893 lines
22 KiB
C
893 lines
22 KiB
C
/*
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* Copyright (c) 2003, 2007-14 Matteo Frigo
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* Copyright (c) 2003, 2007-14 Massachusetts Institute of Technology
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*
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* This program is free software; you can redistribute it and/or modify
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* it under the terms of the GNU General Public License as published by
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* the Free Software Foundation; either version 2 of the License, or
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* (at your option) any later version.
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*
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* This program is distributed in the hope that it will be useful,
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* but WITHOUT ANY WARRANTY; without even the implied warranty of
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* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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* GNU General Public License for more details.
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*
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* You should have received a copy of the GNU General Public License
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* along with this program; if not, write to the Free Software
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* Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
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*
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*/
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/* This file was automatically generated --- DO NOT EDIT */
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/* Generated on Tue Sep 14 10:47:12 EDT 2021 */
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#include "rdft/codelet-rdft.h"
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#if defined(ARCH_PREFERS_FMA) || defined(ISA_EXTENSION_PREFERS_FMA)
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/* Generated by: ../../../genfft/gen_hc2cdft.native -fma -compact -variables 4 -pipeline-latency 4 -sign 1 -n 16 -dif -name hc2cbdft_16 -include rdft/scalar/hc2cb.h */
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/*
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* This function contains 206 FP additions, 100 FP multiplications,
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* (or, 136 additions, 30 multiplications, 70 fused multiply/add),
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* 66 stack variables, 3 constants, and 64 memory accesses
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*/
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#include "rdft/scalar/hc2cb.h"
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static void hc2cbdft_16(R *Rp, R *Ip, R *Rm, R *Im, const R *W, stride rs, INT mb, INT me, INT ms)
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{
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DK(KP923879532, +0.923879532511286756128183189396788286822416626);
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DK(KP414213562, +0.414213562373095048801688724209698078569671875);
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DK(KP707106781, +0.707106781186547524400844362104849039284835938);
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{
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INT m;
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for (m = mb, W = W + ((mb - 1) * 30); m < me; m = m + 1, Rp = Rp + ms, Ip = Ip + ms, Rm = Rm - ms, Im = Im - ms, W = W + 30, MAKE_VOLATILE_STRIDE(64, rs)) {
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E Tf, T20, T32, T3Q, T3f, T3V, TN, T2a, T1m, T2f, T2G, T3G, T2T, T3L, T1F;
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E T26, T2J, T2M, T2N, T2U, T2V, T3H, Tu, T25, T3i, T3R, T1a, T2g, T1y, T21;
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E T39, T3W, T1p, T2b;
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{
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E T3, T1e, TA, T1C, T6, Tx, T1h, T1D, Td, T1A, TL, T1k, Ta, T1z, TG;
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E T1j;
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{
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E T1, T2, T1f, T1g;
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T1 = Rp[0];
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T2 = Rm[WS(rs, 7)];
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T3 = T1 + T2;
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T1e = T1 - T2;
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{
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E Ty, Tz, T4, T5;
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Ty = Ip[0];
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Tz = Im[WS(rs, 7)];
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TA = Ty + Tz;
