1 | /**************************************** |
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2 | * Computer Algebra System SINGULAR * |
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3 | ****************************************/ |
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4 | /* $Id: syz0.cc,v 1.4 2005-02-17 09:42:22 Singular Exp $ */ |
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5 | /* |
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6 | * ABSTRACT: resolutions |
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7 | */ |
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8 | |
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9 | |
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10 | #include "mod2.h" |
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11 | #include "structs.h" |
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12 | #include "omalloc.h" |
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13 | #include "polys.h" |
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14 | #include "febase.h" |
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15 | #include "kstd1.h" |
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16 | #include "kutil.h" |
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17 | #include "stairc.h" |
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18 | //#include "cntrlc.h" |
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19 | #include "intvec.h" |
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20 | #include "numbers.h" |
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21 | #include "ideals.h" |
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22 | #include "intvec.h" |
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23 | #include "ring.h" |
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24 | #include "syz.h" |
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25 | #include "kbuckets.h" |
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26 | #include "prCopy.h" |
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27 | |
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28 | static kBucket_pt sy0buck; |
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29 | |
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30 | static void syInitSort(ideal arg,intvec **modcomp) |
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31 | { |
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32 | int i,j,k,kk,kkk,jj; |
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33 | polyset F,oldF=arg->m; |
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34 | int Fl=IDELEMS(arg); |
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35 | int rkF=idRankFreeModule(arg); |
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36 | int syComponentOrder=currRing->ComponentOrder; |
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37 | |
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38 | while ((Fl!=0) && (oldF[Fl-1]==NULL)) Fl--; |
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39 | if (*modcomp!=NULL) delete modcomp; |
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40 | *modcomp = new intvec(rkF+2); |
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41 | F=(polyset)omAlloc0(IDELEMS(arg)*sizeof(poly)); |
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42 | j=0; |
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43 | for(i=0;i<=rkF;i++) |
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44 | { |
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45 | k=0; |
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46 | jj = j; |
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47 | (**modcomp)[i] = j; |
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48 | while (k<Fl) |
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49 | { |
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50 | while ((k<Fl) && (pGetComp(oldF[k]) != i)) k++; |
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51 | if (k<Fl) |
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52 | { |
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53 | kk=jj; |
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54 | while ((kk<Fl) && (F[kk]) && (pLmCmp(oldF[k],F[kk])!=syComponentOrder)) |
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55 | { |
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56 | kk++; |
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57 | } |
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58 | for (kkk=j;kkk>kk;kkk--) |
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59 | { |
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60 | F[kkk] = F[kkk-1]; |
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61 | } |
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62 | F[kk] = oldF[k]; |
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63 | //Print("Element %d: ",kk);pWrite(F[kk]); |
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64 | j++; |
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65 | k++; |
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66 | } |
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67 | } |
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68 | } |
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69 | (**modcomp)[rkF+1] = Fl; |
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70 | arg->m = F; |
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71 | omFreeSize((ADDRESS)oldF,IDELEMS(arg)*sizeof(poly)); |
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72 | #ifndef __OPTIMIZE__ |
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73 | //Print("Neue Anordnung: "); |
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74 | //idPrint(arg); |
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75 | #endif |
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76 | } |
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77 | |
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78 | static void syCreatePairs(polyset F,int lini,int wend,int k,int j,int i, |
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79 | polyset pairs,int regularPairs=0,ideal mW=NULL) |
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80 | { |
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81 | int l,ii=0,jj; |
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82 | poly p,q; |
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83 | |
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84 | while (((k<wend) && (pGetComp(F[k]) == i)) || |
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85 | ((currQuotient!=NULL) && (k<regularPairs+IDELEMS(currQuotient)))) |
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86 | { |
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87 | p = pOne(); |
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88 | if ((k<wend) && (pGetComp(F[k]) == i) && (k!=j)) |
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89 | pLcm(F[j],F[k],p); |
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90 | else if (ii<IDELEMS(currQuotient)) |
