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1 /*
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2 * Copyright (c) 2003, 2007-11 Matteo Frigo
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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
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22 /* Do a RODFT00 problem via an R2HC problem, with some pre/post-processing.
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23
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24 This code uses the trick from FFTPACK, also documented in a similar
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25 form by Numerical Recipes. Unfortunately, this algorithm seems to
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26 have intrinsic numerical problems (similar to those in
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27 reodft11e-r2hc.c), possibly due to the fact that it multiplies its
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28 input by a sine, causing a loss of precision near the zero. For
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29 transforms of 16k points, it has already lost three or four decimal
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30 places of accuracy, which we deem unacceptable.
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31
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32 So, we have abandoned this algorithm in favor of the one in
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33 rodft00-r2hc-pad.c, which unfortunately sacrifices 30-50% in speed.
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34 The only other alternative in the literature that does not have
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35 similar numerical difficulties seems to be the direct adaptation of
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36 the Cooley-Tukey decomposition for antisymmetric data, but this
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37 would require a whole new set of codelets and it's not clear that
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38 it's worth it at this point. However, we did implement the latter
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39 algorithm for the specific case of odd n (logically adapting the
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40 split-radix algorithm); see reodft00e-splitradix.c. */
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41
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42 #include "reodft.h"
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43
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44 typedef struct {
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45 solver super;
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46 } S;
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47
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48 typedef struct {
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49 plan_rdft super;
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50 plan *cld;
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51 twid *td;
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52 INT is, os;
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53 INT n;
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54 INT vl;
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55 INT ivs, ovs;
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56 } P;
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57
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58 static void apply(const plan *ego_, R *I, R *O)
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59 {
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60 const P *ego = (const P *) ego_;
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61 INT is = ego->is, os = ego->os;
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62 INT i, n = ego->n;
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63 INT iv, vl = ego->vl;
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64 INT ivs = ego->ivs, ovs = ego->ovs;
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65 R *W = ego->td->W;
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66 R *buf;
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67
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68 buf = (R *) MALLOC(sizeof(R) * n, BUFFERS);
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69
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70 for (iv = 0; iv < vl; ++iv, I += ivs, O += ovs) {
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71 buf[0] = 0;
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72 for (i = 1; i < n - i; ++i) {
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73 E a, b, apb, amb;
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74 a = I[is * (i - 1)];
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75 b = I[is * ((n - i) - 1)];
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76 apb = K(2.0) * W[i] * (a + b);
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77 amb = (a - b);
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78 buf[i] = apb + amb;
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79 buf[n - i] = apb - amb;
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80 }
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81 if (i == n - i) {
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82 buf[i] = K(4.0) * I[is * (i - 1)];
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83 }
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84
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85 {
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86 plan_rdft *cld = (plan_rdft *) ego->cld;
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87 cld->apply((plan *) cld, buf, buf);
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88 }
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89
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90 /* FIXME: use recursive/cascade summation for better stability? */
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91 O[0] = buf[0] * 0.5;
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92 for (i = 1; i + i < n - 1; ++i) {
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93 INT k = i + i;
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94 O[os * (k - 1)] = -buf[n - i];
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95 O[os * k] = O[os * (k - 2)] + buf[i];
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96 }
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97 if (i + i == n - 1) {
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98 O[os * (n - 2)] = -buf[n - i];
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99 }
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100 }
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101
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102 X(ifree)(buf);
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103 }
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104
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105 static void awake(plan *ego_, enum wakefulness wakefulness)
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106 {
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107 P *ego = (P *) ego_;
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108 static const tw_instr rodft00e_tw[] = {
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109 { TW_SIN, 0, 1 },
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110 { TW_NEXT, 1, 0 }
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111 };
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112
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113 X(plan_awake)(ego->cld, wakefulness);
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114
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115 X(twiddle_awake)(wakefulness,
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116 &ego->td, rodft00e_tw, 2*ego->n, 1, (ego->n+1)/2);
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117 }
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118
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119 static void destroy(plan *ego_)
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120 {
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121 P *ego = (P *) ego_;
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122 X(plan_destroy_internal)(ego->cld);
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123 }
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124
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125 static void print(const plan *ego_, printer *p)
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126 {
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127 const P *ego = (const P *) ego_;
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128 p->print(p, "(rodft00e-r2hc-%D%v%(%p%))", ego->n - 1, ego->vl, ego->cld);
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129 }
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130
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131 static int applicable0(const solver *ego_, const problem *p_)
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132 {
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133 const problem_rdft *p = (const problem_rdft *) p_;
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134 UNUSED(ego_);
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135
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136 return (1
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137 && p->sz->rnk == 1
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138 && p->vecsz->rnk <= 1
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139 && p->kind[0] == RODFT00
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140 );
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141 }
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142
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143 static int applicable(const solver *ego, const problem *p, const planner *plnr)
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144 {
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145 return (!NO_SLOWP(plnr) && applicable0(ego, p));
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146 }
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147
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148 static plan *mkplan(const solver *ego_, const problem *p_, planner *plnr)
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149 {
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150 P *pln;
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151 const problem_rdft *p;
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152 plan *cld;
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153 R *buf;
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154 INT n;
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155 opcnt ops;
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156
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157 static const plan_adt padt = {
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158 X(rdft_solve), awake, print, destroy
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159 };
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160
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161 if (!applicable(ego_, p_, plnr))
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162 return (plan *)0;
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163
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164 p = (const problem_rdft *) p_;
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165
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166 n = p->sz->dims[0].n + 1;
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167 buf = (R *) MALLOC(sizeof(R) * n, BUFFERS);
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168
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169 cld = X(mkplan_d)(plnr, X(mkproblem_rdft_1_d)(X(mktensor_1d)(n, 1, 1),
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170 X(mktensor_0d)(),
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171 buf, buf, R2HC));
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172 X(ifree)(buf);
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173 if (!cld)
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174 return (plan *)0;
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175
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176 pln = MKPLAN_RDFT(P, &padt, apply);
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177
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178 pln->n = n;
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179 pln->is = p->sz->dims[0].is;
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180 pln->os = p->sz->dims[0].os;
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181 pln->cld = cld;
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182 pln->td = 0;
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183
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184 X(tensor_tornk1)(p->vecsz, &pln->vl, &pln->ivs, &pln->ovs);
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185
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186 X(ops_zero)(&ops);
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187 ops.other = 4 + (n-1)/2 * 5 + (n-2)/2 * 5;
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188 ops.add = (n-1)/2 * 4 + (n-2)/2 * 1;
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189 ops.mul = 1 + (n-1)/2 * 2;
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190 if (n % 2 == 0)
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191 ops.mul += 1;
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192
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193 X(ops_zero)(&pln->super.super.ops);
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194 X(ops_madd2)(pln->vl, &ops, &pln->super.super.ops);
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195 X(ops_madd2)(pln->vl, &cld->ops, &pln->super.super.ops);
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196
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197 return &(pln->super.super);
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198 }
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199
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200 /* constructor */
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201 static solver *mksolver(void)
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202 {
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203 static const solver_adt sadt = { PROBLEM_RDFT, mkplan, 0 };
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204 S *slv = MKSOLVER(S, &sadt);
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205 return &(slv->super);
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206 }
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207
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208 void X(rodft00e_r2hc_register)(planner *p)
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209 {
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210 REGISTER_SOLVER(p, mksolver());
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211 }
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