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6305 lines
293 KiB
Text
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This is fftw3.info, produced by makeinfo version 6.7 from fftw3.texi.
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This manual is for FFTW (version 3.3.10, 10 December 2020).
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Copyright (C) 2003 Matteo Frigo.
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Copyright (C) 2003 Massachusetts Institute of Technology.
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Permission is granted to make and distribute verbatim copies of
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this manual provided the copyright notice and this permission
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notice are preserved on all copies.
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Permission is granted to copy and distribute modified versions of
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this manual under the conditions for verbatim copying, provided
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that the entire resulting derived work is distributed under the
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terms of a permission notice identical to this one.
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Permission is granted to copy and distribute translations of this
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manual into another language, under the above conditions for
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modified versions, except that this permission notice may be stated
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in a translation approved by the Free Software Foundation.
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INFO-DIR-SECTION Development
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START-INFO-DIR-ENTRY
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* fftw3: (fftw3). FFTW User's Manual.
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END-INFO-DIR-ENTRY
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File: fftw3.info, Node: Top, Next: Introduction, Prev: (dir), Up: (dir)
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FFTW User Manual
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****************
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Welcome to FFTW, the Fastest Fourier Transform in the West. FFTW is a
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collection of fast C routines to compute the discrete Fourier transform.
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This manual documents FFTW version 3.3.10.
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* Menu:
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* Introduction::
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* Tutorial::
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* Other Important Topics::
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* FFTW Reference::
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* Multi-threaded FFTW::
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* Distributed-memory FFTW with MPI::
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* Calling FFTW from Modern Fortran::
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* Calling FFTW from Legacy Fortran::
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* Upgrading from FFTW version 2::
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* Installation and Customization::
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* Acknowledgments::
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* License and Copyright::
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* Concept Index::
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* Library Index::
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File: fftw3.info, Node: Introduction, Next: Tutorial, Prev: Top, Up: Top
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1 Introduction
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**************
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This manual documents version 3.3.10 of FFTW, the _Fastest Fourier
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Transform in the West_. FFTW is a comprehensive collection of fast C
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routines for computing the discrete Fourier transform (DFT) and various
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special cases thereof.
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* FFTW computes the DFT of complex data, real data, even- or
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odd-symmetric real data (these symmetric transforms are usually
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known as the discrete cosine or sine transform, respectively), and
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the discrete Hartley transform (DHT) of real data.
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* The input data can have arbitrary length. FFTW employs O(n log n)
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algorithms for all lengths, including prime numbers.
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* FFTW supports arbitrary multi-dimensional data.
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* FFTW supports the SSE, SSE2, AVX, AVX2, AVX512, KCVI, Altivec, VSX,
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and NEON vector instruction sets.
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* FFTW includes parallel (multi-threaded) transforms for
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shared-memory systems.
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* Starting with version 3.3, FFTW includes distributed-memory
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parallel transforms using MPI.
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We assume herein that you are familiar with the properties and uses
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of the DFT that are relevant to your application. Otherwise, see e.g.
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'The Fast Fourier Transform and Its Applications' by E. O. Brigham
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(Prentice-Hall, Englewood Cliffs, NJ, 1988). Our web page
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(http://www.fftw.org) also has links to FFT-related information online.
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In order to use FFTW effectively, you need to learn one basic concept
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of FFTW's internal structure: FFTW does not use a fixed algorithm for
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computing the transform, but instead it adapts the DFT algorithm to
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details of the underlying hardware in order to maximize performance.
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Hence, the computation of the transform is split into two phases.
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First, FFTW's "planner" "learns" the fastest way to compute the
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transform on your machine. The planner produces a data structure called
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a "plan" that contains this information. Subsequently, the plan is
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"executed" to transform the array of input data as dictated by the plan.
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The plan can be reused as many times as needed. In typical
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high-performance applications, many transforms of the same size are
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computed and, consequently, a relatively expensive initialization of
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this sort is acceptable. On the other hand, if you need a single
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transform of a given size, the one-time cost of the planner becomes
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significant. For this case, FFTW provides fast planners based on
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heuristics or on previously computed plans.
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FFTW supports transforms of data with arbitrary length, rank,
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multiplicity, and a general memory layout. In simple cases, however,
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this generality may be unnecessary and confusing. Consequently, we
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organized the interface to FFTW into three levels of increasing
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generality.
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* The "basic interface" computes a single transform of contiguous
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data.
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* The "advanced interface" computes transforms of multiple or strided
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arrays.
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* The "guru interface" supports the most general data layouts,
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multiplicities, and strides.
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We expect that most users will be best served by the basic interface,
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whereas the guru interface requires careful attention to the
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documentation to avoid problems.
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Besides the automatic performance adaptation performed by the
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planner, it is also possible for advanced users to customize FFTW
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manually. For example, if code space is a concern, we provide a tool
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that links only the subset of FFTW needed by your application.
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Conversely, you may need to extend FFTW because the standard
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distribution is not sufficient for your needs. For example, the
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standard FFTW distribution works most efficiently for arrays whose size
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can be factored into small primes (2, 3, 5, and 7), and otherwise it
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uses a slower general-purpose routine. If you need efficient transforms
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of other sizes, you can use FFTW's code generator, which produces fast C
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programs ("codelets") for any particular array size you may care about.
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For example, if you need transforms of size 513 = 19 x 3^3, you can
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customize FFTW to support the factor 19 efficiently.
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For more information regarding FFTW, see the paper, "The Design and
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Implementation of FFTW3," by M. Frigo and S. G. Johnson, which was an
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invited paper in 'Proc. IEEE' 93 (2), p. 216 (2005). The code
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generator is described in the paper "A fast Fourier transform compiler",
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by M. Frigo, in the 'Proceedings of the 1999 ACM SIGPLAN Conference on
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Programming Language Design and Implementation (PLDI), Atlanta, Georgia,
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May 1999'. These papers, along with the latest version of FFTW, the
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FAQ, benchmarks, and other links, are available at the FFTW home page
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(http://www.fftw.org).
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The current version of FFTW incorporates many good ideas from the
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past thirty years of FFT literature. In one way or another, FFTW uses
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the Cooley-Tukey algorithm, the prime factor algorithm, Rader's
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algorithm for prime sizes, and a split-radix algorithm (with a
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"conjugate-pair" variation pointed out to us by Dan Bernstein). FFTW's
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code generator also produces new algorithms that we do not completely
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understand. The reader is referred to the cited papers for the
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appropriate references.
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The rest of this manual is organized as follows. We first discuss
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the sequential (single-processor) implementation. We start by
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describing the basic interface/features of FFTW in *note Tutorial::.
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Next, *note Other Important Topics:: discusses data alignment (*note
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SIMD alignment and fftw_malloc::), the storage scheme of
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multi-dimensional arrays (*note Multi-dimensional Array Format::), and
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FFTW's mechanism for storing plans on disk (*note Words of Wisdom-Saving
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Plans::). Next, *note FFTW Reference:: provides comprehensive
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documentation of all FFTW's features. Parallel transforms are discussed
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in their own chapters: *note Multi-threaded FFTW:: and *note
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Distributed-memory FFTW with MPI::. Fortran programmers can also use
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FFTW, as described in *note Calling FFTW from Legacy Fortran:: and *note
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Calling FFTW from Modern Fortran::. *note Installation and
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Customization:: explains how to install FFTW in your computer system and
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how to adapt FFTW to your needs. License and copyright information is
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given in *note License and Copyright::. Finally, we thank all the
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people who helped us in *note Acknowledgments::.
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File: fftw3.info, Node: Tutorial, Next: Other Important Topics, Prev: Introduction, Up: Top
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2 Tutorial
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**********
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* Menu:
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* Complex One-Dimensional DFTs::
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* Complex Multi-Dimensional DFTs::
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* One-Dimensional DFTs of Real Data::
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* Multi-Dimensional DFTs of Real Data::
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* More DFTs of Real Data::
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This chapter describes the basic usage of FFTW, i.e., how to compute the
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Fourier transform of a single array. This chapter tells the truth, but
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not the _whole_ truth. Specifically, FFTW implements additional
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routines and flags that are not documented here, although in many cases
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we try to indicate where added capabilities exist. For more complete
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information, see *note FFTW Reference::. (Note that you need to compile
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and install FFTW before you can use it in a program. For the details of
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the installation, see *note Installation and Customization::.)
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We recommend that you read this tutorial in order.(1) At the least,
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read the first section (*note Complex One-Dimensional DFTs::) before
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reading any of the others, even if your main interest lies in one of the
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other transform types.
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Users of FFTW version 2 and earlier may also want to read *note
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Upgrading from FFTW version 2::.
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---------- Footnotes ----------
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(1) You can read the tutorial in bit-reversed order after computing
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your first transform.
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File: fftw3.info, Node: Complex One-Dimensional DFTs, Next: Complex Multi-Dimensional DFTs, Prev: Tutorial, Up: Tutorial
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2.1 Complex One-Dimensional DFTs
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================================
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Plan: To bother about the best method of accomplishing an
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accidental result. [Ambrose Bierce, 'The Enlarged Devil's
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Dictionary'.]
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The basic usage of FFTW to compute a one-dimensional DFT of size 'N'
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is simple, and it typically looks something like this code:
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#include <fftw3.h>
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...
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{
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fftw_complex *in, *out;
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fftw_plan p;
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...
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in = (fftw_complex*) fftw_malloc(sizeof(fftw_complex) * N);
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out = (fftw_complex*) fftw_malloc(sizeof(fftw_complex) * N);
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p = fftw_plan_dft_1d(N, in, out, FFTW_FORWARD, FFTW_ESTIMATE);
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...
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fftw_execute(p); /* repeat as needed */
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...
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fftw_destroy_plan(p);
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fftw_free(in); fftw_free(out);
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}
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You must link this code with the 'fftw3' library. On Unix systems,
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link with '-lfftw3 -lm'.
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The example code first allocates the input and output arrays. You
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can allocate them in any way that you like, but we recommend using
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'fftw_malloc', which behaves like 'malloc' except that it properly
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aligns the array when SIMD instructions (such as SSE and Altivec) are
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available (*note SIMD alignment and fftw_malloc::). [Alternatively, we
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provide a convenient wrapper function 'fftw_alloc_complex(N)' which has
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the same effect.]
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The data is an array of type 'fftw_complex', which is by default a
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'double[2]' composed of the real ('in[i][0]') and imaginary ('in[i][1]')
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parts of a complex number.
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The next step is to create a "plan", which is an object that contains
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all the data that FFTW needs to compute the FFT. This function creates
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the plan:
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fftw_plan fftw_plan_dft_1d(int n, fftw_complex *in, fftw_complex *out,
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int sign, unsigned flags);
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The first argument, 'n', is the size of the transform you are trying
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to compute. The size 'n' can be any positive integer, but sizes that
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are products of small factors are transformed most efficiently (although
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prime sizes still use an O(n log n) algorithm).
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The next two arguments are pointers to the input and output arrays of
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the transform. These pointers can be equal, indicating an "in-place"
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transform.
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The fourth argument, 'sign', can be either 'FFTW_FORWARD' ('-1') or
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'FFTW_BACKWARD' ('+1'), and indicates the direction of the transform you
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are interested in; technically, it is the sign of the exponent in the
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transform.
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The 'flags' argument is usually either 'FFTW_MEASURE' or
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'FFTW_ESTIMATE'. 'FFTW_MEASURE' instructs FFTW to run and measure the
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execution time of several FFTs in order to find the best way to compute
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the transform of size 'n'. This process takes some time (usually a few
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seconds), depending on your machine and on the size of the transform.
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'FFTW_ESTIMATE', on the contrary, does not run any computation and just
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builds a reasonable plan that is probably sub-optimal. In short, if
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your program performs many transforms of the same size and
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initialization time is not important, use 'FFTW_MEASURE'; otherwise use
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the estimate.
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_You must create the plan before initializing the input_, because
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'FFTW_MEASURE' overwrites the 'in'/'out' arrays. (Technically,
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'FFTW_ESTIMATE' does not touch your arrays, but you should always create
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plans first just to be sure.)
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Once the plan has been created, you can use it as many times as you
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like for transforms on the specified 'in'/'out' arrays, computing the
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actual transforms via 'fftw_execute(plan)':
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void fftw_execute(const fftw_plan plan);
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The DFT results are stored in-order in the array 'out', with the
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zero-frequency (DC) component in 'out[0]'. If 'in != out', the
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transform is "out-of-place" and the input array 'in' is not modified.
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Otherwise, the input array is overwritten with the transform.
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If you want to transform a _different_ array of the same size, you
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can create a new plan with 'fftw_plan_dft_1d' and FFTW automatically
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reuses the information from the previous plan, if possible.
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Alternatively, with the "guru" interface you can apply a given plan to a
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different array, if you are careful. *Note FFTW Reference::.
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When you are done with the plan, you deallocate it by calling
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'fftw_destroy_plan(plan)':
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void fftw_destroy_plan(fftw_plan plan);
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If you allocate an array with 'fftw_malloc()' you must deallocate it
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with 'fftw_free()'. Do not use 'free()' or, heaven forbid, 'delete'.
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FFTW computes an _unnormalized_ DFT. Thus, computing a forward
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followed by a backward transform (or vice versa) results in the original
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array scaled by 'n'. For the definition of the DFT, see *note What FFTW
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Really Computes::.
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If you have a C compiler, such as 'gcc', that supports the C99
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standard, and you '#include <complex.h>' _before_ '<fftw3.h>', then
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'fftw_complex' is the native double-precision complex type and you can
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manipulate it with ordinary arithmetic. Otherwise, FFTW defines its own
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complex type, which is bit-compatible with the C99 complex type. *Note
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Complex numbers::. (The C++ '<complex>' template class may also be
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usable via a typecast.)
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To use single or long-double precision versions of FFTW, replace the
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'fftw_' prefix by 'fftwf_' or 'fftwl_' and link with '-lfftw3f' or
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'-lfftw3l', but use the _same_ '<fftw3.h>' header file.
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Many more flags exist besides 'FFTW_MEASURE' and 'FFTW_ESTIMATE'.
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For example, use 'FFTW_PATIENT' if you're willing to wait even longer
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for a possibly even faster plan (*note FFTW Reference::). You can also
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save plans for future use, as described by *note Words of Wisdom-Saving
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Plans::.
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|||
|
|
|||
|
File: fftw3.info, Node: Complex Multi-Dimensional DFTs, Next: One-Dimensional DFTs of Real Data, Prev: Complex One-Dimensional DFTs, Up: Tutorial
|
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|
2.2 Complex Multi-Dimensional DFTs
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|
==================================
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Multi-dimensional transforms work much the same way as one-dimensional
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transforms: you allocate arrays of 'fftw_complex' (preferably using
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'fftw_malloc'), create an 'fftw_plan', execute it as many times as you
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want with 'fftw_execute(plan)', and clean up with
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'fftw_destroy_plan(plan)' (and 'fftw_free').
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FFTW provides two routines for creating plans for 2d and 3d
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transforms, and one routine for creating plans of arbitrary
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dimensionality. The 2d and 3d routines have the following signature:
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fftw_plan fftw_plan_dft_2d(int n0, int n1,
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fftw_complex *in, fftw_complex *out,
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int sign, unsigned flags);
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fftw_plan fftw_plan_dft_3d(int n0, int n1, int n2,
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fftw_complex *in, fftw_complex *out,
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int sign, unsigned flags);
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|||
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|
|||
|
These routines create plans for 'n0' by 'n1' two-dimensional (2d)
|
|||
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transforms and 'n0' by 'n1' by 'n2' 3d transforms, respectively. All of
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|||
|
these transforms operate on contiguous arrays in the C-standard
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|
"row-major" order, so that the last dimension has the fastest-varying
|
|||
|
index in the array. This layout is described further in *note
|
|||
|
Multi-dimensional Array Format::.
|
|||
|
|
|||
|
FFTW can also compute transforms of higher dimensionality. In order
|
|||
|
to avoid confusion between the various meanings of the the word
|
|||
|
"dimension", we use the term _rank_ to denote the number of independent
|
|||
|
indices in an array.(1) For example, we say that a 2d transform has
|
|||
|
rank 2, a 3d transform has rank 3, and so on. You can plan transforms
|
|||
|
of arbitrary rank by means of the following function:
|
|||
|
|
|||
|
fftw_plan fftw_plan_dft(int rank, const int *n,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
int sign, unsigned flags);
|
|||
|
|
|||
|
Here, 'n' is a pointer to an array 'n[rank]' denoting an 'n[0]' by
|
|||
|
'n[1]' by ... by 'n[rank-1]' transform. Thus, for example, the call
|
|||
|
fftw_plan_dft_2d(n0, n1, in, out, sign, flags);
|
|||
|
is equivalent to the following code fragment:
|
|||
|
int n[2];
|
|||
|
n[0] = n0;
|
|||
|
n[1] = n1;
|
|||
|
fftw_plan_dft(2, n, in, out, sign, flags);
|
|||
|
'fftw_plan_dft' is not restricted to 2d and 3d transforms, however,
|
|||
|
but it can plan transforms of arbitrary rank.
|
|||
|
|
|||
|
You may have noticed that all the planner routines described so far
|
|||
|
have overlapping functionality. For example, you can plan a 1d or 2d
|
|||
|
transform by using 'fftw_plan_dft' with a 'rank' of '1' or '2', or even
|
|||
|
by calling 'fftw_plan_dft_3d' with 'n0' and/or 'n1' equal to '1' (with
|
|||
|
no loss in efficiency). This pattern continues, and FFTW's planning
|
|||
|
routines in general form a "partial order," sequences of interfaces with
|
|||
|
strictly increasing generality but correspondingly greater complexity.
|
|||
|
|
|||
|
'fftw_plan_dft' is the most general complex-DFT routine that we
|
|||
|
describe in this tutorial, but there are also the advanced and guru
|
|||
|
interfaces, which allow one to efficiently combine multiple/strided
|
|||
|
transforms into a single FFTW plan, transform a subset of a larger
|
|||
|
multi-dimensional array, and/or to handle more general complex-number
|
|||
|
formats. For more information, see *note FFTW Reference::.
|
|||
|
|
|||
|
---------- Footnotes ----------
|
|||
|
|
|||
|
(1) The term "rank" is commonly used in the APL, FORTRAN, and Common
|
|||
|
Lisp traditions, although it is not so common in the C world.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: One-Dimensional DFTs of Real Data, Next: Multi-Dimensional DFTs of Real Data, Prev: Complex Multi-Dimensional DFTs, Up: Tutorial
|
|||
|
|
|||
|
2.3 One-Dimensional DFTs of Real Data
|
|||
|
=====================================
|
|||
|
|
|||
|
In many practical applications, the input data 'in[i]' are purely real
|
|||
|
numbers, in which case the DFT output satisfies the "Hermitian"
|
|||
|
redundancy: 'out[i]' is the conjugate of 'out[n-i]'. It is possible to
|
|||
|
take advantage of these circumstances in order to achieve roughly a
|
|||
|
factor of two improvement in both speed and memory usage.
|
|||
|
|
|||
|
In exchange for these speed and space advantages, the user sacrifices
|
|||
|
some of the simplicity of FFTW's complex transforms. First of all, the
|
|||
|
input and output arrays are of _different sizes and types_: the input is
|
|||
|
'n' real numbers, while the output is 'n/2+1' complex numbers (the
|
|||
|
non-redundant outputs); this also requires slight "padding" of the input
|
|||
|
array for in-place transforms. Second, the inverse transform (complex
|
|||
|
to real) has the side-effect of _overwriting its input array_, by
|
|||
|
default. Neither of these inconveniences should pose a serious problem
|
|||
|
for users, but it is important to be aware of them.
|
|||
|
|
|||
|
The routines to perform real-data transforms are almost the same as
|
|||
|
those for complex transforms: you allocate arrays of 'double' and/or
|
|||
|
'fftw_complex' (preferably using 'fftw_malloc' or 'fftw_alloc_complex'),
|
|||
|
create an 'fftw_plan', execute it as many times as you want with
|
|||
|
'fftw_execute(plan)', and clean up with 'fftw_destroy_plan(plan)' (and
|
|||
|
'fftw_free'). The only differences are that the input (or output) is of
|
|||
|
type 'double' and there are new routines to create the plan. In one
|
|||
|
dimension:
|
|||
|
|
|||
|
fftw_plan fftw_plan_dft_r2c_1d(int n, double *in, fftw_complex *out,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_c2r_1d(int n, fftw_complex *in, double *out,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
for the real input to complex-Hermitian output ("r2c") and
|
|||
|
complex-Hermitian input to real output ("c2r") transforms. Unlike the
|
|||
|
complex DFT planner, there is no 'sign' argument. Instead, r2c DFTs are
|
|||
|
always 'FFTW_FORWARD' and c2r DFTs are always 'FFTW_BACKWARD'. (For
|
|||
|
single/long-double precision 'fftwf' and 'fftwl', 'double' should be
|
|||
|
replaced by 'float' and 'long double', respectively.)
|
|||
|
|
|||
|
Here, 'n' is the "logical" size of the DFT, not necessarily the
|
|||
|
physical size of the array. In particular, the real ('double') array
|
|||
|
has 'n' elements, while the complex ('fftw_complex') array has 'n/2+1'
|
|||
|
elements (where the division is rounded down). For an in-place
|
|||
|
transform, 'in' and 'out' are aliased to the same array, which must be
|
|||
|
big enough to hold both; so, the real array would actually have
|
|||
|
'2*(n/2+1)' elements, where the elements beyond the first 'n' are unused
|
|||
|
padding. (Note that this is very different from the concept of
|
|||
|
"zero-padding" a transform to a larger length, which changes the logical
|
|||
|
size of the DFT by actually adding new input data.) The kth element of
|
|||
|
the complex array is exactly the same as the kth element of the
|
|||
|
corresponding complex DFT. All positive 'n' are supported; products of
|
|||
|
small factors are most efficient, but an O(n log n) algorithm is used
|
|||
|
even for prime sizes.
|
|||
|
|
|||
|
As noted above, the c2r transform destroys its input array even for
|
|||
|
out-of-place transforms. This can be prevented, if necessary, by
|
|||
|
including 'FFTW_PRESERVE_INPUT' in the 'flags', with unfortunately some
|
|||
|
sacrifice in performance. This flag is also not currently supported for
|
|||
|
multi-dimensional real DFTs (next section).
|
|||
|
|
|||
|
Readers familiar with DFTs of real data will recall that the 0th (the
|
|||
|
"DC") and 'n/2'-th (the "Nyquist" frequency, when 'n' is even) elements
|
|||
|
of the complex output are purely real. Some implementations therefore
|
|||
|
store the Nyquist element where the DC imaginary part would go, in order
|
|||
|
to make the input and output arrays the same size. Such packing,
|
|||
|
however, does not generalize well to multi-dimensional transforms, and
|
|||
|
the space savings are miniscule in any case; FFTW does not support it.
|
|||
|
|
|||
|
An alternative interface for one-dimensional r2c and c2r DFTs can be
|
|||
|
found in the 'r2r' interface (*note The Halfcomplex-format DFT::), with
|
|||
|
"halfcomplex"-format output that _is_ the same size (and type) as the
|
|||
|
input array. That interface, although it is not very useful for
|
|||
|
multi-dimensional transforms, may sometimes yield better performance.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Multi-Dimensional DFTs of Real Data, Next: More DFTs of Real Data, Prev: One-Dimensional DFTs of Real Data, Up: Tutorial
|
|||
|
|
|||
|
2.4 Multi-Dimensional DFTs of Real Data
|
|||
|
=======================================
|
|||
|
|
|||
|
Multi-dimensional DFTs of real data use the following planner routines:
|
|||
|
|
|||
|
fftw_plan fftw_plan_dft_r2c_2d(int n0, int n1,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_r2c_3d(int n0, int n1, int n2,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_r2c(int rank, const int *n,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
as well as the corresponding 'c2r' routines with the input/output
|
|||
|
types swapped. These routines work similarly to their complex
|
|||
|
analogues, except for the fact that here the complex output array is cut
|
|||
|
roughly in half and the real array requires padding for in-place
|
|||
|
transforms (as in 1d, above).
|
|||
|
|
|||
|
As before, 'n' is the logical size of the array, and the consequences
|
|||
|
of this on the the format of the complex arrays deserve careful
|
|||
|
attention. Suppose that the real data has dimensions n[0] x n[1] x n[2]
|
|||
|
x ... x n[d-1] (in row-major order). Then, after an r2c transform, the
|
|||
|
output is an n[0] x n[1] x n[2] x ... x (n[d-1]/2 + 1) array of
|
|||
|
'fftw_complex' values in row-major order, corresponding to slightly over
|
|||
|
half of the output of the corresponding complex DFT. (The division is
|
|||
|
rounded down.) The ordering of the data is otherwise exactly the same
|
|||
|
as in the complex-DFT case.
|
|||
|
|
|||
|
For out-of-place transforms, this is the end of the story: the real
|
|||
|
data is stored as a row-major array of size n[0] x n[1] x n[2] x ... x
|
|||
|
n[d-1] and the complex data is stored as a row-major array of size n[0]
|
|||
|
x n[1] x n[2] x ... x (n[d-1]/2 + 1) .
|
|||
|
|
|||
|
For in-place transforms, however, extra padding of the real-data
|
|||
|
array is necessary because the complex array is larger than the real
|
|||
|
array, and the two arrays share the same memory locations. Thus, for
|
|||
|
in-place transforms, the final dimension of the real-data array must be
|
|||
|
padded with extra values to accommodate the size of the complex
|
|||
|
data--two values if the last dimension is even and one if it is odd.
|
|||
|
That is, the last dimension of the real data must physically contain 2 *
|
|||
|
(n[d-1]/2+1) 'double' values (exactly enough to hold the complex data).
|
|||
|
This physical array size does not, however, change the _logical_ array
|
|||
|
size--only n[d-1] values are actually stored in the last dimension, and
|
|||
|
n[d-1] is the last dimension passed to the plan-creation routine.
|
|||
|
|
|||
|
For example, consider the transform of a two-dimensional real array
|
|||
|
of size 'n0' by 'n1'. The output of the r2c transform is a
|
|||
|
two-dimensional complex array of size 'n0' by 'n1/2+1', where the 'y'
|
|||
|
dimension has been cut nearly in half because of redundancies in the
|
|||
|
output. Because 'fftw_complex' is twice the size of 'double', the
|
|||
|
output array is slightly bigger than the input array. Thus, if we want
|
|||
|
to compute the transform in place, we must _pad_ the input array so that
|
|||
|
it is of size 'n0' by '2*(n1/2+1)'. If 'n1' is even, then there are two
|
|||
|
padding elements at the end of each row (which need not be initialized,
|
|||
|
as they are only used for output).
|
|||
|
|
|||
|
These transforms are unnormalized, so an r2c followed by a c2r
|
|||
|
transform (or vice versa) will result in the original data scaled by the
|
|||
|
number of real data elements--that is, the product of the (logical)
|
|||
|
dimensions of the real data.
|
|||
|
|
|||
|
(Because the last dimension is treated specially, if it is equal to
|
|||
|
'1' the transform is _not_ equivalent to a lower-dimensional r2c/c2r
|
|||
|
transform. In that case, the last complex dimension also has size '1'
|
|||
|
('=1/2+1'), and no advantage is gained over the complex transforms.)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: More DFTs of Real Data, Prev: Multi-Dimensional DFTs of Real Data, Up: Tutorial
|
|||
|
|
|||
|
2.5 More DFTs of Real Data
|
|||
|
==========================
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* The Halfcomplex-format DFT::
|
|||
|
* Real even/odd DFTs (cosine/sine transforms)::
|
|||
|
* The Discrete Hartley Transform::
|
|||
|
|
|||
|
FFTW supports several other transform types via a unified "r2r"
|
|||
|
(real-to-real) interface, so called because it takes a real ('double')
|
|||
|
array and outputs a real array of the same size. These r2r transforms
|
|||
|
currently fall into three categories: DFTs of real input and
|
|||
|
complex-Hermitian output in halfcomplex format, DFTs of real input with
|
|||
|
even/odd symmetry (a.k.a. discrete cosine/sine transforms, DCTs/DSTs),
|
|||
|
and discrete Hartley transforms (DHTs), all described in more detail by
|
|||
|
the following sections.
|
|||
|
|
|||
|
The r2r transforms follow the by now familiar interface of creating
|
|||
|
an 'fftw_plan', executing it with 'fftw_execute(plan)', and destroying
|
|||
|
it with 'fftw_destroy_plan(plan)'. Furthermore, all r2r transforms
|
|||
|
share the same planner interface:
|
|||
|
|
|||
|
fftw_plan fftw_plan_r2r_1d(int n, double *in, double *out,
|
|||
|
fftw_r2r_kind kind, unsigned flags);
|
|||
|
fftw_plan fftw_plan_r2r_2d(int n0, int n1, double *in, double *out,
|
|||
|
fftw_r2r_kind kind0, fftw_r2r_kind kind1,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_r2r_3d(int n0, int n1, int n2,
|
|||
|
double *in, double *out,
|
|||
|
fftw_r2r_kind kind0,
|
|||
|
fftw_r2r_kind kind1,
|
|||
|
fftw_r2r_kind kind2,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_r2r(int rank, const int *n, double *in, double *out,
|
|||
|
const fftw_r2r_kind *kind, unsigned flags);
|
|||
|
|
|||
|
Just as for the complex DFT, these plan 1d/2d/3d/multi-dimensional
|
|||
|
transforms for contiguous arrays in row-major order, transforming (real)
|
|||
|
input to output of the same size, where 'n' specifies the _physical_
|
|||
|
dimensions of the arrays. All positive 'n' are supported (with the
|
|||
|
exception of 'n=1' for the 'FFTW_REDFT00' kind, noted in the real-even
|
|||
|
subsection below); products of small factors are most efficient
|
|||
|
(factorizing 'n-1' and 'n+1' for 'FFTW_REDFT00' and 'FFTW_RODFT00'
|
|||
|
kinds, described below), but an O(n log n) algorithm is used even for
|
|||
|
prime sizes.
|
|||
|
|
|||
|
Each dimension has a "kind" parameter, of type 'fftw_r2r_kind',
|
|||
|
specifying the kind of r2r transform to be used for that dimension. (In
|
|||
|
the case of 'fftw_plan_r2r', this is an array 'kind[rank]' where
|
|||
|
'kind[i]' is the transform kind for the dimension 'n[i]'.) The kind can
|
|||
|
be one of a set of predefined constants, defined in the following
|
|||
|
subsections.
|
|||
|
|
|||
|
In other words, FFTW computes the separable product of the specified
|
|||
|
r2r transforms over each dimension, which can be used e.g. for partial
|
|||
|
differential equations with mixed boundary conditions. (For some r2r
|
|||
|
kinds, notably the halfcomplex DFT and the DHT, such a separable product
|
|||
|
is somewhat problematic in more than one dimension, however, as is
|
|||
|
described below.)
|
|||
|
|
|||
|
In the current version of FFTW, all r2r transforms except for the
|
|||
|
halfcomplex type are computed via pre- or post-processing of halfcomplex
|
|||
|
transforms, and they are therefore not as fast as they could be. Since
|
|||
|
most other general DCT/DST codes employ a similar algorithm, however,
|
|||
|
FFTW's implementation should provide at least competitive performance.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: The Halfcomplex-format DFT, Next: Real even/odd DFTs (cosine/sine transforms), Prev: More DFTs of Real Data, Up: More DFTs of Real Data
|
|||
|
|
|||
|
2.5.1 The Halfcomplex-format DFT
|
|||
|
--------------------------------
|
|||
|
|
|||
|
An r2r kind of 'FFTW_R2HC' ("r2hc") corresponds to an r2c DFT (*note
|
|||
|
One-Dimensional DFTs of Real Data::) but with "halfcomplex" format
|
|||
|
output, and may sometimes be faster and/or more convenient than the
|
|||
|
latter. The inverse "hc2r" transform is of kind 'FFTW_HC2R'. This
|
|||
|
consists of the non-redundant half of the complex output for a 1d
|
|||
|
real-input DFT of size 'n', stored as a sequence of 'n' real numbers
|
|||
|
('double') in the format:
|
|||
|
|
|||
|
r0, r1, r2, r(n/2), i((n+1)/2-1), ..., i2, i1
|
|||
|
|
|||
|
Here, rk is the real part of the kth output, and ik is the imaginary
|
|||
|
part. (Division by 2 is rounded down.) For a halfcomplex array
|
|||
|
'hc[n]', the kth component thus has its real part in 'hc[k]' and its
|
|||
|
imaginary part in 'hc[n-k]', with the exception of 'k' '==' '0' or 'n/2'
|
|||
|
(the latter only if 'n' is even)--in these two cases, the imaginary part
|
|||
|
is zero due to symmetries of the real-input DFT, and is not stored.
|
|||
|
Thus, the r2hc transform of 'n' real values is a halfcomplex array of
|
|||
|
length 'n', and vice versa for hc2r.
|
|||
|
|
|||
|
Aside from the differing format, the output of
|
|||
|
'FFTW_R2HC'/'FFTW_HC2R' is otherwise exactly the same as for the
|
|||
|
corresponding 1d r2c/c2r transform (i.e. 'FFTW_FORWARD'/'FFTW_BACKWARD'
|
|||
|
transforms, respectively). Recall that these transforms are
|
|||
|
unnormalized, so r2hc followed by hc2r will result in the original data
|
|||
|
multiplied by 'n'. Furthermore, like the c2r transform, an out-of-place
|
|||
|
hc2r transform will _destroy its input_ array.
|
|||
|
|
|||
|
Although these halfcomplex transforms can be used with the
|
|||
|
multi-dimensional r2r interface, the interpretation of such a separable
|
|||
|
product of transforms along each dimension is problematic. For example,
|
|||
|
consider a two-dimensional 'n0' by 'n1', r2hc by r2hc transform planned
|
|||
|
by 'fftw_plan_r2r_2d(n0, n1, in, out, FFTW_R2HC, FFTW_R2HC,
|
|||
|
FFTW_MEASURE)'. Conceptually, FFTW first transforms the rows (of size
|
|||
|
'n1') to produce halfcomplex rows, and then transforms the columns (of
|
|||
|
size 'n0'). Half of these column transforms, however, are of imaginary
|
|||
|
parts, and should therefore be multiplied by i and combined with the
|
|||
|
r2hc transforms of the real columns to produce the 2d DFT amplitudes;
|
|||
|
FFTW's r2r transform does _not_ perform this combination for you. Thus,
|
|||
|
if a multi-dimensional real-input/output DFT is required, we recommend
|
|||
|
using the ordinary r2c/c2r interface (*note Multi-Dimensional DFTs of
|
|||
|
Real Data::).
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Real even/odd DFTs (cosine/sine transforms), Next: The Discrete Hartley Transform, Prev: The Halfcomplex-format DFT, Up: More DFTs of Real Data
|
|||
|
|
|||
|
2.5.2 Real even/odd DFTs (cosine/sine transforms)
|
|||
|
-------------------------------------------------
|
|||
|
|
|||
|
The Fourier transform of a real-even function f(-x) = f(x) is real-even,
|
|||
|
and i times the Fourier transform of a real-odd function f(-x) = -f(x)
|
|||
|
is real-odd. Similar results hold for a discrete Fourier transform, and
|
|||
|
thus for these symmetries the need for complex inputs/outputs is
|
|||
|
entirely eliminated. Moreover, one gains a factor of two in speed/space
|
|||
|
from the fact that the data are real, and an additional factor of two
|
|||
|
from the even/odd symmetry: only the non-redundant (first) half of the
|
|||
|
array need be stored. The result is the real-even DFT ("REDFT") and the
|
|||
|
real-odd DFT ("RODFT"), also known as the discrete cosine and sine
|
|||
|
transforms ("DCT" and "DST"), respectively.
|
|||
|
|
|||
|
(In this section, we describe the 1d transforms; multi-dimensional
|
|||
|
transforms are just a separable product of these transforms operating
|
|||
|
along each dimension.)
|
|||
|
|
|||
|
Because of the discrete sampling, one has an additional choice: is
|
|||
|
the data even/odd around a sampling point, or around the point halfway
|
|||
|
between two samples? The latter corresponds to _shifting_ the samples
|
|||
|
by _half_ an interval, and gives rise to several transform variants
|
|||
|
denoted by REDFTab and RODFTab: a and b are 0 or 1, and indicate whether
|
|||
|
the input (a) and/or output (b) are shifted by half a sample (1 means it
|
|||
|
is shifted). These are also known as types I-IV of the DCT and DST, and
|
|||
|
all four types are supported by FFTW's r2r interface.(1)
|
|||
|
|
|||
|
The r2r kinds for the various REDFT and RODFT types supported by
|
|||
|
FFTW, along with the boundary conditions at both ends of the _input_
|
|||
|
array ('n' real numbers 'in[j=0..n-1]'), are:
|
|||
|
|
|||
|
* 'FFTW_REDFT00' (DCT-I): even around j=0 and even around j=n-1.
|
|||
|
|
|||
|
* 'FFTW_REDFT10' (DCT-II, "the" DCT): even around j=-0.5 and even
|
|||
|
around j=n-0.5.
|
|||
|
|
|||
|
* 'FFTW_REDFT01' (DCT-III, "the" IDCT): even around j=0 and odd
|
|||
|
around j=n.
|
|||
|
|
|||
|
* 'FFTW_REDFT11' (DCT-IV): even around j=-0.5 and odd around j=n-0.5.
|
|||
|
|
|||
|
* 'FFTW_RODFT00' (DST-I): odd around j=-1 and odd around j=n.
|
|||
|
|
|||
|
* 'FFTW_RODFT10' (DST-II): odd around j=-0.5 and odd around j=n-0.5.
|
|||
|
|
|||
|
* 'FFTW_RODFT01' (DST-III): odd around j=-1 and even around j=n-1.
|
|||
|
|
|||
|
* 'FFTW_RODFT11' (DST-IV): odd around j=-0.5 and even around j=n-0.5.
|
|||
|
|
|||
|
Note that these symmetries apply to the "logical" array being
|
|||
|
transformed; *there are no constraints on your physical input data*.
|
|||
|
So, for example, if you specify a size-5 REDFT00 (DCT-I) of the data
|
|||
|
abcde, it corresponds to the DFT of the logical even array abcdedcb of
|
|||
|
size 8. A size-4 REDFT10 (DCT-II) of the data abcd corresponds to the
|
|||
|
size-8 logical DFT of the even array abcddcba, shifted by half a sample.
|
|||
|
|
|||
|
All of these transforms are invertible. The inverse of R*DFT00 is
|
|||
|
R*DFT00; of R*DFT10 is R*DFT01 and vice versa (these are often called
|
|||
|
simply "the" DCT and IDCT, respectively); and of R*DFT11 is R*DFT11.
|
|||
|
However, the transforms computed by FFTW are unnormalized, exactly like
|
|||
|
the corresponding real and complex DFTs, so computing a transform
|
|||
|
followed by its inverse yields the original array scaled by N, where N
|
|||
|
is the _logical_ DFT size. For REDFT00, N=2(n-1); for RODFT00,
|
|||
|
N=2(n+1); otherwise, N=2n.
|
|||
|
|
|||
|
Note that the boundary conditions of the transform output array are
|
|||
|
given by the input boundary conditions of the inverse transform. Thus,
|
|||
|
the above transforms are all inequivalent in terms of input/output
|
|||
|
boundary conditions, even neglecting the 0.5 shift difference.
|
|||
|
|
|||
|
FFTW is most efficient when N is a product of small factors; note
|
|||
|
that this _differs_ from the factorization of the physical size 'n' for
|
|||
|
REDFT00 and RODFT00! There is another oddity: 'n=1' REDFT00 transforms
|
|||
|
correspond to N=0, and so are _not defined_ (the planner will return
|
|||
|
'NULL'). Otherwise, any positive 'n' is supported.
|
|||
|
|
|||
|
For the precise mathematical definitions of these transforms as used
|
|||
|
by FFTW, see *note What FFTW Really Computes::. (For people accustomed
|
|||
|
to the DCT/DST, FFTW's definitions have a coefficient of 2 in front of
|
|||
|
the cos/sin functions so that they correspond precisely to an even/odd
|
|||
|
DFT of size N. Some authors also include additional multiplicative
|
|||
|
factors of sqrt(2) for selected inputs and outputs; this makes the
|
|||
|
transform orthogonal, but sacrifices the direct equivalence to a
|
|||
|
symmetric DFT.)
|
|||
|
|
|||
|
Which type do you need?
|
|||
|
.......................
|
|||
|
|
|||
|
Since the required flavor of even/odd DFT depends upon your problem, you
|
|||
|
are the best judge of this choice, but we can make a few comments on
|
|||
|
relative efficiency to help you in your selection. In particular,
|
|||
|
R*DFT01 and R*DFT10 tend to be slightly faster than R*DFT11 (especially
|
|||
|
for odd sizes), while the R*DFT00 transforms are sometimes significantly
|
|||
|
slower (especially for even sizes).(2)
|
|||
|
|
|||
|
Thus, if only the boundary conditions on the transform inputs are
|
|||
|
specified, we generally recommend R*DFT10 over R*DFT00 and R*DFT01 over
|
|||
|
R*DFT11 (unless the half-sample shift or the self-inverse property is
|
|||
|
significant for your problem).
|
|||
|
|
|||
|
If performance is important to you and you are using only small sizes
|
|||
|
(say n<200), e.g. for multi-dimensional transforms, then you might
|
|||
|
consider generating hard-coded transforms of those sizes and types that
|
|||
|
you are interested in (*note Generating your own code::).
|
|||
|
|
|||
|
We are interested in hearing what types of symmetric transforms you
|
|||
|
find most useful.
|
|||
|
|
|||
|
---------- Footnotes ----------
|
|||
|
|
|||
|
(1) There are also type V-VIII transforms, which correspond to a
|
|||
|
logical DFT of _odd_ size N, independent of whether the physical size
|
|||
|
'n' is odd, but we do not support these variants.
|
|||
|
|
|||
|
(2) R*DFT00 is sometimes slower in FFTW because we discovered that
|
|||
|
the standard algorithm for computing this by a pre/post-processed real
|
|||
|
DFT--the algorithm used in FFTPACK, Numerical Recipes, and other sources
|
|||
|
for decades now--has serious numerical problems: it already loses
|
|||
|
several decimal places of accuracy for 16k sizes. There seem to be only
|
|||
|
two alternatives in the literature that do not suffer similarly: a
|
|||
|
recursive decomposition into smaller DCTs, which would require a large
|
|||
|
set of codelets for efficiency and generality, or sacrificing a factor
|
|||
|
of 2 in speed to use a real DFT of twice the size. We currently employ
|
|||
|
the latter technique for general n, as well as a limited form of the
|
|||
|
former method: a split-radix decomposition when n is odd (N a multiple
|
|||
|
of 4). For N containing many factors of 2, the split-radix method seems
|
|||
|
to recover most of the speed of the standard algorithm without the
|
|||
|
accuracy tradeoff.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: The Discrete Hartley Transform, Prev: Real even/odd DFTs (cosine/sine transforms), Up: More DFTs of Real Data
|
|||
|
|
|||
|
2.5.3 The Discrete Hartley Transform
|
|||
|
------------------------------------
|
|||
|
|
|||
|
If you are planning to use the DHT because you've heard that it is
|
|||
|
"faster" than the DFT (FFT), *stop here*. The DHT is not faster than
|
|||
|
the DFT. That story is an old but enduring misconception that was
|
|||
|
debunked in 1987.
|
|||
|
|
|||
|
The discrete Hartley transform (DHT) is an invertible linear
|
|||
|
transform closely related to the DFT. In the DFT, one multiplies each
|
|||
|
input by cos - i * sin (a complex exponential), whereas in the DHT each
|
|||
|
input is multiplied by simply cos + sin. Thus, the DHT transforms 'n'
|
|||
|
real numbers to 'n' real numbers, and has the convenient property of
|
|||
|
being its own inverse. In FFTW, a DHT (of any positive 'n') can be
|
|||
|
specified by an r2r kind of 'FFTW_DHT'.
|
|||
|
|
|||
|
Like the DFT, in FFTW the DHT is unnormalized, so computing a DHT of
|
|||
|
size 'n' followed by another DHT of the same size will result in the
|
|||
|
original array multiplied by 'n'.
|
|||
|
|
|||
|
The DHT was originally proposed as a more efficient alternative to
|
|||
|
the DFT for real data, but it was subsequently shown that a specialized
|
|||
|
DFT (such as FFTW's r2hc or r2c transforms) could be just as fast. In
|
|||
|
FFTW, the DHT is actually computed by post-processing an r2hc transform,
|
|||
|
so there is ordinarily no reason to prefer it from a performance
|
|||
|
perspective.(1) However, we have heard rumors that the DHT might be the
|
|||
|
most appropriate transform in its own right for certain applications,
|
|||
|
and we would be very interested to hear from anyone who finds it useful.
|
|||
|
|
|||
|
If 'FFTW_DHT' is specified for multiple dimensions of a
|
|||
|
multi-dimensional transform, FFTW computes the separable product of 1d
|
|||
|
DHTs along each dimension. Unfortunately, this is not quite the same
|
|||
|
thing as a true multi-dimensional DHT; you can compute the latter, if
|
|||
|
necessary, with at most 'rank-1' post-processing passes [see e.g. H.
|
|||
|
Hao and R. N. Bracewell, Proc. IEEE 75, 264-266 (1987)].
|
|||
|
|
|||
|
For the precise mathematical definition of the DHT as used by FFTW,
|
|||
|
see *note What FFTW Really Computes::.
|
|||
|
|
|||
|
---------- Footnotes ----------
|
|||
|
|
|||
|
(1) We provide the DHT mainly as a byproduct of some internal
|
|||
|
algorithms. FFTW computes a real input/output DFT of _prime_ size by
|
|||
|
re-expressing it as a DHT plus post/pre-processing and then using
|
|||
|
Rader's prime-DFT algorithm adapted to the DHT.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Other Important Topics, Next: FFTW Reference, Prev: Tutorial, Up: Top
|
|||
|
|
|||
|
3 Other Important Topics
|
|||
|
************************
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* SIMD alignment and fftw_malloc::
|
|||
|
* Multi-dimensional Array Format::
|
|||
|
* Words of Wisdom-Saving Plans::
|
|||
|
* Caveats in Using Wisdom::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: SIMD alignment and fftw_malloc, Next: Multi-dimensional Array Format, Prev: Other Important Topics, Up: Other Important Topics
|
|||
|
|
|||
|
3.1 SIMD alignment and fftw_malloc
|
|||
|
==================================
|
|||
|
|
|||
|
SIMD, which stands for "Single Instruction Multiple Data," is a set of
|
|||
|
special operations supported by some processors to perform a single
|
|||
|
operation on several numbers (usually 2 or 4) simultaneously. SIMD
|
|||
|
floating-point instructions are available on several popular CPUs:
|
|||
|
SSE/SSE2/AVX/AVX2/AVX512/KCVI on some x86/x86-64 processors, AltiVec and
|
|||
|
VSX on some POWER/PowerPCs, NEON on some ARM models. FFTW can be
|
|||
|
compiled to support the SIMD instructions on any of these systems.
|
|||
|
|
|||
|
A program linking to an FFTW library compiled with SIMD support can
|
|||
|
obtain a nonnegligible speedup for most complex and r2c/c2r transforms.
|
|||
|
In order to obtain this speedup, however, the arrays of complex (or
|
|||
|
real) data passed to FFTW must be specially aligned in memory (typically
|
|||
|
16-byte aligned), and often this alignment is more stringent than that
|
|||
|
provided by the usual 'malloc' (etc.) allocation routines.
|
|||
|
|
|||
|
In order to guarantee proper alignment for SIMD, therefore, in case
|
|||
|
your program is ever linked against a SIMD-using FFTW, we recommend
|
|||
|
allocating your transform data with 'fftw_malloc' and de-allocating it
|
|||
|
with 'fftw_free'. These have exactly the same interface and behavior as
|
|||
|
'malloc'/'free', except that for a SIMD FFTW they ensure that the
|
|||
|
returned pointer has the necessary alignment (by calling 'memalign' or
|
|||
|
its equivalent on your OS).
|
|||
|
|
|||
|
You are not _required_ to use 'fftw_malloc'. You can allocate your
|
|||
|
data in any way that you like, from 'malloc' to 'new' (in C++) to a
|
|||
|
fixed-size array declaration. If the array happens not to be properly
|
|||
|
aligned, FFTW will not use the SIMD extensions.
|
|||
|
|
|||
|
Since 'fftw_malloc' only ever needs to be used for real and complex
|
|||
|
arrays, we provide two convenient wrapper routines 'fftw_alloc_real(N)'
|
|||
|
and 'fftw_alloc_complex(N)' that are equivalent to
|
|||
|
'(double*)fftw_malloc(sizeof(double) * N)' and
|
|||
|
'(fftw_complex*)fftw_malloc(sizeof(fftw_complex) * N)', respectively (or
|
|||
|
their equivalents in other precisions).