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91 | { |
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92 | q = pHead(F[j]); |
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93 | if (mW!=NULL) |
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94 | { |
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95 | for(jj=1;jj<=pVariables;jj++) |
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96 | pSetExp(q,jj,pGetExp(q,jj) -pGetExp(mW->m[pGetComp(q)-1],jj)); |
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97 | pSetm(q); |
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98 | } |
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99 | pLcm(q,currQuotient->m[ii],p); |
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100 | if (mW!=NULL) |
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101 | { |
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102 | for(jj=1;jj<=pVariables;jj++) |
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103 | pSetExp(p,jj,pGetExp(p,jj) +pGetExp(mW->m[pGetComp(p)-1],jj)); |
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104 | pSetm(p); |
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105 | } |
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106 | pDelete(&q); |
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107 | k = regularPairs+ii; |
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108 | ii++; |
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109 | } |
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110 | l=lini; |
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111 | while ((l<k) && ((pairs[l]==NULL) || (!pDivisibleBy(pairs[l],p)))) |
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112 | { |
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113 | if ((pairs[l]!=NULL) && (pDivisibleBy(p,pairs[l]))) |
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114 | pDelete(&(pairs[l])); |
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115 | l++; |
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116 | } |
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117 | if (l==k) |
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118 | { |
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119 | pSetm(p); |
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120 | pairs[l] = p; |
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121 | } |
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122 | else |
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123 | pDelete(&p); |
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124 | k++; |
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125 | } |
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126 | } |
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127 | |
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128 | static poly syRedtail2(poly p, polyset redWith, intvec *modcomp) |
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129 | { |
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130 | poly h, hn; |
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131 | int hncomp,nxt; |
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132 | int j; |
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133 | |
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134 | h = p; |
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135 | hn = pNext(h); |
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136 | while(hn != NULL) |
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137 | { |
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138 | hncomp = pGetComp(hn); |
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139 | j = (*modcomp)[hncomp]; |
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140 | nxt = (*modcomp)[hncomp+1]; |
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141 | while (j < nxt) |
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142 | { |
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143 | if (pLmDivisibleByNoComp(redWith[j], hn)) |
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144 | { |
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145 | //if (TEST_OPT_PROT) PrintS("r"); |
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146 | hn = ksOldSpolyRed(redWith[j],hn); |
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147 | if (hn == NULL) |
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148 | { |
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149 | pNext(h) = NULL; |
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150 | return p; |
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151 | } |
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152 | hncomp = pGetComp(hn); |
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153 | j = (*modcomp)[hncomp]; |
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154 | nxt = (*modcomp)[hncomp+1]; |
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155 | } |
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156 | else |
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157 | { |
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158 | j++; |
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159 | } |
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160 | } |
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161 | h = pNext(h) = hn; |
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162 | hn = pNext(h); |
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163 | } |
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164 | return p; |
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165 | } |
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166 | |
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167 | /*2 |
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168 | * computes the Schreyer syzygies in the local case |
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169 | * input: arg (only allocated: Shdl, Smax) |
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170 | * output: Shdl, Smax |
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171 | */ |
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172 | static ideal sySchreyersSyzygiesFM(ideal arg,intvec ** modcomp) |
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173 | { |
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174 | int Fl=IDELEMS(arg); |
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175 | while ((Fl!=0) && (arg->m[Fl-1]==NULL)) Fl--; |
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176 | ideal result=idInit(16,arg->rank+Fl); |
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177 | polyset F=arg->m,*Shdl=&(result->m); |
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178 | if (Fl==0) return result; |
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179 | |
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180 | int i,j,l,k,totalToRed,ecartToRed,kk,kkk; |
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181 | int bestEcart,totalmax,rkF,Sl=0,smax,tmax,tl; |
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182 | int *ecartS, *ecartT, *totalS, |