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T1C = Ty - Tz;
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T4 = Rp[WS(rs, 4)];
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T5 = Rm[WS(rs, 3)];
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T6 = T4 + T5;
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Tx = T4 - T5;
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}
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T1f = Ip[WS(rs, 4)];
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T1g = Im[WS(rs, 3)];
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T1h = T1f + T1g;
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T1D = T1f - T1g;
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{
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E Tb, Tc, TH, TI, TJ, TK;
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Tb = Rm[WS(rs, 1)];
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Tc = Rp[WS(rs, 6)];
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TH = Tb - Tc;
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TI = Im[WS(rs, 1)];
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TJ = Ip[WS(rs, 6)];
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TK = TI + TJ;
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Td = Tb + Tc;
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T1A = TJ - TI;
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TL = TH + TK;
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T1k = TH - TK;
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}
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{
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E T8, T9, TC, TD, TE, TF;
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T8 = Rp[WS(rs, 2)];
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T9 = Rm[WS(rs, 5)];
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TC = T8 - T9;
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TD = Ip[WS(rs, 2)];
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TE = Im[WS(rs, 5)];
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TF = TD + TE;
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Ta = T8 + T9;
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T1z = TD - TE;
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TG = TC + TF;
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T1j = TC - TF;
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}
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}
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{
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E T7, Te, T30, T31;
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T7 = T3 + T6;
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Te = Ta + Td;
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Tf = T7 + Te;
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T20 = T7 - Te;
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T30 = TA - Tx;
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T31 = T1j - T1k;
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T32 = FMA(KP707106781, T31, T30);
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T3Q = FNMS(KP707106781, T31, T30);
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}
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{
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E T3d, T3e, TB, TM;
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T3d = T1e + T1h;
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T3e = TG + TL;
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T3f = FNMS(KP707106781, T3e, T3d);
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T3V = FMA(KP707106781, T3e, T3d);
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TB = Tx + TA;
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TM = TG - TL;
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TN = FMA(KP707106781, TM, TB);
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T2a = FNMS(KP707106781, TM, TB);
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}
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{
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E T1i, T1l, T2E, T2F;
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T1i = T1e - T1h;
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T1l = T1j + T1k;
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T1m = FMA(KP707106781, T1l, T1i);
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T2f = FNMS(KP707106781, T1l, T1i);
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T2E = T3 - T6;
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T2F = T1A - T1z;
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T2G = T2E + T2F;
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T3G = T2E - T2F;
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}
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{
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E T2R, T2S, T1B, T1E;
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T2R = Ta - Td;
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T2S = T1C - T1D;
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T2T = T2R + T2S;