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Multi-dimensional Array Format, Next: Words of Wisdom-Saving Plans, Prev: SIMD alignment and fftw_malloc, Up: Other Important Topics
|
|||
|
|
|||
|
3.2 Multi-dimensional Array Format
|
|||
|
==================================
|
|||
|
|
|||
|
This section describes the format in which multi-dimensional arrays are
|
|||
|
stored in FFTW. We felt that a detailed discussion of this topic was
|
|||
|
necessary. Since several different formats are common, this topic is
|
|||
|
often a source of confusion.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Row-major Format::
|
|||
|
* Column-major Format::
|
|||
|
* Fixed-size Arrays in C::
|
|||
|
* Dynamic Arrays in C::
|
|||
|
* Dynamic Arrays in C-The Wrong Way::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Row-major Format, Next: Column-major Format, Prev: Multi-dimensional Array Format, Up: Multi-dimensional Array Format
|
|||
|
|
|||
|
3.2.1 Row-major Format
|
|||
|
----------------------
|
|||
|
|
|||
|
The multi-dimensional arrays passed to 'fftw_plan_dft' etcetera are
|
|||
|
expected to be stored as a single contiguous block in "row-major" order
|
|||
|
(sometimes called "C order"). Basically, this means that as you step
|
|||
|
through adjacent memory locations, the first dimension's index varies
|
|||
|
most slowly and the last dimension's index varies most quickly.
|
|||
|
|
|||
|
To be more explicit, let us consider an array of rank d whose
|
|||
|
dimensions are n[0] x n[1] x n[2] x ... x n[d-1] . Now, we specify a
|
|||
|
location in the array by a sequence of d (zero-based) indices, one for
|
|||
|
each dimension: (i[0], i[1], ..., i[d-1]). If the array is stored in
|
|||
|
row-major order, then this element is located at the position i[d-1] +
|
|||
|
n[d-1] * (i[d-2] + n[d-2] * (... + n[1] * i[0])).
|
|||
|
|
|||
|
Note that, for the ordinary complex DFT, each element of the array
|
|||
|
must be of type 'fftw_complex'; i.e. a (real, imaginary) pair of
|
|||
|
(double-precision) numbers.
|
|||
|
|
|||
|
In the advanced FFTW interface, the physical dimensions n from which
|
|||
|
the indices are computed can be different from (larger than) the logical
|
|||
|
dimensions of the transform to be computed, in order to transform a
|
|||
|
subset of a larger array. Note also that, in the advanced interface,
|
|||
|
the expression above is multiplied by a "stride" to get the actual array
|
|||
|
index--this is useful in situations where each element of the
|
|||
|
multi-dimensional array is actually a data structure (or another array),
|
|||
|
and you just want to transform a single field. In the basic interface,
|
|||
|
however, the stride is 1.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Column-major Format, Next: Fixed-size Arrays in C, Prev: Row-major Format, Up: Multi-dimensional Array Format
|
|||
|
|
|||
|
3.2.2 Column-major Format
|
|||
|
-------------------------
|
|||
|
|
|||
|
Readers from the Fortran world are used to arrays stored in
|
|||
|
"column-major" order (sometimes called "Fortran order"). This is
|
|||
|
essentially the exact opposite of row-major order in that, here, the
|
|||
|
_first_ dimension's index varies most quickly.
|
|||
|
|
|||
|
If you have an array stored in column-major order and wish to
|
|||
|
transform it using FFTW, it is quite easy to do. When creating the
|
|||
|
plan, simply pass the dimensions of the array to the planner in _reverse
|
|||
|
order_. For example, if your array is a rank three 'N x M x L' matrix
|
|||
|
in column-major order, you should pass the dimensions of the array as if
|
|||
|
it were an 'L x M x N' matrix (which it is, from the perspective of
|
|||
|
FFTW). This is done for you _automatically_ by the FFTW legacy-Fortran
|
|||
|
interface (*note Calling FFTW from Legacy Fortran::), but you must do it
|
|||
|
manually with the modern Fortran interface (*note Reversing array
|
|||
|
dimensions::).
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Fixed-size Arrays in C, Next: Dynamic Arrays in C, Prev: Column-major Format, Up: Multi-dimensional Array Format
|
|||
|
|
|||
|
3.2.3 Fixed-size Arrays in C
|
|||
|
----------------------------
|
|||
|
|
|||
|
A multi-dimensional array whose size is declared at compile time in C is
|
|||
|
_already_ in row-major order. You don't have to do anything special to
|
|||
|
transform it. For example:
|
|||
|
|
|||
|
{
|
|||
|
fftw_complex data[N0][N1][N2];
|
|||
|
fftw_plan plan;
|
|||
|
...
|
|||
|
plan = fftw_plan_dft_3d(N0, N1, N2, &data[0][0][0], &data[0][0][0],
|
|||
|
FFTW_FORWARD, FFTW_ESTIMATE);
|
|||
|
...
|
|||
|
}
|
|||
|
|
|||
|
This will plan a 3d in-place transform of size 'N0 x N1 x N2'.
|
|||
|
Notice how we took the address of the zero-th element to pass to the
|
|||
|
planner (we could also have used a typecast).
|
|||
|
|
|||
|
However, we tend to _discourage_ users from declaring their arrays in
|
|||
|
this way, for two reasons. First, this allocates the array on the stack
|
|||
|
("automatic" storage), which has a very limited size on most operating
|
|||
|
systems (declaring an array with more than a few thousand elements will
|
|||
|
often cause a crash). (You can get around this limitation on many
|
|||
|
systems by declaring the array as 'static' and/or global, but that has
|
|||
|
its own drawbacks.) Second, it may not optimally align the array for
|
|||
|
use with a SIMD FFTW (*note SIMD alignment and fftw_malloc::). Instead,
|
|||
|
we recommend using 'fftw_malloc', as described below.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Dynamic Arrays in C, Next: Dynamic Arrays in C-The Wrong Way, Prev: Fixed-size Arrays in C, Up: Multi-dimensional Array Format
|
|||
|
|
|||
|
3.2.4 Dynamic Arrays in C
|
|||
|
-------------------------
|
|||
|
|
|||
|
We recommend allocating most arrays dynamically, with 'fftw_malloc'.
|
|||
|
This isn't too hard to do, although it is not as straightforward for
|
|||
|
multi-dimensional arrays as it is for one-dimensional arrays.
|
|||
|
|
|||
|
Creating the array is simple: using a dynamic-allocation routine like
|
|||
|
'fftw_malloc', allocate an array big enough to store N 'fftw_complex'
|
|||
|
values (for a complex DFT), where N is the product of the sizes of the
|
|||
|
array dimensions (i.e. the total number of complex values in the
|
|||
|
array). For example, here is code to allocate a 5 x 12 x 27 rank-3
|
|||
|
array:
|
|||
|
|
|||
|
fftw_complex *an_array;
|
|||
|
an_array = (fftw_complex*) fftw_malloc(5*12*27 * sizeof(fftw_complex));
|
|||
|
|
|||
|
Accessing the array elements, however, is more tricky--you can't
|
|||
|
simply use multiple applications of the '[]' operator like you could for
|
|||
|
fixed-size arrays. Instead, you have to explicitly compute the offset
|
|||
|
into the array using the formula given earlier for row-major arrays.
|
|||
|
For example, to reference the (i,j,k)-th element of the array allocated
|
|||
|
above, you would use the expression 'an_array[k + 27 * (j + 12 * i)]'.
|
|||
|
|
|||
|
This pain can be alleviated somewhat by defining appropriate macros,
|
|||
|
or, in C++, creating a class and overloading the '()' operator. The
|
|||
|
recent C99 standard provides a way to reinterpret the dynamic array as a
|
|||
|
"variable-length" multi-dimensional array amenable to '[]', but this
|
|||
|
feature is not yet widely supported by compilers.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Dynamic Arrays in C-The Wrong Way, Prev: Dynamic Arrays in C, Up: Multi-dimensional Array Format
|
|||
|
|
|||
|
3.2.5 Dynamic Arrays in C--The Wrong Way
|
|||
|
----------------------------------------
|
|||
|
|
|||
|
A different method for allocating multi-dimensional arrays in C is often
|
|||
|
suggested that is incompatible with FFTW: _using it will cause FFTW to
|
|||
|
die a painful death_. We discuss the technique here, however, because
|
|||
|
it is so commonly known and used. This method is to create arrays of
|
|||
|
pointers of arrays of pointers of ...etcetera. For example, the
|
|||
|
analogue in this method to the example above is:
|
|||
|
|
|||
|
int i,j;
|
|||
|
fftw_complex ***a_bad_array; /* another way to make a 5x12x27 array */
|
|||
|
|
|||
|
a_bad_array = (fftw_complex ***) malloc(5 * sizeof(fftw_complex **));
|
|||
|
for (i = 0; i < 5; ++i) {
|
|||
|
a_bad_array[i] =
|
|||
|
(fftw_complex **) malloc(12 * sizeof(fftw_complex *));
|
|||
|
for (j = 0; j < 12; ++j)
|
|||
|
a_bad_array[i][j] =
|
|||
|
(fftw_complex *) malloc(27 * sizeof(fftw_complex));
|
|||
|
}
|
|||
|
|
|||
|
As you can see, this sort of array is inconvenient to allocate (and
|
|||
|
deallocate). On the other hand, it has the advantage that the
|
|||
|
(i,j,k)-th element can be referenced simply by 'a_bad_array[i][j][k]'.
|
|||
|
|
|||
|
If you like this technique and want to maximize convenience in
|
|||
|
accessing the array, but still want to pass the array to FFTW, you can
|
|||
|
use a hybrid method. Allocate the array as one contiguous block, but
|
|||
|
also declare an array of arrays of pointers that point to appropriate
|
|||
|
places in the block. That sort of trick is beyond the scope of this
|
|||
|
documentation; for more information on multi-dimensional arrays in C,
|
|||
|
see the 'comp.lang.c' FAQ (http://c-faq.com/aryptr/dynmuldimary.html).
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Words of Wisdom-Saving Plans, Next: Caveats in Using Wisdom, Prev: Multi-dimensional Array Format, Up: Other Important Topics
|
|||
|
|
|||
|
3.3 Words of Wisdom--Saving Plans
|
|||
|
=================================
|
|||
|
|
|||
|
FFTW implements a method for saving plans to disk and restoring them.
|
|||
|
In fact, what FFTW does is more general than just saving and loading
|
|||
|
plans. The mechanism is called "wisdom". Here, we describe this
|
|||
|
feature at a high level. *Note FFTW Reference::, for a less casual but
|
|||
|
more complete discussion of how to use wisdom in FFTW.
|
|||
|
|
|||
|
Plans created with the 'FFTW_MEASURE', 'FFTW_PATIENT', or
|
|||
|
'FFTW_EXHAUSTIVE' options produce near-optimal FFT performance, but may
|
|||
|
require a long time to compute because FFTW must measure the runtime of
|
|||
|
many possible plans and select the best one. This setup is designed for
|
|||
|
the situations where so many transforms of the same size must be
|
|||
|
computed that the start-up time is irrelevant. For short initialization
|
|||
|
times, but slower transforms, we have provided 'FFTW_ESTIMATE'. The
|
|||
|
'wisdom' mechanism is a way to get the best of both worlds: you compute
|
|||
|
a good plan once, save it to disk, and later reload it as many times as
|
|||
|
necessary. The wisdom mechanism can actually save and reload many plans
|
|||
|
at once, not just one.
|
|||
|
|
|||
|
Whenever you create a plan, the FFTW planner accumulates wisdom,
|
|||
|
which is information sufficient to reconstruct the plan. After
|
|||
|
planning, you can save this information to disk by means of the
|
|||
|
function:
|
|||
|
int fftw_export_wisdom_to_filename(const char *filename);
|
|||
|
(This function returns non-zero on success.)
|
|||
|
|
|||
|
The next time you run the program, you can restore the wisdom with
|
|||
|
'fftw_import_wisdom_from_filename' (which also returns non-zero on
|
|||
|
success), and then recreate the plan using the same flags as before.
|
|||
|
int fftw_import_wisdom_from_filename(const char *filename);
|
|||
|
|
|||
|
Wisdom is automatically used for any size to which it is applicable,
|
|||
|
as long as the planner flags are not more "patient" than those with
|
|||
|
which the wisdom was created. For example, wisdom created with
|
|||
|
'FFTW_MEASURE' can be used if you later plan with 'FFTW_ESTIMATE' or
|
|||
|
'FFTW_MEASURE', but not with 'FFTW_PATIENT'.
|
|||
|
|
|||
|
The 'wisdom' is cumulative, and is stored in a global, private data
|
|||
|
structure managed internally by FFTW. The storage space required is
|
|||
|
minimal, proportional to the logarithm of the sizes the wisdom was
|
|||
|
generated from. If memory usage is a concern, however, the wisdom can
|
|||
|
be forgotten and its associated memory freed by calling:
|
|||
|
void fftw_forget_wisdom(void);
|
|||
|
|
|||
|
Wisdom can be exported to a file, a string, or any other medium. For
|
|||
|
details, see *note Wisdom::.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Caveats in Using Wisdom, Prev: Words of Wisdom-Saving Plans, Up: Other Important Topics
|
|||
|
|
|||
|
3.4 Caveats in Using Wisdom
|
|||
|
===========================
|
|||
|
|
|||
|
For in much wisdom is much grief, and he that increaseth knowledge
|
|||
|
increaseth sorrow. [Ecclesiastes 1:18]
|
|||
|
|
|||
|
There are pitfalls to using wisdom, in that it can negate FFTW's
|
|||
|
ability to adapt to changing hardware and other conditions. For
|
|||
|
example, it would be perfectly possible to export wisdom from a program
|
|||
|
running on one processor and import it into a program running on another
|
|||
|
processor. Doing so, however, would mean that the second program would
|
|||
|
use plans optimized for the first processor, instead of the one it is
|
|||
|
running on.
|
|||
|
|
|||
|
It should be safe to reuse wisdom as long as the hardware and program
|
|||
|
binaries remain unchanged. (Actually, the optimal plan may change even
|
|||
|
between runs of the same binary on identical hardware, due to
|
|||
|
differences in the virtual memory environment, etcetera. Users
|
|||
|
seriously interested in performance should worry about this problem,
|
|||
|
too.) It is likely that, if the same wisdom is used for two different
|
|||
|
program binaries, even running on the same machine, the plans may be
|
|||
|
sub-optimal because of differing code alignments. It is therefore wise
|
|||
|
to recreate wisdom every time an application is recompiled. The more
|
|||
|
the underlying hardware and software changes between the creation of
|
|||
|
wisdom and its use, the greater grows the risk of sub-optimal plans.
|
|||
|
|
|||
|
Nevertheless, if the choice is between using 'FFTW_ESTIMATE' or using
|
|||
|
possibly-suboptimal wisdom (created on the same machine, but for a
|
|||
|
different binary), the wisdom is likely to be better. For this reason,
|
|||
|
we provide a function to import wisdom from a standard system-wide
|
|||
|
location ('/etc/fftw/wisdom' on Unix):
|
|||
|
|
|||
|
int fftw_import_system_wisdom(void);
|
|||
|
|
|||
|
FFTW also provides a standalone program, 'fftw-wisdom' (described by
|
|||
|
its own 'man' page on Unix) with which users can create wisdom, e.g.
|
|||
|
for a canonical set of sizes to store in the system wisdom file. *Note
|
|||
|
Wisdom Utilities::.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: FFTW Reference, Next: Multi-threaded FFTW, Prev: Other Important Topics, Up: Top
|
|||
|
|
|||
|
4 FFTW Reference
|
|||
|
****************
|
|||
|
|
|||
|
This chapter provides a complete reference for all sequential (i.e.,
|
|||
|
one-processor) FFTW functions. Parallel transforms are described in
|
|||
|
later chapters.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Data Types and Files::
|
|||
|
* Using Plans::
|
|||
|
* Basic Interface::
|
|||
|
* Advanced Interface::
|
|||
|
* Guru Interface::
|
|||
|
* New-array Execute Functions::
|
|||
|
* Wisdom::
|
|||
|
* What FFTW Really Computes::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Data Types and Files, Next: Using Plans, Prev: FFTW Reference, Up: FFTW Reference
|
|||
|
|
|||
|
4.1 Data Types and Files
|
|||
|
========================
|
|||
|
|
|||
|
All programs using FFTW should include its header file:
|
|||
|
|
|||
|
#include <fftw3.h>
|
|||
|
|
|||
|
You must also link to the FFTW library. On Unix, this means adding
|
|||
|
'-lfftw3 -lm' at the _end_ of the link command.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Complex numbers::
|
|||
|
* Precision::
|
|||
|
* Memory Allocation::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Complex numbers, Next: Precision, Prev: Data Types and Files, Up: Data Types and Files
|
|||
|
|
|||
|
4.1.1 Complex numbers
|
|||
|
---------------------
|
|||
|
|
|||
|
The default FFTW interface uses 'double' precision for all
|
|||
|
floating-point numbers, and defines a 'fftw_complex' type to hold
|
|||
|
complex numbers as:
|
|||
|
|
|||
|
typedef double fftw_complex[2];
|
|||
|
|
|||
|
Here, the '[0]' element holds the real part and the '[1]' element
|
|||
|
holds the imaginary part.
|
|||
|
|
|||
|
Alternatively, if you have a C compiler (such as 'gcc') that supports
|
|||
|
the C99 revision of the ANSI C standard, you can use C's new native
|
|||
|
complex type (which is binary-compatible with the typedef above). In
|
|||
|
particular, if you '#include <complex.h>' _before_ '<fftw3.h>', then
|
|||
|
'fftw_complex' is defined to be the native complex type and you can
|
|||
|
manipulate it with ordinary arithmetic (e.g. 'x = y * (3+4*I)', where
|
|||
|
'x' and 'y' are 'fftw_complex' and 'I' is the standard symbol for the
|
|||
|
imaginary unit);
|
|||
|
|
|||
|
C++ has its own 'complex<T>' template class, defined in the standard
|
|||
|
'<complex>' header file. Reportedly, the C++ standards committee has
|
|||
|
recently agreed to mandate that the storage format used for this type be
|
|||
|
binary-compatible with the C99 type, i.e. an array 'T[2]' with
|
|||
|
consecutive real '[0]' and imaginary '[1]' parts. (See report
|
|||
|
<http://www.open-std.org/jtc1/sc22/WG21/docs/papers/2002/n1388.pdf
|
|||
|
WG21/N1388>.) Although not part of the official standard as of this
|
|||
|
writing, the proposal stated that: "This solution has been tested with
|
|||
|
all current major implementations of the standard library and shown to
|
|||
|
be working." To the extent that this is true, if you have a variable
|
|||
|
'complex<double> *x', you can pass it directly to FFTW via
|
|||
|
'reinterpret_cast<fftw_complex*>(x)'.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Precision, Next: Memory Allocation, Prev: Complex numbers, Up: Data Types and Files
|
|||
|
|
|||
|
4.1.2 Precision
|
|||
|
---------------
|
|||
|
|
|||
|
You can install single and long-double precision versions of FFTW, which
|
|||
|
replace 'double' with 'float' and 'long double', respectively (*note
|
|||
|
Installation and Customization::). To use these interfaces, you:
|
|||
|
|
|||
|
* Link to the single/long-double libraries; on Unix, '-lfftw3f' or
|
|||
|
'-lfftw3l' instead of (or in addition to) '-lfftw3'. (You can link
|
|||
|
to the different-precision libraries simultaneously.)
|
|||
|
|
|||
|
* Include the _same_ '<fftw3.h>' header file.
|
|||
|
|
|||
|
* Replace all lowercase instances of 'fftw_' with 'fftwf_' or
|
|||
|
'fftwl_' for single or long-double precision, respectively.
|
|||
|
('fftw_complex' becomes 'fftwf_complex', 'fftw_execute' becomes
|
|||
|
'fftwf_execute', etcetera.)
|
|||
|
|
|||
|
* Uppercase names, i.e. names beginning with 'FFTW_', remain the
|
|||
|
same.
|
|||
|
|
|||
|
* Replace 'double' with 'float' or 'long double' for subroutine
|
|||
|
parameters.
|
|||
|
|
|||
|
Depending upon your compiler and/or hardware, 'long double' may not
|
|||
|
be any more precise than 'double' (or may not be supported at all,
|
|||
|
although it is standard in C99).
|
|||
|
|
|||
|
We also support using the nonstandard '__float128'
|
|||
|
quadruple-precision type provided by recent versions of 'gcc' on 32- and
|
|||
|
64-bit x86 hardware (*note Installation and Customization::). To use
|
|||
|
this type, link with '-lfftw3q -lquadmath -lm' (the 'libquadmath'
|
|||
|
library provided by 'gcc' is needed for quadruple-precision
|
|||
|
trigonometric functions) and use 'fftwq_' identifiers.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Memory Allocation, Prev: Precision, Up: Data Types and Files
|
|||
|
|
|||
|
4.1.3 Memory Allocation
|
|||
|
-----------------------
|
|||
|
|
|||
|
void *fftw_malloc(size_t n);
|
|||
|
void fftw_free(void *p);
|
|||
|
|
|||
|
These are functions that behave identically to 'malloc' and 'free',
|
|||
|
except that they guarantee that the returned pointer obeys any special
|
|||
|
alignment restrictions imposed by any algorithm in FFTW (e.g. for SIMD
|
|||
|
acceleration). *Note SIMD alignment and fftw_malloc::.
|
|||
|
|
|||
|
Data allocated by 'fftw_malloc' _must_ be deallocated by 'fftw_free'
|
|||
|
and not by the ordinary 'free'.
|
|||
|
|
|||
|
These routines simply call through to your operating system's
|
|||
|
'malloc' or, if necessary, its aligned equivalent (e.g. 'memalign'), so
|
|||
|
you normally need not worry about any significant time or space
|
|||
|
overhead. You are _not required_ to use them to allocate your data, but
|
|||
|
we strongly recommend it.
|
|||
|
|
|||
|
Note: in C++, just as with ordinary 'malloc', you must typecast the
|
|||
|
output of 'fftw_malloc' to whatever pointer type you are allocating.
|
|||
|
|
|||
|
We also provide the following two convenience functions to allocate
|
|||
|
real and complex arrays with 'n' elements, which are equivalent to
|
|||
|
'(double *) fftw_malloc(sizeof(double) * n)' and '(fftw_complex *)
|
|||
|
fftw_malloc(sizeof(fftw_complex) * n)', respectively:
|
|||
|
|
|||
|
double *fftw_alloc_real(size_t n);
|
|||
|
fftw_complex *fftw_alloc_complex(size_t n);
|
|||
|
|
|||
|
The equivalent functions in other precisions allocate arrays of 'n'
|
|||
|
elements in that precision. e.g. 'fftwf_alloc_real(n)' is equivalent
|
|||
|
to '(float *) fftwf_malloc(sizeof(float) * n)'.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Using Plans, Next: Basic Interface, Prev: Data Types and Files, Up: FFTW Reference
|
|||
|
|
|||
|
4.2 Using Plans
|
|||
|
===============
|
|||
|
|
|||
|
Plans for all transform types in FFTW are stored as type 'fftw_plan' (an
|
|||
|
opaque pointer type), and are created by one of the various planning
|
|||
|
routines described in the following sections. An 'fftw_plan' contains
|
|||
|
all information necessary to compute the transform, including the
|
|||
|
pointers to the input and output arrays.
|
|||
|
|
|||
|
void fftw_execute(const fftw_plan plan);
|
|||
|
|
|||
|
This executes the 'plan', to compute the corresponding transform on
|
|||
|
the arrays for which it was planned (which must still exist). The plan
|
|||
|
is not modified, and 'fftw_execute' can be called as many times as
|
|||
|
desired.
|
|||
|
|
|||
|
To apply a given plan to a different array, you can use the new-array
|
|||
|
execute interface. *Note New-array Execute Functions::.
|
|||
|
|
|||
|
'fftw_execute' (and equivalents) is the only function in FFTW
|
|||
|
guaranteed to be thread-safe; see *note Thread safety::.
|
|||
|
|
|||
|
This function:
|
|||
|
void fftw_destroy_plan(fftw_plan plan);
|
|||
|
deallocates the 'plan' and all its associated data.
|
|||
|
|
|||
|
FFTW's planner saves some other persistent data, such as the
|
|||
|
accumulated wisdom and a list of algorithms available in the current
|
|||
|
configuration. If you want to deallocate all of that and reset FFTW to
|
|||
|
the pristine state it was in when you started your program, you can
|
|||
|
call:
|
|||
|
|
|||
|
void fftw_cleanup(void);
|
|||
|
|
|||
|
After calling 'fftw_cleanup', all existing plans become undefined,
|
|||
|
and you should not attempt to execute them nor to destroy them. You can
|
|||
|
however create and execute/destroy new plans, in which case FFTW starts
|
|||
|
accumulating wisdom information again.
|
|||
|
|
|||
|
'fftw_cleanup' does not deallocate your plans, however. To prevent
|
|||
|
memory leaks, you must still call 'fftw_destroy_plan' before executing
|
|||
|
'fftw_cleanup'.
|
|||
|
|
|||
|
Occasionally, it may useful to know FFTW's internal "cost" metric
|
|||
|
that it uses to compare plans to one another; this cost is proportional
|
|||
|
to an execution time of the plan, in undocumented units, if the plan was
|
|||
|
created with the 'FFTW_MEASURE' or other timing-based options, or
|
|||
|
alternatively is a heuristic cost function for 'FFTW_ESTIMATE' plans.
|
|||
|
(The cost values of measured and estimated plans are not comparable,
|
|||
|
being in different units. Also, costs from different FFTW versions or
|
|||
|
the same version compiled differently may not be in the same units.
|
|||
|
Plans created from wisdom have a cost of 0 since no timing measurement
|
|||
|
is performed for them. Finally, certain problems for which only one
|
|||
|
top-level algorithm was possible may have required no measurements of
|
|||
|
the cost of the whole plan, in which case 'fftw_cost' will also return
|
|||
|
0.) The cost metric for a given plan is returned by:
|
|||
|
|
|||
|
double fftw_cost(const fftw_plan plan);
|
|||
|
|
|||
|
The following two routines are provided purely for academic purposes
|
|||
|
(that is, for entertainment).
|
|||
|
|
|||
|
void fftw_flops(const fftw_plan plan,
|
|||
|
double *add, double *mul, double *fma);
|
|||
|
|
|||
|
Given a 'plan', set 'add', 'mul', and 'fma' to an exact count of the
|
|||
|
number of floating-point additions, multiplications, and fused
|
|||
|
multiply-add operations involved in the plan's execution. The total
|
|||
|
number of floating-point operations (flops) is 'add + mul + 2*fma', or
|
|||
|
'add + mul + fma' if the hardware supports fused multiply-add
|
|||
|
instructions (although the number of FMA operations is only approximate
|
|||
|
because of compiler voodoo). (The number of operations should be an
|
|||
|
integer, but we use 'double' to avoid overflowing 'int' for large
|
|||
|
transforms; the arguments are of type 'double' even for single and
|
|||
|
long-double precision versions of FFTW.)
|
|||
|
|
|||
|
void fftw_fprint_plan(const fftw_plan plan, FILE *output_file);
|
|||
|
void fftw_print_plan(const fftw_plan plan);
|
|||
|
char *fftw_sprint_plan(const fftw_plan plan);
|
|||
|
|
|||
|
This outputs a "nerd-readable" representation of the 'plan' to the
|
|||
|
given file, to 'stdout', or two a newly allocated NUL-terminated string
|
|||
|
(which the caller is responsible for deallocating with 'free'),
|
|||
|
respectively.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Basic Interface, Next: Advanced Interface, Prev: Using Plans, Up: FFTW Reference
|
|||
|
|
|||
|
4.3 Basic Interface
|
|||
|
===================
|
|||
|
|
|||
|
Recall that the FFTW API is divided into three parts(1): the "basic
|
|||
|
interface" computes a single transform of contiguous data, the "advanced
|
|||
|
interface" computes transforms of multiple or strided arrays, and the
|
|||
|
"guru interface" supports the most general data layouts, multiplicities,
|
|||
|
and strides. This section describes the basic interface, which we
|
|||
|
expect to satisfy the needs of most users.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Complex DFTs::
|
|||
|
* Planner Flags::
|
|||
|
* Real-data DFTs::
|
|||
|
* Real-data DFT Array Format::
|
|||
|
* Real-to-Real Transforms::
|
|||
|
* Real-to-Real Transform Kinds::
|
|||
|
|
|||
|
---------- Footnotes ----------
|
|||
|
|
|||
|
(1) Gallia est omnis divisa in partes tres (Julius Caesar).
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Complex DFTs, Next: Planner Flags, Prev: Basic Interface, Up: Basic Interface
|
|||
|
|
|||
|
4.3.1 Complex DFTs
|
|||
|
------------------
|
|||
|
|
|||
|
fftw_plan fftw_plan_dft_1d(int n0,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
int sign, unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_2d(int n0, int n1,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
int sign, unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_3d(int n0, int n1, int n2,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
int sign, unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft(int rank, const int *n,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
int sign, unsigned flags);
|
|||
|
|
|||
|
Plan a complex input/output discrete Fourier transform (DFT) in zero
|
|||
|
or more dimensions, returning an 'fftw_plan' (*note Using Plans::).
|
|||
|
|
|||
|
Once you have created a plan for a certain transform type and
|
|||
|
parameters, then creating another plan of the same type and parameters,
|
|||
|
but for different arrays, is fast and shares constant data with the
|
|||
|
first plan (if it still exists).
|
|||
|
|
|||
|
The planner returns 'NULL' if the plan cannot be created. In the
|
|||
|
standard FFTW distribution, the basic interface is guaranteed to return
|
|||
|
a non-'NULL' plan. A plan may be 'NULL', however, if you are using a
|
|||
|
customized FFTW configuration supporting a restricted set of transforms.
|
|||
|
|
|||
|
Arguments
|
|||
|
.........
|
|||
|
|
|||
|
* 'rank' is the rank of the transform (it should be the size of the
|
|||
|
array '*n'), and can be any non-negative integer. (*Note Complex
|
|||
|
Multi-Dimensional DFTs::, for the definition of "rank".) The
|
|||
|
'_1d', '_2d', and '_3d' planners correspond to a 'rank' of '1',
|
|||
|
'2', and '3', respectively. The rank may be zero, which is
|
|||
|
equivalent to a rank-1 transform of size 1, i.e. a copy of one
|
|||
|
number from input to output.
|
|||
|
|
|||
|
* 'n0', 'n1', 'n2', or 'n[0..rank-1]' (as appropriate for each
|
|||
|
routine) specify the size of the transform dimensions. They can be
|
|||
|
any positive integer.
|
|||
|
|
|||
|
- Multi-dimensional arrays are stored in row-major order with
|
|||
|
dimensions: 'n0' x 'n1'; or 'n0' x 'n1' x 'n2'; or 'n[0]' x
|
|||
|
'n[1]' x ... x 'n[rank-1]'. *Note Multi-dimensional Array
|
|||
|
Format::.
|
|||
|
- FFTW is best at handling sizes of the form 2^a 3^b 5^c 7^d
|
|||
|
11^e 13^f, where e+f is either 0 or 1, and the other exponents
|
|||
|
are arbitrary. Other sizes are computed by means of a slow,
|
|||
|
general-purpose algorithm (which nevertheless retains O(n log
|
|||
|
n) performance even for prime sizes). It is possible to
|
|||
|
customize FFTW for different array sizes; see *note
|
|||
|
Installation and Customization::. Transforms whose sizes are
|
|||
|
powers of 2 are especially fast.
|
|||
|
|
|||
|
* 'in' and 'out' point to the input and output arrays of the
|
|||
|
transform, which may be the same (yielding an in-place transform).
|
|||
|
These arrays are overwritten during planning, unless
|
|||
|
'FFTW_ESTIMATE' is used in the flags. (The arrays need not be
|
|||
|
initialized, but they must be allocated.)
|
|||
|
|
|||
|
If 'in == out', the transform is "in-place" and the input array is
|
|||
|
overwritten. If 'in != out', the two arrays must not overlap (but
|
|||
|
FFTW does not check for this condition).
|
|||
|
|
|||
|
* 'sign' is the sign of the exponent in the formula that defines the
|
|||
|
Fourier transform. It can be -1 (= 'FFTW_FORWARD') or +1 (=
|
|||
|
'FFTW_BACKWARD').
|
|||
|
|
|||
|
* 'flags' is a bitwise OR ('|') of zero or more planner flags, as
|
|||
|
defined in *note Planner Flags::.
|
|||
|
|
|||
|
FFTW computes an unnormalized transform: computing a forward followed
|
|||
|
by a backward transform (or vice versa) will result in the original data
|
|||
|
multiplied by the size of the transform (the product of the dimensions).
|
|||
|
For more information, see *note What FFTW Really Computes::.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Planner Flags, Next: Real-data DFTs, Prev: Complex DFTs, Up: Basic Interface
|
|||
|
|
|||
|
4.3.2 Planner Flags
|
|||
|
-------------------
|
|||
|
|
|||
|
All of the planner routines in FFTW accept an integer 'flags' argument,
|
|||
|
which is a bitwise OR ('|') of zero or more of the flag constants
|
|||
|
defined below. These flags control the rigor (and time) of the planning
|
|||
|
process, and can also impose (or lift) restrictions on the type of
|
|||
|
transform algorithm that is employed.
|
|||
|
|
|||
|
_Important:_ the planner overwrites the input array during planning
|
|||
|
unless a saved plan (*note Wisdom::) is available for that problem, so
|
|||
|
you should initialize your input data after creating the plan. The only
|
|||
|
exceptions to this are the 'FFTW_ESTIMATE' and 'FFTW_WISDOM_ONLY' flags,
|
|||
|
as mentioned below.
|
|||
|
|
|||
|
In all cases, if wisdom is available for the given problem that was
|
|||
|
created with equal-or-greater planning rigor, then the more rigorous
|
|||
|
wisdom is used. For example, in 'FFTW_ESTIMATE' mode any available
|
|||
|
wisdom is used, whereas in 'FFTW_PATIENT' mode only wisdom created in
|
|||
|
patient or exhaustive mode can be used. *Note Words of Wisdom-Saving
|
|||
|
Plans::.
|
|||
|
|
|||
|
Planning-rigor flags
|
|||
|
....................
|
|||
|
|
|||
|
* 'FFTW_ESTIMATE' specifies that, instead of actual measurements of
|
|||
|
different algorithms, a simple heuristic is used to pick a
|
|||
|
(probably sub-optimal) plan quickly. With this flag, the
|
|||
|
input/output arrays are not overwritten during planning.
|
|||
|
|
|||
|
* 'FFTW_MEASURE' tells FFTW to find an optimized plan by actually
|
|||
|
_computing_ several FFTs and measuring their execution time.
|
|||
|
Depending on your machine, this can take some time (often a few
|
|||
|
seconds). 'FFTW_MEASURE' is the default planning option.
|
|||
|
|
|||
|
* 'FFTW_PATIENT' is like 'FFTW_MEASURE', but considers a wider range
|
|||
|
of algorithms and often produces a "more optimal" plan (especially
|
|||
|
for large transforms), but at the expense of several times longer
|
|||
|
planning time (especially for large transforms).
|
|||
|
|
|||
|
* 'FFTW_EXHAUSTIVE' is like 'FFTW_PATIENT', but considers an even
|
|||
|
wider range of algorithms, including many that we think are
|
|||
|
unlikely to be fast, to produce the most optimal plan but with a
|
|||
|
substantially increased planning time.
|
|||
|
|
|||
|
* 'FFTW_WISDOM_ONLY' is a special planning mode in which the plan is
|
|||
|
only created if wisdom is available for the given problem, and
|
|||
|
otherwise a 'NULL' plan is returned. This can be combined with
|
|||
|
other flags, e.g. 'FFTW_WISDOM_ONLY | FFTW_PATIENT' creates a plan
|
|||
|
only if wisdom is available that was created in 'FFTW_PATIENT' or
|
|||
|
'FFTW_EXHAUSTIVE' mode. The 'FFTW_WISDOM_ONLY' flag is intended
|
|||
|
for users who need to detect whether wisdom is available; for
|
|||
|
example, if wisdom is not available one may wish to allocate new
|
|||
|
arrays for planning so that user data is not overwritten.
|
|||
|
|
|||
|
Algorithm-restriction flags
|
|||
|
...........................
|
|||
|
|
|||
|
* 'FFTW_DESTROY_INPUT' specifies that an out-of-place transform is
|
|||
|
allowed to _overwrite its input_ array with arbitrary data; this
|
|||
|
can sometimes allow more efficient algorithms to be employed.
|
|||
|
|
|||
|
* 'FFTW_PRESERVE_INPUT' specifies that an out-of-place transform must
|
|||
|
_not change its input_ array. This is ordinarily the _default_,
|
|||
|
except for c2r and hc2r (i.e. complex-to-real) transforms for
|
|||
|
which 'FFTW_DESTROY_INPUT' is the default. In the latter cases,
|
|||
|
passing 'FFTW_PRESERVE_INPUT' will attempt to use algorithms that
|
|||
|
do not destroy the input, at the expense of worse performance; for
|
|||
|
multi-dimensional c2r transforms, however, no input-preserving
|
|||
|
algorithms are implemented and the planner will return 'NULL' if
|
|||
|
one is requested.
|
|||
|
|
|||
|
* 'FFTW_UNALIGNED' specifies that the algorithm may not impose any
|
|||
|
unusual alignment requirements on the input/output arrays (i.e. no
|
|||
|
SIMD may be used). This flag is normally _not necessary_, since
|
|||
|
the planner automatically detects misaligned arrays. The only use
|
|||
|
for this flag is if you want to use the new-array execute interface
|
|||
|
to execute a given plan on a different array that may not be
|
|||
|
aligned like the original. (Using 'fftw_malloc' makes this flag
|
|||
|
unnecessary even then. You can also use 'fftw_alignment_of' to
|
|||
|
detect whether two arrays are equivalently aligned.)
|
|||
|
|
|||
|
Limiting planning time
|
|||
|
......................
|
|||
|
|
|||
|
extern void fftw_set_timelimit(double seconds);
|
|||
|
|
|||
|
This function instructs FFTW to spend at most 'seconds' seconds
|
|||
|
(approximately) in the planner. If 'seconds == FFTW_NO_TIMELIMIT' (the
|
|||
|
default value, which is negative), then planning time is unbounded.
|
|||
|
Otherwise, FFTW plans with a progressively wider range of algorithms
|
|||
|
until the given time limit is reached or the given range of algorithms
|
|||
|
is explored, returning the best available plan.
|
|||
|
|
|||
|
For example, specifying 'FFTW_PATIENT' first plans in 'FFTW_ESTIMATE'
|
|||
|
mode, then in 'FFTW_MEASURE' mode, then finally (time permitting) in
|
|||
|
'FFTW_PATIENT'. If 'FFTW_EXHAUSTIVE' is specified instead, the planner
|
|||
|
will further progress to 'FFTW_EXHAUSTIVE' mode.
|
|||
|
|
|||
|
Note that the 'seconds' argument specifies only a rough limit; in
|
|||
|
practice, the planner may use somewhat more time if the time limit is
|
|||
|
reached when the planner is in the middle of an operation that cannot be
|
|||
|
interrupted. At the very least, the planner will complete planning in
|
|||
|
'FFTW_ESTIMATE' mode (which is thus equivalent to a time limit of 0).