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183 | *totalT=NULL, *temp=NULL; |
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184 | polyset pairs,S,T,ST,oldF; |
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185 | poly p,q,toRed; |
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186 | BOOLEAN notFound = FALSE; |
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187 | intvec * newmodcomp = new intvec(Fl+2); |
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188 | intvec * tempcomp; |
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189 | |
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190 | //Print("Naechster Modul\n"); |
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191 | //idPrint(arg); |
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192 | /*-------------initializing the sets--------------------*/ |
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193 | ST=(polyset)omAlloc0(Fl*sizeof(poly)); |
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194 | S=(polyset)omAlloc0(Fl*sizeof(poly)); |
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195 | ecartS=(int*)omAlloc(Fl*sizeof(int)); |
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196 | totalS=(int*)omAlloc(Fl*sizeof(int)); |
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197 | T=(polyset)omAlloc0(2*Fl*sizeof(poly)); |
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198 | ecartT=(int*)omAlloc(2*Fl*sizeof(int)); |
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199 | totalT=(int*)omAlloc(2*Fl*sizeof(int)); |
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200 | pairs=(polyset)omAlloc0(Fl*sizeof(poly)); |
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201 | |
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202 | smax = Fl; |
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203 | tmax = 2*Fl; |
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204 | for (j=1;j<IDELEMS(arg);j++) |
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205 | { |
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206 | if (arg->m[j] != NULL) |
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207 | { |
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208 | assume (arg->m[j-1] != NULL); |
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209 | assume (pGetComp(arg->m[j-1])-pGetComp(arg->m[j])<=0); |
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210 | } |
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211 | } |
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212 | rkF=idRankFreeModule(arg); |
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213 | /*----------------construction of the new ordering----------*/ |
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214 | if (rkF>0) |
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215 | rSetSyzComp(rkF); |
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216 | else |
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217 | rSetSyzComp(1); |
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218 | /*----------------creating S--------------------------------*/ |
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219 | for(j=0;j<Fl;j++) |
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220 | { |
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221 | S[j] = pCopy(F[j]); |
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222 | totalS[j] = pLDeg(S[j],&k,currRing); |
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223 | ecartS[j] = totalS[j]-pFDeg(S[j],currRing); |
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224 | //Print("%d", pGetComp(S[j]));PrintS(" "); |
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225 | p = S[j]; |
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226 | if (rkF==0) pSetCompP(p,1); |
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227 | while (pNext(p)!=NULL) pIter(p); |
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228 | pNext(p) = pHead(F[j]); |
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229 | pIter(p); |
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230 | if (rkF==0) |
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231 | pSetComp(p,j+2); |
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232 | else |
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233 | pSetComp(p,rkF+j+1); |
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234 | pSetmComp(p); |
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235 | } |
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236 | //PrintLn(); |
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237 | if (rkF==0) rkF = 1; |
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238 | /*---------------creating the initial for T----------------*/ |
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239 | j=0; |
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240 | l=-1; |
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241 | totalmax=-1; |
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242 | for (k=0;k<smax;k++) |
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243 | if (totalS[k]>totalmax) totalmax=totalS[k]; |
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244 | for (kk=1;kk<=rkF;kk++) |
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245 | { |
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246 | for (k=0;k<=totalmax;k++) |
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247 | { |
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248 | for (l=0;l<smax;l++) |
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249 | { |
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250 | if ((pGetComp(S[l])==kk) && (totalS[l]==k)) |
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251 | { |
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252 | ST[j] = S[l]; |
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253 | totalT[j] = totalS[l]; |
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254 | ecartT[j] = ecartS[l]; |
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255 | //Print("%d", totalS[l]);PrintS(" "); |
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256 | j++; |
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257 | } |
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258 | } |
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259 | } |
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260 | } |
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261 | //PrintLn(); |
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262 | for (j=0;j<smax;j++) |
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263 | { |
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264 | totalS[j] = totalT[j]; |
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265 | ecartS[j] = ecartT[j]; |
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266 | } |
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267 | |
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268 | /*---------------computing---------------------------------*/ |
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269 | for(j=0;j<smax;j++) |
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270 | { |