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T3L = T2S - T2R;
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T1B = T1z + T1A;
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T1E = T1C + T1D;
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T1F = T1B + T1E;
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T26 = T1E - T1B;
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}
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}
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{
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E Ti, T1s, Tl, T1t, TS, TX, T34, T33, T2I, T2H, Tp, T1v, Ts, T1w, T13;
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E T18, T37, T36, T2L, T2K;
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{
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E TT, TR, TO, TW;
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{
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E Tg, Th, TP, TQ;
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Tg = Rp[WS(rs, 1)];
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Th = Rm[WS(rs, 6)];
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Ti = Tg + Th;
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TT = Tg - Th;
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TP = Ip[WS(rs, 1)];
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TQ = Im[WS(rs, 6)];
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TR = TP + TQ;
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T1s = TP - TQ;
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}
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{
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E Tj, Tk, TU, TV;
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Tj = Rp[WS(rs, 5)];
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Tk = Rm[WS(rs, 2)];
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Tl = Tj + Tk;
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TO = Tj - Tk;
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TU = Ip[WS(rs, 5)];
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TV = Im[WS(rs, 2)];
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TW = TU + TV;
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T1t = TU - TV;
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}
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TS = TO + TR;
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TX = TT - TW;
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T34 = TR - TO;
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T33 = TT + TW;
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T2I = T1s - T1t;
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T2H = Ti - Tl;
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}
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{
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E T14, T12, TZ, T17;
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{
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E Tn, To, T10, T11;
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Tn = Rm[0];
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To = Rp[WS(rs, 7)];
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Tp = Tn + To;
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T14 = Tn - To;
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T10 = Im[0];
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T11 = Ip[WS(rs, 7)];
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T12 = T10 + T11;
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T1v = T11 - T10;
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}
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{
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E Tq, Tr, T15, T16;
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Tq = Rp[WS(rs, 3)];
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Tr = Rm[WS(rs, 4)];
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Ts = Tq + Tr;
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TZ = Tq - Tr;
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T15 = Ip[WS(rs, 3)];
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T16 = Im[WS(rs, 4)];
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T17 = T15 + T16;
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T1w = T15 - T16;
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}
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T13 = TZ - T12;
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T18 = T14 - T17;
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T37 = TZ + T12;
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T36 = T14 + T17;
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T2L = T1v - T1w;
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T2K = Tp - Ts;
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}
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T2J = T2H - T2I;
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T2M = T2K + T2L;
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T2N = T2J + T2M;
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T2U = T2H + T2I;
