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Chris@10
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1 /*
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Chris@10
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2 * Copyright (c) 2003, 2007-11 Matteo Frigo
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Chris@10
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3 * Copyright (c) 2003, 2007-11 Massachusetts Institute of Technology
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4 *
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5 * This program is free software; you can redistribute it and/or modify
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6 * it under the terms of the GNU General Public License as published by
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7 * the Free Software Foundation; either version 2 of the License, or
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8 * (at your option) any later version.
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9 *
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10 * This program is distributed in the hope that it will be useful,
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11 * but WITHOUT ANY WARRANTY; without even the implied warranty of
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12 * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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13 * GNU General Public License for more details.
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14 *
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15 * You should have received a copy of the GNU General Public License
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16 * along with this program; if not, write to the Free Software
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17 * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301 USA
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18 *
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19 */
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20
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21 /* This file was automatically generated --- DO NOT EDIT */
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22 /* Generated on Sun Nov 25 07:36:59 EST 2012 */
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23
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24 #include "codelet-dft.h"
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25
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26 #ifdef HAVE_FMA
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27
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28 /* Generated by: ../../../genfft/gen_notw_c.native -fma -reorder-insns -schedule-for-pipeline -simd -compact -variables 4 -pipeline-latency 8 -sign 1 -n 9 -name n1bv_9 -include n1b.h */
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29
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30 /*
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31 * This function contains 46 FP additions, 38 FP multiplications,
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32 * (or, 12 additions, 4 multiplications, 34 fused multiply/add),
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33 * 68 stack variables, 19 constants, and 18 memory accesses
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34 */
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35 #include "n1b.h"
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36
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37 static void n1bv_9(const R *ri, const R *ii, R *ro, R *io, stride is, stride os, INT v, INT ivs, INT ovs)
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38 {
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39 DVK(KP939692620, +0.939692620785908384054109277324731469936208134);
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Chris@10
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40 DVK(KP907603734, +0.907603734547952313649323976213898122064543220);
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41 DVK(KP852868531, +0.852868531952443209628250963940074071936020296);
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42 DVK(KP666666666, +0.666666666666666666666666666666666666666666667);
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43 DVK(KP879385241, +0.879385241571816768108218554649462939872416269);
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44 DVK(KP984807753, +0.984807753012208059366743024589523013670643252);
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45 DVK(KP826351822, +0.826351822333069651148283373230685203999624323);
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46 DVK(KP347296355, +0.347296355333860697703433253538629592000751354);
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47 DVK(KP898197570, +0.898197570222573798468955502359086394667167570);
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48 DVK(KP673648177, +0.673648177666930348851716626769314796000375677);
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49 DVK(KP420276625, +0.420276625461206169731530603237061658838781920);
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50 DVK(KP866025403, +0.866025403784438646763723170752936183471402627);
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51 DVK(KP586256827, +0.586256827714544512072145703099641959914944179);
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52 DVK(KP968908795, +0.968908795874236621082202410917456709164223497);
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53 DVK(KP726681596, +0.726681596905677465811651808188092531873167623);
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54 DVK(KP439692620, +0.439692620785908384054109277324731469936208134);
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55 DVK(KP203604859, +0.203604859554852403062088995281827210665664861);
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56 DVK(KP152703644, +0.152703644666139302296566746461370407999248646);
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57 DVK(KP500000000, +0.500000000000000000000000000000000000000000000);
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58 {
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59 INT i;
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60 const R *xi;