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271 | (*newmodcomp)[j+1] = Sl; |
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272 | i = pGetComp(S[j]); |
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273 | int syComponentOrder= currRing->ComponentOrder; |
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274 | int lini,wend; |
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275 | if (syComponentOrder==1) |
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276 | { |
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277 | lini=k=j+1; |
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278 | wend=Fl; |
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279 | } |
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280 | else |
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281 | { |
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282 | lini=k=0; |
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283 | while ((k<j) && (pGetComp(S[k]) != i)) k++; |
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284 | wend=j; |
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285 | } |
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286 | if (TEST_OPT_PROT) |
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287 | { |
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288 | Print("(%d)",Fl-j); |
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289 | mflush(); |
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290 | } |
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291 | syCreatePairs(S,lini,wend,k,j,i,pairs); |
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292 | for (k=lini;k<wend;k++) |
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293 | { |
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294 | if (pairs[k]!=NULL) |
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295 | { |
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296 | /*--------------creating T----------------------------------*/ |
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297 | for (l=0;l<smax;l++) |
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298 | { |
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299 | ecartT[l] = ecartS[l]; |
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300 | totalT[l] = totalS[l]; |
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301 | T[l] = ST[l]; |
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302 | } |
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303 | tl = smax; |
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304 | tempcomp = ivCopy(*modcomp); |
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305 | /*--------------begin to reduce-----------------------------*/ |
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306 | toRed = ksOldCreateSpoly(S[j],S[k]); |
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307 | ecartToRed = 1; |
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308 | bestEcart = 1; |
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309 | if (TEST_OPT_DEBUG) |
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310 | { |
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311 | PrintS("pair: ");pWrite0(S[j]);PrintS(" ");pWrite(S[k]); |
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312 | } |
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313 | if (TEST_OPT_PROT) |
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314 | { |
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315 | PrintS("."); |
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316 | mflush(); |
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317 | } |
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318 | //Print("Reduziere Paar %d,%d (ecart %d): \n",j,k,ecartToRed); |
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319 | //Print("Poly %d: ",j);pWrite(S[j]); |
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320 | //Print("Poly %d: ",k);pWrite(S[k]); |
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321 | //Print("Spoly: ");pWrite(toRed); |
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322 | while (pGetComp(toRed)<=rkF) |
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323 | { |
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324 | if (TEST_OPT_DEBUG) |
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325 | { |
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326 | PrintS("toRed: ");pWrite(toRed); |
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327 | } |
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328 | /* |
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329 | * if ((bestEcart) || (ecartToRed!=0)) |
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330 | * { |
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331 | */ |
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332 | totalToRed = pLDeg(toRed,&kk,currRing); |
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333 | ecartToRed = totalToRed-pFDeg(toRed,currRing); |
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334 | /* |
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335 | * } |
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336 | */ |
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337 | //Print("toRed now (neuer ecart %d): ",ecartToRed);pWrite(toRed); |
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338 | notFound = TRUE; |
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339 | bestEcart = 32000; //a very large integer |
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340 | p = NULL; |
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341 | int l=0; |
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342 | #define OLD_SEARCH |
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343 | #ifdef OLD_SEARCH |
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344 | while ((l<tl) && (pGetComp(T[l])<pGetComp(toRed))) l++; |
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345 | //assume (l==(**modcomp)[pGetComp(toRed)]); |
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346 | while ((l<tl) && (notFound)) |
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347 | #else |
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348 | l = (**modcomp)[pGetComp(toRed)]; |
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349 | kkk = (**modcomp)[pGetComp(toRed)+1]; |
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350 | while ((l<kkk) && (notFound)) |
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351 | #endif |
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352 | { |
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353 | if ((ecartT[l]<bestEcart) && (pDivisibleBy(T[l],toRed))) |
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354 | { |
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355 | if (ecartT[l]<=ecartToRed) notFound = FALSE; |
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356 | p = T[l]; |
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357 | bestEcart = ecartT[l]; |
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358 | } |