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T2V = T2L - T2K;
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T3H = T2V - T2U;
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{
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E Tm, Tt, T3g, T3h;
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Tm = Ti + Tl;
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Tt = Tp + Ts;
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Tu = Tm + Tt;
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T25 = Tm - Tt;
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T3g = FNMS(KP414213562, T33, T34);
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T3h = FNMS(KP414213562, T36, T37);
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T3i = T3g + T3h;
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T3R = T3h - T3g;
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}
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{
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E TY, T19, T1u, T1x;
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TY = FMA(KP414213562, TX, TS);
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T19 = FNMS(KP414213562, T18, T13);
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T1a = TY + T19;
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T2g = T19 - TY;
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T1u = T1s + T1t;
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T1x = T1v + T1w;
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T1y = T1u + T1x;
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T21 = T1x - T1u;
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}
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{
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E T35, T38, T1n, T1o;
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T35 = FMA(KP414213562, T34, T33);
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T38 = FMA(KP414213562, T37, T36);
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T39 = T35 - T38;
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T3W = T35 + T38;
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T1n = FNMS(KP414213562, TS, TX);
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T1o = FMA(KP414213562, T13, T18);
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T1p = T1n + T1o;
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T2b = T1n - T1o;
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}
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}
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{
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E Tv, T1G, T1b, T1q, T1c, T1H, Tw, T1r, T1I, T1d;
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Tv = Tf + Tu;
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T1G = T1y + T1F;
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T1b = FMA(KP923879532, T1a, TN);
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T1q = FMA(KP923879532, T1p, T1m);
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Tw = W[0];
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T1c = Tw * T1b;
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T1H = Tw * T1q;
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T1d = W[1];
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T1r = FMA(T1d, T1q, T1c);
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T1I = FNMS(T1d, T1b, T1H);
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Rp[0] = Tv - T1r;
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Ip[0] = T1G + T1I;
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Rm[0] = Tv + T1r;
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Im[0] = T1I - T1G;
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}
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{
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E T1N, T1J, T1L, T1M, T1V, T1Q, T1T, T1R, T1X, T1K, T1P;
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T1N = T1F - T1y;
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T1K = Tf - Tu;
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T1J = W[14];
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T1L = T1J * T1K;
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T1M = W[15];
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T1V = T1M * T1K;
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T1Q = FNMS(KP923879532, T1a, TN);
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T1T = FNMS(KP923879532, T1p, T1m);
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T1P = W[16];
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T1R = T1P * T1Q;
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T1X = T1P * T1T;
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{
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E T1O, T1W, T1U, T1Y, T1S;
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T1O = FNMS(T1M, T1N, T1L);
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T1W = FMA(T1J, T1N, T1V);
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T1S = W[17];
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T1U = FMA(T1S, T1T, T1R);