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Real-data DFTs, Next: Real-data DFT Array Format, Prev: Planner Flags, Up: Basic Interface
|
|||
|
|
|||
|
4.3.3 Real-data DFTs
|
|||
|
--------------------
|
|||
|
|
|||
|
fftw_plan fftw_plan_dft_r2c_1d(int n0,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_r2c_2d(int n0, int n1,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_r2c_3d(int n0, int n1, int n2,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_r2c(int rank, const int *n,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
Plan a real-input/complex-output discrete Fourier transform (DFT) in
|
|||
|
zero or more dimensions, returning an 'fftw_plan' (*note Using Plans::).
|
|||
|
|
|||
|
Once you have created a plan for a certain transform type and
|
|||
|
parameters, then creating another plan of the same type and parameters,
|
|||
|
but for different arrays, is fast and shares constant data with the
|
|||
|
first plan (if it still exists).
|
|||
|
|
|||
|
The planner returns 'NULL' if the plan cannot be created. A
|
|||
|
non-'NULL' plan is always returned by the basic interface unless you are
|
|||
|
using a customized FFTW configuration supporting a restricted set of
|
|||
|
transforms, or if you use the 'FFTW_PRESERVE_INPUT' flag with a
|
|||
|
multi-dimensional out-of-place c2r transform (see below).
|
|||
|
|
|||
|
Arguments
|
|||
|
.........
|
|||
|
|
|||
|
* 'rank' is the rank of the transform (it should be the size of the
|
|||
|
array '*n'), and can be any non-negative integer. (*Note Complex
|
|||
|
Multi-Dimensional DFTs::, for the definition of "rank".) The
|
|||
|
'_1d', '_2d', and '_3d' planners correspond to a 'rank' of '1',
|
|||
|
'2', and '3', respectively. The rank may be zero, which is
|
|||
|
equivalent to a rank-1 transform of size 1, i.e. a copy of one
|
|||
|
real number (with zero imaginary part) from input to output.
|
|||
|
|
|||
|
* 'n0', 'n1', 'n2', or 'n[0..rank-1]', (as appropriate for each
|
|||
|
routine) specify the size of the transform dimensions. They can be
|
|||
|
any positive integer. This is different in general from the
|
|||
|
_physical_ array dimensions, which are described in *note Real-data
|
|||
|
DFT Array Format::.
|
|||
|
|
|||
|
- FFTW is best at handling sizes of the form 2^a 3^b 5^c 7^d
|
|||
|
11^e 13^f, where e+f is either 0 or 1, and the other exponents
|
|||
|
are arbitrary. Other sizes are computed by means of a slow,
|
|||
|
general-purpose algorithm (which nevertheless retains O(n log
|
|||
|
n) performance even for prime sizes). (It is possible to
|
|||
|
customize FFTW for different array sizes; see *note
|
|||
|
Installation and Customization::.) Transforms whose sizes are
|
|||
|
powers of 2 are especially fast, and it is generally
|
|||
|
beneficial for the _last_ dimension of an r2c/c2r transform to
|
|||
|
be _even_.
|
|||
|
|
|||
|
* 'in' and 'out' point to the input and output arrays of the
|
|||
|
transform, which may be the same (yielding an in-place transform).
|
|||
|
These arrays are overwritten during planning, unless
|
|||
|
'FFTW_ESTIMATE' is used in the flags. (The arrays need not be
|
|||
|
initialized, but they must be allocated.) For an in-place
|
|||
|
transform, it is important to remember that the real array will
|
|||
|
require padding, described in *note Real-data DFT Array Format::.
|
|||
|
|
|||
|
* 'flags' is a bitwise OR ('|') of zero or more planner flags, as
|
|||
|
defined in *note Planner Flags::.
|
|||
|
|
|||
|
The inverse transforms, taking complex input (storing the
|
|||
|
non-redundant half of a logically Hermitian array) to real output, are
|
|||
|
given by:
|
|||
|
|
|||
|
fftw_plan fftw_plan_dft_c2r_1d(int n0,
|
|||
|
fftw_complex *in, double *out,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_c2r_2d(int n0, int n1,
|
|||
|
fftw_complex *in, double *out,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_c2r_3d(int n0, int n1, int n2,
|
|||
|
fftw_complex *in, double *out,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_dft_c2r(int rank, const int *n,
|
|||
|
fftw_complex *in, double *out,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
The arguments are the same as for the r2c transforms, except that the
|
|||
|
input and output data formats are reversed.
|
|||
|
|
|||
|
FFTW computes an unnormalized transform: computing an r2c followed by
|
|||
|
a c2r transform (or vice versa) will result in the original data
|
|||
|
multiplied by the size of the transform (the product of the logical
|
|||
|
dimensions). An r2c transform produces the same output as a
|
|||
|
'FFTW_FORWARD' complex DFT of the same input, and a c2r transform is
|
|||
|
correspondingly equivalent to 'FFTW_BACKWARD'. For more information,
|
|||
|
see *note What FFTW Really Computes::.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Real-data DFT Array Format, Next: Real-to-Real Transforms, Prev: Real-data DFTs, Up: Basic Interface
|
|||
|
|
|||
|
4.3.4 Real-data DFT Array Format
|
|||
|
--------------------------------
|
|||
|
|
|||
|
The output of a DFT of real data (r2c) contains symmetries that, in
|
|||
|
principle, make half of the outputs redundant (*note What FFTW Really
|
|||
|
Computes::). (Similarly for the input of an inverse c2r transform.) In
|
|||
|
practice, it is not possible to entirely realize these savings in an
|
|||
|
efficient and understandable format that generalizes to
|
|||
|
multi-dimensional transforms. Instead, the output of the r2c transforms
|
|||
|
is _slightly_ over half of the output of the corresponding complex
|
|||
|
transform. We do not "pack" the data in any way, but store it as an
|
|||
|
ordinary array of 'fftw_complex' values. In fact, this data is simply a
|
|||
|
subsection of what would be the array in the corresponding complex
|
|||
|
transform.
|
|||
|
|
|||
|
Specifically, for a real transform of d (= 'rank') dimensions n[0] x
|
|||
|
n[1] x n[2] x ... x n[d-1] , the complex data is an n[0] x n[1] x n[2]
|
|||
|
x ... x (n[d-1]/2 + 1) array of 'fftw_complex' values in row-major
|
|||
|
order (with the division rounded down). That is, we only store the
|
|||
|
_lower_ half (non-negative frequencies), plus one element, of the last
|
|||
|
dimension of the data from the ordinary complex transform. (We could
|
|||
|
have instead taken half of any other dimension, but implementation turns
|
|||
|
out to be simpler if the last, contiguous, dimension is used.)
|
|||
|
|
|||
|
For an out-of-place transform, the real data is simply an array with
|
|||
|
physical dimensions n[0] x n[1] x n[2] x ... x n[d-1] in row-major
|
|||
|
order.
|
|||
|
|
|||
|
For an in-place transform, some complications arise since the complex
|
|||
|
data is slightly larger than the real data. In this case, the final
|
|||
|
dimension of the real data must be _padded_ with extra values to
|
|||
|
accommodate the size of the complex data--two extra if the last
|
|||
|
dimension is even and one if it is odd. That is, the last dimension of
|
|||
|
the real data must physically contain 2 * (n[d-1]/2+1) 'double' values
|
|||
|
(exactly enough to hold the complex data). This physical array size
|
|||
|
does not, however, change the _logical_ array size--only n[d-1] values
|
|||
|
are actually stored in the last dimension, and n[d-1] is the last
|
|||
|
dimension passed to the planner.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Real-to-Real Transforms, Next: Real-to-Real Transform Kinds, Prev: Real-data DFT Array Format, Up: Basic Interface
|
|||
|
|
|||
|
4.3.5 Real-to-Real Transforms
|
|||
|
-----------------------------
|
|||
|
|
|||
|
fftw_plan fftw_plan_r2r_1d(int n, double *in, double *out,
|
|||
|
fftw_r2r_kind kind, unsigned flags);
|
|||
|
fftw_plan fftw_plan_r2r_2d(int n0, int n1, double *in, double *out,
|
|||
|
fftw_r2r_kind kind0, fftw_r2r_kind kind1,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_r2r_3d(int n0, int n1, int n2,
|
|||
|
double *in, double *out,
|
|||
|
fftw_r2r_kind kind0,
|
|||
|
fftw_r2r_kind kind1,
|
|||
|
fftw_r2r_kind kind2,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_r2r(int rank, const int *n, double *in, double *out,
|
|||
|
const fftw_r2r_kind *kind, unsigned flags);
|
|||
|
|
|||
|
Plan a real input/output (r2r) transform of various kinds in zero or
|
|||
|
more dimensions, returning an 'fftw_plan' (*note Using Plans::).
|
|||
|
|
|||
|
Once you have created a plan for a certain transform type and
|
|||
|
parameters, then creating another plan of the same type and parameters,
|
|||
|
but for different arrays, is fast and shares constant data with the
|
|||
|
first plan (if it still exists).
|
|||
|
|
|||
|
The planner returns 'NULL' if the plan cannot be created. A
|
|||
|
non-'NULL' plan is always returned by the basic interface unless you are
|
|||
|
using a customized FFTW configuration supporting a restricted set of
|
|||
|
transforms, or for size-1 'FFTW_REDFT00' kinds (which are not defined).
|
|||
|
|
|||
|
Arguments
|
|||
|
.........
|
|||
|
|
|||
|
* 'rank' is the dimensionality of the transform (it should be the
|
|||
|
size of the arrays '*n' and '*kind'), and can be any non-negative
|
|||
|
integer. The '_1d', '_2d', and '_3d' planners correspond to a
|
|||
|
'rank' of '1', '2', and '3', respectively. A 'rank' of zero is
|
|||
|
equivalent to a copy of one number from input to output.
|
|||
|
|
|||
|
* 'n', or 'n0'/'n1'/'n2', or 'n[rank]', respectively, gives the
|
|||
|
(physical) size of the transform dimensions. They can be any
|
|||
|
positive integer.
|
|||
|
|
|||
|
- Multi-dimensional arrays are stored in row-major order with
|
|||
|
dimensions: 'n0' x 'n1'; or 'n0' x 'n1' x 'n2'; or 'n[0]' x
|
|||
|
'n[1]' x ... x 'n[rank-1]'. *Note Multi-dimensional Array
|
|||
|
Format::.
|
|||
|
- FFTW is generally best at handling sizes of the form 2^a 3^b
|
|||
|
5^c 7^d 11^e 13^f, where e+f is either 0 or 1, and the other
|
|||
|
exponents are arbitrary. Other sizes are computed by means of
|
|||
|
a slow, general-purpose algorithm (which nevertheless retains
|
|||
|
O(n log n) performance even for prime sizes). (It is possible
|
|||
|
to customize FFTW for different array sizes; see *note
|
|||
|
Installation and Customization::.) Transforms whose sizes are
|
|||
|
powers of 2 are especially fast.
|
|||
|
- For a 'REDFT00' or 'RODFT00' transform kind in a dimension of
|
|||
|
size n, it is n-1 or n+1, respectively, that should be
|
|||
|
factorizable in the above form.
|
|||
|
|
|||
|
* 'in' and 'out' point to the input and output arrays of the
|
|||
|
transform, which may be the same (yielding an in-place transform).
|
|||
|
These arrays are overwritten during planning, unless
|
|||
|
'FFTW_ESTIMATE' is used in the flags. (The arrays need not be
|
|||
|
initialized, but they must be allocated.)
|
|||
|
|
|||
|
* 'kind', or 'kind0'/'kind1'/'kind2', or 'kind[rank]', is the kind of
|
|||
|
r2r transform used for the corresponding dimension. The valid kind
|
|||
|
constants are described in *note Real-to-Real Transform Kinds::.
|
|||
|
In a multi-dimensional transform, what is computed is the separable
|
|||
|
product formed by taking each transform kind along the
|
|||
|
corresponding dimension, one dimension after another.
|
|||
|
|
|||
|
* 'flags' is a bitwise OR ('|') of zero or more planner flags, as
|
|||
|
defined in *note Planner Flags::.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Real-to-Real Transform Kinds, Prev: Real-to-Real Transforms, Up: Basic Interface
|
|||
|
|
|||
|
4.3.6 Real-to-Real Transform Kinds
|
|||
|
----------------------------------
|
|||
|
|
|||
|
FFTW currently supports 11 different r2r transform kinds, specified by
|
|||
|
one of the constants below. For the precise definitions of these
|
|||
|
transforms, see *note What FFTW Really Computes::. For a more
|
|||
|
colloquial introduction to these transform kinds, see *note More DFTs of
|
|||
|
Real Data::.
|
|||
|
|
|||
|
For dimension of size 'n', there is a corresponding "logical"
|
|||
|
dimension 'N' that determines the normalization (and the optimal
|
|||
|
factorization); the formula for 'N' is given for each kind below. Also,
|
|||
|
with each transform kind is listed its corrsponding inverse transform.
|
|||
|
FFTW computes unnormalized transforms: a transform followed by its
|
|||
|
inverse will result in the original data multiplied by 'N' (or the
|
|||
|
product of the 'N''s for each dimension, in multi-dimensions).
|
|||
|
|
|||
|
* 'FFTW_R2HC' computes a real-input DFT with output in "halfcomplex"
|
|||
|
format, i.e. real and imaginary parts for a transform of size 'n'
|
|||
|
stored as: r0, r1, r2, r(n/2), i((n+1)/2-1), ..., i2, i1 (Logical
|
|||
|
'N=n', inverse is 'FFTW_HC2R'.)
|
|||
|
|
|||
|
* 'FFTW_HC2R' computes the reverse of 'FFTW_R2HC', above. (Logical
|
|||
|
'N=n', inverse is 'FFTW_R2HC'.)
|
|||
|
|
|||
|
* 'FFTW_DHT' computes a discrete Hartley transform. (Logical 'N=n',
|
|||
|
inverse is 'FFTW_DHT'.)
|
|||
|
|
|||
|
* 'FFTW_REDFT00' computes an REDFT00 transform, i.e. a DCT-I.
|
|||
|
(Logical 'N=2*(n-1)', inverse is 'FFTW_REDFT00'.)
|
|||
|
|
|||
|
* 'FFTW_REDFT10' computes an REDFT10 transform, i.e. a DCT-II
|
|||
|
(sometimes called "the" DCT). (Logical 'N=2*n', inverse is
|
|||
|
'FFTW_REDFT01'.)
|
|||
|
|
|||
|
* 'FFTW_REDFT01' computes an REDFT01 transform, i.e. a DCT-III
|
|||
|
(sometimes called "the" IDCT, being the inverse of DCT-II).
|
|||
|
(Logical 'N=2*n', inverse is 'FFTW_REDFT=10'.)
|
|||
|
|
|||
|
* 'FFTW_REDFT11' computes an REDFT11 transform, i.e. a DCT-IV.
|
|||
|
(Logical 'N=2*n', inverse is 'FFTW_REDFT11'.)
|
|||
|
|
|||
|
* 'FFTW_RODFT00' computes an RODFT00 transform, i.e. a DST-I.
|
|||
|
(Logical 'N=2*(n+1)', inverse is 'FFTW_RODFT00'.)
|
|||
|
|
|||
|
* 'FFTW_RODFT10' computes an RODFT10 transform, i.e. a DST-II.
|
|||
|
(Logical 'N=2*n', inverse is 'FFTW_RODFT01'.)
|
|||
|
|
|||
|
* 'FFTW_RODFT01' computes an RODFT01 transform, i.e. a DST-III.
|
|||
|
(Logical 'N=2*n', inverse is 'FFTW_RODFT=10'.)
|
|||
|
|
|||
|
* 'FFTW_RODFT11' computes an RODFT11 transform, i.e. a DST-IV.
|
|||
|
(Logical 'N=2*n', inverse is 'FFTW_RODFT11'.)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Advanced Interface, Next: Guru Interface, Prev: Basic Interface, Up: FFTW Reference
|
|||
|
|
|||
|
4.4 Advanced Interface
|
|||
|
======================
|
|||
|
|
|||
|
FFTW's "advanced" interface supplements the basic interface with four
|
|||
|
new planner routines, providing a new level of flexibility: you can plan
|
|||
|
a transform of multiple arrays simultaneously, operate on non-contiguous
|
|||
|
(strided) data, and transform a subset of a larger multi-dimensional
|
|||
|
array. Other than these additional features, the planner operates in
|
|||
|
the same fashion as in the basic interface, and the resulting
|
|||
|
'fftw_plan' is used in the same way (*note Using Plans::).
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Advanced Complex DFTs::
|
|||
|
* Advanced Real-data DFTs::
|
|||
|
* Advanced Real-to-real Transforms::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Advanced Complex DFTs, Next: Advanced Real-data DFTs, Prev: Advanced Interface, Up: Advanced Interface
|
|||
|
|
|||
|
4.4.1 Advanced Complex DFTs
|
|||
|
---------------------------
|
|||
|
|
|||
|
fftw_plan fftw_plan_many_dft(int rank, const int *n, int howmany,
|
|||
|
fftw_complex *in, const int *inembed,
|
|||
|
int istride, int idist,
|
|||
|
fftw_complex *out, const int *onembed,
|
|||
|
int ostride, int odist,
|
|||
|
int sign, unsigned flags);
|
|||
|
|
|||
|
This routine plans multiple multidimensional complex DFTs, and it
|
|||
|
extends the 'fftw_plan_dft' routine (*note Complex DFTs::) to compute
|
|||
|
'howmany' transforms, each having rank 'rank' and size 'n'. In
|
|||
|
addition, the transform data need not be contiguous, but it may be laid
|
|||
|
out in memory with an arbitrary stride. To account for these
|
|||
|
possibilities, 'fftw_plan_many_dft' adds the new parameters 'howmany',
|
|||
|
{'i','o'}'nembed', {'i','o'}'stride', and {'i','o'}'dist'. The FFTW
|
|||
|
basic interface (*note Complex DFTs::) provides routines specialized for
|
|||
|
ranks 1, 2, and 3, but the advanced interface handles only the
|
|||
|
general-rank case.
|
|||
|
|
|||
|
'howmany' is the (nonnegative) number of transforms to compute. The
|
|||
|
resulting plan computes 'howmany' transforms, where the input of the
|
|||
|
'k'-th transform is at location 'in+k*idist' (in C pointer arithmetic),
|
|||
|
and its output is at location 'out+k*odist'. Plans obtained in this way
|
|||
|
can often be faster than calling FFTW multiple times for the individual
|
|||
|
transforms. The basic 'fftw_plan_dft' interface corresponds to
|
|||
|
'howmany=1' (in which case the 'dist' parameters are ignored).
|
|||
|
|
|||
|
Each of the 'howmany' transforms has rank 'rank' and size 'n', as in
|
|||
|
the basic interface. In addition, the advanced interface allows the
|
|||
|
input and output arrays of each transform to be row-major subarrays of
|
|||
|
larger rank-'rank' arrays, described by 'inembed' and 'onembed'
|
|||
|
parameters, respectively. {'i','o'}'nembed' must be arrays of length
|
|||
|
'rank', and 'n' should be elementwise less than or equal to
|
|||
|
{'i','o'}'nembed'. Passing 'NULL' for an 'nembed' parameter is
|
|||
|
equivalent to passing 'n' (i.e. same physical and logical dimensions,
|
|||
|
as in the basic interface.)
|
|||
|
|
|||
|
The 'stride' parameters indicate that the 'j'-th element of the input
|
|||
|
or output arrays is located at 'j*istride' or 'j*ostride', respectively.
|
|||
|
(For a multi-dimensional array, 'j' is the ordinary row-major index.)
|
|||
|
When combined with the 'k'-th transform in a 'howmany' loop, from above,
|
|||
|
this means that the ('j','k')-th element is at 'j*stride+k*dist'. (The
|
|||
|
basic 'fftw_plan_dft' interface corresponds to a stride of 1.)
|
|||
|
|
|||
|
For in-place transforms, the input and output 'stride' and 'dist'
|
|||
|
parameters should be the same; otherwise, the planner may return 'NULL'.
|
|||
|
|
|||
|
Arrays 'n', 'inembed', and 'onembed' are not used after this function
|
|||
|
returns. You can safely free or reuse them.
|
|||
|
|
|||
|
*Examples*: One transform of one 5 by 6 array contiguous in memory:
|
|||
|
int rank = 2;
|
|||
|
int n[] = {5, 6};
|
|||
|
int howmany = 1;
|
|||
|
int idist = odist = 0; /* unused because howmany = 1 */
|
|||
|
int istride = ostride = 1; /* array is contiguous in memory */
|
|||
|
int *inembed = n, *onembed = n;
|
|||
|
|
|||
|
Transform of three 5 by 6 arrays, each contiguous in memory, stored
|
|||
|
in memory one after another:
|
|||
|
int rank = 2;
|
|||
|
int n[] = {5, 6};
|
|||
|
int howmany = 3;
|
|||
|
int idist = odist = n[0]*n[1]; /* = 30, the distance in memory
|
|||
|
between the first element
|
|||
|
of the first array and the
|
|||
|
first element of the second array */
|
|||
|
int istride = ostride = 1; /* array is contiguous in memory */
|
|||
|
int *inembed = n, *onembed = n;
|
|||
|
|
|||
|
Transform each column of a 2d array with 10 rows and 3 columns:
|
|||
|
int rank = 1; /* not 2: we are computing 1d transforms */
|
|||
|
int n[] = {10}; /* 1d transforms of length 10 */
|
|||
|
int howmany = 3;
|
|||
|
int idist = odist = 1;
|
|||
|
int istride = ostride = 3; /* distance between two elements in
|
|||
|
the same column */
|
|||
|
int *inembed = n, *onembed = n;
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Advanced Real-data DFTs, Next: Advanced Real-to-real Transforms, Prev: Advanced Complex DFTs, Up: Advanced Interface
|
|||
|
|
|||
|
4.4.2 Advanced Real-data DFTs
|
|||
|
-----------------------------
|
|||
|
|
|||
|
fftw_plan fftw_plan_many_dft_r2c(int rank, const int *n, int howmany,
|
|||
|
double *in, const int *inembed,
|
|||
|
int istride, int idist,
|
|||
|
fftw_complex *out, const int *onembed,
|
|||
|
int ostride, int odist,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_plan_many_dft_c2r(int rank, const int *n, int howmany,
|
|||
|
fftw_complex *in, const int *inembed,
|
|||
|
int istride, int idist,
|
|||
|
double *out, const int *onembed,
|
|||
|
int ostride, int odist,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
Like 'fftw_plan_many_dft', these two functions add 'howmany',
|
|||
|
'nembed', 'stride', and 'dist' parameters to the 'fftw_plan_dft_r2c' and
|
|||
|
'fftw_plan_dft_c2r' functions, but otherwise behave the same as the
|
|||
|
basic interface.
|
|||
|
|
|||
|
The interpretation of 'howmany', 'stride', and 'dist' are the same as
|
|||
|
for 'fftw_plan_many_dft', above. Note that the 'stride' and 'dist' for
|
|||
|
the real array are in units of 'double', and for the complex array are
|
|||
|
in units of 'fftw_complex'.
|
|||
|
|
|||
|
If an 'nembed' parameter is 'NULL', it is interpreted as what it
|
|||
|
would be in the basic interface, as described in *note Real-data DFT
|
|||
|
Array Format::. That is, for the complex array the size is assumed to
|
|||
|
be the same as 'n', but with the last dimension cut roughly in half.
|
|||
|
For the real array, the size is assumed to be 'n' if the transform is
|
|||
|
out-of-place, or 'n' with the last dimension "padded" if the transform
|
|||
|
is in-place.
|
|||
|
|
|||
|
If an 'nembed' parameter is non-'NULL', it is interpreted as the
|
|||
|
physical size of the corresponding array, in row-major order, just as
|
|||
|
for 'fftw_plan_many_dft'. In this case, each dimension of 'nembed'
|
|||
|
should be '>=' what it would be in the basic interface (e.g. the halved
|
|||
|
or padded 'n').
|
|||
|
|
|||
|
Arrays 'n', 'inembed', and 'onembed' are not used after this function
|
|||
|
returns. You can safely free or reuse them.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Advanced Real-to-real Transforms, Prev: Advanced Real-data DFTs, Up: Advanced Interface
|
|||
|
|
|||
|
4.4.3 Advanced Real-to-real Transforms
|
|||
|
--------------------------------------
|
|||
|
|
|||
|
fftw_plan fftw_plan_many_r2r(int rank, const int *n, int howmany,
|
|||
|
double *in, const int *inembed,
|
|||
|
int istride, int idist,
|
|||
|
double *out, const int *onembed,
|
|||
|
int ostride, int odist,
|
|||
|
const fftw_r2r_kind *kind, unsigned flags);
|
|||
|
|
|||
|
Like 'fftw_plan_many_dft', this functions adds 'howmany', 'nembed',
|
|||
|
'stride', and 'dist' parameters to the 'fftw_plan_r2r' function, but
|
|||
|
otherwise behave the same as the basic interface. The interpretation of
|
|||
|
those additional parameters are the same as for 'fftw_plan_many_dft'.
|
|||
|
(Of course, the 'stride' and 'dist' parameters are now in units of
|
|||
|
'double', not 'fftw_complex'.)
|
|||
|
|
|||
|
Arrays 'n', 'inembed', 'onembed', and 'kind' are not used after this
|
|||
|
function returns. You can safely free or reuse them.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Guru Interface, Next: New-array Execute Functions, Prev: Advanced Interface, Up: FFTW Reference
|
|||
|
|
|||
|
4.5 Guru Interface
|
|||
|
==================
|
|||
|
|
|||
|
The "guru" interface to FFTW is intended to expose as much as possible
|
|||
|
of the flexibility in the underlying FFTW architecture. It allows one
|
|||
|
to compute multi-dimensional "vectors" (loops) of multi-dimensional
|
|||
|
transforms, where each vector/transform dimension has an independent
|
|||
|
size and stride. One can also use more general complex-number formats,
|
|||
|
e.g. separate real and imaginary arrays.
|
|||
|
|
|||
|
For those users who require the flexibility of the guru interface, it
|
|||
|
is important that they pay special attention to the documentation lest
|
|||
|
they shoot themselves in the foot.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Interleaved and split arrays::
|
|||
|
* Guru vector and transform sizes::
|
|||
|
* Guru Complex DFTs::
|
|||
|
* Guru Real-data DFTs::
|
|||
|
* Guru Real-to-real Transforms::
|
|||
|
* 64-bit Guru Interface::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Interleaved and split arrays, Next: Guru vector and transform sizes, Prev: Guru Interface, Up: Guru Interface
|
|||
|
|
|||
|
4.5.1 Interleaved and split arrays
|
|||
|
----------------------------------
|
|||
|
|
|||
|
The guru interface supports two representations of complex numbers,
|
|||
|
which we call the interleaved and the split format.
|
|||
|
|
|||
|
The "interleaved" format is the same one used by the basic and
|
|||
|
advanced interfaces, and it is documented in *note Complex numbers::.
|
|||
|
In the interleaved format, you provide pointers to the real part of a
|
|||
|
complex number, and the imaginary part understood to be stored in the
|
|||
|
next memory location.
|
|||
|
|
|||
|
The "split" format allows separate pointers to the real and imaginary
|
|||
|
parts of a complex array.
|
|||
|
|
|||
|
Technically, the interleaved format is redundant, because you can
|
|||
|
always express an interleaved array in terms of a split array with
|
|||
|
appropriate pointers and strides. On the other hand, the interleaved
|
|||
|
format is simpler to use, and it is common in practice. Hence, FFTW
|
|||
|
supports it as a special case.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Guru vector and transform sizes, Next: Guru Complex DFTs, Prev: Interleaved and split arrays, Up: Guru Interface
|
|||
|
|
|||
|
4.5.2 Guru vector and transform sizes
|
|||
|
-------------------------------------
|
|||
|
|
|||
|
The guru interface introduces one basic new data structure,
|
|||
|
'fftw_iodim', that is used to specify sizes and strides for
|
|||
|
multi-dimensional transforms and vectors:
|
|||
|
|
|||
|
typedef struct {
|
|||
|
int n;
|
|||
|
int is;
|
|||
|
int os;
|
|||
|
} fftw_iodim;
|
|||
|
|
|||
|
Here, 'n' is the size of the dimension, and 'is' and 'os' are the
|
|||
|
strides of that dimension for the input and output arrays. (The stride
|
|||
|
is the separation of consecutive elements along this dimension.)
|
|||
|
|
|||
|
The meaning of the stride parameter depends on the type of the array
|
|||
|
that the stride refers to. _If the array is interleaved complex,
|
|||
|
strides are expressed in units of complex numbers ('fftw_complex'). If
|
|||
|
the array is split complex or real, strides are expressed in units of
|
|||
|
real numbers ('double')._ This convention is consistent with the usual
|
|||
|
pointer arithmetic in the C language. An interleaved array is denoted
|
|||
|
by a pointer 'p' to 'fftw_complex', so that 'p+1' points to the next
|
|||
|
complex number. Split arrays are denoted by pointers to 'double', in
|
|||
|
which case pointer arithmetic operates in units of 'sizeof(double)'.
|
|||
|
|
|||
|
The guru planner interfaces all take a ('rank', 'dims[rank]') pair
|
|||
|
describing the transform size, and a ('howmany_rank',
|
|||
|
'howmany_dims[howmany_rank]') pair describing the "vector" size (a
|
|||
|
multi-dimensional loop of transforms to perform), where 'dims' and
|
|||
|
'howmany_dims' are arrays of 'fftw_iodim'. Each 'n' field must be
|
|||
|
positive for 'dims' and nonnegative for 'howmany_dims', while both
|
|||
|
'rank' and 'howmany_rank' must be nonnegative.
|
|||
|
|
|||
|
For example, the 'howmany' parameter in the advanced complex-DFT
|
|||
|
interface corresponds to 'howmany_rank' = 1, 'howmany_dims[0].n' =
|
|||
|
'howmany', 'howmany_dims[0].is' = 'idist', and 'howmany_dims[0].os' =
|
|||
|
'odist'. (To compute a single transform, you can just use
|
|||
|
'howmany_rank' = 0.)
|
|||
|
|
|||
|
A row-major multidimensional array with dimensions 'n[rank]' (*note
|
|||
|
Row-major Format::) corresponds to 'dims[i].n' = 'n[i]' and the
|
|||
|
recurrence 'dims[i].is' = 'n[i+1] * dims[i+1].is' (similarly for 'os').
|
|||
|
The stride of the last ('i=rank-1') dimension is the overall stride of
|
|||
|
the array. e.g. to be equivalent to the advanced complex-DFT
|
|||
|
interface, you would have 'dims[rank-1].is' = 'istride' and
|
|||
|
'dims[rank-1].os' = 'ostride'.
|
|||
|
|
|||
|
In general, we only guarantee FFTW to return a non-'NULL' plan if the
|
|||
|
vector and transform dimensions correspond to a set of distinct indices,
|
|||
|
and for in-place transforms the input/output strides should be the same.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Guru Complex DFTs, Next: Guru Real-data DFTs, Prev: Guru vector and transform sizes, Up: Guru Interface
|
|||
|
|
|||
|
4.5.3 Guru Complex DFTs
|
|||
|
-----------------------
|
|||
|
|
|||
|
fftw_plan fftw_plan_guru_dft(
|
|||
|
int rank, const fftw_iodim *dims,
|
|||
|
int howmany_rank, const fftw_iodim *howmany_dims,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
int sign, unsigned flags);
|
|||
|
|
|||
|
fftw_plan fftw_plan_guru_split_dft(
|
|||
|
int rank, const fftw_iodim *dims,
|
|||
|
int howmany_rank, const fftw_iodim *howmany_dims,
|
|||
|
double *ri, double *ii, double *ro, double *io,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
These two functions plan a complex-data, multi-dimensional DFT for
|
|||
|
the interleaved and split format, respectively. Transform dimensions
|
|||
|
are given by ('rank', 'dims') over a multi-dimensional vector (loop) of
|
|||
|
dimensions ('howmany_rank', 'howmany_dims'). 'dims' and 'howmany_dims'
|
|||
|
should point to 'fftw_iodim' arrays of length 'rank' and 'howmany_rank',
|
|||
|
respectively.
|
|||
|
|
|||
|
'flags' is a bitwise OR ('|') of zero or more planner flags, as
|
|||
|
defined in *note Planner Flags::.
|
|||
|
|
|||
|
In the 'fftw_plan_guru_dft' function, the pointers 'in' and 'out'
|
|||
|
point to the interleaved input and output arrays, respectively. The
|
|||
|
sign can be either -1 (= 'FFTW_FORWARD') or +1 (= 'FFTW_BACKWARD'). If
|
|||
|
the pointers are equal, the transform is in-place.
|
|||
|
|
|||
|
In the 'fftw_plan_guru_split_dft' function, 'ri' and 'ii' point to
|
|||
|
the real and imaginary input arrays, and 'ro' and 'io' point to the real
|
|||
|
and imaginary output arrays. The input and output pointers may be the
|
|||
|
same, indicating an in-place transform. For example, for 'fftw_complex'
|
|||
|
pointers 'in' and 'out', the corresponding parameters are:
|
|||
|
|
|||
|
ri = (double *) in;
|
|||
|
ii = (double *) in + 1;
|
|||
|
ro = (double *) out;
|
|||
|
io = (double *) out + 1;
|
|||
|
|
|||
|
Because 'fftw_plan_guru_split_dft' accepts split arrays, strides are
|
|||
|
expressed in units of 'double'. For a contiguous 'fftw_complex' array,
|
|||
|
the overall stride of the transform should be 2, the distance between
|
|||
|
consecutive real parts or between consecutive imaginary parts; see *note
|
|||
|
Guru vector and transform sizes::. Note that the dimension strides are
|
|||
|
applied equally to the real and imaginary parts; real and imaginary
|
|||
|
arrays with different strides are not supported.
|
|||
|
|
|||
|
There is no 'sign' parameter in 'fftw_plan_guru_split_dft'. This
|
|||
|
function always plans for an 'FFTW_FORWARD' transform. To plan for an
|
|||
|
'FFTW_BACKWARD' transform, you can exploit the identity that the
|
|||
|
backwards DFT is equal to the forwards DFT with the real and imaginary
|
|||
|
parts swapped. For example, in the case of the 'fftw_complex' arrays
|
|||
|
above, the 'FFTW_BACKWARD' transform is computed by the parameters:
|
|||
|
|
|||
|
ri = (double *) in + 1;
|
|||
|
ii = (double *) in;
|
|||
|
ro = (double *) out + 1;
|
|||
|
io = (double *) out;
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Guru Real-data DFTs, Next: Guru Real-to-real Transforms, Prev: Guru Complex DFTs, Up: Guru Interface
|
|||
|
|
|||
|
4.5.4 Guru Real-data DFTs
|
|||
|
-------------------------
|
|||
|
|
|||
|
fftw_plan fftw_plan_guru_dft_r2c(
|
|||
|
int rank, const fftw_iodim *dims,
|
|||
|
int howmany_rank, const fftw_iodim *howmany_dims,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
fftw_plan fftw_plan_guru_split_dft_r2c(
|
|||
|
int rank, const fftw_iodim *dims,
|
|||
|
int howmany_rank, const fftw_iodim *howmany_dims,
|
|||
|
double *in, double *ro, double *io,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
fftw_plan fftw_plan_guru_dft_c2r(
|
|||
|
int rank, const fftw_iodim *dims,
|
|||
|
int howmany_rank, const fftw_iodim *howmany_dims,
|
|||
|
fftw_complex *in, double *out,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
fftw_plan fftw_plan_guru_split_dft_c2r(
|
|||
|
int rank, const fftw_iodim *dims,
|
|||
|
int howmany_rank, const fftw_iodim *howmany_dims,
|
|||
|
double *ri, double *ii, double *out,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
Plan a real-input (r2c) or real-output (c2r), multi-dimensional DFT
|
|||
|
with transform dimensions given by ('rank', 'dims') over a
|
|||
|
multi-dimensional vector (loop) of dimensions ('howmany_rank',
|
|||
|
'howmany_dims'). 'dims' and 'howmany_dims' should point to 'fftw_iodim'
|
|||
|
arrays of length 'rank' and 'howmany_rank', respectively. As for the
|
|||
|
basic and advanced interfaces, an r2c transform is 'FFTW_FORWARD' and a
|
|||
|
c2r transform is 'FFTW_BACKWARD'.
|
|||
|
|
|||
|
The _last_ dimension of 'dims' is interpreted specially: that
|
|||
|
dimension of the real array has size 'dims[rank-1].n', but that
|
|||
|
dimension of the complex array has size 'dims[rank-1].n/2+1' (division
|
|||
|
rounded down). The strides, on the other hand, are taken to be exactly
|
|||
|
as specified. It is up to the user to specify the strides appropriately
|
|||
|
for the peculiar dimensions of the data, and we do not guarantee that
|
|||
|
the planner will succeed (return non-'NULL') for any dimensions other
|
|||
|
than those described in *note Real-data DFT Array Format:: and
|
|||
|
generalized in *note Advanced Real-data DFTs::. (That is, for an
|
|||
|
in-place transform, each individual dimension should be able to operate
|
|||
|
in place.)
|
|||
|
|
|||
|
'in' and 'out' point to the input and output arrays for r2c and c2r
|
|||
|
transforms, respectively. For split arrays, 'ri' and 'ii' point to the
|
|||
|
real and imaginary input arrays for a c2r transform, and 'ro' and 'io'
|
|||
|
point to the real and imaginary output arrays for an r2c transform.
|
|||
|
'in' and 'ro' or 'ri' and 'out' may be the same, indicating an in-place
|
|||
|
transform. (In-place transforms where 'in' and 'io' or 'ii' and 'out'
|
|||
|
are the same are not currently supported.)
|
|||
|
|
|||
|
'flags' is a bitwise OR ('|') of zero or more planner flags, as
|
|||
|
defined in *note Planner Flags::.
|
|||
|
|
|||
|
In-place transforms of rank greater than 1 are currently only
|
|||
|
supported for interleaved arrays. For split arrays, the planner will
|
|||
|
return 'NULL'.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Guru Real-to-real Transforms, Next: 64-bit Guru Interface, Prev: Guru Real-data DFTs, Up: Guru Interface
|
|||
|
|
|||
|
4.5.5 Guru Real-to-real Transforms
|
|||
|
----------------------------------
|
|||
|
|
|||
|
fftw_plan fftw_plan_guru_r2r(int rank, const fftw_iodim *dims,
|
|||
|
int howmany_rank,
|
|||
|
const fftw_iodim *howmany_dims,
|
|||
|
double *in, double *out,
|
|||
|
const fftw_r2r_kind *kind,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
Plan a real-to-real (r2r) multi-dimensional 'FFTW_FORWARD' transform
|
|||
|
with transform dimensions given by ('rank', 'dims') over a
|
|||
|
multi-dimensional vector (loop) of dimensions ('howmany_rank',
|
|||
|
'howmany_dims'). 'dims' and 'howmany_dims' should point to 'fftw_iodim'
|
|||
|
arrays of length 'rank' and 'howmany_rank', respectively.
|
|||
|
|
|||
|
The transform kind of each dimension is given by the 'kind'
|
|||
|
parameter, which should point to an array of length 'rank'. Valid
|
|||
|
'fftw_r2r_kind' constants are given in *note Real-to-Real Transform
|
|||
|
Kinds::.
|
|||
|
|
|||
|
'in' and 'out' point to the real input and output arrays; they may be
|
|||
|
the same, indicating an in-place transform.
|
|||
|
|
|||
|
'flags' is a bitwise OR ('|') of zero or more planner flags, as
|
|||
|
defined in *note Planner Flags::.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: 64-bit Guru Interface, Prev: Guru Real-to-real Transforms, Up: Guru Interface
|
|||
|
|
|||
|
4.5.6 64-bit Guru Interface
|
|||
|
---------------------------
|
|||
|
|
|||
|
When compiled in 64-bit mode on a 64-bit architecture (where addresses
|
|||
|
are 64 bits wide), FFTW uses 64-bit quantities internally for all
|
|||
|
transform sizes, strides, and so on--you don't have to do anything
|
|||
|
special to exploit this. However, in the ordinary FFTW interfaces, you
|
|||
|
specify the transform size by an 'int' quantity, which is normally only
|
|||
|
32 bits wide. This means that, even though FFTW is using 64-bit sizes
|
|||
|
internally, you cannot specify a single transform dimension larger than
|
|||
|
2^31-1 numbers.
|
|||
|
|
|||
|
We expect that few users will require transforms larger than this,
|
|||
|
but, for those who do, we provide a 64-bit version of the guru interface
|
|||
|
in which all sizes are specified as integers of type 'ptrdiff_t' instead
|
|||
|
of 'int'. ('ptrdiff_t' is a signed integer type defined by the C
|
|||
|
standard to be wide enough to represent address differences, and thus
|
|||
|
must be at least 64 bits wide on a 64-bit machine.) We stress that
|
|||
|
there is _no performance advantage_ to using this interface--the same
|
|||
|
internal FFTW code is employed regardless--and it is only necessary if
|
|||
|
you want to specify very large transform sizes.
|
|||
|
|
|||
|
In particular, the 64-bit guru interface is a set of planner routines
|
|||
|
that are exactly the same as the guru planner routines, except that they
|
|||
|
are named with 'guru64' instead of 'guru' and they take arguments of
|
|||
|
type 'fftw_iodim64' instead of 'fftw_iodim'. For example, instead of
|
|||
|
'fftw_plan_guru_dft', we have 'fftw_plan_guru64_dft'.
|
|||
|
|
|||
|
fftw_plan fftw_plan_guru64_dft(
|
|||
|
int rank, const fftw_iodim64 *dims,
|
|||
|
int howmany_rank, const fftw_iodim64 *howmany_dims,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
int sign, unsigned flags);
|
|||
|
|
|||
|
The 'fftw_iodim64' type is similar to 'fftw_iodim', with the same
|
|||
|
interpretation, except that it uses type 'ptrdiff_t' instead of type
|
|||
|
'int'.
|
|||
|
|
|||
|
typedef struct {
|
|||
|
ptrdiff_t n;
|
|||
|
ptrdiff_t is;
|
|||
|
ptrdiff_t os;
|
|||
|
} fftw_iodim64;
|
|||
|
|
|||
|
Every other 'fftw_plan_guru' function also has a 'fftw_plan_guru64'
|
|||
|
equivalent, but we do not repeat their documentation here since they are
|
|||
|
identical to the 32-bit versions except as noted above.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: New-array Execute Functions, Next: Wisdom, Prev: Guru Interface, Up: FFTW Reference
|
|||
|
|
|||
|
4.6 New-array Execute Functions
|
|||
|
===============================
|
|||
|
|
|||
|
Normally, one executes a plan for the arrays with which the plan was
|
|||
|
created, by calling 'fftw_execute(plan)' as described in *note Using
|
|||
|
Plans::. However, it is possible for sophisticated users to apply a
|
|||
|
given plan to a _different_ array using the "new-array execute"
|
|||
|
functions detailed below, provided that the following conditions are
|
|||
|
met:
|
|||
|
|
|||
|
* The array size, strides, etcetera are the same (since those are set
|
|||
|
by the plan).
|
|||
|
|
|||
|
* The input and output arrays are the same (in-place) or different
|
|||
|
(out-of-place) if the plan was originally created to be in-place or
|
|||
|
out-of-place, respectively.
|
|||
|
|
|||
|
* For split arrays, the separations between the real and imaginary
|
|||
|
parts, 'ii-ri' and 'io-ro', are the same as they were for the input
|
|||
|
and output arrays when the plan was created. (This condition is
|
|||
|
automatically satisfied for interleaved arrays.)
|
|||
|
|
|||
|
* The "alignment" of the new input/output arrays is the same as that
|
|||
|
of the input/output arrays when the plan was created, unless the
|
|||
|
plan was created with the 'FFTW_UNALIGNED' flag. Here, the
|
|||
|
alignment is a platform-dependent quantity (for example, it is the
|
|||
|
address modulo 16 if SSE SIMD instructions are used, but the
|
|||
|
address modulo 4 for non-SIMD single-precision FFTW on the same
|
|||
|
machine). In general, only arrays allocated with 'fftw_malloc' are
|
|||
|
guaranteed to be equally aligned (*note SIMD alignment and
|
|||
|
fftw_malloc::).
|
|||
|
|
|||
|
The alignment issue is especially critical, because if you don't use
|
|||
|
'fftw_malloc' then you may have little control over the alignment of
|
|||
|
arrays in memory. For example, neither the C++ 'new' function nor the
|
|||
|
Fortran 'allocate' statement provide strong enough guarantees about data
|
|||
|
alignment. If you don't use 'fftw_malloc', therefore, you probably have
|
|||
|
to use 'FFTW_UNALIGNED' (which disables most SIMD support). If
|
|||
|
possible, it is probably better for you to simply create multiple plans
|
|||
|
(creating a new plan is quick once one exists for a given size), or
|
|||
|
better yet re-use the same array for your transforms.
|
|||
|
|
|||
|
For rare circumstances in which you cannot control the alignment of
|
|||
|
allocated memory, but wish to determine where a given array is aligned
|
|||
|
like the original array for which a plan was created, you can use the
|
|||
|
'fftw_alignment_of' function:
|
|||
|
int fftw_alignment_of(double *p);
|
|||
|
Two arrays have equivalent alignment (for the purposes of applying a
|
|||
|
plan) if and only if 'fftw_alignment_of' returns the same value for the
|
|||
|
corresponding pointers to their data (typecast to 'double*' if
|
|||
|
necessary).
|
|||
|
|
|||
|
If you are tempted to use the new-array execute interface because you
|
|||
|
want to transform a known bunch of arrays of the same size, you should
|
|||
|
probably go use the advanced interface instead (*note Advanced
|
|||
|
Interface::)).
|
|||
|
|
|||
|
The new-array execute functions are:
|
|||
|
|
|||
|
void fftw_execute_dft(
|
|||
|
const fftw_plan p,
|
|||
|
fftw_complex *in, fftw_complex *out);
|
|||
|
|
|||
|
void fftw_execute_split_dft(
|
|||
|
const fftw_plan p,
|
|||
|
double *ri, double *ii, double *ro, double *io);
|
|||
|
|
|||
|
void fftw_execute_dft_r2c(
|
|||
|
const fftw_plan p,
|
|||
|
double *in, fftw_complex *out);
|
|||
|
|
|||
|
void fftw_execute_split_dft_r2c(
|
|||
|
const fftw_plan p,
|
|||
|
double *in, double *ro, double *io);
|
|||
|
|
|||
|
void fftw_execute_dft_c2r(
|
|||
|
const fftw_plan p,
|
|||
|
fftw_complex *in, double *out);
|
|||
|
|
|||
|
void fftw_execute_split_dft_c2r(
|
|||
|
const fftw_plan p,
|
|||
|
double *ri, double *ii, double *out);
|
|||
|
|
|||
|
void fftw_execute_r2r(
|
|||
|
const fftw_plan p,
|
|||
|
double *in, double *out);
|
|||
|
|
|||
|
These execute the 'plan' to compute the corresponding transform on
|
|||
|
the input/output arrays specified by the subsequent arguments. The
|
|||
|
input/output array arguments have the same meanings as the ones passed
|
|||
|
to the guru planner routines in the preceding sections. The 'plan' is
|
|||
|
not modified, and these routines can be called as many times as desired,
|
|||
|
or intermixed with calls to the ordinary 'fftw_execute'.
|
|||
|
|
|||
|
The 'plan' _must_ have been created for the transform type
|
|||
|
corresponding to the execute function, e.g. it must be a complex-DFT
|
|||
|
plan for 'fftw_execute_dft'. Any of the planner routines for that
|
|||
|
transform type, from the basic to the guru interface, could have been
|
|||
|
used to create the plan, however.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Wisdom, Next: What FFTW Really Computes, Prev: New-array Execute Functions, Up: FFTW Reference
|
|||
|
|
|||
|
4.7 Wisdom
|
|||
|
==========
|
|||
|
|
|||
|
This section documents the FFTW mechanism for saving and restoring plans
|
|||
|
from disk. This mechanism is called "wisdom".