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61 R *xo;
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62 xi = ii;
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63 xo = io;
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64 for (i = v; i > 0; i = i - VL, xi = xi + (VL * ivs), xo = xo + (VL * ovs), MAKE_VOLATILE_STRIDE(18, is), MAKE_VOLATILE_STRIDE(18, os)) {
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65 V T1, T2, T3, T6, Tf, T7, T8, Tb, Tc, Tp, T4;
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66 T1 = LD(&(xi[0]), ivs, &(xi[0]));
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67 T2 = LD(&(xi[WS(is, 3)]), ivs, &(xi[WS(is, 1)]));
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68 T3 = LD(&(xi[WS(is, 6)]), ivs, &(xi[0]));
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69 T6 = LD(&(xi[WS(is, 2)]), ivs, &(xi[0]));
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70 Tf = LD(&(xi[WS(is, 1)]), ivs, &(xi[WS(is, 1)]));
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71 T7 = LD(&(xi[WS(is, 5)]), ivs, &(xi[WS(is, 1)]));
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72 T8 = LD(&(xi[WS(is, 8)]), ivs, &(xi[0]));
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73 Tb = LD(&(xi[WS(is, 4)]), ivs, &(xi[0]));
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74 Tc = LD(&(xi[WS(is, 7)]), ivs, &(xi[WS(is, 1)]));
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75 Tp = VSUB(T2, T3);
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76 T4 = VADD(T2, T3);
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77 {
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78 V Te, T9, Tg, Td, TF, T5;
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79 Te = VSUB(T8, T7);
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80 T9 = VADD(T7, T8);
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81 Tg = VADD(Tb, Tc);
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82 Td = VSUB(Tb, Tc);
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83 TF = VADD(T1, T4);
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84 T5 = VFNMS(LDK(KP500000000), T4, T1);
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85 {
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86 V Ta, TH, Th, TG;
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87 Ta = VFNMS(LDK(KP500000000), T9, T6);
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88 TH = VADD(T6, T9);
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89 Th = VFNMS(LDK(KP500000000), Tg, Tf);
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90 TG = VADD(Tf, Tg);
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91 {
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92 V Tr, Tu, Tm, Tv, Ts, Ti, TI, TK;
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93 Tr = VFNMS(LDK(KP152703644), Te, Ta);
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94 Tu = VFMA(LDK(KP203604859), Ta, Te);
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95 Tm = VFNMS(LDK(KP439692620), Td, Ta);
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96 Tv = VFNMS(LDK(KP726681596), Td, Th);
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97 Ts = VFMA(LDK(KP968908795), Th, Td);
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98 Ti = VFNMS(LDK(KP586256827), Th, Te);
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99 TI = VADD(TG, TH);
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100 TK = VMUL(LDK(KP866025403), VSUB(TG, TH));
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101 {
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102 V Tt, TA, Tw, Tz, Tj, TJ, To, TE, Tn;
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103 Tn = VFNMS(LDK(KP420276625), Tm, Te);
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104 Tt = VFNMS(LDK(KP673648177), Ts, Tr);
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105 TA = VFMA(LDK(KP673648177), Ts, Tr);
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106 Tw = VFMA(LDK(KP898197570), Tv, Tu);
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107 Tz = VFNMS(LDK(KP898197570), Tv, Tu);
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108 Tj = VFNMS(LDK(KP347296355), Ti, Td);
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109 ST(&(xo[0]), VADD(TI, TF), ovs, &(xo[0]));
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110 TJ = VFNMS(LDK(KP500000000), TI, TF);
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111 To = VFNMS(LDK(KP826351822), Tn, Th);
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112 TE = VMUL(LDK(KP984807753), VFMA(LDK(KP879385241), Tp, TA));
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113 {
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114 V TB, TD, Tx, Tk, Tq, TC, Ty, Tl;
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115 TB = VFMA(LDK(KP666666666), TA, Tz);
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116 TD = VFMA(LDK(KP852868531), Tw, T5);
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117 Tx = VFNMS(LDK(KP500000000), Tw, Tt);
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118 Tk = VFNMS(LDK(KP907603734), Tj, Ta);
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119 ST(&(xo[WS(os, 6)]), VFNMSI(TK, TJ), ovs, &(xo[0]));
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120 ST(&(xo[WS(os, 3)]), VFMAI(TK, TJ), ovs, &(xo[WS(os, 1)]));
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121 Tq = VMUL(LDK(KP984807753), VFNMS(LDK(KP879385241), Tp, To));
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122 TC = VMUL(LDK(KP866025403), VFNMS(LDK(KP852868531), TB, Tp));
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123 ST(&(xo[WS(os, 8)]), VFNMSI(TE, TD), ovs, &(xo[0]));
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124 ST(&(xo[WS(os, 1)]), VFMAI(TE, TD), ovs, &(xo[WS(os, 1)]));
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125 Ty = VFMA(LDK(KP852868531), Tx, T5);
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126 Tl = VFNMS(LDK(KP939692620), Tk, T5);
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127 ST(&(xo[WS(os, 5)]), VFNMSI(TC, Ty), ovs, &(xo[WS(os, 1)]));
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128 ST(&(xo[WS(os, 4)]), VFMAI(TC, Ty), ovs, &(xo[0]));
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129 ST(&(xo[WS(os, 2)]), VFMAI(Tq, Tl), ovs, &(xo[0]));