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T1Y = FNMS(T1S, T1Q, T1X);
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Rp[WS(rs, 4)] = T1O - T1U;
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Ip[WS(rs, 4)] = T1W + T1Y;
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Rm[WS(rs, 4)] = T1O + T1U;
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Im[WS(rs, 4)] = T1Y - T1W;
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}
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}
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{
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E T2r, T2n, T2p, T2q, T2z, T2u, T2x, T2v, T2B, T2o, T2t;
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T2r = T26 - T25;
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T2o = T20 - T21;
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T2n = W[22];
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T2p = T2n * T2o;
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T2q = W[23];
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T2z = T2q * T2o;
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T2u = FNMS(KP923879532, T2b, T2a);
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T2x = FNMS(KP923879532, T2g, T2f);
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T2t = W[24];
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T2v = T2t * T2u;
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T2B = T2t * T2x;
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{
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E T2s, T2A, T2y, T2C, T2w;
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T2s = FNMS(T2q, T2r, T2p);
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T2A = FMA(T2n, T2r, T2z);
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T2w = W[25];
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T2y = FMA(T2w, T2x, T2v);
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T2C = FNMS(T2w, T2u, T2B);
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Rp[WS(rs, 6)] = T2s - T2y;
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Ip[WS(rs, 6)] = T2A + T2C;
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Rm[WS(rs, 6)] = T2s + T2y;
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Im[WS(rs, 6)] = T2C - T2A;
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}
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}
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{
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E T27, T1Z, T23, T24, T2j, T2c, T2h, T2d, T2l, T22, T29;
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T27 = T25 + T26;
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T22 = T20 + T21;
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T1Z = W[6];
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T23 = T1Z * T22;
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T24 = W[7];
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T2j = T24 * T22;
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T2c = FMA(KP923879532, T2b, T2a);
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T2h = FMA(KP923879532, T2g, T2f);
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T29 = W[8];
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T2d = T29 * T2c;
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T2l = T29 * T2h;
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{
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E T28, T2k, T2i, T2m, T2e;
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T28 = FNMS(T24, T27, T23);
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T2k = FMA(T1Z, T27, T2j);
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T2e = W[9];
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T2i = FMA(T2e, T2h, T2d);
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T2m = FNMS(T2e, T2c, T2l);
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Rp[WS(rs, 2)] = T28 - T2i;
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Ip[WS(rs, 2)] = T2k + T2m;
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Rm[WS(rs, 2)] = T28 + T2i;
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Im[WS(rs, 2)] = T2m - T2k;
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}
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}
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{
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E T3N, T47, T43, T45, T46, T4f, T3F, T3J, T3K, T3Z, T3S, T3X, T3T, T41, T4a;
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E T4d, T4b, T4h;
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{
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E T3M, T44, T3I, T3P, T49;
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T3M = T2J - T2M;
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T3N = FMA(KP707106781, T3M, T3L);
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T47 = FNMS(KP707106781, T3M, T3L);
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T44 = FNMS(KP707106781, T3H, T3G);
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T43 = W[26];
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T45 = T43 * T44;