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359 | l++; |
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360 | } |
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361 | if (p==NULL) |
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362 | { |
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363 | WerrorS("ideal not a standardbasis");//no polynom for reduction |
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364 | pDelete(&toRed); |
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365 | for(k=j;k<Fl;k++) pDelete(&(pairs[k])); |
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366 | omFreeSize((ADDRESS)pairs,Fl*sizeof(poly)); |
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367 | omFreeSize((ADDRESS)ST,Fl*sizeof(poly)); |
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368 | omFreeSize((ADDRESS)S,Fl*sizeof(poly)); |
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369 | omFreeSize((ADDRESS)T,tmax*sizeof(poly)); |
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370 | omFreeSize((ADDRESS)ecartT,tmax*sizeof(int)); |
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371 | omFreeSize((ADDRESS)totalT,tmax*sizeof(int)); |
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372 | omFreeSize((ADDRESS)ecartS,Fl*sizeof(int)); |
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373 | omFreeSize((ADDRESS)totalS,Fl*sizeof(int)); |
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374 | for(k=0;k<IDELEMS(result);k++) pDelete(&((*Shdl)[k])); |
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375 | return result; |
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376 | } |
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377 | else |
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378 | { |
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379 | //Print("reduced with (ecart %d): ",bestEcart);wrp(p);PrintLn(); |
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380 | if (notFound) |
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381 | { |
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382 | if (tl>=tmax) |
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383 | { |
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384 | pEnlargeSet(&T,tmax,16); |
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385 | tmax += 16; |
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386 | temp = (int*)omAlloc((tmax+16)*sizeof(int)); |
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387 | for(l=0;l<tmax;l++) temp[l]=totalT[l]; |
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388 | totalT = temp; |
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389 | temp = (int*)omAlloc((tmax+16)*sizeof(int)); |
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390 | for(l=0;l<tmax;l++) temp[l]=ecartT[l]; |
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391 | ecartT = temp; |
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392 | } |
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393 | //PrintS("t"); |
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394 | int comptR=pGetComp(toRed); |
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395 | for (l=tempcomp->length()-1;l>comptR;l--) |
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396 | { |
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397 | if ((*tempcomp)[l]>0) |
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398 | (*tempcomp)[l]++; |
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399 | } |
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400 | l=0; |
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401 | while ((l<tl) && (comptR>pGetComp(T[l]))) l++; |
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402 | while ((l<tl) && (totalT[l]<=totalToRed)) l++; |
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403 | for (kk=tl;kk>l;kk--) |
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404 | { |
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405 | T[kk]=T[kk-1]; |
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406 | totalT[kk]=totalT[kk-1]; |
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407 | ecartT[kk]=ecartT[kk-1]; |
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408 | } |
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409 | q = pCopy(toRed); |
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410 | pNorm(q); |
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411 | T[l] = q; |
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412 | totalT[l] = totalToRed; |
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413 | ecartT[l] = ecartToRed; |
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414 | tl++; |
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415 | } |
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416 | toRed = ksOldSpolyRed(p,toRed); |
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417 | } |
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418 | } |
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419 | //Print("toRed finally (neuer ecart %d): ",ecartToRed);pWrite(toRed); |
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420 | //PrintS("s"); |
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421 | if (pGetComp(toRed)>rkF) |
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422 | { |
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423 | if (Sl>=IDELEMS(result)) |
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424 | { |
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425 | pEnlargeSet(Shdl,IDELEMS(result),16); |
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426 | IDELEMS(result) += 16; |
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427 | } |
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428 | //pShift(&toRed,-rkF); |
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429 | pNorm(toRed); |
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430 | (*Shdl)[Sl] = toRed; |
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431 | Sl++; |
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432 | } |
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433 | /*----------------deleting all polys not from ST--------------*/ |
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434 | for(l=0;l<tl;l++) |
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435 | { |
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436 | kk=0; |
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437 | while ((kk<smax) && (T[l] != S[kk])) kk++; |
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438 | if (kk>=smax) |
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439 | { |
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440 | pDelete(&T[l]); |
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441 | //Print ("#"); |
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442 | } |
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443 | } |
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444 | delete tempcomp; |
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445 | } |
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446 | } |