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130 ST(&(xo[WS(os, 7)]), VFNMSI(Tq, Tl), ovs, &(xo[WS(os, 1)]));
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131 }
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132 }
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133 }
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134 }
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135 }
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136 }
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137 }
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138 VLEAVE();
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139 }
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140
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141 static const kdft_desc desc = { 9, XSIMD_STRING("n1bv_9"), {12, 4, 34, 0}, &GENUS, 0, 0, 0, 0 };
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142
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143 void XSIMD(codelet_n1bv_9) (planner *p) {
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144 X(kdft_register) (p, n1bv_9, &desc);
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145 }
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146
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147 #else /* HAVE_FMA */
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148
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149 /* Generated by: ../../../genfft/gen_notw_c.native -simd -compact -variables 4 -pipeline-latency 8 -sign 1 -n 9 -name n1bv_9 -include n1b.h */
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150
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151 /*
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152 * This function contains 46 FP additions, 26 FP multiplications,
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153 * (or, 30 additions, 10 multiplications, 16 fused multiply/add),
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154 * 41 stack variables, 14 constants, and 18 memory accesses
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155 */
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156 #include "n1b.h"
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157
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158 static void n1bv_9(const R *ri, const R *ii, R *ro, R *io, stride is, stride os, INT v, INT ivs, INT ovs)
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159 {
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160 DVK(KP342020143, +0.342020143325668733044099614682259580763083368);
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161 DVK(KP813797681, +0.813797681349373692844693217248393223289101568);
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162 DVK(KP939692620, +0.939692620785908384054109277324731469936208134);
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163 DVK(KP296198132, +0.296198132726023843175338011893050938967728390);
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164 DVK(KP642787609, +0.642787609686539326322643409907263432907559884);
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165 DVK(KP663413948, +0.663413948168938396205421319635891297216863310);
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166 DVK(KP556670399, +0.556670399226419366452912952047023132968291906);
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167 DVK(KP766044443, +0.766044443118978035202392650555416673935832457);
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168 DVK(KP984807753, +0.984807753012208059366743024589523013670643252);
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169 DVK(KP150383733, +0.150383733180435296639271897612501926072238258);
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170 DVK(KP852868531, +0.852868531952443209628250963940074071936020296);
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171 DVK(KP173648177, +0.173648177666930348851716626769314796000375677);
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172 DVK(KP866025403, +0.866025403784438646763723170752936183471402627);
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173 DVK(KP500000000, +0.500000000000000000000000000000000000000000000);
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174 {
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175 INT i;
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176 const R *xi;
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177 R *xo;
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178 xi = ii;
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179 xo = io;
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180 for (i = v; i > 0; i = i - VL, xi = xi + (VL * ivs), xo = xo + (VL * ovs), MAKE_VOLATILE_STRIDE(18, is), MAKE_VOLATILE_STRIDE(18, os)) {
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181 V T5, Ty, Tm, Ti, Tw, Th, Tj, To, Tb, Tv, Ta, Tc, Tn;
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182 {
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183 V T1, T2, T3, T4;
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184 T1 = LD(&(xi[0]), ivs, &(xi[0]));
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185 T2 = LD(&(xi[WS(is, 3)]), ivs, &(xi[WS(is, 1)]));
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186 T3 = LD(&(xi[WS(is, 6)]), ivs, &(xi[0]));
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187 T4 = VADD(T2, T3);
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188 T5 = VFNMS(LDK(KP500000000), T4, T1);
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189 Ty = VADD(T1, T4);
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190 Tm = VMUL(LDK(KP866025403), VSUB(T2, T3));
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191 }
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192 {
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193 V Td, Tg, Te, Tf;
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194 Td = LD(&(xi[WS(is, 2)]), ivs, &(xi[0]));
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195 Te = LD(&(xi[WS(is, 5)]), ivs, &(xi[WS(is, 1)]));
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196 Tf = LD(&(xi[WS(is, 8)]), ivs, &(xi[0]));
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197 Tg = VADD(Te, Tf);
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198 Ti = VSUB(Te, Tf);
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199 Tw = VADD(Td, Tg);