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Wisdom Export::
|
|||
|
* Wisdom Import::
|
|||
|
* Forgetting Wisdom::
|
|||
|
* Wisdom Utilities::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Wisdom Export, Next: Wisdom Import, Prev: Wisdom, Up: Wisdom
|
|||
|
|
|||
|
4.7.1 Wisdom Export
|
|||
|
-------------------
|
|||
|
|
|||
|
int fftw_export_wisdom_to_filename(const char *filename);
|
|||
|
void fftw_export_wisdom_to_file(FILE *output_file);
|
|||
|
char *fftw_export_wisdom_to_string(void);
|
|||
|
void fftw_export_wisdom(void (*write_char)(char c, void *), void *data);
|
|||
|
|
|||
|
These functions allow you to export all currently accumulated wisdom
|
|||
|
in a form from which it can be later imported and restored, even during
|
|||
|
a separate run of the program. (*Note Words of Wisdom-Saving Plans::.)
|
|||
|
The current store of wisdom is not affected by calling any of these
|
|||
|
routines.
|
|||
|
|
|||
|
'fftw_export_wisdom' exports the wisdom to any output medium, as
|
|||
|
specified by the callback function 'write_char'. 'write_char' is a
|
|||
|
'putc'-like function that writes the character 'c' to some output; its
|
|||
|
second parameter is the 'data' pointer passed to 'fftw_export_wisdom'.
|
|||
|
For convenience, the following three "wrapper" routines are provided:
|
|||
|
|
|||
|
'fftw_export_wisdom_to_filename' writes wisdom to a file named
|
|||
|
'filename' (which is created or overwritten), returning '1' on success
|
|||
|
and '0' on failure. A lower-level function, which requires you to open
|
|||
|
and close the file yourself (e.g. if you want to write wisdom to a
|
|||
|
portion of a larger file) is 'fftw_export_wisdom_to_file'. This writes
|
|||
|
the wisdom to the current position in 'output_file', which should be
|
|||
|
open with write permission; upon exit, the file remains open and is
|
|||
|
positioned at the end of the wisdom data.
|
|||
|
|
|||
|
'fftw_export_wisdom_to_string' returns a pointer to a
|
|||
|
'NULL'-terminated string holding the wisdom data. This string is
|
|||
|
dynamically allocated, and it is the responsibility of the caller to
|
|||
|
deallocate it with 'free' when it is no longer needed.
|
|||
|
|
|||
|
All of these routines export the wisdom in the same format, which we
|
|||
|
will not document here except to say that it is LISP-like ASCII text
|
|||
|
that is insensitive to white space.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Wisdom Import, Next: Forgetting Wisdom, Prev: Wisdom Export, Up: Wisdom
|
|||
|
|
|||
|
4.7.2 Wisdom Import
|
|||
|
-------------------
|
|||
|
|
|||
|
int fftw_import_system_wisdom(void);
|
|||
|
int fftw_import_wisdom_from_filename(const char *filename);
|
|||
|
int fftw_import_wisdom_from_string(const char *input_string);
|
|||
|
int fftw_import_wisdom(int (*read_char)(void *), void *data);
|
|||
|
|
|||
|
These functions import wisdom into a program from data stored by the
|
|||
|
'fftw_export_wisdom' functions above. (*Note Words of Wisdom-Saving
|
|||
|
Plans::.) The imported wisdom replaces any wisdom already accumulated
|
|||
|
by the running program.
|
|||
|
|
|||
|
'fftw_import_wisdom' imports wisdom from any input medium, as
|
|||
|
specified by the callback function 'read_char'. 'read_char' is a
|
|||
|
'getc'-like function that returns the next character in the input; its
|
|||
|
parameter is the 'data' pointer passed to 'fftw_import_wisdom'. If the
|
|||
|
end of the input data is reached (which should never happen for valid
|
|||
|
data), 'read_char' should return 'EOF' (as defined in '<stdio.h>'). For
|
|||
|
convenience, the following three "wrapper" routines are provided:
|
|||
|
|
|||
|
'fftw_import_wisdom_from_filename' reads wisdom from a file named
|
|||
|
'filename'. A lower-level function, which requires you to open and
|
|||
|
close the file yourself (e.g. if you want to read wisdom from a portion
|
|||
|
of a larger file) is 'fftw_import_wisdom_from_file'. This reads wisdom
|
|||
|
from the current position in 'input_file' (which should be open with
|
|||
|
read permission); upon exit, the file remains open, but the position of
|
|||
|
the read pointer is unspecified.
|
|||
|
|
|||
|
'fftw_import_wisdom_from_string' reads wisdom from the
|
|||
|
'NULL'-terminated string 'input_string'.
|
|||
|
|
|||
|
'fftw_import_system_wisdom' reads wisdom from an
|
|||
|
implementation-defined standard file ('/etc/fftw/wisdom' on Unix and GNU
|
|||
|
systems).
|
|||
|
|
|||
|
The return value of these import routines is '1' if the wisdom was
|
|||
|
read successfully and '0' otherwise. Note that, in all of these
|
|||
|
functions, any data in the input stream past the end of the wisdom data
|
|||
|
is simply ignored.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Forgetting Wisdom, Next: Wisdom Utilities, Prev: Wisdom Import, Up: Wisdom
|
|||
|
|
|||
|
4.7.3 Forgetting Wisdom
|
|||
|
-----------------------
|
|||
|
|
|||
|
void fftw_forget_wisdom(void);
|
|||
|
|
|||
|
Calling 'fftw_forget_wisdom' causes all accumulated 'wisdom' to be
|
|||
|
discarded and its associated memory to be freed. (New 'wisdom' can
|
|||
|
still be gathered subsequently, however.)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Wisdom Utilities, Prev: Forgetting Wisdom, Up: Wisdom
|
|||
|
|
|||
|
4.7.4 Wisdom Utilities
|
|||
|
----------------------
|
|||
|
|
|||
|
FFTW includes two standalone utility programs that deal with wisdom. We
|
|||
|
merely summarize them here, since they come with their own 'man' pages
|
|||
|
for Unix and GNU systems (with HTML versions on our web site).
|
|||
|
|
|||
|
The first program is 'fftw-wisdom' (or 'fftwf-wisdom' in single
|
|||
|
precision, etcetera), which can be used to create a wisdom file
|
|||
|
containing plans for any of the transform sizes and types supported by
|
|||
|
FFTW. It is preferable to create wisdom directly from your executable
|
|||
|
(*note Caveats in Using Wisdom::), but this program is useful for
|
|||
|
creating global wisdom files for 'fftw_import_system_wisdom'.
|
|||
|
|
|||
|
The second program is 'fftw-wisdom-to-conf', which takes a wisdom
|
|||
|
file as input and produces a "configuration routine" as output. The
|
|||
|
latter is a C subroutine that you can compile and link into your
|
|||
|
program, replacing a routine of the same name in the FFTW library, that
|
|||
|
determines which parts of FFTW are callable by your program.
|
|||
|
'fftw-wisdom-to-conf' produces a configuration routine that links to
|
|||
|
only those parts of FFTW needed by the saved plans in the wisdom,
|
|||
|
greatly reducing the size of statically linked executables (which should
|
|||
|
only attempt to create plans corresponding to those in the wisdom,
|
|||
|
however).
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: What FFTW Really Computes, Prev: Wisdom, Up: FFTW Reference
|
|||
|
|
|||
|
4.8 What FFTW Really Computes
|
|||
|
=============================
|
|||
|
|
|||
|
In this section, we provide precise mathematical definitions for the
|
|||
|
transforms that FFTW computes. These transform definitions are fairly
|
|||
|
standard, but some authors follow slightly different conventions for the
|
|||
|
normalization of the transform (the constant factor in front) and the
|
|||
|
sign of the complex exponent. We begin by presenting the
|
|||
|
one-dimensional (1d) transform definitions, and then give the
|
|||
|
straightforward extension to multi-dimensional transforms.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* The 1d Discrete Fourier Transform (DFT)::
|
|||
|
* The 1d Real-data DFT::
|
|||
|
* 1d Real-even DFTs (DCTs)::
|
|||
|
* 1d Real-odd DFTs (DSTs)::
|
|||
|
* 1d Discrete Hartley Transforms (DHTs)::
|
|||
|
* Multi-dimensional Transforms::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: The 1d Discrete Fourier Transform (DFT), Next: The 1d Real-data DFT, Prev: What FFTW Really Computes, Up: What FFTW Really Computes
|
|||
|
|
|||
|
4.8.1 The 1d Discrete Fourier Transform (DFT)
|
|||
|
---------------------------------------------
|
|||
|
|
|||
|
The forward ('FFTW_FORWARD') discrete Fourier transform (DFT) of a 1d
|
|||
|
complex array X of size n computes an array Y, where:
|
|||
|
Y[k] = sum for j = 0 to (n - 1) of X[j] * exp(-2 pi j k sqrt(-1)/n) .
|
|||
|
The backward ('FFTW_BACKWARD') DFT computes:
|
|||
|
Y[k] = sum for j = 0 to (n - 1) of X[j] * exp(2 pi j k sqrt(-1)/n) .
|
|||
|
|
|||
|
FFTW computes an unnormalized transform, in that there is no
|
|||
|
coefficient in front of the summation in the DFT. In other words,
|
|||
|
applying the forward and then the backward transform will multiply the
|
|||
|
input by n.
|
|||
|
|
|||
|
From above, an 'FFTW_FORWARD' transform corresponds to a sign of -1
|
|||
|
in the exponent of the DFT. Note also that we use the standard
|
|||
|
"in-order" output ordering--the k-th output corresponds to the frequency
|
|||
|
k/n (or k/T, where T is your total sampling period). For those who like
|
|||
|
to think in terms of positive and negative frequencies, this means that
|
|||
|
the positive frequencies are stored in the first half of the output and
|
|||
|
the negative frequencies are stored in backwards order in the second
|
|||
|
half of the output. (The frequency -k/n is the same as the frequency
|
|||
|
(n-k)/n.)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: The 1d Real-data DFT, Next: 1d Real-even DFTs (DCTs), Prev: The 1d Discrete Fourier Transform (DFT), Up: What FFTW Really Computes
|
|||
|
|
|||
|
4.8.2 The 1d Real-data DFT
|
|||
|
--------------------------
|
|||
|
|
|||
|
The real-input (r2c) DFT in FFTW computes the _forward_ transform Y of
|
|||
|
the size 'n' real array X, exactly as defined above, i.e.
|
|||
|
Y[k] = sum for j = 0 to (n - 1) of X[j] * exp(-2 pi j k sqrt(-1)/n) .
|
|||
|
This output array Y can easily be shown to possess the "Hermitian"
|
|||
|
symmetry Y[k] = Y[n-k]*, where we take Y to be periodic so that Y[n] =
|
|||
|
Y[0].
|
|||
|
|
|||
|
As a result of this symmetry, half of the output Y is redundant
|
|||
|
(being the complex conjugate of the other half), and so the 1d r2c
|
|||
|
transforms only output elements 0...n/2 of Y (n/2+1 complex numbers),
|
|||
|
where the division by 2 is rounded down.
|
|||
|
|
|||
|
Moreover, the Hermitian symmetry implies that Y[0] and, if n is even,
|
|||
|
the Y[n/2] element, are purely real. So, for the 'R2HC' r2r transform,
|
|||
|
the halfcomplex format does not store the imaginary parts of these
|
|||
|
elements.
|
|||
|
|
|||
|
The c2r and 'H2RC' r2r transforms compute the backward DFT of the
|
|||
|
_complex_ array X with Hermitian symmetry, stored in the r2c/'R2HC'
|
|||
|
output formats, respectively, where the backward transform is defined
|
|||
|
exactly as for the complex case:
|
|||
|
Y[k] = sum for j = 0 to (n - 1) of X[j] * exp(2 pi j k sqrt(-1)/n) .
|
|||
|
The outputs 'Y' of this transform can easily be seen to be purely
|
|||
|
real, and are stored as an array of real numbers.
|
|||
|
|
|||
|
Like FFTW's complex DFT, these transforms are unnormalized. In other
|
|||
|
words, applying the real-to-complex (forward) and then the
|
|||
|
complex-to-real (backward) transform will multiply the input by n.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: 1d Real-even DFTs (DCTs), Next: 1d Real-odd DFTs (DSTs), Prev: The 1d Real-data DFT, Up: What FFTW Really Computes
|
|||
|
|
|||
|
4.8.3 1d Real-even DFTs (DCTs)
|
|||
|
------------------------------
|
|||
|
|
|||
|
The Real-even symmetry DFTs in FFTW are exactly equivalent to the
|
|||
|
unnormalized forward (and backward) DFTs as defined above, where the
|
|||
|
input array X of length N is purely real and is also "even" symmetry.
|
|||
|
In this case, the output array is likewise real and even symmetry.
|
|||
|
|
|||
|
For the case of 'REDFT00', this even symmetry means that X[j] =
|
|||
|
X[N-j], where we take X to be periodic so that X[N] = X[0]. Because of
|
|||
|
this redundancy, only the first n real numbers are actually stored,
|
|||
|
where N = 2(n-1).
|
|||
|
|
|||
|
The proper definition of even symmetry for 'REDFT10', 'REDFT01', and
|
|||
|
'REDFT11' transforms is somewhat more intricate because of the shifts by
|
|||
|
1/2 of the input and/or output, although the corresponding boundary
|
|||
|
conditions are given in *note Real even/odd DFTs (cosine/sine
|
|||
|
transforms)::. Because of the even symmetry, however, the sine terms in
|
|||
|
the DFT all cancel and the remaining cosine terms are written explicitly
|
|||
|
below. This formulation often leads people to call such a transform a
|
|||
|
"discrete cosine transform" (DCT), although it is really just a special
|
|||
|
case of the DFT.
|
|||
|
|
|||
|
In each of the definitions below, we transform a real array X of
|
|||
|
length n to a real array Y of length n:
|
|||
|
|
|||
|
REDFT00 (DCT-I)
|
|||
|
...............
|
|||
|
|
|||
|
An 'REDFT00' transform (type-I DCT) in FFTW is defined by: Y[k] = X[0] +
|
|||
|
(-1)^k X[n-1] + 2 (sum for j = 1 to n-2 of X[j] cos(pi jk /(n-1))).
|
|||
|
Note that this transform is not defined for n=1. For n=2, the summation
|
|||
|
term above is dropped as you might expect.
|
|||
|
|
|||
|
REDFT10 (DCT-II)
|
|||
|
................
|
|||
|
|
|||
|
An 'REDFT10' transform (type-II DCT, sometimes called "the" DCT) in FFTW
|
|||
|
is defined by: Y[k] = 2 (sum for j = 0 to n-1 of X[j] cos(pi (j+1/2) k /
|
|||
|
n)).
|
|||
|
|
|||
|
REDFT01 (DCT-III)
|
|||
|
.................
|
|||
|
|
|||
|
An 'REDFT01' transform (type-III DCT) in FFTW is defined by: Y[k] = X[0]
|
|||
|
+ 2 (sum for j = 1 to n-1 of X[j] cos(pi j (k+1/2) / n)). In the case
|
|||
|
of n=1, this reduces to Y[0] = X[0]. Up to a scale factor (see below),
|
|||
|
this is the inverse of 'REDFT10' ("the" DCT), and so the 'REDFT01'
|
|||
|
(DCT-III) is sometimes called the "IDCT".
|
|||
|
|
|||
|
REDFT11 (DCT-IV)
|
|||
|
................
|
|||
|
|
|||
|
An 'REDFT11' transform (type-IV DCT) in FFTW is defined by: Y[k] = 2
|
|||
|
(sum for j = 0 to n-1 of X[j] cos(pi (j+1/2) (k+1/2) / n)).
|
|||
|
|
|||
|
Inverses and Normalization
|
|||
|
..........................
|
|||
|
|
|||
|
These definitions correspond directly to the unnormalized DFTs used
|
|||
|
elsewhere in FFTW (hence the factors of 2 in front of the summations).
|
|||
|
The unnormalized inverse of 'REDFT00' is 'REDFT00', of 'REDFT10' is
|
|||
|
'REDFT01' and vice versa, and of 'REDFT11' is 'REDFT11'. Each
|
|||
|
unnormalized inverse results in the original array multiplied by N,
|
|||
|
where N is the _logical_ DFT size. For 'REDFT00', N=2(n-1) (note that
|
|||
|
n=1 is not defined); otherwise, N=2n.
|
|||
|
|
|||
|
In defining the discrete cosine transform, some authors also include
|
|||
|
additional factors of sqrt(2) (or its inverse) multiplying selected
|
|||
|
inputs and/or outputs. This is a mostly cosmetic change that makes the
|
|||
|
transform orthogonal, but sacrifices the direct equivalence to a
|
|||
|
symmetric DFT.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: 1d Real-odd DFTs (DSTs), Next: 1d Discrete Hartley Transforms (DHTs), Prev: 1d Real-even DFTs (DCTs), Up: What FFTW Really Computes
|
|||
|
|
|||
|
4.8.4 1d Real-odd DFTs (DSTs)
|
|||
|
-----------------------------
|
|||
|
|
|||
|
The Real-odd symmetry DFTs in FFTW are exactly equivalent to the
|
|||
|
unnormalized forward (and backward) DFTs as defined above, where the
|
|||
|
input array X of length N is purely real and is also "odd" symmetry. In
|
|||
|
this case, the output is odd symmetry and purely imaginary.
|
|||
|
|
|||
|
For the case of 'RODFT00', this odd symmetry means that X[j] =
|
|||
|
-X[N-j], where we take X to be periodic so that X[N] = X[0]. Because of
|
|||
|
this redundancy, only the first n real numbers starting at j=1 are
|
|||
|
actually stored (the j=0 element is zero), where N = 2(n+1).
|
|||
|
|
|||
|
The proper definition of odd symmetry for 'RODFT10', 'RODFT01', and
|
|||
|
'RODFT11' transforms is somewhat more intricate because of the shifts by
|
|||
|
1/2 of the input and/or output, although the corresponding boundary
|
|||
|
conditions are given in *note Real even/odd DFTs (cosine/sine
|
|||
|
transforms)::. Because of the odd symmetry, however, the cosine terms
|
|||
|
in the DFT all cancel and the remaining sine terms are written
|
|||
|
explicitly below. This formulation often leads people to call such a
|
|||
|
transform a "discrete sine transform" (DST), although it is really just
|
|||
|
a special case of the DFT.
|
|||
|
|
|||
|
In each of the definitions below, we transform a real array X of
|
|||
|
length n to a real array Y of length n:
|
|||
|
|
|||
|
RODFT00 (DST-I)
|
|||
|
...............
|
|||
|
|
|||
|
An 'RODFT00' transform (type-I DST) in FFTW is defined by: Y[k] = 2 (sum
|
|||
|
for j = 0 to n-1 of X[j] sin(pi (j+1)(k+1) / (n+1))).
|
|||
|
|
|||
|
RODFT10 (DST-II)
|
|||
|
................
|
|||
|
|
|||
|
An 'RODFT10' transform (type-II DST) in FFTW is defined by: Y[k] = 2
|
|||
|
(sum for j = 0 to n-1 of X[j] sin(pi (j+1/2) (k+1) / n)).
|
|||
|
|
|||
|
RODFT01 (DST-III)
|
|||
|
.................
|
|||
|
|
|||
|
An 'RODFT01' transform (type-III DST) in FFTW is defined by: Y[k] =
|
|||
|
(-1)^k X[n-1] + 2 (sum for j = 0 to n-2 of X[j] sin(pi (j+1) (k+1/2) /
|
|||
|
n)). In the case of n=1, this reduces to Y[0] = X[0].
|
|||
|
|
|||
|
RODFT11 (DST-IV)
|
|||
|
................
|
|||
|
|
|||
|
An 'RODFT11' transform (type-IV DST) in FFTW is defined by: Y[k] = 2
|
|||
|
(sum for j = 0 to n-1 of X[j] sin(pi (j+1/2) (k+1/2) / n)).
|
|||
|
|
|||
|
Inverses and Normalization
|
|||
|
..........................
|
|||
|
|
|||
|
These definitions correspond directly to the unnormalized DFTs used
|
|||
|
elsewhere in FFTW (hence the factors of 2 in front of the summations).
|
|||
|
The unnormalized inverse of 'RODFT00' is 'RODFT00', of 'RODFT10' is
|
|||
|
'RODFT01' and vice versa, and of 'RODFT11' is 'RODFT11'. Each
|
|||
|
unnormalized inverse results in the original array multiplied by N,
|
|||
|
where N is the _logical_ DFT size. For 'RODFT00', N=2(n+1); otherwise,
|
|||
|
N=2n.
|
|||
|
|
|||
|
In defining the discrete sine transform, some authors also include
|
|||
|
additional factors of sqrt(2) (or its inverse) multiplying selected
|
|||
|
inputs and/or outputs. This is a mostly cosmetic change that makes the
|
|||
|
transform orthogonal, but sacrifices the direct equivalence to an
|
|||
|
antisymmetric DFT.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: 1d Discrete Hartley Transforms (DHTs), Next: Multi-dimensional Transforms, Prev: 1d Real-odd DFTs (DSTs), Up: What FFTW Really Computes
|
|||
|
|
|||
|
4.8.5 1d Discrete Hartley Transforms (DHTs)
|
|||
|
-------------------------------------------
|
|||
|
|
|||
|
The discrete Hartley transform (DHT) of a 1d real array X of size n
|
|||
|
computes a real array Y of the same size, where:
|
|||
|
Y[k] = sum for j = 0 to (n - 1) of X[j] * [cos(2 pi j k / n) + sin(2 pi j k / n)].
|
|||
|
|
|||
|
FFTW computes an unnormalized transform, in that there is no
|
|||
|
coefficient in front of the summation in the DHT. In other words,
|
|||
|
applying the transform twice (the DHT is its own inverse) will multiply
|
|||
|
the input by n.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Multi-dimensional Transforms, Prev: 1d Discrete Hartley Transforms (DHTs), Up: What FFTW Really Computes
|
|||
|
|
|||
|
4.8.6 Multi-dimensional Transforms
|
|||
|
----------------------------------
|
|||
|
|
|||
|
The multi-dimensional transforms of FFTW, in general, compute simply the
|
|||
|
separable product of the given 1d transform along each dimension of the
|
|||
|
array. Since each of these transforms is unnormalized, computing the
|
|||
|
forward followed by the backward/inverse multi-dimensional transform
|
|||
|
will result in the original array scaled by the product of the
|
|||
|
normalization factors for each dimension (e.g. the product of the
|
|||
|
dimension sizes, for a multi-dimensional DFT).
|
|||
|
|
|||
|
The definition of FFTW's multi-dimensional DFT of real data (r2c)
|
|||
|
deserves special attention. In this case, we logically compute the full
|
|||
|
multi-dimensional DFT of the input data; since the input data are purely
|
|||
|
real, the output data have the Hermitian symmetry and therefore only one
|
|||
|
non-redundant half need be stored. More specifically, for an n[0] x
|
|||
|
n[1] x n[2] x ... x n[d-1] multi-dimensional real-input DFT, the full
|
|||
|
(logical) complex output array Y[k[0], k[1], ..., k[d-1]] has the
|
|||
|
symmetry: Y[k[0], k[1], ..., k[d-1]] = Y[n[0] - k[0], n[1] - k[1], ...,
|
|||
|
n[d-1] - k[d-1]]* (where each dimension is periodic). Because of this
|
|||
|
symmetry, we only store the k[d-1] = 0...n[d-1]/2 elements of the _last_
|
|||
|
dimension (division by 2 is rounded down). (We could instead have cut
|
|||
|
any other dimension in half, but the last dimension proved
|
|||
|
computationally convenient.) This results in the peculiar array format
|
|||
|
described in more detail by *note Real-data DFT Array Format::.
|
|||
|
|
|||
|
The multi-dimensional c2r transform is simply the unnormalized
|
|||
|
inverse of the r2c transform. i.e. it is the same as FFTW's complex
|
|||
|
backward multi-dimensional DFT, operating on a Hermitian input array in
|
|||
|
the peculiar format mentioned above and outputting a real array (since
|
|||
|
the DFT output is purely real).
|
|||
|
|
|||
|
We should remind the user that the separable product of 1d transforms
|
|||
|
along each dimension, as computed by FFTW, is not always the same thing
|
|||
|
as the usual multi-dimensional transform. A multi-dimensional 'R2HC'
|
|||
|
(or 'HC2R') transform is not identical to the multi-dimensional DFT,
|
|||
|
requiring some post-processing to combine the requisite real and
|
|||
|
imaginary parts, as was described in *note The Halfcomplex-format DFT::.
|
|||
|
Likewise, FFTW's multidimensional 'FFTW_DHT' r2r transform is not the
|
|||
|
same thing as the logical multi-dimensional discrete Hartley transform
|
|||
|
defined in the literature, as discussed in *note The Discrete Hartley
|
|||
|
Transform::.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Multi-threaded FFTW, Next: Distributed-memory FFTW with MPI, Prev: FFTW Reference, Up: Top
|
|||
|
|
|||
|
5 Multi-threaded FFTW
|
|||
|
*********************
|
|||
|
|
|||
|
In this chapter we document the parallel FFTW routines for shared-memory
|
|||
|
parallel hardware. These routines, which support parallel one- and
|
|||
|
multi-dimensional transforms of both real and complex data, are the
|
|||
|
easiest way to take advantage of multiple processors with FFTW. They
|
|||
|
work just like the corresponding uniprocessor transform routines, except
|
|||
|
that you have an extra initialization routine to call, and there is a
|
|||
|
routine to set the number of threads to employ. Any program that uses
|
|||
|
the uniprocessor FFTW can therefore be trivially modified to use the
|
|||
|
multi-threaded FFTW.
|
|||
|
|
|||
|
A shared-memory machine is one in which all CPUs can directly access
|
|||
|
the same main memory, and such machines are now common due to the
|
|||
|
ubiquity of multi-core CPUs. FFTW's multi-threading support allows you
|
|||
|
to utilize these additional CPUs transparently from a single program.
|
|||
|
However, this does not necessarily translate into performance
|
|||
|
gains--when multiple threads/CPUs are employed, there is an overhead
|
|||
|
required for synchronization that may outweigh the computatational
|
|||
|
parallelism. Therefore, you can only benefit from threads if your
|
|||
|
problem is sufficiently large.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Installation and Supported Hardware/Software::
|
|||
|
* Usage of Multi-threaded FFTW::
|
|||
|
* How Many Threads to Use?::
|
|||
|
* Thread safety::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Installation and Supported Hardware/Software, Next: Usage of Multi-threaded FFTW, Prev: Multi-threaded FFTW, Up: Multi-threaded FFTW
|
|||
|
|
|||
|
5.1 Installation and Supported Hardware/Software
|
|||
|
================================================
|
|||
|
|
|||
|
All of the FFTW threads code is located in the 'threads' subdirectory of
|
|||
|
the FFTW package. On Unix systems, the FFTW threads libraries and
|
|||
|
header files can be automatically configured, compiled, and installed
|
|||
|
along with the uniprocessor FFTW libraries simply by including
|
|||
|
'--enable-threads' in the flags to the 'configure' script (*note
|
|||
|
Installation on Unix::), or '--enable-openmp' to use OpenMP
|
|||
|
(http://www.openmp.org) threads.
|
|||
|
|
|||
|
The threads routines require your operating system to have some sort
|
|||
|
of shared-memory threads support. Specifically, the FFTW threads
|
|||
|
package works with POSIX threads (available on most Unix variants, from
|
|||
|
GNU/Linux to MacOS X) and Win32 threads. OpenMP threads, which are
|
|||
|
supported in many common compilers (e.g. gcc) are also supported, and
|
|||
|
may give better performance on some systems. (OpenMP threads are also
|
|||
|
useful if you are employing OpenMP in your own code, in order to
|
|||
|
minimize conflicts between threading models.) If you have a
|
|||
|
shared-memory machine that uses a different threads API, it should be a
|
|||
|
simple matter of programming to include support for it; see the file
|
|||
|
'threads/threads.c' for more detail.
|
|||
|
|
|||
|
You can compile FFTW with _both_ '--enable-threads' and
|
|||
|
'--enable-openmp' at the same time, since they install libraries with
|
|||
|
different names ('fftw3_threads' and 'fftw3_omp', as described below).
|
|||
|
However, your programs may only link to _one_ of these two libraries at
|
|||
|
a time.
|
|||
|
|
|||
|
Ideally, of course, you should also have multiple processors in order
|
|||
|
to get any benefit from the threaded transforms.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Usage of Multi-threaded FFTW, Next: How Many Threads to Use?, Prev: Installation and Supported Hardware/Software, Up: Multi-threaded FFTW
|
|||
|
|
|||
|
5.2 Usage of Multi-threaded FFTW
|
|||
|
================================
|
|||
|
|
|||
|
Here, it is assumed that the reader is already familiar with the usage
|
|||
|
of the uniprocessor FFTW routines, described elsewhere in this manual.
|
|||
|
We only describe what one has to change in order to use the
|
|||
|
multi-threaded routines.
|
|||
|
|
|||
|
First, programs using the parallel complex transforms should be
|
|||
|
linked with '-lfftw3_threads -lfftw3 -lm' on Unix, or '-lfftw3_omp
|
|||
|
-lfftw3 -lm' if you compiled with OpenMP. You will also need to link
|
|||
|
with whatever library is responsible for threads on your system (e.g.
|
|||
|
'-lpthread' on GNU/Linux) or include whatever compiler flag enables
|
|||
|
OpenMP (e.g. '-fopenmp' with gcc).
|
|||
|
|
|||
|
Second, before calling _any_ FFTW routines, you should call the
|
|||
|
function:
|
|||
|
|
|||
|
int fftw_init_threads(void);
|
|||
|
|
|||
|
This function, which need only be called once, performs any one-time
|
|||
|
initialization required to use threads on your system. It returns zero
|
|||
|
if there was some error (which should not happen under normal
|
|||
|
circumstances) and a non-zero value otherwise.
|
|||
|
|
|||
|
Third, before creating a plan that you want to parallelize, you
|
|||
|
should call:
|
|||
|
|
|||
|
void fftw_plan_with_nthreads(int nthreads);
|
|||
|
|
|||
|
The 'nthreads' argument indicates the number of threads you want FFTW
|
|||
|
to use (or actually, the maximum number). All plans subsequently
|
|||
|
created with any planner routine will use that many threads. You can
|
|||
|
call 'fftw_plan_with_nthreads', create some plans, call
|
|||
|
'fftw_plan_with_nthreads' again with a different argument, and create
|
|||
|
some more plans for a new number of threads. Plans already created
|
|||
|
before a call to 'fftw_plan_with_nthreads' are unaffected. If you pass
|
|||
|
an 'nthreads' argument of '1' (the default), threads are disabled for
|
|||
|
subsequent plans.
|
|||
|
|
|||
|
You can determine the current number of threads that the planner can
|
|||
|
use by calling:
|
|||
|
|
|||
|
int fftw_planner_nthreads(void);
|
|||
|
|
|||
|
With OpenMP, to configure FFTW to use all of the currently running
|
|||
|
OpenMP threads (set by 'omp_set_num_threads(nthreads)' or by the
|
|||
|
'OMP_NUM_THREADS' environment variable), you can do:
|
|||
|
'fftw_plan_with_nthreads(omp_get_max_threads())'. (The 'omp_' OpenMP
|
|||
|
functions are declared via '#include <omp.h>'.)
|
|||
|
|
|||
|
Given a plan, you then execute it as usual with 'fftw_execute(plan)',
|
|||
|
and the execution will use the number of threads specified when the plan
|
|||
|
was created. When done, you destroy it as usual with
|
|||
|
'fftw_destroy_plan'. As described in *note Thread safety::, plan
|
|||
|
_execution_ is thread-safe, but plan creation and destruction are _not_:
|
|||
|
you should create/destroy plans only from a single thread, but can
|
|||
|
safely execute multiple plans in parallel.
|
|||
|
|
|||
|
There is one additional routine: if you want to get rid of all memory
|
|||
|
and other resources allocated internally by FFTW, you can call:
|
|||
|
|
|||
|
void fftw_cleanup_threads(void);
|
|||
|
|
|||
|
which is much like the 'fftw_cleanup()' function except that it also
|
|||
|
gets rid of threads-related data. You must _not_ execute any previously
|
|||
|
created plans after calling this function.
|
|||
|
|
|||
|
We should also mention one other restriction: if you save wisdom from
|
|||
|
a program using the multi-threaded FFTW, that wisdom _cannot be used_ by
|
|||
|
a program using only the single-threaded FFTW (i.e. not calling
|
|||
|
'fftw_init_threads'). *Note Words of Wisdom-Saving Plans::.
|
|||
|
|
|||
|
Finally, FFTW provides a optional callback interface that allows you
|
|||
|
to replace its parallel threading backend at runtime:
|
|||
|
|
|||
|
void fftw_threads_set_callback(
|
|||
|
void (*parallel_loop)(void *(*work)(void *), char *jobdata, size_t elsize, int njobs, void *data),
|
|||
|
void *data);
|
|||
|
|
|||
|
This routine (which is _not_ threadsafe and should generally be
|
|||
|
called before creating any FFTW plans) allows you to provide a function
|
|||
|
'parallel_loop' that executes parallel work for FFTW: it should call the
|
|||
|
function 'work(jobdata + elsize*i)' for 'i' from '0' to 'njobs-1',
|
|||
|
possibly in parallel. (The 'data' pointer supplied to
|
|||
|
'fftw_threads_set_callback' is passed through to your 'parallel_loop'
|
|||
|
function.) For example, if you link to an FFTW threads library built to
|
|||
|
use POSIX threads, but you want it to use OpenMP instead (because you
|
|||
|
are using OpenMP elsewhere in your program and want to avoid competing
|
|||
|
threads), you can call 'fftw_threads_set_callback' with the callback
|
|||
|
function:
|
|||
|
|
|||
|
void parallel_loop(void *(*work)(char *), char *jobdata, size_t elsize, int njobs, void *data)
|
|||
|
{
|
|||
|
#pragma omp parallel for
|
|||
|
for (int i = 0; i < njobs; ++i)
|
|||
|
work(jobdata + elsize * i);
|
|||
|
}
|
|||
|
|
|||
|
The same mechanism could be used in order to make FFTW use a
|
|||
|
threading backend implemented via Intel TBB, Apple GCD, or Cilk, for
|
|||
|
example.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: How Many Threads to Use?, Next: Thread safety, Prev: Usage of Multi-threaded FFTW, Up: Multi-threaded FFTW
|
|||
|
|
|||
|
5.3 How Many Threads to Use?
|
|||
|
============================
|
|||
|
|
|||
|
There is a fair amount of overhead involved in synchronizing threads, so
|
|||
|
the optimal number of threads to use depends upon the size of the
|
|||
|
transform as well as on the number of processors you have.
|
|||
|
|
|||
|
As a general rule, you don't want to use more threads than you have
|
|||
|
processors. (Using more threads will work, but there will be extra
|
|||
|
overhead with no benefit.) In fact, if the problem size is too small,
|
|||
|
you may want to use fewer threads than you have processors.
|
|||
|
|
|||
|
You will have to experiment with your system to see what level of
|
|||
|
parallelization is best for your problem size. Typically, the problem
|
|||
|
will have to involve at least a few thousand data points before threads
|
|||
|
become beneficial. If you plan with 'FFTW_PATIENT', it will
|
|||
|
automatically disable threads for sizes that don't benefit from
|
|||
|
parallelization.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Thread safety, Prev: How Many Threads to Use?, Up: Multi-threaded FFTW
|
|||
|
|
|||
|
5.4 Thread safety
|
|||
|
=================
|
|||
|
|
|||
|
Users writing multi-threaded programs (including OpenMP) must concern
|
|||
|
themselves with the "thread safety" of the libraries they use--that is,
|
|||
|
whether it is safe to call routines in parallel from multiple threads.
|
|||
|
FFTW can be used in such an environment, but some care must be taken
|
|||
|
because the planner routines share data (e.g. wisdom and trigonometric
|
|||
|
tables) between calls and plans.
|
|||
|
|
|||
|
The upshot is that the only thread-safe routine in FFTW is
|
|||
|
'fftw_execute' (and the new-array variants thereof). All other routines
|
|||
|
(e.g. the planner) should only be called from one thread at a time.
|
|||
|
So, for example, you can wrap a semaphore lock around any calls to the
|
|||
|
planner; even more simply, you can just create all of your plans from
|
|||
|
one thread. We do not think this should be an important restriction
|
|||
|
(FFTW is designed for the situation where the only performance-sensitive
|
|||
|
code is the actual execution of the transform), and the benefits of
|
|||
|
shared data between plans are great.
|
|||
|
|
|||
|
Note also that, since the plan is not modified by 'fftw_execute', it
|
|||
|
is safe to execute the _same plan_ in parallel by multiple threads.
|
|||
|
However, since a given plan operates by default on a fixed array, you
|
|||
|
need to use one of the new-array execute functions (*note New-array
|
|||
|
Execute Functions::) so that different threads compute the transform of
|
|||
|
different data.
|
|||
|
|
|||
|
(Users should note that these comments only apply to programs using
|
|||
|
shared-memory threads or OpenMP. Parallelism using MPI or forked
|
|||
|
processes involves a separate address-space and global variables for
|
|||
|
each process, and is not susceptible to problems of this sort.)
|
|||
|
|
|||
|
The FFTW planner is intended to be called from a single thread. If
|
|||
|
you really must call it from multiple threads, you are expected to grab
|
|||
|
whatever lock makes sense for your application, with the understanding
|
|||
|
that you may be holding that lock for a long time, which is undesirable.
|
|||
|
|
|||
|
Neither strategy works, however, in the following situation. The
|
|||
|
"application" is structured as a set of "plugins" which are unaware of
|
|||
|
each other, and for whatever reason the "plugins" cannot coordinate on
|
|||
|
grabbing the lock. (This is not a technical problem, but an
|
|||
|
organizational one. The "plugins" are written by independent agents,
|
|||
|
and from the perspective of each plugin's author, each plugin is using
|
|||
|
FFTW correctly from a single thread.) To cope with this situation,
|
|||
|
starting from FFTW-3.3.5, FFTW supports an API to make the planner
|
|||
|
thread-safe:
|
|||
|
|
|||
|
void fftw_make_planner_thread_safe(void);
|
|||
|
|
|||
|
This call operates by brute force: It just installs a hook that wraps
|
|||
|
a lock (chosen by us) around all planner calls. So there is no magic
|
|||
|
and you get the worst of all worlds. The planner is still
|
|||
|
single-threaded, but you cannot choose which lock to use. The planner
|
|||
|
still holds the lock for a long time, but you cannot impose a timeout on
|
|||
|
lock acquisition. As of FFTW-3.3.5 and FFTW-3.3.6, this call does not
|
|||
|
work when using OpenMP as threading substrate. (Suggestions on what to
|
|||
|
do about this bug are welcome.) _Do not use
|
|||
|
'fftw_make_planner_thread_safe' unless there is no other choice,_ such
|
|||
|
as in the application/plugin situation.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Distributed-memory FFTW with MPI, Next: Calling FFTW from Modern Fortran, Prev: Multi-threaded FFTW, Up: Top
|
|||
|
|
|||
|
6 Distributed-memory FFTW with MPI
|
|||
|
**********************************
|
|||
|
|
|||
|
In this chapter we document the parallel FFTW routines for parallel
|
|||
|
systems supporting the MPI message-passing interface. Unlike the
|
|||
|
shared-memory threads described in the previous chapter, MPI allows you
|
|||
|
to use _distributed-memory_ parallelism, where each CPU has its own
|
|||
|
separate memory, and which can scale up to clusters of many thousands of
|
|||
|
processors. This capability comes at a price, however: each process
|
|||
|
only stores a _portion_ of the data to be transformed, which means that
|
|||
|
the data structures and programming-interface are quite different from
|
|||
|
the serial or threads versions of FFTW.
|
|||
|
|
|||
|
Distributed-memory parallelism is especially useful when you are
|
|||
|
transforming arrays so large that they do not fit into the memory of a
|
|||
|
single processor. The storage per-process required by FFTW's MPI
|
|||
|
routines is proportional to the total array size divided by the number
|
|||
|
of processes. Conversely, distributed-memory parallelism can easily
|
|||
|
pose an unacceptably high communications overhead for small problems;
|
|||
|
the threshold problem size for which parallelism becomes advantageous
|
|||
|
will depend on the precise problem you are interested in, your hardware,
|
|||
|
and your MPI implementation.
|
|||
|
|
|||
|
A note on terminology: in MPI, you divide the data among a set of
|
|||
|
"processes" which each run in their own memory address space.
|
|||
|
Generally, each process runs on a different physical processor, but this
|
|||
|
is not required. A set of processes in MPI is described by an opaque
|
|||
|
data structure called a "communicator," the most common of which is the
|
|||
|
predefined communicator 'MPI_COMM_WORLD' which refers to _all_
|
|||
|
processes. For more information on these and other concepts common to
|
|||
|
all MPI programs, we refer the reader to the documentation at the MPI
|
|||
|
home page (http://www.mcs.anl.gov/research/projects/mpi/).