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T46 = W[27];
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T4f = T46 * T44;
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T3I = FMA(KP707106781, T3H, T3G);
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T3F = W[10];
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T3J = T3F * T3I;
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T3K = W[11];
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T3Z = T3K * T3I;
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T3S = FMA(KP923879532, T3R, T3Q);
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T3X = FNMS(KP923879532, T3W, T3V);
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T3P = W[12];
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T3T = T3P * T3S;
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T41 = T3P * T3X;
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T4a = FNMS(KP923879532, T3R, T3Q);
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T4d = FMA(KP923879532, T3W, T3V);
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T49 = W[28];
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T4b = T49 * T4a;
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T4h = T49 * T4d;
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}
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{
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E T3O, T40, T3Y, T42, T3U;
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T3O = FNMS(T3K, T3N, T3J);
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T40 = FMA(T3F, T3N, T3Z);
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T3U = W[13];
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T3Y = FMA(T3U, T3X, T3T);
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T42 = FNMS(T3U, T3S, T41);
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Rp[WS(rs, 3)] = T3O - T3Y;
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Ip[WS(rs, 3)] = T40 + T42;
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Rm[WS(rs, 3)] = T3O + T3Y;
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Im[WS(rs, 3)] = T42 - T40;
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}
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{
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E T48, T4g, T4e, T4i, T4c;
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T48 = FNMS(T46, T47, T45);
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T4g = FMA(T43, T47, T4f);
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T4c = W[29];
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T4e = FMA(T4c, T4d, T4b);
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T4i = FNMS(T4c, T4a, T4h);
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Rp[WS(rs, 7)] = T48 - T4e;
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Ip[WS(rs, 7)] = T4g + T4i;
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Rm[WS(rs, 7)] = T48 + T4e;
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Im[WS(rs, 7)] = T4i - T4g;
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}
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}
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{
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E T2X, T3t, T3p, T3r, T3s, T3B, T2D, T2P, T2Q, T3l, T3a, T3j, T3b, T3n, T3w;
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E T3z, T3x, T3D;
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{
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E T2W, T3q, T2O, T2Z, T3v;
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T2W = T2U + T2V;
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T2X = FMA(KP707106781, T2W, T2T);
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T3t = FNMS(KP707106781, T2W, T2T);
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T3q = FNMS(KP707106781, T2N, T2G);
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T3p = W[18];
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T3r = T3p * T3q;
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T3s = W[19];
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T3B = T3s * T3q;
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T2O = FMA(KP707106781, T2N, T2G);
|
|
T2D = W[2];
|
|
T2P = T2D * T2O;
|
|
T2Q = W[3];
|
|
T3l = T2Q * T2O;
|
|
T3a = FMA(KP923879532, T39, T32);
|
|
T3j = FNMS(KP923879532, T3i, T3f);
|
|
T2Z = W[4];
|
|
T3b = T2Z * T3a;
|
|
T3n = T2Z * T3j;
|
|
T3w = FNMS(KP923879532, T39, T32);
|
|
T3z = FMA(KP923879532, T3i, T3f);
|
|
T3v = W[20];
|
|
T3x = T3v * T3w;
|
|
T3D = T3v * T3z;
|
|
}
|
|
{
|
|
E T2Y, T3m, T3k, T3o, T3c;
|
|
T2Y = FNMS(T2Q, T2X, T2P);
|
|
T3m = FMA(T2D, T2X, T3l);
|
|
T3c = W[5];
|
|
T3k = FMA(T3c, T3j, T3b);
|
|
T3o = FNMS(T3c, T3a, T3n);
|
|
Rp[WS(rs, 1)] = T2Y - T3k;
|
|
Ip[WS(rs, 1)] = T3m + T3o;
|
|
Rm[WS(rs, 1)] = T2Y + T3k;
|
|
Im[WS(rs, 1)] = T3o - T3m;
|
|
}
|
|
{
|
|
E T3u, T3C, T3A, T3E, T3y;
|
|
T3u = FNMS(T3s, T3t, T3r);
|
|
T3C = FMA(T3p, T3t, T3B);
|
|
T3y = W[21];
|
|
T3A = FMA(T3y, T3z, T3x);
|
|
T3E = FNMS(T3y, T3w, T3D);
|
|
Rp[WS(rs, 5)] = T3u - T3A;
|
|
Ip[WS(rs, 5)] = T3C + T3E;
|
|
Rm[WS(rs, 5)] = T3u + T3A;
|
|
Im[WS(rs, 5)] = T3E - T3C;