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200 Th = VFNMS(LDK(KP500000000), Tg, Td);
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201 Tj = VFNMS(LDK(KP852868531), Ti, VMUL(LDK(KP173648177), Th));
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202 To = VFMA(LDK(KP150383733), Ti, VMUL(LDK(KP984807753), Th));
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203 }
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204 {
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205 V T6, T9, T7, T8;
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206 T6 = LD(&(xi[WS(is, 1)]), ivs, &(xi[WS(is, 1)]));
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207 T7 = LD(&(xi[WS(is, 4)]), ivs, &(xi[0]));
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208 T8 = LD(&(xi[WS(is, 7)]), ivs, &(xi[WS(is, 1)]));
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209 T9 = VADD(T7, T8);
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210 Tb = VSUB(T7, T8);
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211 Tv = VADD(T6, T9);
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212 Ta = VFNMS(LDK(KP500000000), T9, T6);
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213 Tc = VFNMS(LDK(KP556670399), Tb, VMUL(LDK(KP766044443), Ta));
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214 Tn = VFMA(LDK(KP663413948), Tb, VMUL(LDK(KP642787609), Ta));
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215 }
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216 {
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217 V Tx, Tz, TA, Tt, Tu;
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218 Tx = VBYI(VMUL(LDK(KP866025403), VSUB(Tv, Tw)));
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219 Tz = VADD(Tv, Tw);
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220 TA = VFNMS(LDK(KP500000000), Tz, Ty);
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221 ST(&(xo[WS(os, 3)]), VADD(Tx, TA), ovs, &(xo[WS(os, 1)]));
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222 ST(&(xo[0]), VADD(Ty, Tz), ovs, &(xo[0]));
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223 ST(&(xo[WS(os, 6)]), VSUB(TA, Tx), ovs, &(xo[0]));
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224 Tt = VFMA(LDK(KP852868531), Tb, VFMA(LDK(KP173648177), Ta, VFMA(LDK(KP296198132), Ti, VFNMS(LDK(KP939692620), Th, T5))));
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225 Tu = VBYI(VSUB(VFMA(LDK(KP984807753), Ta, VFMA(LDK(KP813797681), Ti, VFNMS(LDK(KP150383733), Tb, VMUL(LDK(KP342020143), Th)))), Tm));
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226 ST(&(xo[WS(os, 7)]), VSUB(Tt, Tu), ovs, &(xo[WS(os, 1)]));
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227 ST(&(xo[WS(os, 2)]), VADD(Tt, Tu), ovs, &(xo[0]));
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228 {
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229 V Tl, Ts, Tq, Tr, Tk, Tp;
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230 Tk = VADD(Tc, Tj);
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231 Tl = VADD(T5, Tk);
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232 Ts = VFMA(LDK(KP866025403), VSUB(To, Tn), VFNMS(LDK(KP500000000), Tk, T5));
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Chris@10
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233 Tp = VADD(Tn, To);
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Chris@10
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234 Tq = VBYI(VADD(Tm, Tp));
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Chris@10
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235 Tr = VBYI(VADD(Tm, VFNMS(LDK(KP500000000), Tp, VMUL(LDK(KP866025403), VSUB(Tc, Tj)))));
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Chris@10
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236 ST(&(xo[WS(os, 8)]), VSUB(Tl, Tq), ovs, &(xo[0]));
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Chris@10
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237 ST(&(xo[WS(os, 5)]), VSUB(Ts, Tr), ovs, &(xo[WS(os, 1)]));
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Chris@10
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238 ST(&(xo[WS(os, 1)]), VADD(Tl, Tq), ovs, &(xo[WS(os, 1)]));
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Chris@10
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239 ST(&(xo[WS(os, 4)]), VADD(Tr, Ts), ovs, &(xo[0]));
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Chris@10
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240 }
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Chris@10
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241 }
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Chris@10
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242 }
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Chris@10
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243 }
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Chris@10
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244 VLEAVE();
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Chris@10
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245 }
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Chris@10
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246
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Chris@10
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247 static const kdft_desc desc = { 9, XSIMD_STRING("n1bv_9"), {30, 10, 16, 0}, &GENUS, 0, 0, 0, 0 };
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Chris@10
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248
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Chris@10
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249 void XSIMD(codelet_n1bv_9) (planner *p) {
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Chris@10
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250 X(kdft_register) (p, n1bv_9, &desc);
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Chris@10
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251 }
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Chris@10
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252
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Chris@10
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253 #endif /* HAVE_FMA */
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