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447 | for(k=lini;k<wend;k++) pDelete(&(pairs[k])); |
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448 | } |
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449 | (*newmodcomp)[Fl+1] = Sl; |
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450 | omFreeSize((ADDRESS)pairs,Fl*sizeof(poly)); |
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451 | omFreeSize((ADDRESS)ST,Fl*sizeof(poly)); |
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452 | omFreeSize((ADDRESS)S,Fl*sizeof(poly)); |
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453 | omFreeSize((ADDRESS)T,tmax*sizeof(poly)); |
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454 | omFreeSize((ADDRESS)ecartT,tmax*sizeof(int)); |
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455 | omFreeSize((ADDRESS)totalT,tmax*sizeof(int)); |
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456 | omFreeSize((ADDRESS)ecartS,Fl*sizeof(int)); |
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457 | omFreeSize((ADDRESS)totalS,Fl*sizeof(int)); |
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458 | delete *modcomp; |
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459 | *modcomp = newmodcomp; |
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460 | return result; |
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461 | } |
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462 | |
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463 | /*3 |
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464 | *special Normalform for Schreyer in factor rings |
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465 | */ |
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466 | poly sySpecNormalize(poly toNorm,ideal mW=NULL) |
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467 | { |
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468 | int j,i=0; |
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469 | poly p; |
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470 | |
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471 | if (toNorm==NULL) return NULL; |
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472 | p = pHead(toNorm); |
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473 | if (mW!=NULL) |
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474 | { |
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475 | for(j=1;j<=pVariables;j++) |
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476 | pSetExp(p,j,pGetExp(p,j) -pGetExp(mW->m[pGetComp(p)-1],j)); |
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477 | } |
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478 | while ((p!=NULL) && (i<IDELEMS(currQuotient))) |
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479 | { |
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480 | if (pDivisibleBy(currQuotient->m[i],p)) |
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481 | { |
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482 | //pNorm(toNorm); |
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483 | toNorm = ksOldSpolyRed(currQuotient->m[i],toNorm); |
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484 | pDelete(&p); |
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485 | if (toNorm==NULL) return NULL; |
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486 | p = pHead(toNorm); |
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487 | if (mW!=NULL) |
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488 | { |
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489 | for(j=1;j<=pVariables;j++) |
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490 | pSetExp(p,j,pGetExp(p,j) -pGetExp(mW->m[pGetComp(p)-1],j)); |
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491 | } |
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492 | i = 0; |
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493 | } |
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494 | else |
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495 | { |
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496 | i++; |
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497 | } |
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498 | } |
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499 | pDelete(&p); |
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500 | return toNorm; |
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501 | } |
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502 | |
---|
503 | /*2 |
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504 | * computes the Schreyer syzygies in the global case |
---|
505 | * input: F |
---|
506 | * output: Shdl, Smax |
---|
507 | * modcomp, length stores the start position of the module comp. in arg |
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508 | */ |
---|
509 | static ideal sySchreyersSyzygiesFB(ideal arg,intvec ** modcomp,ideal mW,BOOLEAN redTail=TRUE) |
---|
510 | { |
---|
511 | int Fl=IDELEMS(arg); |
---|
512 | while ((Fl!=0) && (arg->m[Fl-1]==NULL)) Fl--; |
---|
513 | ideal result=idInit(16,Fl); |
---|
514 | int i,j,l,k,kkk,rkF,Sl=0,syComponentOrder=currRing->ComponentOrder; |
---|
515 | int fstart,wend,lini,ltR,gencQ=0; |
---|
516 | intvec *newmodcomp; |
---|
517 | int *Flength; |
---|
518 | polyset pairs,F=arg->m,*Shdl=&(result->m); |
---|
519 | poly p,q,toRed,syz,lastmonom,multWith; |
---|
520 | BOOLEAN isNotReduced=TRUE; |
---|
521 | |
---|
522 | //#define WRITE_BUCKETS |
---|
523 | #ifdef WRITE_BUCKETS |
---|
524 | PrintS("Input: \n"); |
---|
525 | ideal twr=idHead(arg); |
---|
526 | idPrint(arg); |
---|
527 | idDelete(&twr); |
---|
528 | if (modcomp!=NULL) (*modcomp)->show(0,0); |
---|
529 | #endif |
---|
530 | newmodcomp = new intvec(Fl+2); |
---|
531 | //for (j=0;j<Fl;j++) pWrite(F[j]); |
---|
532 | //PrintLn(); |
---|
533 | if (currQuotient==NULL) |
---|
534 | pairs=(polyset)omAlloc0(Fl*sizeof(poly)); |
---|
535 | else |
---|
536 | { |
---|
537 | gencQ = IDELEMS(currQuotient); |
---|
538 | pairs=(polyset)omAlloc0((Fl+gencQ)*sizeof(poly)); |
---|
539 | } |
---|
540 | rkF=idRankFreeModule(arg); |
---|
541 | Flength = (int*)omAlloc0(Fl*sizeof(int)); |
---|
542 | for(j=0;j<Fl;j++) |
---|
543 | { |
---|
544 | Flength[j] = pLength(F[j]); |
---|
545 | } |
---|
546 | for(j=0;j<Fl;j++) |
---|
547 | { |
---|
548 | (*newmodcomp)[j+1] = Sl; |
---|
549 | if (TEST_OPT_PROT) |
---|
550 | { |
---|
551 | Print("(%d)",Fl-j); |
---|
552 | mflush(); |
---|
553 | } |
---|
554 | i = pGetComp(F[j]); |
---|
555 | if (syComponentOrder==1) |
---|
556 | { |
---|
557 | lini=k=j+1; |
---|
558 | wend=Fl; |
---|
559 | } |
---|
560 | else |
---|
561 | { |
---|
562 | lini=k=0; |
---|
563 | while ((k<j) && (pGetComp(F[k]) != i)) k++; |
---|
564 | wend=j; |
---|
565 | } |
---|
566 | syCreatePairs(F,lini,wend,k,j,i,pairs,Fl,mW); |
---|
567 | if (currQuotient!=NULL) wend = Fl+gencQ; |
---|
568 | for (k=lini;k<wend;k++) |
---|
569 | { |
---|
570 | if (pairs[k]!=NULL) |
---|
571 | { |
---|
572 | if (TEST_OPT_PROT) |
---|
573 | { |
---|
574 | PrintS("."); |
---|
575 | mflush(); |
---|
576 | } |
---|
577 | //begins to construct the syzygy |