|
|
}
|
|
}
|
|
}
|
|
}
|
|
}
|
|
|
|
static const tw_instr twinstr[] = {
|
|
{ TW_FULL, 1, 16 },
|
|
{ TW_NEXT, 1, 0 }
|
|
};
|
|
|
|
static const hc2c_desc desc = { 16, "hc2cbdft_16", twinstr, &GENUS, { 136, 30, 70, 0 } };
|
|
|
|
void X(codelet_hc2cbdft_16) (planner *p) {
|
|
X(khc2c_register) (p, hc2cbdft_16, &desc, HC2C_VIA_DFT);
|
|
}
|
|
#else
|
|
|
|
/* Generated by: ../../../genfft/gen_hc2cdft.native -compact -variables 4 -pipeline-latency 4 -sign 1 -n 16 -dif -name hc2cbdft_16 -include rdft/scalar/hc2cb.h */
|
|
|
|
/*
|
|
* This function contains 206 FP additions, 84 FP multiplications,
|
|
* (or, 168 additions, 46 multiplications, 38 fused multiply/add),
|
|
* 60 stack variables, 3 constants, and 64 memory accesses
|
|
*/
|
|
#include "rdft/scalar/hc2cb.h"
|
|
|
|
static void hc2cbdft_16(R *Rp, R *Ip, R *Rm, R *Im, const R *W, stride rs, INT mb, INT me, INT ms)
|
|
{
|
|
DK(KP923879532, +0.923879532511286756128183189396788286822416626);
|
|
DK(KP382683432, +0.382683432365089771728459984030398866761344562);
|
|
DK(KP707106781, +0.707106781186547524400844362104849039284835938);
|
|
{
|
|
INT m;
|
|
for (m = mb, W = W + ((mb - 1) * 30); m < me; m = m + 1, Rp = Rp + ms, Ip = Ip + ms, Rm = Rm - ms, Im = Im - ms, W = W + 30, MAKE_VOLATILE_STRIDE(64, rs)) {
|
|
E TB, T2L, T30, T1n, Tf, T1U, T2H, T3p, T1E, T1Z, TM, T31, T2s, T3k, T1i;
|
|
E T2M, Tu, T1Y, T2Q, T2X, T2T, T2Y, TY, T1d, T19, T1e, T2v, T2C, T2y, T2D;
|
|
E T1x, T1V;
|
|
{
|
|
E T3, T1j, TA, T1B, T6, Tx, T1m, T1C, Ta, TC, TF, T1y, Td, TH, TK;
|
|
E T1z;
|
|
{
|
|
E T1, T2, Ty, Tz;
|
|
T1 = Rp[0];
|
|
T2 = Rm[WS(rs, 7)];
|
|
T3 = T1 + T2;
|
|
T1j = T1 - T2;
|
|
Ty = Ip[0];
|
|
Tz = Im[WS(rs, 7)];
|
|
TA = Ty + Tz;
|
|
T1B = Ty - Tz;
|
|
}
|
|
{
|
|
E T4, T5, T1k, T1l;
|
|
T4 = Rp[WS(rs, 4)];
|
|
T5 = Rm[WS(rs, 3)];
|
|
T6 = T4 + T5;
|
|
Tx = T4 - T5;
|
|
T1k = Ip[WS(rs, 4)];
|
|
T1l = Im[WS(rs, 3)];
|
|
T1m = T1k + T1l;
|
|
T1C = T1k - T1l;
|
|
}
|
|
{
|
|
E T8, T9, TD, TE;
|
|
T8 = Rp[WS(rs, 2)];
|
|
T9 = Rm[WS(rs, 5)];
|
|
Ta = T8 + T9;
|
|
TC = T8 - T9;
|
|
TD = Ip[WS(rs, 2)];
|
|
TE = Im[WS(rs, 5)];
|
|
TF = TD + TE;
|
|
T1y = TD - TE;
|
|
}
|
|
{
|
|
E Tb, Tc, TI, TJ;
|
|
Tb = Rm[WS(rs, 1)];
|
|
Tc = Rp[WS(rs, 6)];
|
|
Td = Tb + Tc;
|
|
TH = Tb - Tc;
|
|
TI = Im[WS(rs, 1)];
|
|
TJ = Ip[WS(rs, 6)];
|
|
TK = TI + TJ;
|
|
T1z = TJ - TI;
|
|
}
|
|
{
|
|
E T7, Te, TG, TL;
|
|
TB = Tx + TA;
|
|
T2L = TA - Tx;
|
|
T30 = T1j + T1m;
|
|
T1n = T1j - T1m;
|
|
T7 = T3 + T6;
|
|
Te = Ta + Td;
|
|
Tf = T7 + Te;
|
|
T1U = T7 - Te;
|
|
{
|
|
E T2F, T2G, T1A, T1D;
|
|
T2F = Ta - Td;
|
|
T2G = T1B - T1C;
|
|
T2H = T2F + T2G;
|
|
T3p = T2G - T2F;
|
|
T1A = T1y + T1z;
|
|
T1D = T1B + T1C;
|
|
T1E = T1A + T1D;
|
|
T1Z = T1D - T1A;
|
|
}
|
|
TG = TC + TF;
|
|
TL = TH + TK;
|
|
TM = KP707106781 * (TG - TL);
|
|
T31 = KP707106781 * (TG + TL);
|
|
{
|
|
E T2q, T2r, T1g, T1h;
|
|
T2q = T3 - T6;
|
|
T2r = T1z - T1y;
|
|
T2s = T2q + T2r;
|
|
T3k = T2q - T2r;
|
|
T1g = TC - TF;
|
|
T1h = TH - TK;
|
|
T1i = KP707106781 * (T1g + T1h);
|
|
T2M = KP707106781 * (T1g - T1h);
|
|
}
|
|
}
|
|
}
|
|
{
|
|
E Ti, TT, TR, T1r, Tl, TO, TW, T1s, Tp, T14, T12, T1u, Ts, TZ, T17;
|
|
E T1v;
|
|
{
|
|
E Tg, Th, TP, TQ;
|
|
Tg = Rp[WS(rs, 1)];
|
|
Th = Rm[WS(rs, 6)];
|
|
Ti = Tg + Th;
|
|
TT = Tg - Th;
|
|
TP = Ip[WS(rs, 1)];
|
|
TQ = Im[WS(rs, 6)];
|
|
TR = TP + TQ;
|
|
T1r = TP - TQ;
|
|
}
|
|
{
|
|
E Tj, Tk, TU, TV;
|
|
Tj = Rp[WS(rs, 5)];
|
|
Tk = Rm[WS(rs, 2)];
|
|
Tl = Tj + Tk;
|
|
TO = Tj - Tk;
|
|
TU = Ip[WS(rs, 5)];
|
|
TV = Im[WS(rs, 2)];
|
|
TW = TU + TV;
|
|
T1s = TU - TV;
|
|
}
|
|
{
|
|
E Tn, To, T10, T11;
|
|
Tn = Rm[0];
|
|
To = Rp[WS(rs, 7)];
|
|
Tp = Tn + To;
|
|
T14 = Tn - To;
|
|
T10 = Im[0];
|
|
T11 = Ip[WS(rs, 7)];
|
|
T12 = T10 + T11;
|
|
T1u = T11 - T10;
|
|
}
|
|
{
|
|
E Tq, Tr, T15, T16;
|
|
Tq = Rp[WS(rs, 3)];
|
|
Tr = Rm[WS(rs, 4)];
|
|
Ts = Tq + Tr;
|
|
TZ = Tq - Tr;
|
|
T15 = Ip[WS(rs, 3)];
|
|
T16 = Im[WS(rs, 4)];
|
|
T17 = T15 + T16;
|
|
T1v = T15 - T16;
|
|
}
|
|
{
|
|
E Tm, Tt, T2O, T2P;
|
|
Tm = Ti + Tl;
|
|
Tt = Tp + Ts;
|
|
Tu = Tm + Tt;
|
|
T1Y = Tm - Tt;
|
|
T2O = TR - TO;
|
|
T2P = TT + TW;
|
|
T2Q = FMA(KP382683432, T2O, KP923879532 * T2P);
|
|
T2X = FNMS(KP923879532, T2O, KP382683432 * T2P);
|
|
}
|
|
{
|
|
E T2R, T2S, TS, TX;
|
|
T2R = TZ + T12;
|
|
T2S = T14 + T17;
|
|
T2T = FMA(KP382683432, T2R, KP923879532 * T2S);
|
|
T2Y = FNMS(KP923879532, T2R, KP382683432 * T2S);
|
|
TS = TO + TR;
|
|
TX = TT - TW;
|
|
TY = FMA(KP923879532, TS, KP382683432 * TX);
|
|
T1d = FNMS(KP382683432, TS, KP923879532 * TX);
|
|
}
|
|
{
|
|
E T13, T18, T2t, T2u;
|
|
T13 = TZ - T12;
|
|
T18 = T14 - T17;
|
|
T19 = FNMS(KP382683432, T18, KP923879532 * T13);
|
|
T1e = FMA(KP382683432, T13, KP923879532 * T18);
|
|
T2t = Ti - Tl;
|
|
T2u = T1r - T1s;
|
|
T2v = T2t - T2u;
|
|
T2C = T2t + T2u;
|
|
}
|
|
{
|
|
E T2w, T2x, T1t, T1w;
|
|
T2w = Tp - Ts;
|
|
T2x = T1u - T1v;
|
|
T2y = T2w + T2x;
|
|
T2D = T2x - T2w;
|
|
T1t = T1r + T1s;
|
|
T1w = T1u + T1v;
|
|
T1x = T1t + T1w;
|
|
T1V = T1w - T1t;
|
|
}
|
|
}
|
|
{
|
|
E Tv, T1F, T1b, T1N, T1p, T1P, T1L, T1R;
|
|
Tv = Tf + Tu;
|
|
T1F = T1x + T1E;
|
|
{
|
|
E TN, T1a, T1f, T1o;
|
|
TN = TB + TM;
