(* * Copyright (c) 1997-1999 Massachusetts Institute of Technology * Copyright (c) 2003, 2007-14 Matteo Frigo * Copyright (c) 2003, 2007-14 Massachusetts Institute of Technology * * This program 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 * *) open Complex open Util let polyphase m a ph i = a (m * i + ph) let rec divmod n i = if (i < 0) then let (a, b) = divmod n (i + n) in (a - 1, b) else (i / n, i mod n) let unpolyphase m a i = let (x, y) = divmod m i in a y x let lift2 f a b i = f (a i) (b i) (* convolution of signals A and B *) let rec conv na a nb b = let rec naive na a nb b i = sigma 0 na (fun j -> (a j) @* (b (i - j))) and recur na a nb b = if (na <= 1 || nb <= 1) then naive na a nb b else let p = polyphase 2 in let ee = conv (na - na / 2) (p a 0) (nb - nb / 2) (p b 0) and eo = conv (na - na / 2) (p a 0) (nb / 2) (p b 1) and oe = conv (na / 2) (p a 1) (nb - nb / 2) (p b 0) and oo = conv (na / 2) (p a 1) (nb / 2) (p b 1) in unpolyphase 2 (function 0 -> fun i -> (ee i) @+ (oo (i - 1)) | 1 -> fun i -> (eo i) @+ (oe i) | _ -> failwith "recur") (* Karatsuba variant 1: (a+bx)(c+dx) = (ac+bdxx)+((a+b)(c+d)-ac-bd)x *) and karatsuba1 na a nb b = let p = polyphase 2 in let ae = p a 0 and nae = na - na / 2 and ao = p a 1 and nao = na / 2 and be = p b 0 and nbe = nb - nb / 2 and bo = p b 1 and nbo = nb / 2 in let ae = infinite nae ae and ao = infinite nao ao and be = infinite nbe be and bo = infinite nbo bo in let aeo = lift2 (@+) ae ao and naeo = nae and beo = lift2 (@+) be bo and nbeo = nbe in let ee = conv nae ae nbe be and oo = conv nao ao nbo bo and eoeo = conv naeo aeo nbeo beo in let q = function 0 -> fun i -> (ee i) @+ (oo (i - 1)) | 1 -> fun i -> (eoeo i) @- ((ee i) @+ (oo i)) | _ -> failwith "karatsuba1" in unpolyphase 2 q (* Karatsuba variant 2: (a+bx)(c+dx) = ((a+b)c-b(c-dxx))+x((a+b)c-a(c-d)) *) and karatsuba2 na a nb b = let p = polyphase 2 in let ae = p a 0 and nae = na - na / 2 and ao = p a 1 and nao = na / 2 and be = p b 0 and nbe = nb - nb / 2 and bo = p b 1 and nbo = nb / 2 in let ae = infinite nae ae and ao = infinite nao ao and be = infinite nbe be and bo = infinite nbo bo in let c1 = conv nae (lift2 (@+) ae ao) nbe be and c2 = conv nao ao (nbo + 1) (fun i -> be i @- bo (i - 1)) and c3 = conv nae ae nbe (lift2 (@-) be bo) in let q = function 0 -> lift2 (@-) c1 c2 | 1 -> lift2 (@-) c1 c3 | _ -> failwith "karatsuba2" in unpolyphase 2 q and karatsuba na a nb b = let m = na + nb - 1 in if (m < !Magic.karatsuba_min) then recur na a nb b else match !Magic.karatsuba_variant with 1 -> karatsuba1 na a nb b | 2 -> karatsuba2 na a nb b | _ -> failwith "unknown karatsuba variant" and via_circular na a nb b = let m = na + nb - 1 in if (m < !Magic.circular_min) then karatsuba na a nb b else let rec find_min n = if n >= m then n else find_min (2 * n) in circular (find_min 1) a b in let a = infinite na a and b = infinite nb b in let res = array (na + nb - 1) (via_circular na a nb b) in infinite (na + nb - 1) res and circular n a b = let via_dft n a b = let fa = Fft.dft (-1) n a and fb = Fft.dft (-1) n b and scale = inverse_int n in let fab i = ((fa i) @* (fb i)) @* scale in Fft.dft 1 n fab in via_dft n a b