---|
578 | if (k<Fl) |
---|
579 | { |
---|
580 | number an=nCopy(pGetCoeff(F[k])),bn=nCopy(pGetCoeff(F[j])); |
---|
581 | int ct = ksCheckCoeff(&an, &bn); |
---|
582 | syz = pCopy(pairs[k]); |
---|
583 | //syz->coef = nCopy(F[k]->coef); |
---|
584 | syz->coef = an; |
---|
585 | //syz->coef = nNeg(syz->coef); |
---|
586 | pNext(syz) = pairs[k]; |
---|
587 | lastmonom = pNext(syz); |
---|
588 | //lastmonom->coef = nCopy(F[j]->coef); |
---|
589 | lastmonom->coef = bn; |
---|
590 | lastmonom->coef = nNeg(lastmonom->coef); |
---|
591 | pSetComp(lastmonom,k+1); |
---|
592 | } |
---|
593 | else |
---|
594 | { |
---|
595 | syz = pairs[k]; |
---|
596 | syz->coef = nCopy(currQuotient->m[k-Fl]->coef); |
---|
597 | syz->coef = nNeg(syz->coef); |
---|
598 | lastmonom = syz; |
---|
599 | multWith = pDivide(syz,F[j]); |
---|
600 | multWith->coef = nCopy(currQuotient->m[k-Fl]->coef); |
---|
601 | } |
---|
602 | pSetComp(syz,j+1); |
---|
603 | pairs[k] = NULL; |
---|
604 | //the next term of the syzygy |
---|
605 | //constructs the spoly |
---|
606 | if (TEST_OPT_DEBUG) |
---|
607 | { |
---|
608 | if (k<Fl) |
---|
609 | { |
---|
610 | PrintS("pair: ");pWrite0(F[j]);PrintS(" ");pWrite(F[k]); |
---|
611 | } |
---|
612 | else |
---|
613 | { |
---|
614 | PrintS("pair: ");pWrite0(F[j]);PrintS(" ");pWrite(currQuotient->m[k-Fl]); |
---|
615 | } |
---|
616 | } |
---|
617 | if (k<Fl) |
---|
618 | toRed = ksOldCreateSpoly(F[j],F[k]); |
---|
619 | else |
---|
620 | { |
---|
621 | q = pMult_mm(pCopy(F[j]),multWith); |
---|
622 | toRed = sySpecNormalize(q,mW); |
---|
623 | pDelete(&multWith); |
---|
624 | } |
---|
625 | kBucketInit(sy0buck,toRed,-1); |
---|
626 | toRed = kBucketGetLm(sy0buck); |
---|
627 | isNotReduced = TRUE; |
---|
628 | while (toRed!=NULL) |
---|
629 | { |
---|
630 | if (TEST_OPT_DEBUG) |
---|
631 | { |
---|
632 | PrintS("toRed: ");pWrite(toRed); |
---|
633 | } |
---|
634 | // l=0; |
---|
635 | // while ((l<Fl) && (!pDivisibleBy(F[l],toRed))) l++; |
---|
636 | // if (l>=Fl) |
---|
637 | l = (**modcomp)[pGetComp(toRed)+1]-1; |
---|
638 | kkk = (**modcomp)[pGetComp(toRed)]; |
---|
639 | while ((l>=kkk) && (!pDivisibleBy(F[l],toRed))) l--; |
---|
640 | #ifdef WRITE_BUCKETS |
---|
641 | kBucketClear(sy0buck,&toRed,<R); |
---|
642 | printf("toRed in Pair[%d, %d]:", j, k); |
---|
643 | pWrite(toRed); |
---|
644 | kBucketInit(sy0buck,toRed,-1); |
---|
645 | #endif |
---|
646 | |
---|
647 | if (l<kkk) |
---|
648 | { |
---|
649 | if ((currQuotient!=NULL) && (isNotReduced)) |
---|
650 | { |
---|
651 | kBucketClear(sy0buck,&toRed,<R); |
---|
652 | toRed = sySpecNormalize(toRed,mW); |
---|
653 | #ifdef WRITE_BUCKETS |
---|
654 | printf("toRed in Pair[%d, %d]:", j, k); |
---|
655 | pWrite(toRed); |
---|
656 | #endif |
---|
657 | kBucketInit(sy0buck,toRed,-1); |
---|
658 | toRed = kBucketGetLm(sy0buck); |
---|
659 | isNotReduced = FALSE; |
---|
660 | } |
---|
661 | else |
---|
662 | { |
---|
663 | //no polynom for reduction |
---|
664 | WerrorS("ideal not a standardbasis"); |
---|
665 | pDelete(&toRed); |
---|
666 | pDelete(&syz); |
---|
667 | for(k=j;k<Fl;k++) pDelete(&(pairs[k])); |
---|
668 | omFreeSize((ADDRESS)pairs,(Fl + gencQ)*sizeof(poly)); |
---|
669 | for(k=0;k<IDELEMS(result);k++) pDelete(&((*Shdl)[k])); |
---|
670 | return result; |
---|
671 | } |
---|
672 | } |
---|
673 | else |
---|
674 | { |
---|
675 | //the next monom of the syzygy |
---|
676 | isNotReduced = TRUE; |
---|
677 | if (TEST_OPT_DEBUG) |
---|
678 | { |
---|
679 | PrintS("reduced with: ");pWrite(F[l]); |
---|
680 | } |
---|
681 | pNext(lastmonom) = pHead(toRed); |
---|
682 | pIter(lastmonom); |
---|
683 | lastmonom->coef = nDiv(lastmonom->coef,F[l]->coef); |
---|
684 | //lastmonom->coef = nNeg(lastmonom->coef); |
---|
685 | pSetComp(lastmonom,l+1); |
---|
686 | //computes the new toRed |
---|
687 | number up = kBucketPolyRed(sy0buck,F[l],Flength[l],NULL); |
---|
688 | if (! nIsOne(up)) |
---|
689 | { |
---|
690 | // Thomas: Now do whatever you need to do |
---|
691 | #ifdef WRITE_BUCKETS |
---|
692 | PrintS("multiplied with: ");nWrite(up);PrintLn(); |
---|
693 | #endif |
---|
694 | pMult_nn(syz,up); |
---|
695 | } |
---|
696 | nDelete(&up); |
---|
697 | |
---|
698 | toRed = kBucketGetLm(sy0buck); |
---|
699 | //the module component of the new monom |
---|
700 | //pWrite(toRed); |
---|
701 | } |
---|
702 | } |
---|
703 | kBucketClear(sy0buck,&toRed,<R); //Zur Sichereheit |
---|
704 | //PrintLn(); |
---|
705 | if (syz!=NULL) |
---|
706 | { |
---|
707 | if (Sl>=IDELEMS(result)) |
---|
708 | { |
---|
709 | pEnlargeSet(Shdl,IDELEMS(result),16); |
---|
710 | IDELEMS(result) += 16; |
---|
711 | } |
---|
712 | pNorm(syz); |
---|
713 | if (BTEST1(OPT_REDTAIL) && redTail) |
---|
714 | { |
---|
715 | (*newmodcomp)[j+2] = Sl; |
---|
716 | (*Shdl)[Sl] = syRedtail2(syz,*Shdl,newmodcomp); |
---|
717 | (*newmodcomp)[j+2] = 0; |
---|
718 | } |
---|
719 | else |
---|
720 | (*Shdl)[Sl] = syz; |
---|
721 | Sl++; |
---|
722 | } |
---|
723 | } |
---|
724 | } |
---|
725 | // for(k=j;k<Fl;k++) pDelete(&(pairs[k])); |
---|
726 | } |
---|
727 | (*newmodcomp)[Fl+1] = Sl; |
---|
728 | if (currQuotient==NULL) |
---|
729 | omFreeSize((ADDRESS)pairs,Fl*sizeof(poly)); |
---|
730 | else |
---|
731 | omFreeSize((ADDRESS)pairs,(Fl+IDELEMS(currQuotient))*sizeof(poly)); |
---|
732 | omFreeSize((ADDRESS)Flength,Fl*sizeof(int)); |
---|
733 | delete *modcomp; |
---|
734 | *modcomp = newmodcomp; |
---|
735 | return result; |
---|
736 | } |
---|
737 | |
---|
738 | void syReOrderResolventFB(resolvente res,int length, int initial) |
---|
739 | { |
---|
740 | int syzIndex=length-1,i,j; |
---|
741 | poly p; |
---|
742 | |
---|
743 | while ((syzIndex!=0) && (res[syzIndex]==NULL)) syzIndex--; |
---|
744 | while (syzIndex>=initial) |
---|
745 | { |
---|
746 | for(i=0;i<IDELEMS(res[syzIndex]);i++) |
---|
747 | { |
---|
748 | p = res[syzIndex]->m[i]; |
---|
749 | |
---|
750 | while (p!=NULL) |
---|
751 | { |
---|
752 | if (res[syzIndex-1]->m[pGetComp(p)-1]!=NULL) |
---|
753 | { |
---|
754 | for(j=1;j<=pVariables;j++) |
---|
755 | { |
---|
756 | pSetExp(p,j,pGetExp(p,j) |
---|
757 | -pGetExp(res[syzIndex-1]->m[pGetComp(p)-1],j)); |
---|
758 | } |
---|
759 | } |
---|
760 | else |
---|
761 | PrintS("error in the resolvent\n"); |
---|
762 | pSetm(p); |
---|
763 | pIter(p); |
---|
764 | } |
---|
765 | } |
---|
766 | syzIndex--; |
---|
767 | } |
---|
768 | } |
---|
769 | |
---|
770 | static void syMergeSortResolventFB(resolvente res,int length, int initial=1) |
---|
771 | { |
---|
772 | int syzIndex=length-1,i,j; |
---|
773 | poly qq,pp,result=NULL; |
---|
774 | poly p; |
---|
775 | |
---|
776 | while ((syzIndex!=0) && (res[syzIndex]==NULL)) syzIndex--; |
---|
777 | while (syzIndex>=initial) |
---|
778 | { |
---|
779 | for(i=0;i<IDELEMS(res[syzIndex]);i++) |
---|
780 | { |
---|
781 | p = res[syzIndex]->m[i]; |
---|
782 | if (p != NULL) |
---|
783 | { |
---|
784 | for (;;) |
---|
785 | { |
---|
786 | qq = p; |
---|
787 | for(j=1;j<=pVariables;j++) |
---|
788 | { |
---|
789 | pSetExp(p,j,pGetExp(p,j) |
---|
790 | -pGetExp(res[syzIndex-1]->m[pGetComp(p)-1],j)); |
---|
791 | } |
---|
792 | pSetm(p); |
---|
793 | for (;;) |
---|
794 | { |
---|