|
|
T1a = TY + T19;
|
|
T1b = TN + T1a;
|
|
T1N = TN - T1a;
|
|
T1f = T1d + T1e;
|
|
T1o = T1i + T1n;
|
|
T1p = T1f + T1o;
|
|
T1P = T1o - T1f;
|
|
{
|
|
E T1I, T1K, T1H, T1J;
|
|
T1I = Tf - Tu;
|
|
T1K = T1E - T1x;
|
|
T1H = W[14];
|
|
T1J = W[15];
|
|
T1L = FNMS(T1J, T1K, T1H * T1I);
|
|
T1R = FMA(T1J, T1I, T1H * T1K);
|
|
}
|
|
}
|
|
{
|
|
E T1q, T1G, Tw, T1c;
|
|
Tw = W[0];
|
|
T1c = W[1];
|
|
T1q = FMA(Tw, T1b, T1c * T1p);
|
|
T1G = FNMS(T1c, T1b, Tw * T1p);
|
|
Rp[0] = Tv - T1q;
|
|
Ip[0] = T1F + T1G;
|
|
Rm[0] = Tv + T1q;
|
|
Im[0] = T1G - T1F;
|
|
}
|
|
{
|
|
E T1Q, T1S, T1M, T1O;
|
|
T1M = W[16];
|
|
T1O = W[17];
|
|
T1Q = FMA(T1M, T1N, T1O * T1P);
|
|
T1S = FNMS(T1O, T1N, T1M * T1P);
|
|
Rp[WS(rs, 4)] = T1L - T1Q;
|
|
Ip[WS(rs, 4)] = T1R + T1S;
|
|
Rm[WS(rs, 4)] = T1L + T1Q;
|
|
Im[WS(rs, 4)] = T1S - T1R;
|
|
}
|
|
}
|
|
{
|
|
E T25, T2j, T29, T2l, T21, T2b, T2h, T2n;
|
|
{
|
|
E T23, T24, T27, T28;
|
|
T23 = TB - TM;
|
|
T24 = T1d - T1e;
|
|
T25 = T23 + T24;
|
|
T2j = T23 - T24;
|
|
T27 = T19 - TY;
|
|
T28 = T1n - T1i;
|
|
T29 = T27 + T28;
|
|
T2l = T28 - T27;
|
|
}
|
|
{
|
|
E T1W, T20, T1T, T1X;
|
|
T1W = T1U + T1V;
|
|
T20 = T1Y + T1Z;
|
|
T1T = W[6];
|
|
T1X = W[7];
|
|
T21 = FNMS(T1X, T20, T1T * T1W);
|
|
T2b = FMA(T1X, T1W, T1T * T20);
|
|
}
|
|
{
|
|
E T2e, T2g, T2d, T2f;
|
|
T2e = T1U - T1V;
|
|
T2g = T1Z - T1Y;
|
|
T2d = W[22];
|
|
T2f = W[23];
|
|
T2h = FNMS(T2f, T2g, T2d * T2e);
|
|
T2n = FMA(T2f, T2e, T2d * T2g);
|
|
}
|
|
{
|
|
E T2a, T2c, T22, T26;
|
|
T22 = W[8];
|
|
T26 = W[9];
|
|
T2a = FMA(T22, T25, T26 * T29);
|
|
T2c = FNMS(T26, T25, T22 * T29);
|
|
Rp[WS(rs, 2)] = T21 - T2a;
|
|
Ip[WS(rs, 2)] = T2b + T2c;
|
|
Rm[WS(rs, 2)] = T21 + T2a;
|
|
Im[WS(rs, 2)] = T2c - T2b;
|
|
}
|
|
{
|
|
E T2m, T2o, T2i, T2k;
|
|
T2i = W[24];
|
|
T2k = W[25];
|
|
T2m = FMA(T2i, T2j, T2k * T2l);
|
|
T2o = FNMS(T2k, T2j, T2i * T2l);
|
|
Rp[WS(rs, 6)] = T2h - T2m;
|
|
Ip[WS(rs, 6)] = T2n + T2o;
|
|
Rm[WS(rs, 6)] = T2h + T2m;
|
|
Im[WS(rs, 6)] = T2o - T2n;
|
|
}
|
|
}
|
|
{
|
|
E T2A, T38, T2I, T3a, T2V, T3d, T33, T3f, T2z, T2E;
|
|
T2z = KP707106781 * (T2v + T2y);
|
|
T2A = T2s + T2z;
|
|
T38 = T2s - T2z;
|
|
T2E = KP707106781 * (T2C + T2D);
|
|
T2I = T2E + T2H;
|
|
T3a = T2H - T2E;
|
|
{
|
|
E T2N, T2U, T2Z, T32;
|
|
T2N = T2L + T2M;
|
|
T2U = T2Q - T2T;
|
|
T2V = T2N + T2U;
|
|
T3d = T2N - T2U;
|
|
T2Z = T2X + T2Y;
|
|
T32 = T30 - T31;
|
|
T33 = T2Z + T32;
|
|
T3f = T32 - T2Z;
|
|
}
|
|
{
|
|
E T2J, T35, T34, T36;
|
|
{
|
|
E T2p, T2B, T2K, T2W;
|
|
T2p = W[2];
|
|
T2B = W[3];
|
|
T2J = FNMS(T2B, T2I, T2p * T2A);
|
|
T35 = FMA(T2B, T2A, T2p * T2I);
|
|
T2K = W[4];
|
|
T2W = W[5];
|
|
T34 = FMA(T2K, T2V, T2W * T33);
|
|
T36 = FNMS(T2W, T2V, T2K * T33);
|
|
}
|
|
Rp[WS(rs, 1)] = T2J - T34;
|
|
Ip[WS(rs, 1)] = T35 + T36;
|
|
Rm[WS(rs, 1)] = T2J + T34;
|
|
Im[WS(rs, 1)] = T36 - T35;
|
|
}
|
|
{
|
|
E T3b, T3h, T3g, T3i;
|
|
{
|
|
E T37, T39, T3c, T3e;
|
|
T37 = W[18];
|
|
T39 = W[19];
|
|
T3b = FNMS(T39, T3a, T37 * T38);
|
|
T3h = FMA(T39, T38, T37 * T3a);
|
|
T3c = W[20];
|
|
T3e = W[21];
|
|
T3g = FMA(T3c, T3d, T3e * T3f);
|
|
T3i = FNMS(T3e, T3d, T3c * T3f);
|
|
}
|
|
Rp[WS(rs, 5)] = T3b - T3g;
|
|
Ip[WS(rs, 5)] = T3h + T3i;
|
|
Rm[WS(rs, 5)] = T3b + T3g;
|
|
Im[WS(rs, 5)] = T3i - T3h;
|
|
}
|
|
}
|
|
{
|
|
E T3m, T3E, T3q, T3G, T3v, T3J, T3z, T3L, T3l, T3o;
|
|
T3l = KP707106781 * (T2D - T2C);
|
|
T3m = T3k + T3l;
|
|
T3E = T3k - T3l;
|
|
T3o = KP707106781 * (T2v - T2y);
|
|
T3q = T3o + T3p;
|
|
T3G = T3p - T3o;
|
|
{
|
|
E T3t, T3u, T3x, T3y;
|
|
T3t = T2L - T2M;
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|
T3u = T2X - T2Y;
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|
T3v = T3t + T3u;
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|
T3J = T3t - T3u;
|
|
T3x = T31 + T30;
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|
T3y = T2Q + T2T;
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|
T3z = T3x - T3y;
|
|
T3L = T3y + T3x;
|
|
}
|
|
{
|
|
E T3r, T3B, T3A, T3C;
|
|
{
|
|
E T3j, T3n, T3s, T3w;
|
|
T3j = W[10];
|
|
T3n = W[11];
|
|
T3r = FNMS(T3n, T3q, T3j * T3m);
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|
T3B = FMA(T3n, T3m, T3j * T3q);
|
|
T3s = W[12];
|
|
T3w = W[13];
|
|
T3A = FMA(T3s, T3v, T3w * T3z);
|
|
T3C = FNMS(T3w, T3v, T3s * T3z);
|
|
}
|
|
Rp[WS(rs, 3)] = T3r - T3A;
|
|
Ip[WS(rs, 3)] = T3B + T3C;
|
|
Rm[WS(rs, 3)] = T3r + T3A;
|
|
Im[WS(rs, 3)] = T3C - T3B;
|
|
}
|
|
{
|
|
E T3H, T3N, T3M, T3O;
|
|
{
|
|
E T3D, T3F, T3I, T3K;
|
|
T3D = W[26];
|
|
T3F = W[27];
|
|
T3H = FNMS(T3F, T3G, T3D * T3E);
|
|
T3N = FMA(T3F, T3E, T3D * T3G);
|
|
T3I = W[28];
|
|
T3K = W[29];
|
|
T3M = FMA(T3I, T3J, T3K * T3L);
|
|
T3O = FNMS(T3K, T3J, T3I * T3L);
|
|
}
|
|
Rp[WS(rs, 7)] = T3H - T3M;
|
|
Ip[WS(rs, 7)] = T3N + T3O;
|
|
Rm[WS(rs, 7)] = T3H + T3M;
|
|
Im[WS(rs, 7)] = T3O - T3N;
|
|
}
|
|
}
|
|
}
|
|
}
|
|
}
|
|
|
|
static const tw_instr twinstr[] = {
|
|
{ TW_FULL, 1, 16 },
|
|
{ TW_NEXT, 1, 0 }
|
|
};
|
|
|
|
static const hc2c_desc desc = { 16, "hc2cbdft_16", twinstr, &GENUS, { 168, 46, 38, 0 } };
|
|
|
|
void X(codelet_hc2cbdft_16) (planner *p) {
|
|
X(khc2c_register) (p, hc2cbdft_16, &desc, HC2C_VIA_DFT);
|
|
}
|
|
#endif
|