|
|||
|
|
|||
|
We assume in this chapter that the reader is familiar with the usage
|
|||
|
of the serial (uniprocessor) FFTW, and focus only on the concepts new to
|
|||
|
the MPI interface.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* FFTW MPI Installation::
|
|||
|
* Linking and Initializing MPI FFTW::
|
|||
|
* 2d MPI example::
|
|||
|
* MPI Data Distribution::
|
|||
|
* Multi-dimensional MPI DFTs of Real Data::
|
|||
|
* Other Multi-dimensional Real-data MPI Transforms::
|
|||
|
* FFTW MPI Transposes::
|
|||
|
* FFTW MPI Wisdom::
|
|||
|
* Avoiding MPI Deadlocks::
|
|||
|
* FFTW MPI Performance Tips::
|
|||
|
* Combining MPI and Threads::
|
|||
|
* FFTW MPI Reference::
|
|||
|
* FFTW MPI Fortran Interface::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: FFTW MPI Installation, Next: Linking and Initializing MPI FFTW, Prev: Distributed-memory FFTW with MPI, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.1 FFTW MPI Installation
|
|||
|
=========================
|
|||
|
|
|||
|
All of the FFTW MPI code is located in the 'mpi' subdirectory of the
|
|||
|
FFTW package. On Unix systems, the FFTW MPI libraries and header files
|
|||
|
are automatically configured, compiled, and installed along with the
|
|||
|
uniprocessor FFTW libraries simply by including '--enable-mpi' in the
|
|||
|
flags to the 'configure' script (*note Installation on Unix::).
|
|||
|
|
|||
|
Any implementation of the MPI standard, version 1 or later, should
|
|||
|
work with FFTW. The 'configure' script will attempt to automatically
|
|||
|
detect how to compile and link code using your MPI implementation. In
|
|||
|
some cases, especially if you have multiple different MPI
|
|||
|
implementations installed or have an unusual MPI software package, you
|
|||
|
may need to provide this information explicitly.
|
|||
|
|
|||
|
Most commonly, one compiles MPI code by invoking a special compiler
|
|||
|
command, typically 'mpicc' for C code. The 'configure' script knows the
|
|||
|
most common names for this command, but you can specify the MPI
|
|||
|
compilation command explicitly by setting the 'MPICC' variable, as in
|
|||
|
'./configure MPICC=mpicc ...'.
|
|||
|
|
|||
|
If, instead of a special compiler command, you need to link a certain
|
|||
|
library, you can specify the link command via the 'MPILIBS' variable, as
|
|||
|
in './configure MPILIBS=-lmpi ...'. Note that if your MPI library is
|
|||
|
installed in a non-standard location (one the compiler does not know
|
|||
|
about by default), you may also have to specify the location of the
|
|||
|
library and header files via 'LDFLAGS' and 'CPPFLAGS' variables,
|
|||
|
respectively, as in './configure LDFLAGS=-L/path/to/mpi/libs
|
|||
|
CPPFLAGS=-I/path/to/mpi/include ...'.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Linking and Initializing MPI FFTW, Next: 2d MPI example, Prev: FFTW MPI Installation, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.2 Linking and Initializing MPI FFTW
|
|||
|
=====================================
|
|||
|
|
|||
|
Programs using the MPI FFTW routines should be linked with '-lfftw3_mpi
|
|||
|
-lfftw3 -lm' on Unix in double precision, '-lfftw3f_mpi -lfftw3f -lm' in
|
|||
|
single precision, and so on (*note Precision::). You will also need to
|
|||
|
link with whatever library is responsible for MPI on your system; in
|
|||
|
most MPI implementations, there is a special compiler alias named
|
|||
|
'mpicc' to compile and link MPI code.
|
|||
|
|
|||
|
Before calling any FFTW routines except possibly 'fftw_init_threads'
|
|||
|
(*note Combining MPI and Threads::), but after calling 'MPI_Init', you
|
|||
|
should call the function:
|
|||
|
|
|||
|
void fftw_mpi_init(void);
|
|||
|
|
|||
|
If, at the end of your program, you want to get rid of all memory and
|
|||
|
other resources allocated internally by FFTW, for both the serial and
|
|||
|
MPI routines, you can call:
|
|||
|
|
|||
|
void fftw_mpi_cleanup(void);
|
|||
|
|
|||
|
which is much like the 'fftw_cleanup()' function except that it also
|
|||
|
gets rid of FFTW's MPI-related data. You must _not_ execute any
|
|||
|
previously created plans after calling this function.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: 2d MPI example, Next: MPI Data Distribution, Prev: Linking and Initializing MPI FFTW, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.3 2d MPI example
|
|||
|
==================
|
|||
|
|
|||
|
Before we document the FFTW MPI interface in detail, we begin with a
|
|||
|
simple example outlining how one would perform a two-dimensional 'N0' by
|
|||
|
'N1' complex DFT.
|
|||
|
|
|||
|
#include <fftw3-mpi.h>
|
|||
|
|
|||
|
int main(int argc, char **argv)
|
|||
|
{
|
|||
|
const ptrdiff_t N0 = ..., N1 = ...;
|
|||
|
fftw_plan plan;
|
|||
|
fftw_complex *data;
|
|||
|
ptrdiff_t alloc_local, local_n0, local_0_start, i, j;
|
|||
|
|
|||
|
MPI_Init(&argc, &argv);
|
|||
|
fftw_mpi_init();
|
|||
|
|
|||
|
/* get local data size and allocate */
|
|||
|
alloc_local = fftw_mpi_local_size_2d(N0, N1, MPI_COMM_WORLD,
|
|||
|
&local_n0, &local_0_start);
|
|||
|
data = fftw_alloc_complex(alloc_local);
|
|||
|
|
|||
|
/* create plan for in-place forward DFT */
|
|||
|
plan = fftw_mpi_plan_dft_2d(N0, N1, data, data, MPI_COMM_WORLD,
|
|||
|
FFTW_FORWARD, FFTW_ESTIMATE);
|
|||
|
|
|||
|
/* initialize data to some function my_function(x,y) */
|
|||
|
for (i = 0; i < local_n0; ++i) for (j = 0; j < N1; ++j)
|
|||
|
data[i*N1 + j] = my_function(local_0_start + i, j);
|
|||
|
|
|||
|
/* compute transforms, in-place, as many times as desired */
|
|||
|
fftw_execute(plan);
|
|||
|
|
|||
|
fftw_destroy_plan(plan);
|
|||
|
|
|||
|
MPI_Finalize();
|
|||
|
}
|
|||
|
|
|||
|
As can be seen above, the MPI interface follows the same basic style
|
|||
|
of allocate/plan/execute/destroy as the serial FFTW routines. All of
|
|||
|
the MPI-specific routines are prefixed with 'fftw_mpi_' instead of
|
|||
|
'fftw_'. There are a few important differences, however:
|
|||
|
|
|||
|
First, we must call 'fftw_mpi_init()' after calling 'MPI_Init'
|
|||
|
(required in all MPI programs) and before calling any other 'fftw_mpi_'
|
|||
|
routine.
|
|||
|
|
|||
|
Second, when we create the plan with 'fftw_mpi_plan_dft_2d',
|
|||
|
analogous to 'fftw_plan_dft_2d', we pass an additional argument: the
|
|||
|
communicator, indicating which processes will participate in the
|
|||
|
transform (here 'MPI_COMM_WORLD', indicating all processes). Whenever
|
|||
|
you create, execute, or destroy a plan for an MPI transform, you must
|
|||
|
call the corresponding FFTW routine on _all_ processes in the
|
|||
|
communicator for that transform. (That is, these are _collective_
|
|||
|
calls.) Note that the plan for the MPI transform uses the standard
|
|||
|
'fftw_execute' and 'fftw_destroy' routines (on the other hand, there are
|
|||
|
MPI-specific new-array execute functions documented below).
|
|||
|
|
|||
|
Third, all of the FFTW MPI routines take 'ptrdiff_t' arguments
|
|||
|
instead of 'int' as for the serial FFTW. 'ptrdiff_t' is a standard C
|
|||
|
integer type which is (at least) 32 bits wide on a 32-bit machine and 64
|
|||
|
bits wide on a 64-bit machine. This is to make it easy to specify very
|
|||
|
large parallel transforms on a 64-bit machine. (You can specify 64-bit
|
|||
|
transform sizes in the serial FFTW, too, but only by using the 'guru64'
|
|||
|
planner interface. *Note 64-bit Guru Interface::.)
|
|||
|
|
|||
|
Fourth, and most importantly, you don't allocate the entire
|
|||
|
two-dimensional array on each process. Instead, you call
|
|||
|
'fftw_mpi_local_size_2d' to find out what _portion_ of the array resides
|
|||
|
on each processor, and how much space to allocate. Here, the portion of
|
|||
|
the array on each process is a 'local_n0' by 'N1' slice of the total
|
|||
|
array, starting at index 'local_0_start'. The total number of
|
|||
|
'fftw_complex' numbers to allocate is given by the 'alloc_local' return
|
|||
|
value, which _may_ be greater than 'local_n0 * N1' (in case some
|
|||
|
intermediate calculations require additional storage). The data
|
|||
|
distribution in FFTW's MPI interface is described in more detail by the
|
|||
|
next section.
|
|||
|
|
|||
|
Given the portion of the array that resides on the local process, it
|
|||
|
is straightforward to initialize the data (here to a function
|
|||
|
'myfunction') and otherwise manipulate it. Of course, at the end of the
|
|||
|
program you may want to output the data somehow, but synchronizing this
|
|||
|
output is up to you and is beyond the scope of this manual. (One good
|
|||
|
way to output a large multi-dimensional distributed array in MPI to a
|
|||
|
portable binary file is to use the free HDF5 library; see the HDF home
|
|||
|
page (http://www.hdfgroup.org/).)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: MPI Data Distribution, Next: Multi-dimensional MPI DFTs of Real Data, Prev: 2d MPI example, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.4 MPI Data Distribution
|
|||
|
=========================
|
|||
|
|
|||
|
The most important concept to understand in using FFTW's MPI interface
|
|||
|
is the data distribution. With a serial or multithreaded FFT, all of
|
|||
|
the inputs and outputs are stored as a single contiguous chunk of
|
|||
|
memory. With a distributed-memory FFT, the inputs and outputs are
|
|||
|
broken into disjoint blocks, one per process.
|
|||
|
|
|||
|
In particular, FFTW uses a _1d block distribution_ of the data,
|
|||
|
distributed along the _first dimension_. For example, if you want to
|
|||
|
perform a 100 x 200 complex DFT, distributed over 4 processes, each
|
|||
|
process will get a 25 x 200 slice of the data. That is, process 0 will
|
|||
|
get rows 0 through 24, process 1 will get rows 25 through 49, process 2
|
|||
|
will get rows 50 through 74, and process 3 will get rows 75 through 99.
|
|||
|
If you take the same array but distribute it over 3 processes, then it
|
|||
|
is not evenly divisible so the different processes will have unequal
|
|||
|
chunks. FFTW's default choice in this case is to assign 34 rows to
|
|||
|
processes 0 and 1, and 32 rows to process 2.
|
|||
|
|
|||
|
FFTW provides several 'fftw_mpi_local_size' routines that you can
|
|||
|
call to find out what portion of an array is stored on the current
|
|||
|
process. In most cases, you should use the default block sizes picked
|
|||
|
by FFTW, but it is also possible to specify your own block size. For
|
|||
|
example, with a 100 x 200 array on three processes, you can tell FFTW to
|
|||
|
use a block size of 40, which would assign 40 rows to processes 0 and 1,
|
|||
|
and 20 rows to process 2. FFTW's default is to divide the data equally
|
|||
|
among the processes if possible, and as best it can otherwise. The rows
|
|||
|
are always assigned in "rank order," i.e. process 0 gets the first
|
|||
|
block of rows, then process 1, and so on. (You can change this by using
|
|||
|
'MPI_Comm_split' to create a new communicator with re-ordered
|
|||
|
processes.) However, you should always call the 'fftw_mpi_local_size'
|
|||
|
routines, if possible, rather than trying to predict FFTW's distribution
|
|||
|
choices.
|
|||
|
|
|||
|
In particular, it is critical that you allocate the storage size that
|
|||
|
is returned by 'fftw_mpi_local_size', which is _not_ necessarily the
|
|||
|
size of the local slice of the array. The reason is that intermediate
|
|||
|
steps of FFTW's algorithms involve transposing the array and
|
|||
|
redistributing the data, so at these intermediate steps FFTW may require
|
|||
|
more local storage space (albeit always proportional to the total size
|
|||
|
divided by the number of processes). The 'fftw_mpi_local_size'
|
|||
|
functions know how much storage is required for these intermediate steps
|
|||
|
and tell you the correct amount to allocate.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Basic and advanced distribution interfaces::
|
|||
|
* Load balancing::
|
|||
|
* Transposed distributions::
|
|||
|
* One-dimensional distributions::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Basic and advanced distribution interfaces, Next: Load balancing, Prev: MPI Data Distribution, Up: MPI Data Distribution
|
|||
|
|
|||
|
6.4.1 Basic and advanced distribution interfaces
|
|||
|
------------------------------------------------
|
|||
|
|
|||
|
As with the planner interface, the 'fftw_mpi_local_size' distribution
|
|||
|
interface is broken into basic and advanced ('_many') interfaces, where
|
|||
|
the latter allows you to specify the block size manually and also to
|
|||
|
request block sizes when computing multiple transforms simultaneously.
|
|||
|
These functions are documented more exhaustively by the FFTW MPI
|
|||
|
Reference, but we summarize the basic ideas here using a couple of
|
|||
|
two-dimensional examples.
|
|||
|
|
|||
|
For the 100 x 200 complex-DFT example, above, we would find the
|
|||
|
distribution by calling the following function in the basic interface:
|
|||
|
|
|||
|
ptrdiff_t fftw_mpi_local_size_2d(ptrdiff_t n0, ptrdiff_t n1, MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start);
|
|||
|
|
|||
|
Given the total size of the data to be transformed (here, 'n0 = 100'
|
|||
|
and 'n1 = 200') and an MPI communicator ('comm'), this function provides
|
|||
|
three numbers.
|
|||
|
|
|||
|
First, it describes the shape of the local data: the current process
|
|||
|
should store a 'local_n0' by 'n1' slice of the overall dataset, in
|
|||
|
row-major order ('n1' dimension contiguous), starting at index
|
|||
|
'local_0_start'. That is, if the total dataset is viewed as a 'n0' by
|
|||
|
'n1' matrix, the current process should store the rows 'local_0_start'
|
|||
|
to 'local_0_start+local_n0-1'. Obviously, if you are running with only
|
|||
|
a single MPI process, that process will store the entire array:
|
|||
|
'local_0_start' will be zero and 'local_n0' will be 'n0'. *Note
|
|||
|
Row-major Format::.
|
|||
|
|
|||
|
Second, the return value is the total number of data elements (e.g.,
|
|||
|
complex numbers for a complex DFT) that should be allocated for the
|
|||
|
input and output arrays on the current process (ideally with
|
|||
|
'fftw_malloc' or an 'fftw_alloc' function, to ensure optimal alignment).
|
|||
|
It might seem that this should always be equal to 'local_n0 * n1', but
|
|||
|
this is _not_ the case. FFTW's distributed FFT algorithms require data
|
|||
|
redistributions at intermediate stages of the transform, and in some
|
|||
|
circumstances this may require slightly larger local storage. This is
|
|||
|
discussed in more detail below, under *note Load balancing::.
|
|||
|
|
|||
|
The advanced-interface 'local_size' function for multidimensional
|
|||
|
transforms returns the same three things ('local_n0', 'local_0_start',
|
|||
|
and the total number of elements to allocate), but takes more inputs:
|
|||
|
|
|||
|
ptrdiff_t fftw_mpi_local_size_many(int rnk, const ptrdiff_t *n,
|
|||
|
ptrdiff_t howmany,
|
|||
|
ptrdiff_t block0,
|
|||
|
MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0,
|
|||
|
ptrdiff_t *local_0_start);
|
|||
|
|
|||
|
The two-dimensional case above corresponds to 'rnk = 2' and an array
|
|||
|
'n' of length 2 with 'n[0] = n0' and 'n[1] = n1'. This routine is for
|
|||
|
any 'rnk > 1'; one-dimensional transforms have their own interface
|
|||
|
because they work slightly differently, as discussed below.
|
|||
|
|
|||
|
First, the advanced interface allows you to perform multiple
|
|||
|
transforms at once, of interleaved data, as specified by the 'howmany'
|
|||
|
parameter. ('hoamany' is 1 for a single transform.)
|
|||
|
|
|||
|
Second, here you can specify your desired block size in the 'n0'
|
|||
|
dimension, 'block0'. To use FFTW's default block size, pass
|
|||
|
'FFTW_MPI_DEFAULT_BLOCK' (0) for 'block0'. Otherwise, on 'P' processes,
|
|||
|
FFTW will return 'local_n0' equal to 'block0' on the first 'P / block0'
|
|||
|
processes (rounded down), return 'local_n0' equal to 'n0 - block0 * (P /
|
|||
|
block0)' on the next process, and 'local_n0' equal to zero on any
|
|||
|
remaining processes. In general, we recommend using the default block
|
|||
|
size (which corresponds to 'n0 / P', rounded up).
|
|||
|
|
|||
|
For example, suppose you have 'P = 4' processes and 'n0 = 21'. The
|
|||
|
default will be a block size of '6', which will give 'local_n0 = 6' on
|
|||
|
the first three processes and 'local_n0 = 3' on the last process.
|
|||
|
Instead, however, you could specify 'block0 = 5' if you wanted, which
|
|||
|
would give 'local_n0 = 5' on processes 0 to 2, 'local_n0 = 6' on process
|
|||
|
3. (This choice, while it may look superficially more "balanced," has
|
|||
|
the same critical path as FFTW's default but requires more
|
|||
|
communications.)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Load balancing, Next: Transposed distributions, Prev: Basic and advanced distribution interfaces, Up: MPI Data Distribution
|
|||
|
|
|||
|
6.4.2 Load balancing
|
|||
|
--------------------
|
|||
|
|
|||
|
Ideally, when you parallelize a transform over some P processes, each
|
|||
|
process should end up with work that takes equal time. Otherwise, all
|
|||
|
of the processes end up waiting on whichever process is slowest. This
|
|||
|
goal is known as "load balancing." In this section, we describe the
|
|||
|
circumstances under which FFTW is able to load-balance well, and in
|
|||
|
particular how you should choose your transform size in order to load
|
|||
|
balance.
|
|||
|
|
|||
|
Load balancing is especially difficult when you are parallelizing
|
|||
|
over heterogeneous machines; for example, if one of your processors is a
|
|||
|
old 486 and another is a Pentium IV, obviously you should give the
|
|||
|
Pentium more work to do than the 486 since the latter is much slower.
|
|||
|
FFTW does not deal with this problem, however--it assumes that your
|
|||
|
processes run on hardware of comparable speed, and that the goal is
|
|||
|
therefore to divide the problem as equally as possible.
|
|||
|
|
|||
|
For a multi-dimensional complex DFT, FFTW can divide the problem
|
|||
|
equally among the processes if: (i) the _first_ dimension 'n0' is
|
|||
|
divisible by P; and (ii), the _product_ of the subsequent dimensions is
|
|||
|
divisible by P. (For the advanced interface, where you can specify
|
|||
|
multiple simultaneous transforms via some "vector" length 'howmany', a
|
|||
|
factor of 'howmany' is included in the product of the subsequent
|
|||
|
dimensions.)
|
|||
|
|
|||
|
For a one-dimensional complex DFT, the length 'N' of the data should
|
|||
|
be divisible by P _squared_ to be able to divide the problem equally
|
|||
|
among the processes.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Transposed distributions, Next: One-dimensional distributions, Prev: Load balancing, Up: MPI Data Distribution
|
|||
|
|
|||
|
6.4.3 Transposed distributions
|
|||
|
------------------------------
|
|||
|
|
|||
|
Internally, FFTW's MPI transform algorithms work by first computing
|
|||
|
transforms of the data local to each process, then by globally
|
|||
|
_transposing_ the data in some fashion to redistribute the data among
|
|||
|
the processes, transforming the new data local to each process, and
|
|||
|
transposing back. For example, a two-dimensional 'n0' by 'n1' array,
|
|||
|
distributed across the 'n0' dimension, is transformd by: (i)
|
|||
|
transforming the 'n1' dimension, which are local to each process; (ii)
|
|||
|
transposing to an 'n1' by 'n0' array, distributed across the 'n1'
|
|||
|
dimension; (iii) transforming the 'n0' dimension, which is now local to
|
|||
|
each process; (iv) transposing back.
|
|||
|
|
|||
|
However, in many applications it is acceptable to compute a
|
|||
|
multidimensional DFT whose results are produced in transposed order
|
|||
|
(e.g., 'n1' by 'n0' in two dimensions). This provides a significant
|
|||
|
performance advantage, because it means that the final transposition
|
|||
|
step can be omitted. FFTW supports this optimization, which you specify
|
|||
|
by passing the flag 'FFTW_MPI_TRANSPOSED_OUT' to the planner routines.
|
|||
|
To compute the inverse transform of transposed output, you specify
|
|||
|
'FFTW_MPI_TRANSPOSED_IN' to tell it that the input is transposed. In
|
|||
|
this section, we explain how to interpret the output format of such a
|
|||
|
transform.
|
|||
|
|
|||
|
Suppose you have are transforming multi-dimensional data with (at
|
|||
|
least two) dimensions n[0] x n[1] x n[2] x ... x n[d-1] . As always,
|
|||
|
it is distributed along the first dimension n[0] . Now, if we compute
|
|||
|
its DFT with the 'FFTW_MPI_TRANSPOSED_OUT' flag, the resulting output
|
|||
|
data are stored with the first _two_ dimensions transposed: n[1] x n[0]
|
|||
|
x n[2] x ... x n[d-1] , distributed along the n[1] dimension.
|
|||
|
Conversely, if we take the n[1] x n[0] x n[2] x ... x n[d-1] data and
|
|||
|
transform it with the 'FFTW_MPI_TRANSPOSED_IN' flag, then the format
|
|||
|
goes back to the original n[0] x n[1] x n[2] x ... x n[d-1] array.
|
|||
|
|
|||
|
There are two ways to find the portion of the transposed array that
|
|||
|
resides on the current process. First, you can simply call the
|
|||
|
appropriate 'local_size' function, passing n[1] x n[0] x n[2] x ... x
|
|||
|
n[d-1] (the transposed dimensions). This would mean calling the
|
|||
|
'local_size' function twice, once for the transposed and once for the
|
|||
|
non-transposed dimensions. Alternatively, you can call one of the
|
|||
|
'local_size_transposed' functions, which returns both the non-transposed
|
|||
|
and transposed data distribution from a single call. For example, for a
|
|||
|
3d transform with transposed output (or input), you might call:
|
|||
|
|
|||
|
ptrdiff_t fftw_mpi_local_size_3d_transposed(
|
|||
|
ptrdiff_t n0, ptrdiff_t n1, ptrdiff_t n2, MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start,
|
|||
|
ptrdiff_t *local_n1, ptrdiff_t *local_1_start);
|
|||
|
|
|||
|
Here, 'local_n0' and 'local_0_start' give the size and starting index
|
|||
|
of the 'n0' dimension for the _non_-transposed data, as in the previous
|
|||
|
sections. For _transposed_ data (e.g. the output for
|
|||
|
'FFTW_MPI_TRANSPOSED_OUT'), 'local_n1' and 'local_1_start' give the size
|
|||
|
and starting index of the 'n1' dimension, which is the first dimension
|
|||
|
of the transposed data ('n1' by 'n0' by 'n2').
|
|||
|
|
|||
|
(Note that 'FFTW_MPI_TRANSPOSED_IN' is completely equivalent to
|
|||
|
performing 'FFTW_MPI_TRANSPOSED_OUT' and passing the first two
|
|||
|
dimensions to the planner in reverse order, or vice versa. If you pass
|
|||
|
_both_ the 'FFTW_MPI_TRANSPOSED_IN' and 'FFTW_MPI_TRANSPOSED_OUT' flags,
|
|||
|
it is equivalent to swapping the first two dimensions passed to the
|
|||
|
planner and passing _neither_ flag.)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: One-dimensional distributions, Prev: Transposed distributions, Up: MPI Data Distribution
|
|||
|
|
|||
|
6.4.4 One-dimensional distributions
|
|||
|
-----------------------------------
|
|||
|
|
|||
|
For one-dimensional distributed DFTs using FFTW, matters are slightly
|
|||
|
more complicated because the data distribution is more closely tied to
|
|||
|
how the algorithm works. In particular, you can no longer pass an
|
|||
|
arbitrary block size and must accept FFTW's default; also, the block
|
|||
|
sizes may be different for input and output. Also, the data
|
|||
|
distribution depends on the flags and transform direction, in order for
|
|||
|
forward and backward transforms to work correctly.
|
|||
|
|
|||
|
ptrdiff_t fftw_mpi_local_size_1d(ptrdiff_t n0, MPI_Comm comm,
|
|||
|
int sign, unsigned flags,
|
|||
|
ptrdiff_t *local_ni, ptrdiff_t *local_i_start,
|
|||
|
ptrdiff_t *local_no, ptrdiff_t *local_o_start);
|
|||
|
|
|||
|
This function computes the data distribution for a 1d transform of
|
|||
|
size 'n0' with the given transform 'sign' and 'flags'. Both input and
|
|||
|
output data use block distributions. The input on the current process
|
|||
|
will consist of 'local_ni' numbers starting at index 'local_i_start';
|
|||
|
e.g. if only a single process is used, then 'local_ni' will be 'n0' and
|
|||
|
'local_i_start' will be '0'. Similarly for the output, with 'local_no'
|
|||
|
numbers starting at index 'local_o_start'. The return value of
|
|||
|
'fftw_mpi_local_size_1d' will be the total number of elements to
|
|||
|
allocate on the current process (which might be slightly larger than the
|
|||
|
local size due to intermediate steps in the algorithm).
|
|||
|
|
|||
|
As mentioned above (*note Load balancing::), the data will be divided
|
|||
|
equally among the processes if 'n0' is divisible by the _square_ of the
|
|||
|
number of processes. In this case, 'local_ni' will equal 'local_no'.
|
|||
|
Otherwise, they may be different.
|
|||
|
|
|||
|
For some applications, such as convolutions, the order of the output
|
|||
|
data is irrelevant. In this case, performance can be improved by
|
|||
|
specifying that the output data be stored in an FFTW-defined "scrambled"
|
|||
|
format. (In particular, this is the analogue of transposed output in
|
|||
|
the multidimensional case: scrambled output saves a communications
|
|||
|
step.) If you pass 'FFTW_MPI_SCRAMBLED_OUT' in the flags, then the
|
|||
|
output is stored in this (undocumented) scrambled order. Conversely, to
|
|||
|
perform the inverse transform of data in scrambled order, pass the
|
|||
|
'FFTW_MPI_SCRAMBLED_IN' flag.
|
|||
|
|
|||
|
In MPI FFTW, only composite sizes 'n0' can be parallelized; we have
|
|||
|
not yet implemented a parallel algorithm for large prime sizes.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Multi-dimensional MPI DFTs of Real Data, Next: Other Multi-dimensional Real-data MPI Transforms, Prev: MPI Data Distribution, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.5 Multi-dimensional MPI DFTs of Real Data
|
|||
|
===========================================
|
|||
|
|
|||
|
FFTW's MPI interface also supports multi-dimensional DFTs of real data,
|
|||
|
similar to the serial r2c and c2r interfaces. (Parallel one-dimensional
|
|||
|
real-data DFTs are not currently supported; you must use a complex
|
|||
|
transform and set the imaginary parts of the inputs to zero.)
|
|||
|
|
|||
|
The key points to understand for r2c and c2r MPI transforms (compared
|
|||
|
to the MPI complex DFTs or the serial r2c/c2r transforms), are:
|
|||
|
|
|||
|
* Just as for serial transforms, r2c/c2r DFTs transform n[0] x n[1] x
|
|||
|
n[2] x ... x n[d-1] real data to/from n[0] x n[1] x n[2] x ... x
|
|||
|
(n[d-1]/2 + 1) complex data: the last dimension of the complex data
|
|||
|
is cut in half (rounded down), plus one. As for the serial
|
|||
|
transforms, the sizes you pass to the 'plan_dft_r2c' and
|
|||
|
'plan_dft_c2r' are the n[0] x n[1] x n[2] x ... x n[d-1]
|
|||
|
dimensions of the real data.
|
|||
|
|
|||
|
* Although the real data is _conceptually_ n[0] x n[1] x n[2] x ...
|
|||
|
x n[d-1] , it is _physically_ stored as an n[0] x n[1] x n[2] x ...
|
|||
|
x [2 (n[d-1]/2 + 1)] array, where the last dimension has been
|
|||
|
_padded_ to make it the same size as the complex output. This is
|
|||
|
much like the in-place serial r2c/c2r interface (*note
|
|||
|
Multi-Dimensional DFTs of Real Data::), except that in MPI the
|
|||
|
padding is required even for out-of-place data. The extra padding
|
|||
|
numbers are ignored by FFTW (they are _not_ like zero-padding the
|
|||
|
transform to a larger size); they are only used to determine the
|
|||
|
data layout.
|
|||
|
|
|||
|
* The data distribution in MPI for _both_ the real and complex data
|
|||
|
is determined by the shape of the _complex_ data. That is, you
|
|||
|
call the appropriate 'local size' function for the n[0] x n[1] x
|
|||
|
n[2] x ... x (n[d-1]/2 + 1) complex data, and then use the _same_
|
|||
|
distribution for the real data except that the last complex
|
|||
|
dimension is replaced by a (padded) real dimension of twice the
|
|||
|
length.
|
|||
|
|
|||
|
For example suppose we are performing an out-of-place r2c transform
|
|||
|
of L x M x N real data [padded to L x M x 2(N/2+1) ], resulting in L x M
|
|||
|
x N/2+1 complex data. Similar to the example in *note 2d MPI example::,
|
|||
|
we might do something like:
|
|||
|
|
|||
|
#include <fftw3-mpi.h>
|
|||
|
|
|||
|
int main(int argc, char **argv)
|
|||
|
{
|
|||
|
const ptrdiff_t L = ..., M = ..., N = ...;
|
|||
|
fftw_plan plan;
|
|||
|
double *rin;
|
|||
|
fftw_complex *cout;
|
|||
|
ptrdiff_t alloc_local, local_n0, local_0_start, i, j, k;
|
|||
|
|
|||
|
MPI_Init(&argc, &argv);
|
|||
|
fftw_mpi_init();
|
|||
|
|
|||
|
/* get local data size and allocate */
|
|||
|
alloc_local = fftw_mpi_local_size_3d(L, M, N/2+1, MPI_COMM_WORLD,
|
|||
|
&local_n0, &local_0_start);
|
|||
|
rin = fftw_alloc_real(2 * alloc_local);
|
|||
|
cout = fftw_alloc_complex(alloc_local);
|
|||
|
|
|||
|
/* create plan for out-of-place r2c DFT */
|
|||
|
plan = fftw_mpi_plan_dft_r2c_3d(L, M, N, rin, cout, MPI_COMM_WORLD,
|
|||
|
FFTW_MEASURE);
|
|||
|
|
|||
|
/* initialize rin to some function my_func(x,y,z) */
|
|||
|
for (i = 0; i < local_n0; ++i)
|
|||
|
for (j = 0; j < M; ++j)
|
|||
|
for (k = 0; k < N; ++k)
|
|||
|
rin[(i*M + j) * (2*(N/2+1)) + k] = my_func(local_0_start+i, j, k);
|
|||
|
|
|||
|
/* compute transforms as many times as desired */
|
|||
|
fftw_execute(plan);
|
|||
|
|
|||
|
fftw_destroy_plan(plan);
|
|||
|
|
|||
|
MPI_Finalize();
|
|||
|
}
|
|||
|
|
|||
|
Note that we allocated 'rin' using 'fftw_alloc_real' with an argument
|
|||
|
of '2 * alloc_local': since 'alloc_local' is the number of _complex_
|
|||
|
values to allocate, the number of _real_ values is twice as many. The
|
|||
|
'rin' array is then local_n0 x M x 2(N/2+1) in row-major order, so its
|
|||
|
'(i,j,k)' element is at the index '(i*M + j) * (2*(N/2+1)) + k' (*note
|
|||
|
Multi-dimensional Array Format::).
|
|||
|
|
|||
|
As for the complex transforms, improved performance can be obtained
|
|||
|
by specifying that the output is the transpose of the input or vice
|
|||
|
versa (*note Transposed distributions::). In our L x M x N r2c example,
|
|||
|
including 'FFTW_TRANSPOSED_OUT' in the flags means that the input would
|
|||
|
be a padded L x M x 2(N/2+1) real array distributed over the 'L'
|
|||
|
dimension, while the output would be a M x L x N/2+1 complex array
|
|||
|
distributed over the 'M' dimension. To perform the inverse c2r
|
|||
|
transform with the same data distributions, you would use the
|
|||
|
'FFTW_TRANSPOSED_IN' flag.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Other Multi-dimensional Real-data MPI Transforms, Next: FFTW MPI Transposes, Prev: Multi-dimensional MPI DFTs of Real Data, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.6 Other multi-dimensional Real-Data MPI Transforms
|
|||
|
====================================================
|
|||
|
|
|||
|
FFTW's MPI interface also supports multi-dimensional 'r2r' transforms of
|
|||
|
all kinds supported by the serial interface (e.g. discrete cosine and
|
|||
|
sine transforms, discrete Hartley transforms, etc.). Only
|
|||
|
multi-dimensional 'r2r' transforms, not one-dimensional transforms, are
|
|||
|
currently parallelized.
|
|||
|
|
|||
|
These are used much like the multidimensional complex DFTs discussed
|
|||
|
above, except that the data is real rather than complex, and one needs
|
|||
|
to pass an r2r transform kind ('fftw_r2r_kind') for each dimension as in
|
|||
|
the serial FFTW (*note More DFTs of Real Data::).
|
|||
|
|
|||
|
For example, one might perform a two-dimensional L x M that is an
|
|||
|
REDFT10 (DCT-II) in the first dimension and an RODFT10 (DST-II) in the
|
|||
|
second dimension with code like:
|
|||
|
|
|||
|
const ptrdiff_t L = ..., M = ...;
|
|||
|
fftw_plan plan;
|
|||
|
double *data;
|
|||
|
ptrdiff_t alloc_local, local_n0, local_0_start, i, j;
|
|||
|
|
|||
|
/* get local data size and allocate */
|
|||
|
alloc_local = fftw_mpi_local_size_2d(L, M, MPI_COMM_WORLD,
|
|||
|
&local_n0, &local_0_start);
|
|||
|
data = fftw_alloc_real(alloc_local);
|
|||
|
|
|||
|
/* create plan for in-place REDFT10 x RODFT10 */
|
|||
|
plan = fftw_mpi_plan_r2r_2d(L, M, data, data, MPI_COMM_WORLD,
|
|||
|
FFTW_REDFT10, FFTW_RODFT10, FFTW_MEASURE);
|
|||
|
|
|||
|
/* initialize data to some function my_function(x,y) */
|
|||
|
for (i = 0; i < local_n0; ++i) for (j = 0; j < M; ++j)
|
|||
|
data[i*M + j] = my_function(local_0_start + i, j);
|
|||
|
|
|||
|
/* compute transforms, in-place, as many times as desired */
|
|||
|
fftw_execute(plan);
|
|||
|
|
|||
|
fftw_destroy_plan(plan);
|
|||
|
|
|||
|
Notice that we use the same 'local_size' functions as we did for
|
|||
|
complex data, only now we interpret the sizes in terms of real rather
|
|||
|
than complex values, and correspondingly use 'fftw_alloc_real'.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: FFTW MPI Transposes, Next: FFTW MPI Wisdom, Prev: Other Multi-dimensional Real-data MPI Transforms, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.7 FFTW MPI Transposes
|
|||
|
=======================
|
|||
|
|
|||
|
The FFTW's MPI Fourier transforms rely on one or more _global
|
|||
|
transposition_ step for their communications. For example, the
|
|||
|
multidimensional transforms work by transforming along some dimensions,
|
|||
|
then transposing to make the first dimension local and transforming
|
|||
|
that, then transposing back. Because global transposition of a
|
|||
|
block-distributed matrix has many other potential uses besides FFTs,
|
|||
|
FFTW's transpose routines can be called directly, as documented in this
|
|||
|
section.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Basic distributed-transpose interface::
|
|||
|
* Advanced distributed-transpose interface::
|
|||
|
* An improved replacement for MPI_Alltoall::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Basic distributed-transpose interface, Next: Advanced distributed-transpose interface, Prev: FFTW MPI Transposes, Up: FFTW MPI Transposes
|
|||
|
|
|||
|
6.7.1 Basic distributed-transpose interface
|
|||
|
-------------------------------------------
|
|||
|
|
|||
|
In particular, suppose that we have an 'n0' by 'n1' array in row-major
|
|||
|
order, block-distributed across the 'n0' dimension. To transpose this
|
|||
|
into an 'n1' by 'n0' array block-distributed across the 'n1' dimension,
|
|||
|
we would create a plan by calling the following function:
|
|||
|
|
|||
|
fftw_plan fftw_mpi_plan_transpose(ptrdiff_t n0, ptrdiff_t n1,
|
|||
|
double *in, double *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
|
|||
|
The input and output arrays ('in' and 'out') can be the same. The
|
|||
|
transpose is actually executed by calling 'fftw_execute' on the plan, as
|
|||
|
usual.
|
|||
|
|
|||
|
The 'flags' are the usual FFTW planner flags, but support two
|
|||
|
additional flags: 'FFTW_MPI_TRANSPOSED_OUT' and/or
|
|||
|
'FFTW_MPI_TRANSPOSED_IN'. What these flags indicate, for transpose
|
|||
|
plans, is that the output and/or input, respectively, are _locally_
|
|||
|
transposed. That is, on each process input data is normally stored as a
|
|||
|
'local_n0' by 'n1' array in row-major order, but for an
|
|||
|
'FFTW_MPI_TRANSPOSED_IN' plan the input data is stored as 'n1' by
|
|||
|
'local_n0' in row-major order. Similarly, 'FFTW_MPI_TRANSPOSED_OUT'
|
|||
|
means that the output is 'n0' by 'local_n1' instead of 'local_n1' by
|
|||
|
'n0'.
|
|||
|
|
|||
|
To determine the local size of the array on each process before and
|
|||
|
after the transpose, as well as the amount of storage that must be
|
|||
|
allocated, one should call 'fftw_mpi_local_size_2d_transposed', just as
|
|||
|
for a 2d DFT as described in the previous section:
|
|||
|
|
|||
|
ptrdiff_t fftw_mpi_local_size_2d_transposed
|
|||
|
(ptrdiff_t n0, ptrdiff_t n1, MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start,
|
|||
|
ptrdiff_t *local_n1, ptrdiff_t *local_1_start);
|
|||
|
|
|||
|
Again, the return value is the local storage to allocate, which in
|
|||
|
this case is the number of _real_ ('double') values rather than complex
|
|||
|
numbers as in the previous examples.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Advanced distributed-transpose interface, Next: An improved replacement for MPI_Alltoall, Prev: Basic distributed-transpose interface, Up: FFTW MPI Transposes
|
|||
|
|
|||
|
6.7.2 Advanced distributed-transpose interface
|
|||
|
----------------------------------------------
|
|||
|
|
|||
|
The above routines are for a transpose of a matrix of numbers (of type
|
|||
|
'double'), using FFTW's default block sizes. More generally, one can
|
|||
|
perform transposes of _tuples_ of numbers, with user-specified block
|
|||
|
sizes for the input and output:
|
|||
|
|
|||
|
fftw_plan fftw_mpi_plan_many_transpose
|
|||
|
(ptrdiff_t n0, ptrdiff_t n1, ptrdiff_t howmany,
|
|||
|
ptrdiff_t block0, ptrdiff_t block1,
|
|||
|
double *in, double *out, MPI_Comm comm, unsigned flags);
|
|||
|
|
|||
|
In this case, one is transposing an 'n0' by 'n1' matrix of
|
|||
|
'howmany'-tuples (e.g. 'howmany = 2' for complex numbers). The input
|
|||
|
is distributed along the 'n0' dimension with block size 'block0', and
|
|||
|
the 'n1' by 'n0' output is distributed along the 'n1' dimension with
|
|||
|
block size 'block1'. If 'FFTW_MPI_DEFAULT_BLOCK' (0) is passed for a
|
|||
|
block size then FFTW uses its default block size. To get the local size
|
|||
|
of the data on each process, you should then call
|
|||
|
'fftw_mpi_local_size_many_transposed'.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: An improved replacement for MPI_Alltoall, Prev: Advanced distributed-transpose interface, Up: FFTW MPI Transposes
|
|||
|
|
|||
|
6.7.3 An improved replacement for MPI_Alltoall
|
|||
|
----------------------------------------------
|
|||
|
|
|||
|
We close this section by noting that FFTW's MPI transpose routines can
|
|||
|
be thought of as a generalization for the 'MPI_Alltoall' function
|
|||
|
(albeit only for floating-point types), and in some circumstances can
|
|||
|
function as an improved replacement.
|
|||
|
|
|||
|
'MPI_Alltoall' is defined by the MPI standard as:
|
|||
|
|
|||
|
int MPI_Alltoall(void *sendbuf, int sendcount, MPI_Datatype sendtype,
|
|||
|
void *recvbuf, int recvcnt, MPI_Datatype recvtype,
|
|||
|
MPI_Comm comm);
|
|||
|
|
|||
|
In particular, for 'double*' arrays 'in' and 'out', consider the
|
|||
|
call:
|
|||
|
|
|||
|
MPI_Alltoall(in, howmany, MPI_DOUBLE, out, howmany MPI_DOUBLE, comm);
|
|||
|
|
|||
|
This is completely equivalent to:
|
|||
|
|
|||
|
MPI_Comm_size(comm, &P);
|
|||
|
plan = fftw_mpi_plan_many_transpose(P, P, howmany, 1, 1, in, out, comm, FFTW_ESTIMATE);
|
|||
|
fftw_execute(plan);
|
|||
|
fftw_destroy_plan(plan);
|
|||
|
|
|||
|
That is, computing a P x P transpose on 'P' processes, with a block
|
|||
|
size of 1, is just a standard all-to-all communication.
|
|||
|
|
|||
|
However, using the FFTW routine instead of 'MPI_Alltoall' may have
|
|||
|
certain advantages. First of all, FFTW's routine can operate in-place
|
|||
|
('in == out') whereas 'MPI_Alltoall' can only operate out-of-place.
|
|||
|
|
|||
|
Second, even for out-of-place plans, FFTW's routine may be faster,
|
|||
|
especially if you need to perform the all-to-all communication many
|
|||
|
times and can afford to use 'FFTW_MEASURE' or 'FFTW_PATIENT'. It should
|
|||
|
certainly be no slower, not including the time to create the plan, since
|
|||
|
one of the possible algorithms that FFTW uses for an out-of-place
|
|||
|
transpose _is_ simply to call 'MPI_Alltoall'. However, FFTW also
|
|||
|
considers several other possible algorithms that, depending on your MPI
|
|||
|
implementation and your hardware, may be faster.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: FFTW MPI Wisdom, Next: Avoiding MPI Deadlocks, Prev: FFTW MPI Transposes, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.8 FFTW MPI Wisdom
|
|||
|
===================
|
|||
|
|
|||
|
FFTW's "wisdom" facility (*note Words of Wisdom-Saving Plans::) can be
|
|||
|
used to save MPI plans as well as to save uniprocessor plans. However,
|
|||
|
for MPI there are several unavoidable complications.
|
|||
|
|
|||
|
First, the MPI standard does not guarantee that every process can
|
|||
|
perform file I/O (at least, not using C stdio routines)--in general, we
|
|||
|
may only assume that process 0 is capable of I/O.(1) So, if we want to
|
|||
|
export the wisdom from a single process to a file, we must first export
|
|||
|
the wisdom to a string, then send it to process 0, then write it to a
|
|||
|
file.
|
|||
|
|
|||
|
Second, in principle we may want to have separate wisdom for every
|
|||
|
process, since in general the processes may run on different hardware
|
|||
|
even for a single MPI program. However, in practice FFTW's MPI code is
|
|||
|
designed for the case of homogeneous hardware (*note Load balancing::),
|
|||
|
and in this case it is convenient to use the same wisdom for every
|
|||
|
process. Thus, we need a mechanism to synchronize the wisdom.
|
|||
|
|
|||
|
To address both of these problems, FFTW provides the following two
|
|||
|
functions:
|
|||
|
|
|||
|
void fftw_mpi_broadcast_wisdom(MPI_Comm comm);
|
|||
|
void fftw_mpi_gather_wisdom(MPI_Comm comm);
|
|||
|
|
|||
|
Given a communicator 'comm', 'fftw_mpi_broadcast_wisdom' will
|
|||
|
broadcast the wisdom from process 0 to all other processes. Conversely,
|
|||
|
'fftw_mpi_gather_wisdom' will collect wisdom from all processes onto
|
|||
|
process 0. (If the plans created for the same problem by different
|
|||
|
processes are not the same, 'fftw_mpi_gather_wisdom' will arbitrarily
|
|||
|
choose one of the plans.) Both of these functions may result in
|
|||
|
suboptimal plans for different processes if the processes are running on
|
|||
|
non-identical hardware. Both of these functions are _collective_ calls,
|
|||
|
which means that they must be executed by all processes in the
|
|||
|
communicator.
|
|||
|
|
|||
|
So, for example, a typical code snippet to import wisdom from a file
|
|||
|
and use it on all processes would be:
|
|||
|
|
|||
|
{
|
|||
|
int rank;
|
|||
|
|
|||
|
fftw_mpi_init();
|
|||
|
MPI_Comm_rank(MPI_COMM_WORLD, &rank);
|
|||
|
if (rank == 0) fftw_import_wisdom_from_filename("mywisdom");
|
|||
|
fftw_mpi_broadcast_wisdom(MPI_COMM_WORLD);
|
|||
|
}
|
|||
|
|
|||
|
(Note that we must call 'fftw_mpi_init' before importing any wisdom
|
|||
|
that might contain MPI plans.) Similarly, a typical code snippet to
|
|||
|
export wisdom from all processes to a file is:
|
|||
|
|
|||
|
{
|
|||
|
int rank;
|
|||
|
|
|||
|
fftw_mpi_gather_wisdom(MPI_COMM_WORLD);
|
|||
|
MPI_Comm_rank(MPI_COMM_WORLD, &rank);
|
|||
|
if (rank == 0) fftw_export_wisdom_to_filename("mywisdom");
|
|||
|
}
|
|||
|
|
|||
|
---------- Footnotes ----------
|
|||
|
|
|||
|
(1) In fact, even this assumption is not technically guaranteed by
|
|||
|
the standard, although it seems to be universal in actual MPI
|
|||
|
implementations and is widely assumed by MPI-using software.
|
|||
|
Technically, you need to query the 'MPI_IO' attribute of
|
|||
|
'MPI_COMM_WORLD' with 'MPI_Attr_get'. If this attribute is
|
|||
|
'MPI_PROC_NULL', no I/O is possible. If it is 'MPI_ANY_SOURCE', any
|
|||
|
process can perform I/O. Otherwise, it is the rank of a process that can
|
|||
|
perform I/O ... but since it is not guaranteed to yield the _same_ rank
|
|||
|
on all processes, you have to do an 'MPI_Allreduce' of some kind if you
|
|||
|
want all processes to agree about which is going to do I/O. And even
|
|||
|
then, the standard only guarantees that this process can perform output,
|
|||
|
but not input. See e.g. 'Parallel Programming with MPI' by P. S.
|
|||
|
Pacheco, section 8.1.3. Needless to say, in our experience virtually no
|
|||
|
MPI programmers worry about this.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Avoiding MPI Deadlocks, Next: FFTW MPI Performance Tips, Prev: FFTW MPI Wisdom, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.9 Avoiding MPI Deadlocks
|
|||
|
==========================
|
|||
|
|
|||
|
An MPI program can _deadlock_ if one process is waiting for a message
|
|||
|
from another process that never gets sent. To avoid deadlocks when
|
|||
|
using FFTW's MPI routines, it is important to know which functions are
|
|||
|
_collective_: that is, which functions must _always_ be called in the
|
|||
|
_same order_ from _every_ process in a given communicator. (For
|
|||
|
example, 'MPI_Barrier' is the canonical example of a collective function
|
|||
|
in the MPI standard.)
|
|||
|
|
|||
|
The functions in FFTW that are _always_ collective are: every
|
|||
|
function beginning with 'fftw_mpi_plan', as well as
|
|||
|
'fftw_mpi_broadcast_wisdom' and 'fftw_mpi_gather_wisdom'. Also, the
|
|||
|
following functions from the ordinary FFTW interface are collective when
|
|||
|
they are applied to a plan created by an 'fftw_mpi_plan' function:
|
|||
|
'fftw_execute', 'fftw_destroy_plan', and 'fftw_flops'.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: FFTW MPI Performance Tips, Next: Combining MPI and Threads, Prev: Avoiding MPI Deadlocks, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.10 FFTW MPI Performance Tips
|
|||
|
==============================
|
|||
|
|
|||
|
In this section, we collect a few tips on getting the best performance
|
|||
|
out of FFTW's MPI transforms.
|
|||
|
|
|||
|
First, because of the 1d block distribution, FFTW's parallelization
|
|||
|
is currently limited by the size of the first dimension.
|
|||
|
(Multidimensional block distributions may be supported by a future
|
|||
|
version.) More generally, you should ideally arrange the dimensions so
|
|||
|
that FFTW can divide them equally among the processes. *Note Load
|
|||
|
balancing::.
|
|||
|
|
|||
|
Second, if it is not too inconvenient, you should consider working
|
|||
|
with transposed output for multidimensional plans, as this saves a
|
|||
|
considerable amount of communications. *Note Transposed
|
|||
|
distributions::.
|
|||
|
|
|||
|
Third, the fastest choices are generally either an in-place transform
|
|||
|
or an out-of-place transform with the 'FFTW_DESTROY_INPUT' flag (which
|
|||
|
allows the input array to be used as scratch space). In-place is
|
|||
|
especially beneficial if the amount of data per process is large.
|
|||
|
|
|||
|
Fourth, if you have multiple arrays to transform at once, rather than
|
|||
|
calling FFTW's MPI transforms several times it usually seems to be
|
|||
|
faster to interleave the data and use the advanced interface. (This
|
|||
|
groups the communications together instead of requiring separate
|
|||
|
messages for each transform.)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Combining MPI and Threads, Next: FFTW MPI Reference, Prev: FFTW MPI Performance Tips, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.11 Combining MPI and Threads
|
|||
|
==============================
|
|||
|
|
|||
|
In certain cases, it may be advantageous to combine MPI
|
|||
|
(distributed-memory) and threads (shared-memory) parallelization. FFTW
|
|||
|
supports this, with certain caveats. For example, if you have a cluster
|
|||
|
of 4-processor shared-memory nodes, you may want to use threads within
|
|||
|
the nodes and MPI between the nodes, instead of MPI for all
|
|||
|
parallelization.
|
|||
|
|
|||
|
In particular, it is possible to seamlessly combine the MPI FFTW
|
|||
|
routines with the multi-threaded FFTW routines (*note Multi-threaded
|
|||
|
FFTW::). However, some care must be taken in the initialization code,
|
|||
|
which should look something like this:
|
|||
|
|
|||
|
int threads_ok;
|
|||
|
|
|||
|
int main(int argc, char **argv)
|
|||
|
{
|
|||
|
int provided;
|
|||
|
MPI_Init_thread(&argc, &argv, MPI_THREAD_FUNNELED, &provided);
|
|||
|
threads_ok = provided >= MPI_THREAD_FUNNELED;
|
|||
|
|
|||
|
if (threads_ok) threads_ok = fftw_init_threads();
|
|||
|
fftw_mpi_init();
|
|||
|
|
|||
|
...
|
|||
|
if (threads_ok) fftw_plan_with_nthreads(...);
|
|||
|
...
|
|||
|
|
|||
|
MPI_Finalize();
|
|||
|
}
|
|||
|
|
|||
|
First, note that instead of calling 'MPI_Init', you should call
|
|||
|
'MPI_Init_threads', which is the initialization routine defined by the
|
|||
|
MPI-2 standard to indicate to MPI that your program will be
|
|||
|
multithreaded. We pass 'MPI_THREAD_FUNNELED', which indicates that we
|
|||
|
will only call MPI routines from the main thread. (FFTW will launch
|
|||
|
additional threads internally, but the extra threads will not call MPI
|
|||
|
code.) (You may also pass 'MPI_THREAD_SERIALIZED' or
|
|||
|
'MPI_THREAD_MULTIPLE', which requests additional multithreading support
|
|||
|
from the MPI implementation, but this is not required by FFTW.) The
|
|||
|
'provided' parameter returns what level of threads support is actually
|
|||
|
supported by your MPI implementation; this _must_ be at least
|
|||
|
'MPI_THREAD_FUNNELED' if you want to call the FFTW threads routines, so
|
|||
|
we define a global variable 'threads_ok' to record this. You should
|
|||
|
only call 'fftw_init_threads' or 'fftw_plan_with_nthreads' if
|
|||
|
'threads_ok' is true. For more information on thread safety in MPI, see
|
|||
|
the MPI and Threads
|
|||
|
(http://www.mpi-forum.org/docs/mpi-20-html/node162.htm) section of the
|
|||
|
MPI-2 standard.
|
|||
|
|
|||
|
Second, we must call 'fftw_init_threads' _before_ 'fftw_mpi_init'.
|
|||
|
This is critical for technical reasons having to do with how FFTW
|
|||
|
initializes its list of algorithms.
|
|||
|
|
|||
|
Then, if you call 'fftw_plan_with_nthreads(N)', _every_ MPI process
|
|||
|
will launch (up to) 'N' threads to parallelize its transforms.
|
|||
|
|
|||
|
For example, in the hypothetical cluster of 4-processor nodes, you
|
|||
|
might wish to launch only a single MPI process per node, and then call
|
|||
|
'fftw_plan_with_nthreads(4)' on each process to use all processors in
|
|||
|
the nodes.
|
|||
|
|
|||
|
This may or may not be faster than simply using as many MPI processes
|
|||
|
as you have processors, however. On the one hand, using threads within
|
|||
|
a node eliminates the need for explicit message passing within the node.
|
|||
|
On the other hand, FFTW's transpose routines are not multi-threaded, and
|
|||
|
this means that the communications that do take place will not benefit
|
|||
|
from parallelization within the node. Moreover, many MPI
|
|||
|
implementations already have optimizations to exploit shared memory when
|
|||
|
it is available, so adding the multithreaded FFTW on top of this may be
|
|||
|
superfluous.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: FFTW MPI Reference, Next: FFTW MPI Fortran Interface, Prev: Combining MPI and Threads, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.12 FFTW MPI Reference
|
|||
|
=======================
|
|||
|
|
|||
|
This chapter provides a complete reference to all FFTW MPI functions,
|
|||
|
datatypes, and constants. See also *note FFTW Reference:: for
|
|||
|
information on functions and types in common with the serial interface.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* MPI Files and Data Types::
|
|||
|
* MPI Initialization::
|
|||
|
* Using MPI Plans::
|
|||
|
* MPI Data Distribution Functions::
|
|||
|
* MPI Plan Creation::
|
|||
|
* MPI Wisdom Communication::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: MPI Files and Data Types, Next: MPI Initialization, Prev: FFTW MPI Reference, Up: FFTW MPI Reference
|
|||
|
|
|||
|
6.12.1 MPI Files and Data Types
|
|||
|
-------------------------------
|
|||
|
|
|||
|
All programs using FFTW's MPI support should include its header file:
|
|||
|
|
|||
|
#include <fftw3-mpi.h>
|
|||
|
|
|||
|
Note that this header file includes the serial-FFTW 'fftw3.h' header
|
|||
|
file, and also the 'mpi.h' header file for MPI, so you need not include
|
|||
|
those files separately.
|
|||
|
|
|||
|
You must also link to _both_ the FFTW MPI library and to the serial
|
|||
|
FFTW library. On Unix, this means adding '-lfftw3_mpi -lfftw3 -lm' at
|
|||
|
the end of the link command.
|
|||
|
|
|||
|
Different precisions are handled as in the serial interface: *Note
|
|||
|
Precision::. That is, 'fftw_' functions become 'fftwf_' (in single
|
|||
|
precision) etcetera, and the libraries become '-lfftw3f_mpi -lfftw3f
|
|||
|
-lm' etcetera on Unix. Long-double precision is supported in MPI, but
|
|||
|
quad precision ('fftwq_') is not due to the lack of MPI support for this
|
|||
|
type.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: MPI Initialization, Next: Using MPI Plans, Prev: MPI Files and Data Types, Up: FFTW MPI Reference
|
|||
|
|
|||
|
6.12.2 MPI Initialization
|
|||
|
-------------------------
|
|||
|
|
|||
|
Before calling any other FFTW MPI ('fftw_mpi_') function, and before
|
|||
|
importing any wisdom for MPI problems, you must call:
|
|||
|
|
|||
|
void fftw_mpi_init(void);
|
|||
|
|
|||
|
If FFTW threads support is used, however, 'fftw_mpi_init' should be
|
|||
|
called _after_ 'fftw_init_threads' (*note Combining MPI and Threads::).
|
|||
|
Calling 'fftw_mpi_init' additional times (before 'fftw_mpi_cleanup') has
|
|||
|
no effect.
|
|||
|
|
|||
|
If you want to deallocate all persistent data and reset FFTW to the
|
|||
|
pristine state it was in when you started your program, you can call:
|
|||
|
|
|||
|
void fftw_mpi_cleanup(void);
|
|||
|
|
|||
|
(This calls 'fftw_cleanup', so you need not call the serial cleanup
|
|||
|
routine too, although it is safe to do so.) After calling
|
|||
|
'fftw_mpi_cleanup', all existing plans become undefined, and you should
|
|||
|
not attempt to execute or destroy them. You must call 'fftw_mpi_init'
|
|||
|
again after 'fftw_mpi_cleanup' if you want to resume using the MPI FFTW
|
|||
|
routines.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Using MPI Plans, Next: MPI Data Distribution Functions, Prev: MPI Initialization, Up: FFTW MPI Reference
|
|||
|
|
|||
|
6.12.3 Using MPI Plans
|
|||
|
----------------------
|
|||
|
|
|||
|
Once an MPI plan is created, you can execute and destroy it using
|
|||
|
'fftw_execute', 'fftw_destroy_plan', and the other functions in the
|
|||
|
serial interface that operate on generic plans (*note Using Plans::).
|
|||
|
|
|||
|
The 'fftw_execute' and 'fftw_destroy_plan' functions, applied to MPI
|
|||
|
plans, are _collective_ calls: they must be called for all processes in
|
|||
|
the communicator that was used to create the plan.
|
|||
|
|
|||
|
You must _not_ use the serial new-array plan-execution functions
|
|||
|
'fftw_execute_dft' and so on (*note New-array Execute Functions::) with
|
|||
|
MPI plans. Such functions are specialized to the problem type, and
|
|||
|
there are specific new-array execute functions for MPI plans:
|
|||
|
|
|||
|
void fftw_mpi_execute_dft(fftw_plan p, fftw_complex *in, fftw_complex *out);
|
|||
|
void fftw_mpi_execute_dft_r2c(fftw_plan p, double *in, fftw_complex *out);
|
|||
|
void fftw_mpi_execute_dft_c2r(fftw_plan p, fftw_complex *in, double *out);
|
|||
|
void fftw_mpi_execute_r2r(fftw_plan p, double *in, double *out);
|
|||
|
|
|||
|
These functions have the same restrictions as those of the serial
|
|||
|
new-array execute functions. They are _always_ safe to apply to the
|
|||
|
_same_ 'in' and 'out' arrays that were used to create the plan. They
|
|||
|
can only be applied to new arrarys if those arrays have the same types,
|
|||
|
dimensions, in-placeness, and alignment as the original arrays, where
|
|||
|
the best way to ensure the same alignment is to use FFTW's 'fftw_malloc'
|
|||
|
and related allocation functions for all arrays (*note Memory
|
|||
|
Allocation::). Note that distributed transposes (*note FFTW MPI
|
|||
|
Transposes::) use 'fftw_mpi_execute_r2r', since they count as rank-zero
|
|||
|
r2r plans from FFTW's perspective.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: MPI Data Distribution Functions, Next: MPI Plan Creation, Prev: Using MPI Plans, Up: FFTW MPI Reference
|
|||
|
|
|||
|
6.12.4 MPI Data Distribution Functions
|
|||
|
--------------------------------------
|
|||
|
|
|||
|
As described above (*note MPI Data Distribution::), in order to allocate
|
|||
|
your arrays, _before_ creating a plan, you must first call one of the
|
|||
|
following routines to determine the required allocation size and the
|
|||
|
portion of the array locally stored on a given process. The 'MPI_Comm'
|
|||
|
communicator passed here must be equivalent to the communicator used
|
|||
|
below for plan creation.
|
|||
|
|
|||
|
The basic interface for multidimensional transforms consists of the
|
|||
|
functions:
|
|||
|
|
|||
|
ptrdiff_t fftw_mpi_local_size_2d(ptrdiff_t n0, ptrdiff_t n1, MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start);
|
|||
|
ptrdiff_t fftw_mpi_local_size_3d(ptrdiff_t n0, ptrdiff_t n1, ptrdiff_t n2,
|
|||
|
MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start);
|
|||
|
ptrdiff_t fftw_mpi_local_size(int rnk, const ptrdiff_t *n, MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start);
|
|||
|
|
|||
|
ptrdiff_t fftw_mpi_local_size_2d_transposed(ptrdiff_t n0, ptrdiff_t n1, MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start,
|
|||
|
ptrdiff_t *local_n1, ptrdiff_t *local_1_start);
|
|||
|
ptrdiff_t fftw_mpi_local_size_3d_transposed(ptrdiff_t n0, ptrdiff_t n1, ptrdiff_t n2,
|
|||
|
MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start,
|
|||
|
ptrdiff_t *local_n1, ptrdiff_t *local_1_start);
|
|||
|
ptrdiff_t fftw_mpi_local_size_transposed(int rnk, const ptrdiff_t *n, MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start,
|
|||
|
ptrdiff_t *local_n1, ptrdiff_t *local_1_start);
|
|||
|
|
|||
|
These functions return the number of elements to allocate (complex
|
|||
|
numbers for DFT/r2c/c2r plans, real numbers for r2r plans), whereas the
|
|||
|
'local_n0' and 'local_0_start' return the portion ('local_0_start' to
|
|||
|
'local_0_start + local_n0 - 1') of the first dimension of an n[0] x n[1]
|
|||
|
x n[2] x ... x n[d-1] array that is stored on the local process. *Note
|
|||
|
Basic and advanced distribution interfaces::. For
|
|||
|
'FFTW_MPI_TRANSPOSED_OUT' plans, the '_transposed' variants are useful
|
|||
|
in order to also return the local portion of the first dimension in the
|
|||
|
n[1] x n[0] x n[2] x ... x n[d-1] transposed output. *Note Transposed
|
|||
|
distributions::. The advanced interface for multidimensional transforms
|
|||
|
is:
|
|||
|
|
|||
|
ptrdiff_t fftw_mpi_local_size_many(int rnk, const ptrdiff_t *n, ptrdiff_t howmany,
|
|||
|
ptrdiff_t block0, MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start);
|
|||
|
ptrdiff_t fftw_mpi_local_size_many_transposed(int rnk, const ptrdiff_t *n, ptrdiff_t howmany,
|
|||
|
ptrdiff_t block0, ptrdiff_t block1, MPI_Comm comm,
|
|||
|
ptrdiff_t *local_n0, ptrdiff_t *local_0_start,
|
|||
|
ptrdiff_t *local_n1, ptrdiff_t *local_1_start);
|
|||
|
|
|||
|
These differ from the basic interface in only two ways. First, they
|
|||
|
allow you to specify block sizes 'block0' and 'block1' (the latter for
|
|||
|
the transposed output); you can pass 'FFTW_MPI_DEFAULT_BLOCK' to use
|
|||
|
FFTW's default block size as in the basic interface. Second, you can
|
|||
|
pass a 'howmany' parameter, corresponding to the advanced planning
|
|||
|
interface below: this is for transforms of contiguous 'howmany'-tuples
|
|||
|
of numbers ('howmany = 1' in the basic interface).
|
|||
|
|
|||
|
The corresponding basic and advanced routines for one-dimensional
|
|||
|
transforms (currently only complex DFTs) are:
|
|||
|
|
|||
|
ptrdiff_t fftw_mpi_local_size_1d(
|
|||
|
ptrdiff_t n0, MPI_Comm comm, int sign, unsigned flags,
|
|||
|
ptrdiff_t *local_ni, ptrdiff_t *local_i_start,
|
|||
|
ptrdiff_t *local_no, ptrdiff_t *local_o_start);
|
|||
|
ptrdiff_t fftw_mpi_local_size_many_1d(
|
|||
|
ptrdiff_t n0, ptrdiff_t howmany,
|
|||
|
MPI_Comm comm, int sign, unsigned flags,
|
|||
|
ptrdiff_t *local_ni, ptrdiff_t *local_i_start,
|
|||
|
ptrdiff_t *local_no, ptrdiff_t *local_o_start);
|
|||
|
|
|||
|
As above, the return value is the number of elements to allocate
|
|||
|
(complex numbers, for complex DFTs). The 'local_ni' and 'local_i_start'
|
|||
|
arguments return the portion ('local_i_start' to 'local_i_start +
|
|||
|
local_ni - 1') of the 1d array that is stored on this process for the
|
|||
|
transform _input_, and 'local_no' and 'local_o_start' are the
|
|||
|
corresponding quantities for the input. The 'sign' ('FFTW_FORWARD' or
|
|||
|
'FFTW_BACKWARD') and 'flags' must match the arguments passed when
|
|||
|
creating a plan. Although the inputs and outputs have different data
|
|||
|
distributions in general, it is guaranteed that the _output_ data
|
|||
|
distribution of an 'FFTW_FORWARD' plan will match the _input_ data
|
|||
|
distribution of an 'FFTW_BACKWARD' plan and vice versa; similarly for
|
|||
|
the 'FFTW_MPI_SCRAMBLED_OUT' and 'FFTW_MPI_SCRAMBLED_IN' flags. *Note
|
|||
|
One-dimensional distributions::.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: MPI Plan Creation, Next: MPI Wisdom Communication, Prev: MPI Data Distribution Functions, Up: FFTW MPI Reference
|
|||
|
|
|||
|
6.12.5 MPI Plan Creation
|
|||
|
------------------------
|
|||
|
|
|||
|
Complex-data MPI DFTs
|
|||
|
.....................
|
|||
|
|
|||
|
Plans for complex-data DFTs (*note 2d MPI example::) are created by:
|
|||
|
|
|||
|
fftw_plan fftw_mpi_plan_dft_1d(ptrdiff_t n0, fftw_complex *in, fftw_complex *out,
|
|||
|
MPI_Comm comm, int sign, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_dft_2d(ptrdiff_t n0, ptrdiff_t n1,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
MPI_Comm comm, int sign, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_dft_3d(ptrdiff_t n0, ptrdiff_t n1, ptrdiff_t n2,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
MPI_Comm comm, int sign, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_dft(int rnk, const ptrdiff_t *n,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
MPI_Comm comm, int sign, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_many_dft(int rnk, const ptrdiff_t *n,
|
|||
|
ptrdiff_t howmany, ptrdiff_t block, ptrdiff_t tblock,
|
|||
|
fftw_complex *in, fftw_complex *out,
|
|||
|
MPI_Comm comm, int sign, unsigned flags);
|
|||
|
|
|||
|
These are similar to their serial counterparts (*note Complex DFTs::)
|
|||
|
in specifying the dimensions, sign, and flags of the transform. The
|
|||
|
'comm' argument gives an MPI communicator that specifies the set of
|
|||
|
processes to participate in the transform; plan creation is a collective
|
|||
|
function that must be called for all processes in the communicator. The
|
|||
|
'in' and 'out' pointers refer only to a portion of the overall transform
|
|||
|
data (*note MPI Data Distribution::) as specified by the 'local_size'
|
|||
|
functions in the previous section. Unless 'flags' contains
|
|||
|
'FFTW_ESTIMATE', these arrays are overwritten during plan creation as
|
|||
|
for the serial interface. For multi-dimensional transforms, any
|
|||
|
dimensions '> 1' are supported; for one-dimensional transforms, only
|
|||
|
composite (non-prime) 'n0' are currently supported (unlike the serial
|
|||
|
FFTW). Requesting an unsupported transform size will yield a 'NULL'
|
|||
|
plan. (As in the serial interface, highly composite sizes generally
|
|||
|
yield the best performance.)
|
|||
|
|
|||
|
The advanced-interface 'fftw_mpi_plan_many_dft' additionally allows
|
|||
|
you to specify the block sizes for the first dimension ('block') of the
|
|||
|
n[0] x n[1] x n[2] x ... x n[d-1] input data and the first dimension
|
|||
|
('tblock') of the n[1] x n[0] x n[2] x ... x n[d-1] transposed data (at
|
|||
|
intermediate steps of the transform, and for the output if
|
|||
|
'FFTW_TRANSPOSED_OUT' is specified in 'flags'). These must be the same
|
|||
|
block sizes as were passed to the corresponding 'local_size' function;
|
|||
|
you can pass 'FFTW_MPI_DEFAULT_BLOCK' to use FFTW's default block size
|
|||
|
as in the basic interface. Also, the 'howmany' parameter specifies that
|
|||
|
the transform is of contiguous 'howmany'-tuples rather than individual
|
|||
|
complex numbers; this corresponds to the same parameter in the serial
|
|||
|
advanced interface (*note Advanced Complex DFTs::) with 'stride =
|
|||
|
howmany' and 'dist = 1'.
|
|||
|
|
|||
|
MPI flags
|
|||
|
.........
|
|||
|
|
|||
|
The 'flags' can be any of those for the serial FFTW (*note Planner
|
|||
|
Flags::), and in addition may include one or more of the following
|
|||
|
MPI-specific flags, which improve performance at the cost of changing
|
|||
|
the output or input data formats.
|
|||
|
|
|||
|
* 'FFTW_MPI_SCRAMBLED_OUT', 'FFTW_MPI_SCRAMBLED_IN': valid for 1d
|
|||
|
transforms only, these flags indicate that the output/input of the
|
|||
|
transform are in an undocumented "scrambled" order. A forward
|
|||
|
'FFTW_MPI_SCRAMBLED_OUT' transform can be inverted by a backward
|
|||
|
'FFTW_MPI_SCRAMBLED_IN' (times the usual 1/N normalization). *Note
|
|||
|
One-dimensional distributions::.
|
|||
|
|
|||
|
* 'FFTW_MPI_TRANSPOSED_OUT', 'FFTW_MPI_TRANSPOSED_IN': valid for
|
|||
|
multidimensional ('rnk > 1') transforms only, these flags specify
|
|||
|
that the output or input of an n[0] x n[1] x n[2] x ... x n[d-1]
|
|||
|
transform is transposed to n[1] x n[0] x n[2] x ... x n[d-1] .
|
|||
|
*Note Transposed distributions::.
|
|||
|
|
|||
|
Real-data MPI DFTs
|
|||
|
..................
|
|||
|
|
|||
|
Plans for real-input/output (r2c/c2r) DFTs (*note Multi-dimensional MPI
|
|||
|
DFTs of Real Data::) are created by:
|
|||
|
|
|||
|
fftw_plan fftw_mpi_plan_dft_r2c_2d(ptrdiff_t n0, ptrdiff_t n1,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_dft_r2c_2d(ptrdiff_t n0, ptrdiff_t n1,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_dft_r2c_3d(ptrdiff_t n0, ptrdiff_t n1, ptrdiff_t n2,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_dft_r2c(int rnk, const ptrdiff_t *n,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_dft_c2r_2d(ptrdiff_t n0, ptrdiff_t n1,
|
|||
|
fftw_complex *in, double *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_dft_c2r_2d(ptrdiff_t n0, ptrdiff_t n1,
|
|||
|
fftw_complex *in, double *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_dft_c2r_3d(ptrdiff_t n0, ptrdiff_t n1, ptrdiff_t n2,
|
|||
|
fftw_complex *in, double *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_dft_c2r(int rnk, const ptrdiff_t *n,
|
|||
|
fftw_complex *in, double *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
|
|||
|
Similar to the serial interface (*note Real-data DFTs::), these
|
|||
|
transform logically n[0] x n[1] x n[2] x ... x n[d-1] real data to/from
|
|||
|
n[0] x n[1] x n[2] x ... x (n[d-1]/2 + 1) complex data, representing
|
|||
|
the non-redundant half of the conjugate-symmetry output of a real-input
|
|||
|
DFT (*note Multi-dimensional Transforms::). However, the real array
|
|||
|
must be stored within a padded n[0] x n[1] x n[2] x ... x [2 (n[d-1]/2
|
|||
|
+ 1)] array (much like the in-place serial r2c transforms, but here for
|
|||
|
out-of-place transforms as well). Currently, only multi-dimensional
|
|||
|
('rnk > 1') r2c/c2r transforms are supported (requesting a plan for 'rnk
|
|||
|
= 1' will yield 'NULL'). As explained above (*note Multi-dimensional
|
|||
|
MPI DFTs of Real Data::), the data distribution of both the real and
|
|||
|
complex arrays is given by the 'local_size' function called for the
|
|||
|
dimensions of the _complex_ array. Similar to the other planning
|
|||
|
functions, the input and output arrays are overwritten when the plan is
|
|||
|
created except in 'FFTW_ESTIMATE' mode.
|
|||
|
|
|||
|
As for the complex DFTs above, there is an advance interface that
|
|||
|
allows you to manually specify block sizes and to transform contiguous
|
|||
|
'howmany'-tuples of real/complex numbers:
|
|||
|
|
|||
|
fftw_plan fftw_mpi_plan_many_dft_r2c
|
|||
|
(int rnk, const ptrdiff_t *n, ptrdiff_t howmany,
|
|||
|
ptrdiff_t iblock, ptrdiff_t oblock,
|
|||
|
double *in, fftw_complex *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_many_dft_c2r
|
|||
|
(int rnk, const ptrdiff_t *n, ptrdiff_t howmany,
|
|||
|
ptrdiff_t iblock, ptrdiff_t oblock,
|
|||
|
fftw_complex *in, double *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
|
|||
|
MPI r2r transforms
|
|||
|
..................
|
|||
|
|
|||
|
There are corresponding plan-creation routines for r2r transforms (*note
|
|||
|
More DFTs of Real Data::), currently supporting multidimensional ('rnk >
|
|||
|
1') transforms only ('rnk = 1' will yield a 'NULL' plan):
|
|||
|
|
|||
|
fftw_plan fftw_mpi_plan_r2r_2d(ptrdiff_t n0, ptrdiff_t n1,
|
|||
|
double *in, double *out,
|
|||
|
MPI_Comm comm,
|
|||
|
fftw_r2r_kind kind0, fftw_r2r_kind kind1,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_r2r_3d(ptrdiff_t n0, ptrdiff_t n1, ptrdiff_t n2,
|
|||
|
double *in, double *out,
|
|||
|
MPI_Comm comm,
|
|||
|
fftw_r2r_kind kind0, fftw_r2r_kind kind1, fftw_r2r_kind kind2,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_r2r(int rnk, const ptrdiff_t *n,
|
|||
|
double *in, double *out,
|
|||
|
MPI_Comm comm, const fftw_r2r_kind *kind,
|
|||
|
unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_many_r2r(int rnk, const ptrdiff_t *n,
|
|||
|
ptrdiff_t iblock, ptrdiff_t oblock,
|
|||
|
double *in, double *out,
|
|||
|
MPI_Comm comm, const fftw_r2r_kind *kind,
|
|||
|
unsigned flags);
|
|||
|
|
|||
|
The parameters are much the same as for the complex DFTs above,
|
|||
|
except that the arrays are of real numbers (and hence the outputs of the
|
|||
|
'local_size' data-distribution functions should be interpreted as counts
|
|||
|
of real rather than complex numbers). Also, the 'kind' parameters
|
|||
|
specify the r2r kinds along each dimension as for the serial interface
|
|||
|
(*note Real-to-Real Transform Kinds::). *Note Other Multi-dimensional
|
|||
|
Real-data MPI Transforms::.
|
|||
|
|
|||
|
MPI transposition
|
|||
|
.................
|
|||
|
|
|||
|
FFTW also provides routines to plan a transpose of a distributed 'n0' by
|
|||
|
'n1' array of real numbers, or an array of 'howmany'-tuples of real
|
|||
|
numbers with specified block sizes (*note FFTW MPI Transposes::):
|
|||
|
|
|||
|
fftw_plan fftw_mpi_plan_transpose(ptrdiff_t n0, ptrdiff_t n1,
|
|||
|
double *in, double *out,
|
|||
|
MPI_Comm comm, unsigned flags);
|
|||
|
fftw_plan fftw_mpi_plan_many_transpose
|
|||
|
(ptrdiff_t n0, ptrdiff_t n1, ptrdiff_t howmany,
|
|||
|
ptrdiff_t block0, ptrdiff_t block1,
|
|||
|
double *in, double *out, MPI_Comm comm, unsigned flags);
|
|||
|
|
|||
|
These plans are used with the 'fftw_mpi_execute_r2r' new-array
|
|||
|
execute function (*note Using MPI Plans::), since they count as (rank
|
|||
|
zero) r2r plans from FFTW's perspective.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: MPI Wisdom Communication, Prev: MPI Plan Creation, Up: FFTW MPI Reference
|
|||
|
|
|||
|
6.12.6 MPI Wisdom Communication
|
|||
|
-------------------------------
|
|||
|
|
|||
|
To facilitate synchronizing wisdom among the different MPI processes, we
|
|||
|
provide two functions:
|
|||
|
|
|||
|
void fftw_mpi_gather_wisdom(MPI_Comm comm);
|
|||
|
void fftw_mpi_broadcast_wisdom(MPI_Comm comm);
|
|||
|
|
|||
|
The 'fftw_mpi_gather_wisdom' function gathers all wisdom in the given
|
|||
|
communicator 'comm' to the process of rank 0 in the communicator: that
|
|||
|
process obtains the union of all wisdom on all the processes. As a side
|
|||
|
effect, some other processes will gain additional wisdom from other
|
|||
|
processes, but only process 0 will gain the complete union.
|
|||
|
|
|||
|
The 'fftw_mpi_broadcast_wisdom' does the reverse: it exports wisdom
|
|||
|
from process 0 in 'comm' to all other processes in the communicator,
|
|||
|
replacing any wisdom they currently have.
|
|||
|
|
|||
|
*Note FFTW MPI Wisdom::.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: FFTW MPI Fortran Interface, Prev: FFTW MPI Reference, Up: Distributed-memory FFTW with MPI
|
|||
|
|
|||
|
6.13 FFTW MPI Fortran Interface
|
|||
|
===============================
|
|||
|
|
|||
|
The FFTW MPI interface is callable from modern Fortran compilers
|
|||
|
supporting the Fortran 2003 'iso_c_binding' standard for calling C
|
|||
|
functions. As described in *note Calling FFTW from Modern Fortran::,
|
|||
|
this means that you can directly call FFTW's C interface from Fortran
|
|||
|
with only minor changes in syntax. There are, however, a few things
|
|||
|
specific to the MPI interface to keep in mind:
|
|||
|
|
|||
|
* Instead of including 'fftw3.f03' as in *note Overview of Fortran
|
|||
|
interface::, you should 'include 'fftw3-mpi.f03'' (after 'use,
|
|||
|
intrinsic :: iso_c_binding' as before). The 'fftw3-mpi.f03' file
|
|||
|
includes 'fftw3.f03', so you should _not_ 'include' them both
|
|||
|
yourself. (You will also want to include the MPI header file,
|
|||
|
usually via 'include 'mpif.h'' or similar, although though this is
|
|||
|
not needed by 'fftw3-mpi.f03' per se.) (To use the 'fftwl_' 'long
|
|||
|
double' extended-precision routines in supporting compilers, you
|
|||
|
should include 'fftw3f-mpi.f03' in _addition_ to 'fftw3-mpi.f03'.
|
|||
|
*Note Extended and quadruple precision in Fortran::.)
|
|||
|
|
|||
|
* Because of the different storage conventions between C and Fortran,
|
|||
|
you reverse the order of your array dimensions when passing them to
|
|||
|
FFTW (*note Reversing array dimensions::). This is merely a
|
|||
|
difference in notation and incurs no performance overhead.
|
|||
|
However, it means that, whereas in C the _first_ dimension is
|
|||
|
distributed, in Fortran the _last_ dimension of your array is
|
|||
|
distributed.
|
|||
|
|
|||
|
* In Fortran, communicators are stored as 'integer' types; there is
|
|||
|
no 'MPI_Comm' type, nor is there any way to access a C 'MPI_Comm'.
|
|||
|
Fortunately, this is taken care of for you by the FFTW Fortran
|
|||
|
interface: whenever the C interface expects an 'MPI_Comm' type, you
|
|||
|
should pass the Fortran communicator as an 'integer'.(1)
|
|||
|
|
|||
|
* Because you need to call the 'local_size' function to find out how
|
|||
|
much space to allocate, and this may be _larger_ than the local
|
|||
|
portion of the array (*note MPI Data Distribution::), you should
|
|||
|
_always_ allocate your arrays dynamically using FFTW's allocation
|
|||
|
routines as described in *note Allocating aligned memory in
|
|||
|
Fortran::. (Coincidentally, this also provides the best
|
|||
|
performance by guaranteeding proper data alignment.)
|
|||
|
|
|||
|
* Because all sizes in the MPI FFTW interface are declared as
|
|||
|
'ptrdiff_t' in C, you should use 'integer(C_INTPTR_T)' in Fortran
|
|||
|
(*note FFTW Fortran type reference::).
|
|||
|
|
|||
|
* In Fortran, because of the language semantics, we generally
|
|||
|
recommend using the new-array execute functions for all plans, even
|
|||
|
in the common case where you are executing the plan on the same
|
|||
|
arrays for which the plan was created (*note Plan execution in
|
|||
|
Fortran::). However, note that in the MPI interface these
|
|||
|
functions are changed: 'fftw_execute_dft' becomes
|
|||
|
'fftw_mpi_execute_dft', etcetera. *Note Using MPI Plans::.
|
|||
|
|
|||
|
For example, here is a Fortran code snippet to perform a distributed
|
|||
|
L x M complex DFT in-place. (This assumes you have already initialized
|
|||
|
MPI with 'MPI_init' and have also performed 'call fftw_mpi_init'.)
|
|||
|
|
|||
|
use, intrinsic :: iso_c_binding
|
|||
|
include 'fftw3-mpi.f03'
|
|||
|
integer(C_INTPTR_T), parameter :: L = ...
|
|||
|
integer(C_INTPTR_T), parameter :: M = ...
|
|||
|
type(C_PTR) :: plan, cdata
|
|||
|
complex(C_DOUBLE_COMPLEX), pointer :: data(:,:)
|
|||
|
integer(C_INTPTR_T) :: i, j, alloc_local, local_M, local_j_offset
|
|||
|
|
|||
|
! get local data size and allocate (note dimension reversal)
|
|||
|
alloc_local = fftw_mpi_local_size_2d(M, L, MPI_COMM_WORLD, &
|
|||
|
local_M, local_j_offset)
|
|||
|
cdata = fftw_alloc_complex(alloc_local)
|
|||
|
call c_f_pointer(cdata, data, [L,local_M])
|
|||
|
|
|||
|
! create MPI plan for in-place forward DFT (note dimension reversal)
|
|||
|
plan = fftw_mpi_plan_dft_2d(M, L, data, data, MPI_COMM_WORLD, &
|
|||
|
FFTW_FORWARD, FFTW_MEASURE)
|
|||
|
|
|||
|
! initialize data to some function my_function(i,j)
|
|||
|
do j = 1, local_M
|
|||
|
do i = 1, L
|
|||
|
data(i, j) = my_function(i, j + local_j_offset)
|
|||
|
end do
|
|||
|
end do
|
|||
|
|
|||
|
! compute transform (as many times as desired)
|
|||
|
call fftw_mpi_execute_dft(plan, data, data)
|
|||
|
|
|||
|
call fftw_destroy_plan(plan)
|
|||
|
call fftw_free(cdata)
|
|||
|
|
|||
|
Note that when we called 'fftw_mpi_local_size_2d' and
|
|||
|
'fftw_mpi_plan_dft_2d' with the dimensions in reversed order, since a L
|
|||
|
x M Fortran array is viewed by FFTW in C as a M x L array. This means
|
|||
|
that the array was distributed over the 'M' dimension, the local portion
|
|||
|
of which is a L x local_M array in Fortran. (You must _not_ use an
|
|||
|
'allocate' statement to allocate an L x local_M array, however; you must
|
|||
|
allocate 'alloc_local' complex numbers, which may be greater than 'L *
|
|||
|
local_M', in order to reserve space for intermediate steps of the
|
|||
|
transform.) Finally, we mention that because C's array indices are
|
|||
|
zero-based, the 'local_j_offset' argument can conveniently be
|
|||
|
interpreted as an offset in the 1-based 'j' index (rather than as a
|
|||
|
starting index as in C).
|
|||
|
|
|||
|
If instead you had used the 'ior(FFTW_MEASURE,
|
|||
|
FFTW_MPI_TRANSPOSED_OUT)' flag, the output of the transform would be a
|
|||
|
transposed M x local_L array, associated with the _same_ 'cdata'
|
|||
|
allocation (since the transform is in-place), and which you could
|
|||
|
declare with:
|
|||
|
|
|||
|
complex(C_DOUBLE_COMPLEX), pointer :: tdata(:,:)
|
|||
|
...
|
|||
|
call c_f_pointer(cdata, tdata, [M,local_L])
|
|||
|
|
|||
|
where 'local_L' would have been obtained by changing the
|
|||
|
'fftw_mpi_local_size_2d' call to:
|
|||
|
|
|||
|
alloc_local = fftw_mpi_local_size_2d_transposed(M, L, MPI_COMM_WORLD, &
|
|||
|
local_M, local_j_offset, local_L, local_i_offset)
|
|||
|
|
|||
|
---------- Footnotes ----------
|
|||
|
|
|||
|
(1) Technically, this is because you aren't actually calling the C
|
|||
|
functions directly. You are calling wrapper functions that translate
|
|||
|
the communicator with 'MPI_Comm_f2c' before calling the ordinary C
|
|||
|
interface. This is all done transparently, however, since the
|
|||
|
'fftw3-mpi.f03' interface file renames the wrappers so that they are
|
|||
|
called in Fortran with the same names as the C interface functions.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Calling FFTW from Modern Fortran, Next: Calling FFTW from Legacy Fortran, Prev: Distributed-memory FFTW with MPI, Up: Top
|
|||
|
|
|||
|
7 Calling FFTW from Modern Fortran
|
|||
|
**********************************
|
|||
|
|
|||
|
Fortran 2003 standardized ways for Fortran code to call C libraries, and
|
|||
|
this allows us to support a direct translation of the FFTW C API into
|
|||
|
Fortran. Compared to the legacy Fortran 77 interface (*note Calling
|
|||
|
FFTW from Legacy Fortran::), this direct interface offers many
|
|||
|
advantages, especially compile-time type-checking and aligned memory
|
|||
|
allocation. As of this writing, support for these C interoperability
|
|||
|
features seems widespread, having been implemented in nearly all major
|
|||
|
Fortran compilers (e.g. GNU, Intel, IBM, Oracle/Solaris, Portland
|
|||
|
Group, NAG).
|
|||
|
|
|||
|
This chapter documents that interface. For the most part, since this
|
|||
|
interface allows Fortran to call the C interface directly, the usage is
|
|||
|
identical to C translated to Fortran syntax. However, there are a few
|
|||
|
subtle points such as memory allocation, wisdom, and data types that
|
|||
|
deserve closer attention.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Overview of Fortran interface::
|
|||
|
* Reversing array dimensions::
|
|||
|
* FFTW Fortran type reference::
|
|||
|
* Plan execution in Fortran::
|
|||
|
* Allocating aligned memory in Fortran::
|
|||
|
* Accessing the wisdom API from Fortran::
|
|||
|
* Defining an FFTW module::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Overview of Fortran interface, Next: Reversing array dimensions, Prev: Calling FFTW from Modern Fortran, Up: Calling FFTW from Modern Fortran
|
|||
|
|
|||
|
7.1 Overview of Fortran interface
|
|||
|
=================================
|
|||
|
|
|||
|
FFTW provides a file 'fftw3.f03' that defines Fortran 2003 interfaces
|
|||
|
for all of its C routines, except for the MPI routines described
|
|||
|
elsewhere, which can be found in the same directory as 'fftw3.h' (the C
|
|||
|
header file). In any Fortran subroutine where you want to use FFTW
|
|||
|
functions, you should begin with:
|
|||
|
|
|||
|
use, intrinsic :: iso_c_binding
|
|||
|
include 'fftw3.f03'
|
|||
|
|
|||
|
This includes the interface definitions and the standard
|
|||
|
'iso_c_binding' module (which defines the equivalents of C types). You
|
|||
|
can also put the FFTW functions into a module if you prefer (*note
|
|||
|
Defining an FFTW module::).
|
|||
|
|
|||
|
At this point, you can now call anything in the FFTW C interface
|
|||
|
directly, almost exactly as in C other than minor changes in syntax.
|
|||
|
For example:
|
|||
|
|
|||
|
type(C_PTR) :: plan
|
|||
|
complex(C_DOUBLE_COMPLEX), dimension(1024,1000) :: in, out
|
|||
|
plan = fftw_plan_dft_2d(1000,1024, in,out, FFTW_FORWARD,FFTW_ESTIMATE)
|
|||
|
...
|
|||
|
call fftw_execute_dft(plan, in, out)
|
|||
|
...
|
|||
|
call fftw_destroy_plan(plan)
|
|||
|
|
|||
|
A few important things to keep in mind are:
|
|||
|
|
|||
|
* FFTW plans are 'type(C_PTR)'. Other C types are mapped in the
|
|||
|
obvious way via the 'iso_c_binding' standard: 'int' turns into
|
|||
|
'integer(C_INT)', 'fftw_complex' turns into
|
|||
|
'complex(C_DOUBLE_COMPLEX)', 'double' turns into 'real(C_DOUBLE)',
|
|||
|
and so on. *Note FFTW Fortran type reference::.
|
|||
|
|
|||
|
* Functions in C become functions in Fortran if they have a return
|
|||
|
value, and subroutines in Fortran otherwise.
|
|||
|
|
|||
|
* The ordering of the Fortran array dimensions must be _reversed_
|
|||
|
when they are passed to the FFTW plan creation, thanks to
|
|||
|
differences in array indexing conventions (*note Multi-dimensional
|
|||
|
Array Format::). This is _unlike_ the legacy Fortran interface
|
|||
|
(*note Fortran-interface routines::), which reversed the dimensions
|
|||
|
for you. *Note Reversing array dimensions::.
|
|||
|
|
|||
|
* Using ordinary Fortran array declarations like this works, but may
|
|||
|
yield suboptimal performance because the data may not be not
|
|||
|
aligned to exploit SIMD instructions on modern proessors (*note
|
|||
|
SIMD alignment and fftw_malloc::). Better performance will often
|
|||
|
be obtained by allocating with 'fftw_alloc'. *Note Allocating
|
|||
|
aligned memory in Fortran::.
|
|||
|
|
|||
|
* Similar to the legacy Fortran interface (*note FFTW Execution in
|
|||
|
Fortran::), we currently recommend _not_ using 'fftw_execute' but
|
|||
|
rather using the more specialized functions like 'fftw_execute_dft'
|
|||
|
(*note New-array Execute Functions::). However, you should execute
|
|||
|
the plan on the 'same arrays' as the ones for which you created the
|
|||
|
plan, unless you are especially careful. *Note Plan execution in
|
|||
|
Fortran::. To prevent you from using 'fftw_execute' by mistake,
|
|||
|
the 'fftw3.f03' file does not provide an 'fftw_execute' interface
|
|||
|
declaration.
|
|||
|
|
|||
|
* Multiple planner flags are combined with 'ior' (equivalent to '|'
|
|||
|
in C). e.g. 'FFTW_MEASURE | FFTW_DESTROY_INPUT' becomes
|
|||
|
'ior(FFTW_MEASURE, FFTW_DESTROY_INPUT)'. (You can also use '+' as
|
|||
|
long as you don't try to include a given flag more than once.)
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Extended and quadruple precision in Fortran::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Extended and quadruple precision in Fortran, Prev: Overview of Fortran interface, Up: Overview of Fortran interface
|
|||
|
|
|||
|
7.1.1 Extended and quadruple precision in Fortran
|
|||
|
-------------------------------------------------
|
|||
|
|
|||
|
If FFTW is compiled in 'long double' (extended) precision (*note
|
|||
|
Installation and Customization::), you may be able to call the resulting
|
|||
|
'fftwl_' routines (*note Precision::) from Fortran if your compiler
|
|||
|
supports the 'C_LONG_DOUBLE_COMPLEX' type code.
|
|||
|
|
|||
|
Because some Fortran compilers do not support
|
|||
|
'C_LONG_DOUBLE_COMPLEX', the 'fftwl_' declarations are segregated into a
|
|||
|
separate interface file 'fftw3l.f03', which you should include _in
|
|||
|
addition_ to 'fftw3.f03' (which declares precision-independent 'FFTW_'
|
|||
|
constants):
|
|||
|
|
|||
|
use, intrinsic :: iso_c_binding
|
|||
|
include 'fftw3.f03'
|
|||
|
include 'fftw3l.f03'
|
|||
|
|
|||
|
We also support using the nonstandard '__float128'
|
|||
|
quadruple-precision type provided by recent versions of 'gcc' on 32- and
|
|||
|
64-bit x86 hardware (*note Installation and Customization::), using the
|
|||
|
corresponding 'real(16)' and 'complex(16)' types supported by
|
|||
|
'gfortran'. The quadruple-precision 'fftwq_' functions (*note
|
|||
|
Precision::) are declared in a 'fftw3q.f03' interface file, which should
|
|||
|
be included in addition to 'fftw3.f03', as above. You should also link
|
|||
|
with '-lfftw3q -lquadmath -lm' as in C.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Reversing array dimensions, Next: FFTW Fortran type reference, Prev: Overview of Fortran interface, Up: Calling FFTW from Modern Fortran
|
|||
|
|
|||
|
7.2 Reversing array dimensions
|
|||
|
==============================
|
|||
|
|
|||
|
A minor annoyance in calling FFTW from Fortran is that FFTW's array
|
|||
|
dimensions are defined in the C convention (row-major order), while
|
|||
|
Fortran's array dimensions are the opposite convention (column-major
|
|||
|
order). *Note Multi-dimensional Array Format::. This is just a
|
|||
|
bookkeeping difference, with no effect on performance. The only
|
|||
|
consequence of this is that, whenever you create an FFTW plan for a
|
|||
|
multi-dimensional transform, you must always _reverse the ordering of
|
|||
|
the dimensions_.
|
|||
|
|
|||
|
For example, consider the three-dimensional (L x M x N ) arrays:
|
|||
|
|
|||
|
complex(C_DOUBLE_COMPLEX), dimension(L,M,N) :: in, out
|
|||
|
|
|||
|
To plan a DFT for these arrays using 'fftw_plan_dft_3d', you could
|
|||
|
do:
|
|||
|
|
|||
|
plan = fftw_plan_dft_3d(N,M,L, in,out, FFTW_FORWARD,FFTW_ESTIMATE)
|
|||
|
|
|||
|
That is, from FFTW's perspective this is a N x M x L array. _No data
|
|||
|
transposition need occur_, as this is _only notation_. Similarly, to
|
|||
|
use the more generic routine 'fftw_plan_dft' with the same arrays, you
|
|||
|
could do:
|
|||
|
|
|||
|
integer(C_INT), dimension(3) :: n = [N,M,L]
|
|||
|
plan = fftw_plan_dft_3d(3, n, in,out, FFTW_FORWARD,FFTW_ESTIMATE)
|
|||
|
|
|||
|
Note, by the way, that this is different from the legacy Fortran
|
|||
|
interface (*note Fortran-interface routines::), which automatically
|
|||
|
reverses the order of the array dimension for you. Here, you are
|
|||
|
calling the C interface directly, so there is no "translation" layer.
|
|||
|
|
|||
|
An important thing to keep in mind is the implication of this for
|
|||
|
multidimensional real-to-complex transforms (*note Multi-Dimensional
|
|||
|
DFTs of Real Data::). In C, a multidimensional real-to-complex DFT
|
|||
|
chops the last dimension roughly in half (N x M x L real input goes to N
|
|||
|
x M x L/2+1 complex output). In Fortran, because the array dimension
|
|||
|
notation is reversed, the _first_ dimension of the complex data is
|
|||
|
chopped roughly in half. For example consider the 'r2c' transform of L
|
|||
|
x M x N real input in Fortran:
|
|||
|
|
|||
|
type(C_PTR) :: plan
|
|||
|
real(C_DOUBLE), dimension(L,M,N) :: in
|
|||
|
complex(C_DOUBLE_COMPLEX), dimension(L/2+1,M,N) :: out
|
|||
|
plan = fftw_plan_dft_r2c_3d(N,M,L, in,out, FFTW_ESTIMATE)
|
|||
|
...
|
|||
|
call fftw_execute_dft_r2c(plan, in, out)
|
|||
|
|
|||
|
Alternatively, for an in-place r2c transform, as described in the C
|
|||
|
documentation we must _pad_ the _first_ dimension of the real input with
|
|||
|
an extra two entries (which are ignored by FFTW) so as to leave enough
|
|||
|
space for the complex output. The input is _allocated_ as a 2[L/2+1] x
|
|||
|
M x N array, even though only L x M x N of it is actually used. In this
|
|||
|
example, we will allocate the array as a pointer type, using
|
|||
|
'fftw_alloc' to ensure aligned memory for maximum performance (*note
|
|||
|
Allocating aligned memory in Fortran::); this also makes it easy to
|
|||
|
reference the same memory as both a real array and a complex array.
|
|||
|
|
|||
|
real(C_DOUBLE), pointer :: in(:,:,:)
|
|||
|
complex(C_DOUBLE_COMPLEX), pointer :: out(:,:,:)
|
|||
|
type(C_PTR) :: plan, data
|
|||
|
data = fftw_alloc_complex(int((L/2+1) * M * N, C_SIZE_T))
|
|||
|
call c_f_pointer(data, in, [2*(L/2+1),M,N])
|
|||
|
call c_f_pointer(data, out, [L/2+1,M,N])
|
|||
|
plan = fftw_plan_dft_r2c_3d(N,M,L, in,out, FFTW_ESTIMATE)
|
|||
|
...
|
|||
|
call fftw_execute_dft_r2c(plan, in, out)
|
|||
|
...
|
|||
|
call fftw_destroy_plan(plan)
|
|||
|
call fftw_free(data)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: FFTW Fortran type reference, Next: Plan execution in Fortran, Prev: Reversing array dimensions, Up: Calling FFTW from Modern Fortran
|
|||
|
|
|||
|
7.3 FFTW Fortran type reference
|
|||
|
===============================
|
|||
|
|
|||
|
The following are the most important type correspondences between the C
|
|||
|
interface and Fortran:
|
|||
|
|
|||
|
* Plans ('fftw_plan' and variants) are 'type(C_PTR)' (i.e. an opaque
|
|||
|
pointer).
|
|||
|
|
|||
|
* The C floating-point types 'double', 'float', and 'long double'
|
|||
|
correspond to 'real(C_DOUBLE)', 'real(C_FLOAT)', and
|
|||
|
'real(C_LONG_DOUBLE)', respectively. The C complex types
|
|||
|
'fftw_complex', 'fftwf_complex', and 'fftwl_complex' correspond in
|
|||
|
Fortran to 'complex(C_DOUBLE_COMPLEX)', 'complex(C_FLOAT_COMPLEX)',
|
|||
|
and 'complex(C_LONG_DOUBLE_COMPLEX)', respectively. Just as in C
|
|||
|
(*note Precision::), the FFTW subroutines and types are prefixed
|
|||
|
with 'fftw_', 'fftwf_', and 'fftwl_' for the different precisions,
|
|||
|
and link to different libraries ('-lfftw3', '-lfftw3f', and
|
|||
|
'-lfftw3l' on Unix), but use the _same_ include file 'fftw3.f03'
|
|||
|
and the _same_ constants (all of which begin with 'FFTW_'). The
|
|||
|
exception is 'long double' precision, for which you should _also_
|
|||
|
include 'fftw3l.f03' (*note Extended and quadruple precision in
|
|||
|
Fortran::).
|
|||
|
|
|||
|
* The C integer types 'int' and 'unsigned' (used for planner flags)
|
|||
|
become 'integer(C_INT)'. The C integer type 'ptrdiff_t' (e.g. in
|
|||
|
the *note 64-bit Guru Interface::) becomes 'integer(C_INTPTR_T)',
|
|||
|
and 'size_t' (in 'fftw_malloc' etc.) becomes 'integer(C_SIZE_T)'.
|
|||
|
|
|||
|
* The 'fftw_r2r_kind' type (*note Real-to-Real Transform Kinds::)
|
|||
|
becomes 'integer(C_FFTW_R2R_KIND)'. The various constant values of
|
|||
|
the C enumerated type ('FFTW_R2HC' etc.) become simply integer
|
|||
|
constants of the same names in Fortran.
|
|||
|
|
|||
|
* Numeric array pointer arguments (e.g. 'double *') become
|
|||
|
'dimension(*), intent(out)' arrays of the same type, or
|
|||
|
'dimension(*), intent(in)' if they are pointers to constant data
|
|||
|
(e.g. 'const int *'). There are a few exceptions where numeric
|
|||
|
pointers refer to scalar outputs (e.g. for 'fftw_flops'), in which
|
|||
|
case they are 'intent(out)' scalar arguments in Fortran too. For
|
|||
|
the new-array execute functions (*note New-array Execute
|
|||
|
Functions::), the input arrays are declared 'dimension(*),
|
|||
|
intent(inout)', since they can be modified in the case of in-place
|
|||
|
or 'FFTW_DESTROY_INPUT' transforms.
|
|||
|
|
|||
|
* Pointer _return_ values (e.g 'double *') become 'type(C_PTR)'. (If
|
|||
|
they are pointers to arrays, as for 'fftw_alloc_real', you can
|
|||
|
convert them back to Fortran array pointers with the standard
|
|||
|
intrinsic function 'c_f_pointer'.)
|
|||
|
|
|||
|
* The 'fftw_iodim' type in the guru interface (*note Guru vector and
|
|||
|
transform sizes::) becomes 'type(fftw_iodim)' in Fortran, a derived
|
|||
|
data type (the Fortran analogue of C's 'struct') with three
|
|||
|
'integer(C_INT)' components: 'n', 'is', and 'os', with the same
|
|||
|
meanings as in C. The 'fftw_iodim64' type in the 64-bit guru
|
|||
|
interface (*note 64-bit Guru Interface::) is the same, except that
|
|||
|
its components are of type 'integer(C_INTPTR_T)'.
|
|||
|
|
|||
|
* Using the wisdom import/export functions from Fortran is a bit
|
|||
|
tricky, and is discussed in *note Accessing the wisdom API from
|
|||
|
Fortran::. In brief, the 'FILE *' arguments map to 'type(C_PTR)',
|
|||
|
'const char *' to 'character(C_CHAR), dimension(*), intent(in)'
|
|||
|
(null-terminated!), and the generic read-char/write-char functions
|
|||
|
map to 'type(C_FUNPTR)'.
|
|||
|
|
|||
|
You may be wondering if you need to search-and-replace
|
|||
|
'real(kind(0.0d0))' (or whatever your favorite Fortran spelling of
|
|||
|
"double precision" is) with 'real(C_DOUBLE)' everywhere in your program,
|
|||
|
and similarly for 'complex' and 'integer' types. The answer is no; you
|
|||
|
can still use your existing types. As long as these types match their C
|
|||
|
counterparts, things should work without a hitch. The worst that can
|
|||
|
happen, e.g. in the (unlikely) event of a system where
|
|||
|
'real(kind(0.0d0))' is different from 'real(C_DOUBLE)', is that the
|
|||
|
compiler will give you a type-mismatch error. That is, if you don't use
|
|||
|
the 'iso_c_binding' kinds you need to accept at least the theoretical
|
|||
|
possibility of having to change your code in response to compiler errors
|
|||
|
on some future machine, but you don't need to worry about silently
|
|||
|
compiling incorrect code that yields runtime errors.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Plan execution in Fortran, Next: Allocating aligned memory in Fortran, Prev: FFTW Fortran type reference, Up: Calling FFTW from Modern Fortran
|
|||
|
|
|||
|
7.4 Plan execution in Fortran
|
|||
|
=============================
|
|||
|
|
|||
|
In C, in order to use a plan, one normally calls 'fftw_execute', which
|
|||
|
executes the plan to perform the transform on the input/output arrays
|
|||
|
passed when the plan was created (*note Using Plans::). The
|
|||
|
corresponding subroutine call in modern Fortran is:
|
|||
|
call fftw_execute(plan)
|
|||
|
|
|||
|
However, we have had reports that this causes problems with some
|
|||
|
recent optimizing Fortran compilers. The problem is, because the
|
|||
|
input/output arrays are not passed as explicit arguments to
|
|||
|
'fftw_execute', the semantics of Fortran (unlike C) allow the compiler
|
|||
|
to assume that the input/output arrays are not changed by
|
|||
|
'fftw_execute'. As a consequence, certain compilers end up
|
|||
|
repositioning the call to 'fftw_execute', assuming incorrectly that it
|
|||
|
does nothing to the arrays.
|
|||
|
|
|||
|
There are various workarounds to this, but the safest and simplest
|
|||
|
thing is to not use 'fftw_execute' in Fortran. Instead, use the
|
|||
|
functions described in *note New-array Execute Functions::, which take
|
|||
|
the input/output arrays as explicit arguments. For example, if the plan
|
|||
|
is for a complex-data DFT and was created for the arrays 'in' and 'out',
|
|||
|
you would do:
|
|||
|
call fftw_execute_dft(plan, in, out)
|
|||
|
|
|||
|
There are a few things to be careful of, however:
|
|||
|
|
|||
|
* You must use the correct type of execute function, matching the way
|
|||
|
the plan was created. Complex DFT plans should use
|
|||
|
'fftw_execute_dft', Real-input (r2c) DFT plans should use use
|
|||
|
'fftw_execute_dft_r2c', and real-output (c2r) DFT plans should use
|
|||
|
'fftw_execute_dft_c2r'. The various r2r plans should use
|
|||
|
'fftw_execute_r2r'. Fortunately, if you use the wrong one you will
|
|||
|
get a compile-time type-mismatch error (unlike legacy Fortran).
|
|||
|
|
|||
|
* You should normally pass the same input/output arrays that were
|
|||
|
used when creating the plan. This is always safe.
|
|||
|
|
|||
|
* _If_ you pass _different_ input/output arrays compared to those
|
|||
|
used when creating the plan, you must abide by all the restrictions
|
|||
|
of the new-array execute functions (*note New-array Execute
|
|||
|
Functions::). The most tricky of these is the requirement that the
|
|||
|
new arrays have the same alignment as the original arrays; the best
|
|||
|
(and possibly only) way to guarantee this is to use the
|
|||
|
'fftw_alloc' functions to allocate your arrays (*note Allocating
|
|||
|
aligned memory in Fortran::). Alternatively, you can use the
|
|||
|
'FFTW_UNALIGNED' flag when creating the plan, in which case the
|
|||
|
plan does not depend on the alignment, but this may sacrifice
|
|||
|
substantial performance on architectures (like x86) with SIMD
|
|||
|
instructions (*note SIMD alignment and fftw_malloc::).
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Allocating aligned memory in Fortran, Next: Accessing the wisdom API from Fortran, Prev: Plan execution in Fortran, Up: Calling FFTW from Modern Fortran
|
|||
|
|
|||
|
7.5 Allocating aligned memory in Fortran
|
|||
|
========================================
|
|||
|
|
|||
|
In order to obtain maximum performance in FFTW, you should store your
|
|||
|
data in arrays that have been specially aligned in memory (*note SIMD
|
|||
|
alignment and fftw_malloc::). Enforcing alignment also permits you to
|
|||
|
safely use the new-array execute functions (*note New-array Execute
|
|||
|
Functions::) to apply a given plan to more than one pair of in/out
|
|||
|
arrays. Unfortunately, standard Fortran arrays do _not_ provide any
|
|||
|
alignment guarantees. The _only_ way to allocate aligned memory in
|
|||
|
standard Fortran is to allocate it with an external C function, like the
|
|||
|
'fftw_alloc_real' and 'fftw_alloc_complex' functions. Fortunately,
|
|||
|
Fortran 2003 provides a simple way to associate such allocated memory
|
|||
|
with a standard Fortran array pointer that you can then use normally.
|
|||
|
|
|||
|
We therefore recommend allocating all your input/output arrays using
|
|||
|
the following technique:
|
|||
|
|
|||
|
1. Declare a 'pointer', 'arr', to your array of the desired type and
|
|||
|
dimensions. For example, 'real(C_DOUBLE), pointer :: a(:,:)' for a
|
|||
|
2d real array, or 'complex(C_DOUBLE_COMPLEX), pointer :: a(:,:,:)'
|
|||
|
for a 3d complex array.
|
|||
|
|
|||
|
2. The number of elements to allocate must be an 'integer(C_SIZE_T)'.
|
|||
|
You can either declare a variable of this type, e.g.
|
|||
|
'integer(C_SIZE_T) :: sz', to store the number of elements to
|
|||
|
allocate, or you can use the 'int(..., C_SIZE_T)' intrinsic
|
|||
|
function. e.g. set 'sz = L * M * N' or use 'int(L * M * N,
|
|||
|
C_SIZE_T)' for an L x M x N array.
|
|||
|
|
|||
|
3. Declare a 'type(C_PTR) :: p' to hold the return value from FFTW's
|
|||
|
allocation routine. Set 'p = fftw_alloc_real(sz)' for a real
|
|||
|
array, or 'p = fftw_alloc_complex(sz)' for a complex array.
|
|||
|
|
|||
|
4. Associate your pointer 'arr' with the allocated memory 'p' using
|
|||
|
the standard 'c_f_pointer' subroutine: 'call c_f_pointer(p, arr,
|
|||
|
[...dimensions...])', where '[...dimensions...])' are an array of
|
|||
|
the dimensions of the array (in the usual Fortran order). e.g.
|
|||
|
'call c_f_pointer(p, arr, [L,M,N])' for an L x M x N array.
|
|||
|
(Alternatively, you can omit the dimensions argument if you
|
|||
|
specified the shape explicitly when declaring 'arr'.) You can now
|
|||
|
use 'arr' as a usual multidimensional array.
|
|||
|
|
|||
|
5. When you are done using the array, deallocate the memory by 'call
|
|||
|
fftw_free(p)' on 'p'.
|
|||
|
|
|||
|
For example, here is how we would allocate an L x M 2d real array:
|
|||
|
|
|||
|
real(C_DOUBLE), pointer :: arr(:,:)
|
|||
|
type(C_PTR) :: p
|
|||
|
p = fftw_alloc_real(int(L * M, C_SIZE_T))
|
|||
|
call c_f_pointer(p, arr, [L,M])
|
|||
|
_...use arr and arr(i,j) as usual..._
|
|||
|
call fftw_free(p)
|
|||
|
|
|||
|
and here is an L x M x N 3d complex array:
|
|||
|
|
|||
|
complex(C_DOUBLE_COMPLEX), pointer :: arr(:,:,:)
|
|||
|
type(C_PTR) :: p
|
|||
|
p = fftw_alloc_complex(int(L * M * N, C_SIZE_T))
|
|||
|
call c_f_pointer(p, arr, [L,M,N])
|
|||
|
_...use arr and arr(i,j,k) as usual..._
|
|||
|
call fftw_free(p)
|
|||
|
|
|||
|
See *note Reversing array dimensions:: for an example allocating a
|
|||
|
single array and associating both real and complex array pointers with
|
|||
|
it, for in-place real-to-complex transforms.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Accessing the wisdom API from Fortran, Next: Defining an FFTW module, Prev: Allocating aligned memory in Fortran, Up: Calling FFTW from Modern Fortran
|
|||
|
|
|||
|
7.6 Accessing the wisdom API from Fortran
|
|||
|
=========================================
|
|||
|
|
|||
|
As explained in *note Words of Wisdom-Saving Plans::, FFTW provides a
|
|||
|
"wisdom" API for saving plans to disk so that they can be recreated
|
|||
|
quickly. The C API for exporting (*note Wisdom Export::) and importing
|
|||
|
(*note Wisdom Import::) wisdom is somewhat tricky to use from Fortran,
|
|||
|
however, because of differences in file I/O and string types between C
|
|||
|
and Fortran.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Wisdom File Export/Import from Fortran::
|
|||
|
* Wisdom String Export/Import from Fortran::
|
|||
|
* Wisdom Generic Export/Import from Fortran::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Wisdom File Export/Import from Fortran, Next: Wisdom String Export/Import from Fortran, Prev: Accessing the wisdom API from Fortran, Up: Accessing the wisdom API from Fortran
|
|||
|
|
|||
|
7.6.1 Wisdom File Export/Import from Fortran
|
|||
|
--------------------------------------------
|
|||
|
|
|||
|
The easiest way to export and import wisdom is to do so using
|
|||
|
'fftw_export_wisdom_to_filename' and 'fftw_wisdom_from_filename'. The
|
|||
|
only trick is that these require you to pass a C string, which is an
|
|||
|
array of type 'CHARACTER(C_CHAR)' that is terminated by 'C_NULL_CHAR'.
|
|||
|
You can call them like this:
|
|||
|
|
|||
|
integer(C_INT) :: ret
|
|||
|
ret = fftw_export_wisdom_to_filename(C_CHAR_'my_wisdom.dat' // C_NULL_CHAR)
|
|||
|
if (ret .eq. 0) stop 'error exporting wisdom to file'
|
|||
|
ret = fftw_import_wisdom_from_filename(C_CHAR_'my_wisdom.dat' // C_NULL_CHAR)
|
|||
|
if (ret .eq. 0) stop 'error importing wisdom from file'
|
|||
|
|
|||
|
Note that prepending 'C_CHAR_' is needed to specify that the literal
|
|||
|
string is of kind 'C_CHAR', and we null-terminate the string by
|
|||
|
appending '// C_NULL_CHAR'. These functions return an 'integer(C_INT)'
|
|||
|
('ret') which is '0' if an error occurred during export/import and
|
|||
|
nonzero otherwise.
|
|||
|
|
|||
|
It is also possible to use the lower-level routines
|
|||
|
'fftw_export_wisdom_to_file' and 'fftw_import_wisdom_from_file', which
|
|||
|
accept parameters of the C type 'FILE*', expressed in Fortran as
|
|||
|
'type(C_PTR)'. However, you are then responsible for creating the
|
|||
|
'FILE*' yourself. You can do this by using 'iso_c_binding' to define
|
|||
|
Fortran intefaces for the C library functions 'fopen' and 'fclose',
|
|||
|
which is a bit strange in Fortran but workable.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Wisdom String Export/Import from Fortran, Next: Wisdom Generic Export/Import from Fortran, Prev: Wisdom File Export/Import from Fortran, Up: Accessing the wisdom API from Fortran
|
|||
|
|
|||
|
7.6.2 Wisdom String Export/Import from Fortran
|
|||
|
----------------------------------------------
|
|||
|
|
|||
|
Dealing with FFTW's C string export/import is a bit more painful. In
|
|||
|
particular, the 'fftw_export_wisdom_to_string' function requires you to
|
|||
|
deal with a dynamically allocated C string. To get its length, you must
|
|||
|
define an interface to the C 'strlen' function, and to deallocate it you
|
|||
|
must define an interface to C 'free':
|
|||
|
|
|||
|
use, intrinsic :: iso_c_binding
|
|||
|
interface
|
|||
|
integer(C_INT) function strlen(s) bind(C, name='strlen')
|
|||
|
import
|
|||
|
type(C_PTR), value :: s
|
|||
|
end function strlen
|
|||
|
subroutine free(p) bind(C, name='free')
|
|||
|
import
|
|||
|
type(C_PTR), value :: p
|
|||
|
end subroutine free
|
|||
|
end interface
|
|||
|
|
|||
|
Given these definitions, you can then export wisdom to a Fortran
|
|||
|
character array:
|
|||
|
|
|||
|
character(C_CHAR), pointer :: s(:)
|
|||
|
integer(C_SIZE_T) :: slen
|
|||
|
type(C_PTR) :: p
|
|||
|
p = fftw_export_wisdom_to_string()
|
|||
|
if (.not. c_associated(p)) stop 'error exporting wisdom'
|
|||
|
slen = strlen(p)
|
|||
|
call c_f_pointer(p, s, [slen+1])
|
|||
|
...
|
|||
|
call free(p)
|
|||
|
|
|||
|
Note that 'slen' is the length of the C string, but the length of the
|
|||
|
array is 'slen+1' because it includes the terminating null character.
|
|||
|
(You can omit the '+1' if you don't want Fortran to know about the null
|
|||
|
character.) The standard 'c_associated' function checks whether 'p' is
|
|||
|
a null pointer, which is returned by 'fftw_export_wisdom_to_string' if
|
|||
|
there was an error.
|
|||
|
|
|||
|
To import wisdom from a string, use 'fftw_import_wisdom_from_string'
|
|||
|
as usual; note that the argument of this function must be a
|
|||
|
'character(C_CHAR)' that is terminated by the 'C_NULL_CHAR' character,
|
|||
|
like the 's' array above.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Wisdom Generic Export/Import from Fortran, Prev: Wisdom String Export/Import from Fortran, Up: Accessing the wisdom API from Fortran
|
|||
|
|
|||
|
7.6.3 Wisdom Generic Export/Import from Fortran
|
|||
|
-----------------------------------------------
|
|||
|
|
|||
|
The most generic wisdom export/import functions allow you to provide an
|
|||
|
arbitrary callback function to read/write one character at a time in any
|
|||
|
way you want. However, your callback function must be written in a
|
|||
|
special way, using the 'bind(C)' attribute to be passed to a C
|
|||
|
interface.
|
|||
|
|
|||
|
In particular, to call the generic wisdom export function
|
|||
|
'fftw_export_wisdom', you would write a callback subroutine of the form:
|
|||
|
|
|||
|
subroutine my_write_char(c, p) bind(C)
|
|||
|
use, intrinsic :: iso_c_binding
|
|||
|
character(C_CHAR), value :: c
|
|||
|
type(C_PTR), value :: p
|
|||
|
_...write c..._
|
|||
|
end subroutine my_write_char
|
|||
|
|
|||
|
Given such a subroutine (along with the corresponding interface
|
|||
|
definition), you could then export wisdom using:
|
|||
|
|
|||
|
call fftw_export_wisdom(c_funloc(my_write_char), p)
|
|||
|
|
|||
|
The standard 'c_funloc' intrinsic converts a Fortran 'bind(C)'
|
|||
|
subroutine into a C function pointer. The parameter 'p' is a
|
|||
|
'type(C_PTR)' to any arbitrary data that you want to pass to
|
|||
|
'my_write_char' (or 'C_NULL_PTR' if none). (Note that you can get a C
|
|||
|
pointer to Fortran data using the intrinsic 'c_loc', and convert it back
|
|||
|
to a Fortran pointer in 'my_write_char' using 'c_f_pointer'.)
|
|||
|
|
|||
|
Similarly, to use the generic 'fftw_import_wisdom', you would define
|
|||
|
a callback function of the form:
|
|||
|
|
|||
|
integer(C_INT) function my_read_char(p) bind(C)
|
|||
|
use, intrinsic :: iso_c_binding
|
|||
|
type(C_PTR), value :: p
|
|||
|
character :: c
|
|||
|
_...read a character c..._
|
|||
|
my_read_char = ichar(c, C_INT)
|
|||
|
end function my_read_char
|
|||
|
|
|||
|
....
|
|||
|
|
|||
|
integer(C_INT) :: ret
|
|||
|
ret = fftw_import_wisdom(c_funloc(my_read_char), p)
|
|||
|
if (ret .eq. 0) stop 'error importing wisdom'
|
|||
|
|
|||
|
Your function can return '-1' if the end of the input is reached.
|
|||
|
Again, 'p' is an arbitrary 'type(C_PTR' that is passed through to your
|
|||
|
function. 'fftw_import_wisdom' returns '0' if an error occurred and
|
|||
|
nonzero otherwise.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Defining an FFTW module, Prev: Accessing the wisdom API from Fortran, Up: Calling FFTW from Modern Fortran
|
|||
|
|
|||
|
7.7 Defining an FFTW module
|
|||
|
===========================
|
|||
|
|
|||
|
Rather than using the 'include' statement to include the 'fftw3.f03'
|
|||
|
interface file in any subroutine where you want to use FFTW, you might
|
|||
|
prefer to define an FFTW Fortran module. FFTW does not install itself
|
|||
|
as a module, primarily because 'fftw3.f03' can be shared between
|
|||
|
different Fortran compilers while modules (in general) cannot. However,
|
|||
|
it is trivial to define your own FFTW module if you want. Just create a
|
|||
|
file containing:
|
|||
|
|
|||
|
module FFTW3
|
|||
|
use, intrinsic :: iso_c_binding
|
|||
|
include 'fftw3.f03'
|
|||
|
end module
|
|||
|
|
|||
|
Compile this file into a module as usual for your compiler (e.g.
|
|||
|
with 'gfortran -c' you will get a file 'fftw3.mod'). Now, instead of
|
|||
|
'include 'fftw3.f03'', whenever you want to use FFTW routines you can
|
|||
|
just do:
|
|||
|
|
|||
|
use FFTW3
|
|||
|
|
|||
|
as usual for Fortran modules. (You still need to link to the FFTW
|
|||
|
library, of course.)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Calling FFTW from Legacy Fortran, Next: Upgrading from FFTW version 2, Prev: Calling FFTW from Modern Fortran, Up: Top
|
|||
|
|
|||
|
8 Calling FFTW from Legacy Fortran
|
|||
|
**********************************
|
|||
|
|
|||
|
This chapter describes the interface to FFTW callable by Fortran code in
|
|||
|
older compilers not supporting the Fortran 2003 C interoperability
|
|||
|
features (*note Calling FFTW from Modern Fortran::). This interface has
|
|||
|
the major disadvantage that it is not type-checked, so if you mistake
|
|||
|
the argument types or ordering then your program will not have any
|
|||
|
compiler errors, and will likely crash at runtime. So, greater care is
|
|||
|
needed. Also, technically interfacing older Fortran versions to C is
|
|||
|
nonstandard, but in practice we have found that the techniques used in
|
|||
|
this chapter have worked with all known Fortran compilers for many
|
|||
|
years.
|
|||
|
|
|||
|
The legacy Fortran interface differs from the C interface only in the
|
|||
|
prefix ('dfftw_' instead of 'fftw_' in double precision) and a few other
|
|||
|
minor details. This Fortran interface is included in the FFTW libraries
|
|||
|
by default, unless a Fortran compiler isn't found on your system or
|
|||
|
'--disable-fortran' is included in the 'configure' flags. We assume
|
|||
|
here that the reader is already familiar with the usage of FFTW in C, as
|
|||
|
described elsewhere in this manual.
|
|||
|
|
|||
|
The MPI parallel interface to FFTW is _not_ currently available to
|
|||
|
legacy Fortran.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Fortran-interface routines::
|
|||
|
* FFTW Constants in Fortran::
|
|||
|
* FFTW Execution in Fortran::
|
|||
|
* Fortran Examples::
|
|||
|
* Wisdom of Fortran?::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Fortran-interface routines, Next: FFTW Constants in Fortran, Prev: Calling FFTW from Legacy Fortran, Up: Calling FFTW from Legacy Fortran
|
|||
|
|
|||
|
8.1 Fortran-interface routines
|
|||
|
==============================
|
|||
|
|
|||
|
Nearly all of the FFTW functions have Fortran-callable equivalents. The
|
|||
|
name of the legacy Fortran routine is the same as that of the
|
|||
|
corresponding C routine, but with the 'fftw_' prefix replaced by
|
|||
|
'dfftw_'.(1) The single and long-double precision versions use 'sfftw_'
|
|||
|
and 'lfftw_', respectively, instead of 'fftwf_' and 'fftwl_'; quadruple
|
|||
|
precision ('real*16') is available on some systems as 'fftwq_' (*note
|
|||
|
Precision::). (Note that 'long double' on x86 hardware is usually at
|
|||
|
most 80-bit extended precision, _not_ quadruple precision.)
|
|||
|
|
|||
|
For the most part, all of the arguments to the functions are the
|
|||
|
same, with the following exceptions:
|
|||
|
|
|||
|
* 'plan' variables (what would be of type 'fftw_plan' in C), must be
|
|||
|
declared as a type that is at least as big as a pointer (address)
|
|||
|
on your machine. We recommend using 'integer*8' everywhere, since
|
|||
|
this should always be big enough.
|
|||
|
|
|||
|
* Any function that returns a value (e.g. 'fftw_plan_dft') is
|
|||
|
converted into a _subroutine_. The return value is converted into
|
|||
|
an additional _first_ parameter of this subroutine.(2)
|
|||
|
|
|||
|
* The Fortran routines expect multi-dimensional arrays to be in
|
|||
|
_column-major_ order, which is the ordinary format of Fortran
|
|||
|
arrays (*note Multi-dimensional Array Format::). They do this
|
|||
|
transparently and costlessly simply by reversing the order of the
|
|||
|
dimensions passed to FFTW, but this has one important consequence
|
|||
|
for multi-dimensional real-complex transforms, discussed below.
|
|||
|
|
|||
|
* Wisdom import and export is somewhat more tricky because one cannot
|
|||
|
easily pass files or strings between C and Fortran; see *note
|
|||
|
Wisdom of Fortran?::.
|
|||
|
|
|||
|
* Legacy Fortran cannot use the 'fftw_malloc' dynamic-allocation
|
|||
|
routine. If you want to exploit the SIMD FFTW (*note SIMD
|
|||
|
alignment and fftw_malloc::), you'll need to figure out some other
|
|||
|
way to ensure that your arrays are at least 16-byte aligned.
|
|||
|
|
|||
|
* Since Fortran 77 does not have data structures, the 'fftw_iodim'
|
|||
|
structure from the guru interface (*note Guru vector and transform
|
|||
|
sizes::) must be split into separate arguments. In particular, any
|
|||
|
'fftw_iodim' array arguments in the C guru interface become three
|
|||
|
integer array arguments ('n', 'is', and 'os') in the Fortran guru
|
|||
|
interface, all of whose lengths should be equal to the
|
|||
|
corresponding 'rank' argument.
|
|||
|
|
|||
|
* The guru planner interface in Fortran does _not_ do any automatic
|
|||
|
translation between column-major and row-major; you are responsible
|
|||
|
for setting the strides etcetera to correspond to your Fortran
|
|||
|
arrays. However, as a slight bug that we are preserving for
|
|||
|
backwards compatibility, the 'plan_guru_r2r' in Fortran _does_
|
|||
|
reverse the order of its 'kind' array parameter, so the 'kind'
|
|||
|
array of that routine should be in the reverse of the order of the
|
|||
|
iodim arrays (see above).
|
|||
|
|
|||
|
In general, you should take care to use Fortran data types that
|
|||
|
correspond to (i.e. are the same size as) the C types used by FFTW. In
|
|||
|
practice, this correspondence is usually straightforward (i.e.
|
|||
|
'integer' corresponds to 'int', 'real' corresponds to 'float',
|
|||
|
etcetera). The native Fortran double/single-precision complex type
|
|||
|
should be compatible with 'fftw_complex'/'fftwf_complex'. Such simple
|
|||
|
correspondences are assumed in the examples below.
|
|||
|
|
|||
|
---------- Footnotes ----------
|
|||
|
|
|||
|
(1) Technically, Fortran 77 identifiers are not allowed to have more
|
|||
|
than 6 characters, nor may they contain underscores. Any compiler that
|
|||
|
enforces this limitation doesn't deserve to link to FFTW.
|
|||
|
|
|||
|
(2) The reason for this is that some Fortran implementations seem to
|
|||
|
have trouble with C function return values, and vice versa.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: FFTW Constants in Fortran, Next: FFTW Execution in Fortran, Prev: Fortran-interface routines, Up: Calling FFTW from Legacy Fortran
|
|||
|
|
|||
|
8.2 FFTW Constants in Fortran
|
|||
|
=============================
|
|||
|
|
|||
|
When creating plans in FFTW, a number of constants are used to specify
|
|||
|
options, such as 'FFTW_MEASURE' or 'FFTW_ESTIMATE'. The same constants
|
|||
|
must be used with the wrapper routines, but of course the C header files
|
|||
|
where the constants are defined can't be incorporated directly into
|
|||
|
Fortran code.
|
|||
|
|
|||
|
Instead, we have placed Fortran equivalents of the FFTW constant
|
|||
|
definitions in the file 'fftw3.f', which can be found in the same
|
|||
|
directory as 'fftw3.h'. If your Fortran compiler supports a
|
|||
|
preprocessor of some sort, you should be able to 'include' or '#include'
|
|||
|
this file; otherwise, you can paste it directly into your code.
|
|||
|
|
|||
|
In C, you combine different flags (like 'FFTW_PRESERVE_INPUT' and
|
|||
|
'FFTW_MEASURE') using the ''|'' operator; in Fortran you should just use
|
|||
|
''+''. (Take care not to add in the same flag more than once, though.
|
|||
|
Alternatively, you can use the 'ior' intrinsic function standardized in
|
|||
|
Fortran 95.)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: FFTW Execution in Fortran, Next: Fortran Examples, Prev: FFTW Constants in Fortran, Up: Calling FFTW from Legacy Fortran
|
|||
|
|
|||
|
8.3 FFTW Execution in Fortran
|
|||
|
=============================
|
|||
|
|
|||
|
In C, in order to use a plan, one normally calls 'fftw_execute', which
|
|||
|
executes the plan to perform the transform on the input/output arrays
|
|||
|
passed when the plan was created (*note Using Plans::). The
|
|||
|
corresponding subroutine call in legacy Fortran is:
|
|||
|
call dfftw_execute(plan)
|
|||
|
|
|||
|
However, we have had reports that this causes problems with some
|
|||
|
recent optimizing Fortran compilers. The problem is, because the
|
|||
|
input/output arrays are not passed as explicit arguments to
|
|||
|
'dfftw_execute', the semantics of Fortran (unlike C) allow the compiler
|
|||
|
to assume that the input/output arrays are not changed by
|
|||
|
'dfftw_execute'. As a consequence, certain compilers end up optimizing
|
|||
|
out or repositioning the call to 'dfftw_execute', assuming incorrectly
|
|||
|
that it does nothing.
|
|||
|
|
|||
|
There are various workarounds to this, but the safest and simplest
|
|||
|
thing is to not use 'dfftw_execute' in Fortran. Instead, use the
|
|||
|
functions described in *note New-array Execute Functions::, which take
|
|||
|
the input/output arrays as explicit arguments. For example, if the plan
|
|||
|
is for a complex-data DFT and was created for the arrays 'in' and 'out',
|
|||
|
you would do:
|
|||
|
call dfftw_execute_dft(plan, in, out)
|
|||
|
|
|||
|
There are a few things to be careful of, however:
|
|||
|
|
|||
|
* You must use the correct type of execute function, matching the way
|
|||
|
the plan was created. Complex DFT plans should use
|
|||
|
'dfftw_execute_dft', Real-input (r2c) DFT plans should use use
|
|||
|
'dfftw_execute_dft_r2c', and real-output (c2r) DFT plans should use
|
|||
|
'dfftw_execute_dft_c2r'. The various r2r plans should use
|
|||
|
'dfftw_execute_r2r'.
|
|||
|
|
|||
|
* You should normally pass the same input/output arrays that were
|
|||
|
used when creating the plan. This is always safe.
|
|||
|
|
|||
|
* _If_ you pass _different_ input/output arrays compared to those
|
|||
|
used when creating the plan, you must abide by all the restrictions
|
|||
|
of the new-array execute functions (*note New-array Execute
|
|||
|
Functions::). The most difficult of these, in Fortran, is the
|
|||
|
requirement that the new arrays have the same alignment as the
|
|||
|
original arrays, because there seems to be no way in legacy Fortran
|
|||
|
to obtain guaranteed-aligned arrays (analogous to 'fftw_malloc' in
|
|||
|
C). You can, of course, use the 'FFTW_UNALIGNED' flag when creating
|
|||
|
the plan, in which case the plan does not depend on the alignment,
|
|||
|
but this may sacrifice substantial performance on architectures
|
|||
|
(like x86) with SIMD instructions (*note SIMD alignment and
|
|||
|
fftw_malloc::).
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Fortran Examples, Next: Wisdom of Fortran?, Prev: FFTW Execution in Fortran, Up: Calling FFTW from Legacy Fortran
|
|||
|
|
|||
|
8.4 Fortran Examples
|
|||
|
====================
|
|||
|
|
|||
|
In C, you might have something like the following to transform a
|
|||
|
one-dimensional complex array:
|
|||
|
|
|||
|
fftw_complex in[N], out[N];
|
|||
|
fftw_plan plan;
|
|||
|
|
|||
|
plan = fftw_plan_dft_1d(N,in,out,FFTW_FORWARD,FFTW_ESTIMATE);
|
|||
|
fftw_execute(plan);
|
|||
|
fftw_destroy_plan(plan);
|
|||
|
|
|||
|
In Fortran, you would use the following to accomplish the same thing:
|
|||
|
|
|||
|
double complex in, out
|
|||
|
dimension in(N), out(N)
|
|||
|
integer*8 plan
|
|||
|
|
|||
|
call dfftw_plan_dft_1d(plan,N,in,out,FFTW_FORWARD,FFTW_ESTIMATE)
|
|||
|
call dfftw_execute_dft(plan, in, out)
|
|||
|
call dfftw_destroy_plan(plan)
|
|||
|
|
|||
|
Notice how all routines are called as Fortran subroutines, and the
|
|||
|
plan is returned via the first argument to 'dfftw_plan_dft_1d'. Notice
|
|||
|
also that we changed 'fftw_execute' to 'dfftw_execute_dft' (*note FFTW
|
|||
|
Execution in Fortran::). To do the same thing, but using 8 threads in
|
|||
|
parallel (*note Multi-threaded FFTW::), you would simply prefix these
|
|||
|
calls with:
|
|||
|
|
|||
|
integer iret
|
|||
|
call dfftw_init_threads(iret)
|
|||
|
call dfftw_plan_with_nthreads(8)
|
|||
|
|
|||
|
(You might want to check the value of 'iret': if it is zero, it
|
|||
|
indicates an unlikely error during thread initialization.)
|
|||
|
|
|||
|
To check the number of threads currently being used by the planner,
|
|||
|
you can do the following:
|
|||
|
|
|||
|
integer iret
|
|||
|
call dfftw_planner_nthreads(iret)
|
|||
|
|
|||
|
To transform a three-dimensional array in-place with C, you might do:
|
|||
|
|
|||
|
fftw_complex arr[L][M][N];
|
|||
|
fftw_plan plan;
|
|||
|
|
|||
|
plan = fftw_plan_dft_3d(L,M,N, arr,arr,
|
|||
|
FFTW_FORWARD, FFTW_ESTIMATE);
|
|||
|
fftw_execute(plan);
|
|||
|
fftw_destroy_plan(plan);
|
|||
|
|
|||
|
In Fortran, you would use this instead:
|
|||
|
|
|||
|
double complex arr
|
|||
|
dimension arr(L,M,N)
|
|||
|
integer*8 plan
|
|||
|
|
|||
|
call dfftw_plan_dft_3d(plan, L,M,N, arr,arr,
|
|||
|
& FFTW_FORWARD, FFTW_ESTIMATE)
|
|||
|
call dfftw_execute_dft(plan, arr, arr)
|
|||
|
call dfftw_destroy_plan(plan)
|
|||
|
|
|||
|
Note that we pass the array dimensions in the "natural" order in both
|
|||
|
C and Fortran.
|
|||
|
|
|||
|
To transform a one-dimensional real array in Fortran, you might do:
|
|||
|
|
|||
|
double precision in
|
|||
|
dimension in(N)
|
|||
|
double complex out
|
|||
|
dimension out(N/2 + 1)
|
|||
|
integer*8 plan
|
|||
|
|
|||
|
call dfftw_plan_dft_r2c_1d(plan,N,in,out,FFTW_ESTIMATE)
|
|||
|
call dfftw_execute_dft_r2c(plan, in, out)
|
|||
|
call dfftw_destroy_plan(plan)
|
|||
|
|
|||
|
To transform a two-dimensional real array, out of place, you might
|
|||
|
use the following:
|
|||
|
|
|||
|
double precision in
|
|||
|
dimension in(M,N)
|
|||
|
double complex out
|
|||
|
dimension out(M/2 + 1, N)
|
|||
|
integer*8 plan
|
|||
|
|
|||
|
call dfftw_plan_dft_r2c_2d(plan,M,N,in,out,FFTW_ESTIMATE)
|
|||
|
call dfftw_execute_dft_r2c(plan, in, out)
|
|||
|
call dfftw_destroy_plan(plan)
|
|||
|
|
|||
|
*Important:* Notice that it is the _first_ dimension of the complex
|
|||
|
output array that is cut in half in Fortran, rather than the last
|
|||
|
dimension as in C. This is a consequence of the interface routines
|
|||
|
reversing the order of the array dimensions passed to FFTW so that the
|
|||
|
Fortran program can use its ordinary column-major order.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Wisdom of Fortran?, Prev: Fortran Examples, Up: Calling FFTW from Legacy Fortran
|
|||
|
|
|||
|
8.5 Wisdom of Fortran?
|
|||
|
======================
|
|||
|
|
|||
|
In this section, we discuss how one can import/export FFTW wisdom (saved
|
|||
|
plans) to/from a Fortran program; we assume that the reader is already
|
|||
|
familiar with wisdom, as described in *note Words of Wisdom-Saving
|
|||
|
Plans::.
|
|||
|
|
|||
|
The basic problem is that is difficult to (portably) pass files and
|
|||
|
strings between Fortran and C, so we cannot provide a direct Fortran
|
|||
|
equivalent to the 'fftw_export_wisdom_to_file', etcetera, functions.
|
|||
|
Fortran interfaces _are_ provided for the functions that do not take
|
|||
|
file/string arguments, however: 'dfftw_import_system_wisdom',
|
|||
|
'dfftw_import_wisdom', 'dfftw_export_wisdom', and 'dfftw_forget_wisdom'.
|
|||
|
|
|||
|
So, for example, to import the system-wide wisdom, you would do:
|
|||
|
|
|||
|
integer isuccess
|
|||
|
call dfftw_import_system_wisdom(isuccess)
|
|||
|
|
|||
|
As usual, the C return value is turned into a first parameter;
|
|||
|
'isuccess' is non-zero on success and zero on failure (e.g. if there is
|
|||
|
no system wisdom installed).
|
|||
|
|
|||
|
If you want to import/export wisdom from/to an arbitrary file or
|
|||
|
elsewhere, you can employ the generic 'dfftw_import_wisdom' and
|
|||
|
'dfftw_export_wisdom' functions, for which you must supply a subroutine
|
|||
|
to read/write one character at a time. The FFTW package contains an
|
|||
|
example file 'doc/f77_wisdom.f' demonstrating how to implement
|
|||
|
'import_wisdom_from_file' and 'export_wisdom_to_file' subroutines in
|
|||
|
this way. (These routines cannot be compiled into the FFTW library
|
|||
|
itself, lest all FFTW-using programs be required to link with the
|
|||
|
Fortran I/O library.)
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Upgrading from FFTW version 2, Next: Installation and Customization, Prev: Calling FFTW from Legacy Fortran, Up: Top
|
|||
|
|
|||
|
9 Upgrading from FFTW version 2
|
|||
|
*******************************
|
|||
|
|
|||
|
In this chapter, we outline the process for updating codes designed for
|
|||
|
the older FFTW 2 interface to work with FFTW 3. The interface for FFTW
|
|||
|
3 is not backwards-compatible with the interface for FFTW 2 and earlier
|
|||
|
versions; codes written to use those versions will fail to link with
|
|||
|
FFTW 3. Nor is it possible to write "compatibility wrappers" to bridge
|
|||
|
the gap (at least not efficiently), because FFTW 3 has different
|
|||
|
semantics from previous versions. However, upgrading should be a
|
|||
|
straightforward process because the data formats are identical and the
|
|||
|
overall style of planning/execution is essentially the same.
|
|||
|
|
|||
|
Unlike FFTW 2, there are no separate header files for real and
|
|||
|
complex transforms (or even for different precisions) in FFTW 3; all
|
|||
|
interfaces are defined in the '<fftw3.h>' header file.
|
|||
|
|
|||
|
Numeric Types
|
|||
|
=============
|
|||
|
|
|||
|
The main difference in data types is that 'fftw_complex' in FFTW 2 was
|
|||
|
defined as a 'struct' with macros 'c_re' and 'c_im' for accessing the
|
|||
|
real/imaginary parts. (This is binary-compatible with FFTW 3 on any
|
|||
|
machine except perhaps for some older Crays in single precision.) The
|
|||
|
equivalent macros for FFTW 3 are:
|
|||
|
|
|||
|
#define c_re(c) ((c)[0])
|
|||
|
#define c_im(c) ((c)[1])
|
|||
|
|
|||
|
This does not work if you are using the C99 complex type, however,
|
|||
|
unless you insert a 'double*' typecast into the above macros (*note
|
|||
|
Complex numbers::).
|
|||
|
|
|||
|
Also, FFTW 2 had an 'fftw_real' typedef that was an alias for
|
|||
|
'double' (in double precision). In FFTW 3 you should just use 'double'
|
|||
|
(or whatever precision you are employing).
|
|||
|
|
|||
|
Plans
|
|||
|
=====
|
|||
|
|
|||
|
The major difference between FFTW 2 and FFTW 3 is in the
|
|||
|
planning/execution division of labor. In FFTW 2, plans were found for a
|
|||
|
given transform size and type, and then could be applied to _any_ arrays
|
|||
|
and for _any_ multiplicity/stride parameters. In FFTW 3, you specify
|
|||
|
the particular arrays, stride parameters, etcetera when creating the
|
|||
|
plan, and the plan is then executed for _those_ arrays (unless the guru
|
|||
|
interface is used) and _those_ parameters _only_. (FFTW 2 had "specific
|
|||
|
planner" routines that planned for a particular array and stride, but
|
|||
|
the plan could still be used for other arrays and strides.) That is,
|
|||
|
much of the information that was formerly specified at execution time is
|
|||
|
now specified at planning time.
|
|||
|
|
|||
|
Like FFTW 2's specific planner routines, the FFTW 3 planner
|
|||
|
overwrites the input/output arrays unless you use 'FFTW_ESTIMATE'.
|
|||
|
|
|||
|
FFTW 2 had separate data types 'fftw_plan', 'fftwnd_plan',
|
|||
|
'rfftw_plan', and 'rfftwnd_plan' for complex and real one- and
|
|||
|
multi-dimensional transforms, and each type had its own 'destroy'
|
|||
|
function. In FFTW 3, all plans are of type 'fftw_plan' and all are
|
|||
|
destroyed by 'fftw_destroy_plan(plan)'.
|
|||
|
|
|||
|
Where you formerly used 'fftw_create_plan' and 'fftw_one' to plan and
|
|||
|
compute a single 1d transform, you would now use 'fftw_plan_dft_1d' to
|
|||
|
plan the transform. If you used the generic 'fftw' function to execute
|
|||
|
the transform with multiplicity ('howmany') and stride parameters, you
|
|||
|
would now use the advanced interface 'fftw_plan_many_dft' to specify
|
|||
|
those parameters. The plans are now executed with 'fftw_execute(plan)',
|
|||
|
which takes all of its parameters (including the input/output arrays)
|
|||
|
from the plan.
|
|||
|
|
|||
|
In-place transforms no longer interpret their output argument as
|
|||
|
scratch space, nor is there an 'FFTW_IN_PLACE' flag. You simply pass
|
|||
|
the same pointer for both the input and output arguments. (Previously,
|
|||
|
the output 'ostride' and 'odist' parameters were ignored for in-place
|
|||
|
transforms; now, if they are specified via the advanced interface, they
|
|||
|
are significant even in the in-place case, although they should normally
|
|||
|
equal the corresponding input parameters.)
|
|||
|
|
|||
|
The 'FFTW_ESTIMATE' and 'FFTW_MEASURE' flags have the same meaning as
|
|||
|
before, although the planning time will differ. You may also consider
|
|||
|
using 'FFTW_PATIENT', which is like 'FFTW_MEASURE' except that it takes
|
|||
|
more time in order to consider a wider variety of algorithms.
|
|||
|
|
|||
|
For multi-dimensional complex DFTs, instead of 'fftwnd_create_plan'
|
|||
|
(or 'fftw2d_create_plan' or 'fftw3d_create_plan'), followed by
|
|||
|
'fftwnd_one', you would use 'fftw_plan_dft' (or 'fftw_plan_dft_2d' or
|
|||
|
'fftw_plan_dft_3d'). followed by 'fftw_execute'. If you used 'fftwnd'
|
|||
|
to to specify strides etcetera, you would instead specify these via
|
|||
|
'fftw_plan_many_dft'.
|
|||
|
|
|||
|
The analogues to 'rfftw_create_plan' and 'rfftw_one' with
|
|||
|
'FFTW_REAL_TO_COMPLEX' or 'FFTW_COMPLEX_TO_REAL' directions are
|
|||
|
'fftw_plan_r2r_1d' with kind 'FFTW_R2HC' or 'FFTW_HC2R', followed by
|
|||
|
'fftw_execute'. The stride etcetera arguments of 'rfftw' are now in
|
|||
|
'fftw_plan_many_r2r'.
|
|||
|
|
|||
|
Instead of 'rfftwnd_create_plan' (or 'rfftw2d_create_plan' or
|
|||
|
'rfftw3d_create_plan') followed by 'rfftwnd_one_real_to_complex' or
|
|||
|
'rfftwnd_one_complex_to_real', you now use 'fftw_plan_dft_r2c' (or
|
|||
|
'fftw_plan_dft_r2c_2d' or 'fftw_plan_dft_r2c_3d') or 'fftw_plan_dft_c2r'
|
|||
|
(or 'fftw_plan_dft_c2r_2d' or 'fftw_plan_dft_c2r_3d'), respectively,
|
|||
|
followed by 'fftw_execute'. As usual, the strides etcetera of
|
|||
|
'rfftwnd_real_to_complex' or 'rfftwnd_complex_to_real' are no specified
|
|||
|
in the advanced planner routines, 'fftw_plan_many_dft_r2c' or
|
|||
|
'fftw_plan_many_dft_c2r'.
|
|||
|
|
|||
|
Wisdom
|
|||
|
======
|
|||
|
|
|||
|
In FFTW 2, you had to supply the 'FFTW_USE_WISDOM' flag in order to use
|
|||
|
wisdom; in FFTW 3, wisdom is always used. (You could simulate the FFTW
|
|||
|
2 wisdom-less behavior by calling 'fftw_forget_wisdom' after every
|
|||
|
planner call.)
|
|||
|
|
|||
|
The FFTW 3 wisdom import/export routines are almost the same as
|
|||
|
before (although the storage format is entirely different). There is
|
|||
|
one significant difference, however. In FFTW 2, the import routines
|
|||
|
would never read past the end of the wisdom, so you could store extra
|
|||
|
data beyond the wisdom in the same file, for example. In FFTW 3, the
|
|||
|
file-import routine may read up to a few hundred bytes past the end of
|
|||
|
the wisdom, so you cannot store other data just beyond it.(1)
|
|||
|
|
|||
|
Wisdom has been enhanced by additional humility in FFTW 3: whereas
|
|||
|
FFTW 2 would re-use wisdom for a given transform size regardless of the
|
|||
|
stride etc., in FFTW 3 wisdom is only used with the strides etc. for
|
|||
|
which it was created. Unfortunately, this means FFTW 3 has to create
|
|||
|
new plans from scratch more often than FFTW 2 (in FFTW 2, planning e.g.
|
|||
|
one transform of size 1024 also created wisdom for all smaller powers of
|
|||
|
2, but this no longer occurs).
|
|||
|
|
|||
|
FFTW 3 also has the new routine 'fftw_import_system_wisdom' to import
|
|||
|
wisdom from a standard system-wide location.
|
|||
|
|
|||
|
Memory allocation
|
|||
|
=================
|
|||
|
|
|||
|
In FFTW 3, we recommend allocating your arrays with 'fftw_malloc' and
|
|||
|
deallocating them with 'fftw_free'; this is not required, but allows
|
|||
|
optimal performance when SIMD acceleration is used. (Those two
|
|||
|
functions actually existed in FFTW 2, and worked the same way, but were
|
|||
|
not documented.)
|
|||
|
|
|||
|
In FFTW 2, there were 'fftw_malloc_hook' and 'fftw_free_hook'
|
|||
|
functions that allowed the user to replace FFTW's memory-allocation
|
|||
|
routines (e.g. to implement different error-handling, since by default
|
|||
|
FFTW prints an error message and calls 'exit' to abort the program if
|
|||
|
'malloc' returns 'NULL'). These hooks are not supported in FFTW 3;
|
|||
|
those few users who require this functionality can just directly modify
|
|||
|
the memory-allocation routines in FFTW (they are defined in
|
|||
|
'kernel/alloc.c').
|
|||
|
|
|||
|
Fortran interface
|
|||
|
=================
|
|||
|
|
|||
|
In FFTW 2, the subroutine names were obtained by replacing 'fftw_' with
|
|||
|
'fftw_f77'; in FFTW 3, you replace 'fftw_' with 'dfftw_' (or 'sfftw_' or
|
|||
|
'lfftw_', depending upon the precision).
|
|||
|
|
|||
|
In FFTW 3, we have begun recommending that you always declare the
|
|||
|
type used to store plans as 'integer*8'. (Too many people didn't notice
|
|||
|
our instruction to switch from 'integer' to 'integer*8' for 64-bit
|
|||
|
machines.)
|
|||
|
|
|||
|
In FFTW 3, we provide a 'fftw3.f' "header file" to include in your
|
|||
|
code (and which is officially installed on Unix systems). (In FFTW 2,
|
|||
|
we supplied a 'fftw_f77.i' file, but it was not installed.)
|
|||
|
|
|||
|
Otherwise, the C-Fortran interface relationship is much the same as
|
|||
|
it was before (e.g. return values become initial parameters, and
|
|||
|
multi-dimensional arrays are in column-major order). Unlike FFTW 2, we
|
|||
|
do provide some support for wisdom import/export in Fortran (*note
|
|||
|
Wisdom of Fortran?::).
|
|||
|
|
|||
|
Threads
|
|||
|
=======
|
|||
|
|
|||
|
Like FFTW 2, only the execution routines are thread-safe. All planner
|
|||
|
routines, etcetera, should be called by only a single thread at a time
|
|||
|
(*note Thread safety::). _Unlike_ FFTW 2, there is no special
|
|||
|
'FFTW_THREADSAFE' flag for the planner to allow a given plan to be
|
|||
|
usable by multiple threads in parallel; this is now the case by default.
|
|||
|
|
|||
|
The multi-threaded version of FFTW 2 required you to pass the number
|
|||
|
of threads each time you execute the transform. The number of threads
|
|||
|
is now stored in the plan, and is specified before the planner is called
|
|||
|
by 'fftw_plan_with_nthreads'. The threads initialization routine used
|
|||
|
to be called 'fftw_threads_init' and would return zero on success; the
|
|||
|
new routine is called 'fftw_init_threads' and returns zero on failure.
|
|||
|
The current number of threads used by the planner can be checked with
|
|||
|
'fftw_planner_nthreads'. *Note Multi-threaded FFTW::.
|
|||
|
|
|||
|
There is no separate threads header file in FFTW 3; all the function
|
|||
|
prototypes are in '<fftw3.h>'. However, you still have to link to a
|
|||
|
separate library ('-lfftw3_threads -lfftw3 -lm' on Unix), as well as to
|
|||
|
the threading library (e.g. POSIX threads on Unix).
|
|||
|
|
|||
|
---------- Footnotes ----------
|
|||
|
|
|||
|
(1) We do our own buffering because GNU libc I/O routines are
|
|||
|
horribly slow for single-character I/O, apparently for thread-safety
|
|||
|
reasons (whether you are using threads or not).
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Installation and Customization, Next: Acknowledgments, Prev: Upgrading from FFTW version 2, Up: Top
|
|||
|
|
|||
|
10 Installation and Customization
|
|||
|
*********************************
|
|||
|
|
|||
|
This chapter describes the installation and customization of FFTW, the
|
|||
|
latest version of which may be downloaded from the FFTW home page
|
|||
|
(http://www.fftw.org).
|
|||
|
|
|||
|
In principle, FFTW should work on any system with an ANSI C compiler
|
|||
|
('gcc' is fine). However, planner time is drastically reduced if FFTW
|
|||
|
can exploit a hardware cycle counter; FFTW comes with cycle-counter
|
|||
|
support for all modern general-purpose CPUs, but you may need to add a
|
|||
|
couple of lines of code if your compiler is not yet supported (*note
|
|||
|
Cycle Counters::). (On Unix, there will be a warning at the end of the
|
|||
|
'configure' output if no cycle counter is found.)
|
|||
|
|
|||
|
Installation of FFTW is simplest if you have a Unix or a GNU system,
|
|||
|
such as GNU/Linux, and we describe this case in the first section below,
|
|||
|
including the use of special configuration options to e.g. install
|
|||
|
different precisions or exploit optimizations for particular
|
|||
|
architectures (e.g. SIMD). Compilation on non-Unix systems is a more
|
|||
|
manual process, but we outline the procedure in the second section. It
|
|||
|
is also likely that pre-compiled binaries will be available for popular
|
|||
|
systems.
|
|||
|
|
|||
|
Finally, we describe how you can customize FFTW for particular needs
|
|||
|
by generating _codelets_ for fast transforms of sizes not supported
|
|||
|
efficiently by the standard FFTW distribution.
|
|||
|
|
|||
|
* Menu:
|
|||
|
|
|||
|
* Installation on Unix::
|
|||
|
* Installation on non-Unix systems::
|
|||
|
* Cycle Counters::
|
|||
|
* Generating your own code::
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Installation on Unix, Next: Installation on non-Unix systems, Prev: Installation and Customization, Up: Installation and Customization
|
|||
|
|
|||
|
10.1 Installation on Unix
|
|||
|
=========================
|
|||
|
|
|||
|
FFTW comes with a 'configure' program in the GNU style. Installation
|
|||
|
can be as simple as:
|
|||
|
|
|||
|
./configure
|
|||
|
make
|
|||
|
make install
|
|||
|
|
|||
|
This will build the uniprocessor complex and real transform libraries
|
|||
|
along with the test programs. (We recommend that you use GNU 'make' if
|
|||
|
it is available; on some systems it is called 'gmake'.) The "'make
|
|||
|
install'" command installs the fftw and rfftw libraries in standard
|
|||
|
places, and typically requires root privileges (unless you specify a
|
|||
|
different install directory with the '--prefix' flag to 'configure').
|
|||
|
You can also type "'make check'" to put the FFTW test programs through
|
|||
|
their paces. If you have problems during configuration or compilation,
|
|||
|
you may want to run "'make distclean'" before trying again; this ensures
|
|||
|
that you don't have any stale files left over from previous compilation
|
|||
|
attempts.
|
|||
|
|
|||
|
The 'configure' script chooses the 'gcc' compiler by default, if it
|
|||
|
is available; you can select some other compiler with:
|
|||
|
./configure CC="<the name of your C compiler>"
|
|||
|
|
|||
|
The 'configure' script knows good 'CFLAGS' (C compiler flags) for a
|
|||
|
few systems. If your system is not known, the 'configure' script will
|
|||
|
print out a warning. In this case, you should re-configure FFTW with
|
|||
|
the command
|
|||
|
./configure CFLAGS="<write your CFLAGS here>"
|
|||
|
and then compile as usual. If you do find an optimal set of 'CFLAGS'
|
|||
|
for your system, please let us know what they are (along with the output
|
|||
|
of 'config.guess') so that we can include them in future releases.
|
|||
|
|
|||
|
'configure' supports all the standard flags defined by the GNU Coding
|
|||
|
Standards; see the 'INSTALL' file in FFTW or the GNU web page
|
|||
|
(http://www.gnu.org/prep/standards/html_node/index.html). Note
|
|||
|
especially '--help' to list all flags and '--enable-shared' to create
|
|||
|
shared, rather than static, libraries. 'configure' also accepts a few
|
|||
|
FFTW-specific flags, particularly:
|
|||
|
|
|||
|
* '--enable-float': Produces a single-precision version of FFTW
|
|||
|
('float') instead of the default double-precision ('double').
|
|||
|
*Note Precision::.
|
|||
|
|
|||
|
* '--enable-long-double': Produces a long-double precision version of
|
|||
|
FFTW ('long double') instead of the default double-precision
|
|||
|
('double'). The 'configure' script will halt with an error message
|
|||
|
if 'long double' is the same size as 'double' on your
|
|||
|
machine/compiler. *Note Precision::.
|
|||
|
|
|||
|
* '--enable-quad-precision': Produces a quadruple-precision version
|
|||
|
of FFTW using the nonstandard '__float128' type provided by 'gcc'
|
|||
|
4.6 or later on x86, x86-64, and Itanium architectures, instead of
|
|||
|
the default double-precision ('double'). The 'configure' script
|
|||
|
will halt with an error message if the compiler is not 'gcc'
|
|||
|
version 4.6 or later or if 'gcc''s 'libquadmath' library is not
|
|||
|
installed. *Note Precision::.
|
|||
|
|
|||
|
* '--enable-threads': Enables compilation and installation of the
|
|||
|
FFTW threads library (*note Multi-threaded FFTW::), which provides
|
|||
|
a simple interface to parallel transforms for SMP systems. By
|
|||
|
default, the threads routines are not compiled.
|
|||
|
|
|||
|
* '--enable-openmp': Like '--enable-threads', but using OpenMP
|
|||
|
compiler directives in order to induce parallelism rather than
|
|||
|
spawning its own threads directly, and installing an 'fftw3_omp'
|
|||
|
library rather than an 'fftw3_threads' library (*note
|
|||
|
Multi-threaded FFTW::). You can use both '--enable-openmp' and
|
|||
|
'--enable-threads' since they compile/install libraries with
|
|||
|
different names. By default, the OpenMP routines are not compiled.
|
|||
|
|
|||
|
* '--with-combined-threads': By default, if '--enable-threads' is
|
|||
|
used, the threads support is compiled into a separate library that
|
|||
|
must be linked in addition to the main FFTW library. This is so
|
|||
|
that users of the serial library do not need to link the system
|
|||
|
threads libraries. If '--with-combined-threads' is specified,
|
|||
|
however, then no separate threads library is created, and threads
|
|||
|
are included in the main FFTW library. This is mainly useful under
|
|||
|
Windows, where no system threads library is required and
|
|||
|
inter-library dependencies are problematic.
|
|||
|
|
|||
|
* '--enable-mpi': Enables compilation and installation of the FFTW
|
|||
|
MPI library (*note Distributed-memory FFTW with MPI::), which
|
|||
|
provides parallel transforms for distributed-memory systems with
|
|||
|
MPI. (By default, the MPI routines are not compiled.) *Note FFTW
|
|||
|
MPI Installation::.
|
|||
|
|
|||
|
* '--disable-fortran': Disables inclusion of legacy-Fortran wrapper
|
|||
|
routines (*note Calling FFTW from Legacy Fortran::) in the standard
|
|||
|
FFTW libraries. These wrapper routines increase the library size
|
|||
|
by only a negligible amount, so they are included by default as
|
|||
|
long as the 'configure' script finds a Fortran compiler on your
|
|||
|
system. (To specify a particular Fortran compiler foo, pass
|
|||
|
'F77='foo to 'configure'.)
|
|||
|
|
|||
|
* '--with-g77-wrappers': By default, when Fortran wrappers are
|
|||
|
included, the wrappers employ the linking conventions of the
|
|||
|
Fortran compiler detected by the 'configure' script. If this
|
|||
|
compiler is GNU 'g77', however, then _two_ versions of the wrappers
|
|||
|
are included: one with 'g77''s idiosyncratic convention of
|
|||
|
appending two underscores to identifiers, and one with the more
|
|||
|
common convention of appending only a single underscore. This way,
|
|||
|
the same FFTW library will work with both 'g77' and other Fortran
|
|||
|
compilers, such as GNU 'gfortran'. However, the converse is not
|
|||
|
true: if you configure with a different compiler, then the
|
|||
|
'g77'-compatible wrappers are not included. By specifying
|
|||
|
'--with-g77-wrappers', the 'g77'-compatible wrappers are included
|
|||
|
in addition to wrappers for whatever Fortran compiler 'configure'
|
|||
|
finds.
|
|||
|
|
|||
|
* '--with-slow-timer': Disables the use of hardware cycle counters,
|
|||
|
and falls back on 'gettimeofday' or 'clock'. This greatly worsens
|
|||
|
performance, and should generally not be used (unless you don't
|
|||
|
have a cycle counter but still really want an optimized plan
|
|||
|
regardless of the time). *Note Cycle Counters::.
|
|||
|
|
|||
|
* '--enable-sse' (single precision), '--enable-sse2' (single,
|
|||
|
double), '--enable-avx' (single, double), '--enable-avx2' (single,
|
|||
|
double), '--enable-avx512' (single, double),
|
|||
|
'--enable-avx-128-fma', '--enable-kcvi' (single),
|
|||
|
'--enable-altivec' (single), '--enable-vsx' (single, double),
|
|||
|
'--enable-neon' (single, double on aarch64),
|
|||
|
'--enable-generic-simd128', and '--enable-generic-simd256':
|
|||
|
|
|||
|
Enable various SIMD instruction sets. You need compiler that
|
|||
|
supports the given SIMD extensions, but FFTW will try to detect at
|
|||
|
runtime whether the CPU supports these extensions. That is, you
|
|||
|
can compile with'--enable-avx' and the code will still run on a CPU
|
|||
|
without AVX support.
|
|||
|
|
|||
|
- These options require a compiler supporting SIMD extensions,
|
|||
|
and compiler support is always a bit flaky: see the FFTW FAQ
|
|||
|
for a list of compiler versions that have problems compiling
|
|||
|
FFTW.
|
|||
|
- Because of the large variety of ARM processors and ABIs, FFTW
|
|||
|
does not attempt to guess the correct 'gcc' flags for
|
|||
|
generating NEON code. In general, you will have to provide
|
|||
|
them on the command line. This command line is known to have
|
|||
|
worked at least once:
|
|||
|
./configure --with-slow-timer --host=arm-linux-gnueabi \
|
|||
|
--enable-single --enable-neon \
|
|||
|
"CC=arm-linux-gnueabi-gcc -march=armv7-a -mfloat-abi=softfp"
|
|||
|
|
|||
|
To force 'configure' to use a particular C compiler foo (instead of
|
|||
|
the default, usually 'gcc'), pass 'CC='foo to the 'configure' script;
|
|||
|
you may also need to set the flags via the variable 'CFLAGS' as
|
|||
|
described above.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Installation on non-Unix systems, Next: Cycle Counters, Prev: Installation on Unix, Up: Installation and Customization
|
|||
|
|
|||
|
10.2 Installation on non-Unix systems
|
|||
|
=====================================
|
|||
|
|
|||
|
It should be relatively straightforward to compile FFTW even on non-Unix
|
|||
|
systems lacking the niceties of a 'configure' script. Basically, you
|
|||
|
need to edit the 'config.h' header (copy it from 'config.h.in') to
|
|||
|
'#define' the various options and compiler characteristics, and then
|
|||
|
compile all the '.c' files in the relevant directories.
|
|||
|
|
|||
|
The 'config.h' header contains about 100 options to set, each one
|
|||
|
initially an '#undef', each documented with a comment, and most of them
|
|||
|
fairly obvious. For most of the options, you should simply '#define'
|
|||
|
them to '1' if they are applicable, although a few options require a
|
|||
|
particular value (e.g. 'SIZEOF_LONG_LONG' should be defined to the size
|
|||
|
of the 'long long' type, in bytes, or zero if it is not supported). We
|
|||
|
will likely post some sample 'config.h' files for various operating
|
|||
|
systems and compilers for you to use (at least as a starting point).
|
|||
|
Please let us know if you have to hand-create a configuration file
|
|||
|
(and/or a pre-compiled binary) that you want to share.
|
|||
|
|
|||
|
To create the FFTW library, you will then need to compile all of the
|
|||
|
'.c' files in the 'kernel', 'dft', 'dft/scalar', 'dft/scalar/codelets',
|
|||
|
'rdft', 'rdft/scalar', 'rdft/scalar/r2cf', 'rdft/scalar/r2cb',
|
|||
|
'rdft/scalar/r2r', 'reodft', and 'api' directories. If you are
|
|||
|
compiling with SIMD support (e.g. you defined 'HAVE_SSE2' in
|
|||
|
'config.h'), then you also need to compile the '.c' files in the
|
|||
|
'simd-support', '{dft,rdft}/simd', '{dft,rdft}/simd/*' directories.
|
|||
|
|
|||
|
Once these files are all compiled, link them into a library, or a
|
|||
|
shared library, or directly into your program.
|
|||
|
|
|||
|
To compile the FFTW test program, additionally compile the code in
|
|||
|
the 'libbench2/' directory, and link it into a library. Then compile
|
|||
|
the code in the 'tests/' directory and link it to the 'libbench2' and
|
|||
|
FFTW libraries. To compile the 'fftw-wisdom' (command-line) tool (*note
|
|||
|
Wisdom Utilities::), compile 'tools/fftw-wisdom.c' and link it to the
|
|||
|
'libbench2' and FFTW libraries
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Cycle Counters, Next: Generating your own code, Prev: Installation on non-Unix systems, Up: Installation and Customization
|
|||
|
|
|||
|
10.3 Cycle Counters
|
|||
|
===================
|
|||
|
|
|||
|
FFTW's planner actually executes and times different possible FFT
|
|||
|
algorithms in order to pick the fastest plan for a given n. In order to
|
|||
|
do this in as short a time as possible, however, the timer must have a
|
|||
|
very high resolution, and to accomplish this we employ the hardware
|
|||
|
"cycle counters" that are available on most CPUs. Currently, FFTW
|
|||
|
supports the cycle counters on x86, PowerPC/POWER, Alpha, UltraSPARC
|
|||
|
(SPARC v9), IA64, PA-RISC, and MIPS processors.
|
|||
|
|
|||
|
Access to the cycle counters, unfortunately, is a compiler and/or
|
|||
|
operating-system dependent task, often requiring inline assembly
|
|||
|
language, and it may be that your compiler is not supported. If you are
|
|||
|
_not_ supported, FFTW will by default fall back on its estimator
|
|||
|
(effectively using 'FFTW_ESTIMATE' for all plans).
|
|||
|
|
|||
|
You can add support by editing the file 'kernel/cycle.h'; normally,
|
|||
|
this will involve adapting one of the examples already present in order
|
|||
|
to use the inline-assembler syntax for your C compiler, and will only
|
|||
|
require a couple of lines of code. Anyone adding support for a new
|
|||
|
system to 'cycle.h' is encouraged to email us at <fftw@fftw.org>.
|
|||
|
|
|||
|
If a cycle counter is not available on your system (e.g. some
|
|||
|
embedded processor), and you don't want to use estimated plans, as a
|
|||
|
last resort you can use the '--with-slow-timer' option to 'configure'
|
|||
|
(on Unix) or '#define WITH_SLOW_TIMER' in 'config.h' (elsewhere). This
|
|||
|
will use the much lower-resolution 'gettimeofday' function, or even
|
|||
|
'clock' if the former is unavailable, and planning will be extremely
|
|||
|
slow.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Generating your own code, Prev: Cycle Counters, Up: Installation and Customization
|
|||
|
|
|||
|
10.4 Generating your own code
|
|||
|
=============================
|
|||
|
|
|||
|
The directory 'genfft' contains the programs that were used to generate
|
|||
|
FFTW's "codelets," which are hard-coded transforms of small sizes. We
|
|||
|
do not expect casual users to employ the generator, which is a rather
|
|||
|
sophisticated program that generates directed acyclic graphs of FFT
|
|||
|
algorithms and performs algebraic simplifications on them. It was
|
|||
|
written in Objective Caml, a dialect of ML, which is available at
|
|||
|
<http://caml.inria.fr/ocaml/index.en.html>.
|
|||
|
|
|||
|
If you have Objective Caml installed (along with recent versions of
|
|||
|
GNU 'autoconf', 'automake', and 'libtool'), then you can change the set
|
|||
|
of codelets that are generated or play with the generation options. The
|
|||
|
set of generated codelets is specified by the
|
|||
|
'{dft,rdft}/{codelets,simd}/*/Makefile.am' files. For example, you can
|
|||
|
add efficient REDFT codelets of small sizes by modifying
|
|||
|
'rdft/codelets/r2r/Makefile.am'. After you modify any 'Makefile.am'
|
|||
|
files, you can type 'sh bootstrap.sh' in the top-level directory
|
|||
|
followed by 'make' to re-generate the files.
|
|||
|
|
|||
|
We do not provide more details about the code-generation process,
|
|||
|
since we do not expect that most users will need to generate their own
|
|||
|
code. However, feel free to contact us at <fftw@fftw.org> if you are
|
|||
|
interested in the subject.
|
|||
|
|
|||
|
You might find it interesting to learn Caml and/or some modern
|
|||
|
programming techniques that we used in the generator (including monadic
|
|||
|
programming), especially if you heard the rumor that Java and
|
|||
|
object-oriented programming are the latest advancement in the field.
|
|||
|
The internal operation of the codelet generator is described in the
|
|||
|
paper, "A Fast Fourier Transform Compiler," by M. Frigo, which is
|
|||
|
available from the FFTW home page (http://www.fftw.org) and also
|
|||
|
appeared in the 'Proceedings of the 1999 ACM SIGPLAN Conference on
|
|||
|
Programming Language Design and Implementation (PLDI)'.
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: Acknowledgments, Next: License and Copyright, Prev: Installation and Customization, Up: Top
|
|||
|
|
|||
|
11 Acknowledgments
|
|||
|
******************
|
|||
|
|
|||
|
Matteo Frigo was supported in part by the Special Research Program SFB
|
|||
|
F011 "AURORA" of the Austrian Science Fund FWF and by MIT Lincoln
|
|||
|
Laboratory. For previous versions of FFTW, he was supported in part by
|
|||
|
the Defense Advanced Research Projects Agency (DARPA), under Grants
|
|||
|
N00014-94-1-0985 and F30602-97-1-0270, and by a Digital Equipment
|
|||
|
Corporation Fellowship.
|
|||
|
|
|||
|
Steven G. Johnson was supported in part by a Dept. of Defense NDSEG
|
|||
|
Fellowship, an MIT Karl Taylor Compton Fellowship, and by the Materials
|
|||
|
Research Science and Engineering Center program of the National Science
|
|||
|
Foundation under award DMR-9400334.
|
|||
|
|
|||
|
Code for the Cell Broadband Engine was graciously donated to the FFTW
|
|||
|
project by the IBM Austin Research Lab and included in fftw-3.2. (This
|
|||
|
code was removed in fftw-3.3.)
|
|||
|
|
|||
|
Code for the MIPS paired-single SIMD support was graciously donated
|
|||
|
to the FFTW project by CodeSourcery, Inc.
|
|||
|
|
|||
|
We are grateful to Sun Microsystems Inc. for its donation of a
|
|||
|
cluster of 9 8-processor Ultra HPC 5000 SMPs (24 Gflops peak). These
|
|||
|
machines served as the primary platform for the development of early
|
|||
|
versions of FFTW.
|
|||
|
|
|||
|
We thank Intel Corporation for donating a four-processor Pentium Pro
|
|||
|
machine. We thank the GNU/Linux community for giving us a decent OS to
|
|||
|
run on that machine.
|
|||
|
|
|||
|
We are thankful to the AMD corporation for donating an AMD Athlon XP
|
|||
|
1700+ computer to the FFTW project.
|
|||
|
|
|||
|
We thank the Compaq/HP testdrive program and VA Software Corporation
|
|||
|
(SourceForge.net) for providing remote access to machines that were used
|
|||
|
to test FFTW.
|
|||
|
|
|||
|
The 'genfft' suite of code generators was written using Objective
|
|||
|
Caml, a dialect of ML. Objective Caml is a small and elegant language
|
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|
developed by Xavier Leroy. The implementation is available from
|
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|
'http://caml.inria.fr/' (http://caml.inria.fr/). In previous releases
|
|||
|
of FFTW, 'genfft' was written in Caml Light, by the same authors. An
|
|||
|
even earlier implementation of 'genfft' was written in Scheme, but Caml
|
|||
|
is definitely better for this kind of application.
|
|||
|
|
|||
|
FFTW uses many tools from the GNU project, including 'automake',
|
|||
|
'texinfo', and 'libtool'.
|
|||
|
|
|||
|
Prof. Charles E. Leiserson of MIT provided continuous support and
|
|||
|
encouragement. This program would not exist without him. Charles also
|
|||
|
proposed the name "codelets" for the basic FFT blocks.
|
|||
|
|
|||
|
Prof. John D. Joannopoulos of MIT demonstrated continuing tolerance
|
|||
|
of Steven's "extra-curricular" computer-science activities, as well as
|
|||
|
remarkable creativity in working them into his grant proposals.
|
|||
|
Steven's physics degree would not exist without him.
|
|||
|
|
|||
|
Franz Franchetti wrote SIMD extensions to FFTW 2, which eventually
|
|||
|
led to the SIMD support in FFTW 3.
|
|||
|
|
|||
|
Stefan Kral wrote most of the K7 code generator distributed with FFTW
|
|||
|
3.0.x and 3.1.x.
|
|||
|
|
|||
|
Andrew Sterian contributed the Windows timing code in FFTW 2.
|
|||
|
|
|||
|
Didier Miras reported a bug in the test procedure used in FFTW 1.2.
|
|||
|
We now use a completely different test algorithm by Funda Ergun that
|
|||
|
does not require a separate FFT program to compare against.
|
|||
|
|
|||
|
Wolfgang Reimer contributed the Pentium cycle counter and a few fixes
|
|||
|
that help portability.
|
|||
|
|
|||
|
Ming-Chang Liu uncovered a well-hidden bug in the complex transforms
|
|||
|
of FFTW 2.0 and supplied a patch to correct it.
|
|||
|
|
|||
|
The FFTW FAQ was written in 'bfnn' (Bizarre Format With No Name) and
|
|||
|
formatted using the tools developed by Ian Jackson for the Linux FAQ.
|
|||
|
|
|||
|
_We are especially thankful to all of our users for their continuing
|
|||
|
support, feedback, and interest during our development of FFTW._
|
|||
|
|
|||
|
|
|||
|
File: fftw3.info, Node: License and Copyright, Next: Concept Index, Prev: Acknowledgments, Up: Top
|
|||
|
|
|||
|
12 License and Copyright
|
|||
|
************************
|
|||
|
|
|||
|
FFTW is Copyright (C) 2003, 2007-11 Matteo Frigo, Copyright (C) 2003,
|
|||
|
2007-11 Massachusetts Institute of Technology.
|
|||
|
|
|||
|
FFTW is free software; you can redistribute it and/or modify it under
|
|||
|
the terms of the GNU General Public License as published by the Free
|
|||
|
Software Foundation; either version 2 of the License, or (at your
|
|||
|
option) any later version.
|
|||
|
|
|||
|
This program is distributed in the hope that it will be useful, but
|
|||
|
WITHOUT ANY WARRANTY; without even the implied warranty of
|
|||
|
MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General
|
|||
|
Public License for more details.
|
|||
|
|
|||
|
You should have received a copy of the GNU General Public License
|
|||
|
along with this program; if not, write to the Free Software Foundation,
|
|||
|
Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA You can
|
|||
|
also find the GPL on the GNU web site
|
|||
|
(http://www.gnu.org/licenses/gpl-2.0.html).
|
|||
|
|
|||
|
In addition, we kindly ask you to acknowledge FFTW and its authors in
|
|||
|
any program or publication in which you use FFTW. (You are not
|
|||
|
_required_ to do so; it is up to your common sense to decide whether you
|
|||
|
want to comply with this request or not.) For general publications, we
|
|||
|
suggest referencing: Matteo Frigo and Steven G. Johnson, "The design and
|
|||
|
implementation of FFTW3," Proc. IEEE 93 (2), 216-231 (2005).
|
|||
|
|
|||
|
Non-free versions of FFTW are available under terms different from
|
|||
|
those of the General Public License. (e.g. they do not require you to
|
|||
|
accompany any object code using FFTW with the corresponding source
|
|||
|
code.) For these alternative terms you must purchase a license from
|
|||
|
MIT's Technology Licensing Office. Users interested in such a license
|
|||
|
should contact us (<fftw@fftw.org>) for more information.
|
|||
|
|