795 | if (pNext(p) == NULL) |
---|
796 | { |
---|
797 | pAdd(result, qq); |
---|
798 | break; |
---|
799 | } |
---|
800 | pp = pNext(p); |
---|
801 | for(j=1;j<=pVariables;j++) |
---|
802 | { |
---|
803 | pSetExp(pp,j,pGetExp(pp,j) |
---|
804 | -pGetExp(res[syzIndex-1]->m[pGetComp(pp)-1],j)); |
---|
805 | } |
---|
806 | pSetm(pp); |
---|
807 | if (pCmp(p,pNext(p)) != 1) |
---|
808 | { |
---|
809 | pp = p; |
---|
810 | pIter(p); |
---|
811 | pNext(pp) = NULL; |
---|
812 | result = pAdd(result, qq); |
---|
813 | break; |
---|
814 | } |
---|
815 | pIter(p); |
---|
816 | } |
---|
817 | } |
---|
818 | } |
---|
819 | res[syzIndex]->m[i] = p; |
---|
820 | } |
---|
821 | syzIndex--; |
---|
822 | } |
---|
823 | } |
---|
824 | |
---|
825 | BOOLEAN syTestOrder(ideal M) |
---|
826 | { |
---|
827 | int i=idRankFreeModule(M); |
---|
828 | if (i == 0) return FALSE; |
---|
829 | int j=0; |
---|
830 | |
---|
831 | while ((currRing->order[j]!=ringorder_c) && (currRing->order[j]!=ringorder_C)) |
---|
832 | j++; |
---|
833 | if (currRing->order[j+1]!=0) |
---|
834 | return TRUE; |
---|
835 | return FALSE; |
---|
836 | } |
---|
837 | |
---|
838 | static void idShift(ideal arg,int index) |
---|
839 | { |
---|
840 | int i,j=rGetMaxSyzComp(index); |
---|
841 | for (i=0;i<IDELEMS(arg);i++) |
---|
842 | { |
---|
843 | if (arg->m[i]!=NULL) |
---|
844 | pShift(&arg->m[i],-j); |
---|
845 | } |
---|
846 | } |
---|
847 | |
---|
848 | static void syPrintResolution(resolvente res,int start,int length) |
---|
849 | { |
---|
850 | while ((start < length) && (res[start])) |
---|
851 | { |
---|
852 | Print("Syz(%d): \n",start); |
---|
853 | idTest(res[start]); |
---|
854 | //idPrint(res[start]); |
---|
855 | start++; |
---|
856 | } |
---|
857 | } |
---|
858 | |
---|
859 | resolvente sySchreyerResolvente(ideal arg, int maxlength, int * length, |
---|
860 | BOOLEAN isMonomial, BOOLEAN notReplace) |
---|
861 | { |
---|
862 | ideal mW=NULL; |
---|
863 | int i,syzIndex = 0,j=0; |
---|
864 | intvec * modcomp=NULL,*w=NULL; |
---|
865 | int ** wv=NULL; |
---|
866 | tHomog hom=(tHomog)idHomModule(arg,NULL,&w); |
---|
867 | ring origR = currRing; |
---|
868 | ring syRing=NULL; |
---|
869 | |
---|
870 | if ((!isMonomial) && syTestOrder(arg)) |
---|
871 | { |
---|
872 | WerrorS("sres only implemented for modules with ordering ..,c or ..,C"); |
---|
873 | return NULL; |
---|
874 | } |
---|
875 | *length = 4; |
---|
876 | resolvente res = (resolvente)omAlloc0(4*sizeof(ideal)),newres; |
---|
877 | res[0] = idCopy(arg); |
---|
878 | while ((!idIs0(res[syzIndex])) && ((maxlength==-1) || (syzIndex<maxlength))) |
---|
879 | { |
---|
880 | i = IDELEMS(res[syzIndex]); |
---|
881 | //while ((i!=0) && (!res[syzIndex]->m[i-1])) i--; |
---|
882 | sy0buck = kBucketCreate(); |
---|
883 | if (syzIndex+1==*length) |
---|
884 | { |
---|
885 | newres = (resolvente)omAlloc0((*length+4)*sizeof(ideal)); |
---|
886 | // for (j=0;j<*length+4;j++) newres[j] = NULL; |
---|
887 | for (j=0;j<*length;j++) newres[j] = res[j]; |
---|
888 | omFreeSize((ADDRESS)res,*length*sizeof(ideal)); |
---|
889 | *length += 4; |
---|
890 | res=newres; |
---|
891 | } |
---|
892 | if ((hom==isHomog)|| (origR->OrdSgn == 1)) |
---|
893 | { |
---|
894 | if (syzIndex==0) syInitSort(res[0],&modcomp); |
---|
895 | if ((syzIndex==0) && !rRing_has_CompLastBlock(currRing)) |
---|
896 | res[syzIndex+1] = sySchreyersSyzygiesFB(res[syzIndex],&modcomp,mW,FALSE); |
---|
897 | else |
---|
898 | res[syzIndex+1] = sySchreyersSyzygiesFB(res[syzIndex],&modcomp,mW); |
---|
899 | mW = res[syzIndex]; |
---|
900 | } |
---|
901 | //idPrint(res[syzIndex+1]); |
---|
902 | |
---|
903 | if ((syzIndex==0)) |
---|
904 | { |
---|
905 | if ((hom==isHomog)|| (origR->OrdSgn == 1)) |
---|
906 | { |
---|
907 | syRing = rCurrRingAssure_CompLastBlock(); |
---|
908 | if (syRing != origR) |
---|
909 | { |
---|
910 | for (i=0; i<IDELEMS(res[1]); i++) |
---|
911 | { |
---|
912 | res[1]->m[i] = prMoveR( res[1]->m[i], origR); |
---|
913 | } |
---|
914 | } |
---|
915 | idTest(res[1]); |
---|
916 | } |
---|
917 | else |
---|
918 | { |
---|
919 | syRing = rCurrRingAssure_SyzComp_CompLastBlock(); |
---|
920 | if (syRing != origR) |
---|
921 | { |
---|
922 | for (i=0; i<IDELEMS(res[0]); i++) |
---|
923 | { |
---|
924 | res[0]->m[i] = prMoveR( res[0]->m[i], origR); |
---|
925 | } |
---|
926 | } |
---|
927 | idTest(res[0]); |
---|
928 | } |
---|
929 | } |
---|
930 | if ((hom!=isHomog) && (origR->OrdSgn != 1)) |
---|
931 | { |
---|
932 | if (syzIndex==0) syInitSort(res[0],&modcomp); |
---|
933 | res[syzIndex+1] = sySchreyersSyzygiesFM(res[syzIndex],&modcomp); |
---|
934 | } |
---|
935 | syzIndex++; |
---|
936 | if (TEST_OPT_PROT) Print("[%d]\n",syzIndex); |
---|
937 | kBucketDestroy(&(sy0buck)); |
---|
938 | } |
---|
939 | //syPrintResolution(res,1,*length); |
---|
940 | if ((hom!=isHomog) && (origR->OrdSgn != 1)) |
---|
941 | { |
---|
942 | syzIndex = 1; |
---|
943 | while ((syzIndex < *length) && (!idIs0(res[syzIndex]))) |
---|
944 | { |
---|
945 | idShift(res[syzIndex],syzIndex); |
---|
946 | syzIndex++; |
---|
947 | } |
---|
948 | } |
---|
949 | if ((hom==isHomog) || (origR->OrdSgn == 1)) |
---|
950 | syzIndex = 1; |
---|
951 | else |
---|
952 | syzIndex = 0; |
---|
953 | syReOrderResolventFB(res,*length,syzIndex+1); |
---|
954 | if (/*ringOrderChanged:*/ origR!=syRing && syRing != NULL) |
---|
955 | { |
---|
956 | rChangeCurrRing(origR); |
---|
957 | // Thomas: Here I assume that all (!) polys of res live in tmpR |
---|
958 | while ((syzIndex < *length) && (res[syzIndex])) |
---|
959 | { |
---|
960 | for (i=0;i<IDELEMS(res[syzIndex]);i++) |
---|
961 | { |
---|
962 | if (res[syzIndex]->m[i]) |
---|
963 | { |
---|
964 | res[syzIndex]->m[i] = prMoveR( res[syzIndex]->m[i], syRing); |
---|
965 | } |
---|
966 | } |
---|
967 | syzIndex++; |
---|
968 | } |
---|
969 | j = 0; |
---|
970 | while (currRing->order[j]!=0) j++; |
---|
971 | rKill(syRing); |
---|
972 | } |
---|
973 | else |
---|
974 | { |
---|
975 | // Thomas -- are you sure that you have to "reorder" here? |
---|
976 | while ((syzIndex < *length) && (res[syzIndex])) |
---|
977 | { |
---|
978 | for (i=0;i<IDELEMS(res[syzIndex]);i++) |
---|
979 | { |
---|
980 | if (res[syzIndex]->m[i]) |
---|
981 | res[syzIndex]->m[i] = pSortCompCorrect(res[syzIndex]->m[i]); |
---|
982 | } |
---|
983 | syzIndex++; |
---|
984 | } |
---|
985 | } |
---|
986 | if ((hom==isHomog) || (origR->OrdSgn == 1)) |
---|
987 | { |
---|
988 | if (res[1]!=NULL) |
---|
989 | { |
---|
990 | syReOrderResolventFB(res,2,1); |
---|
991 | for (i=0;i<IDELEMS(res[1]);i++) |
---|
992 | { |
---|
993 | if (res[1]->m[i]) |
---|
994 | res[1]->m[i] = pSort(res[1]->m[i]); |
---|
995 | } |
---|
996 | } |
---|
997 | } |
---|
998 | //syPrintResolution(res,0,*length); |
---|
999 | |
---|
1000 | //syMergeSortResolventFB(res,*length); |
---|
1001 | if (modcomp!=NULL) delete modcomp; |
---|
1002 | if (w!=NULL) delete w; |
---|
1003 | return res; |
---|
1004 | } |
---|
1005 | |
---|
1006 | syStrategy sySchreyer(ideal arg, int maxlength) |
---|
1007 | { |
---|
1008 | int rl; |
---|
1009 | resolvente fr = sySchreyerResolvente(arg,maxlength,&(rl)); |
---|
1010 | if (fr==NULL) return NULL; |
---|
1011 | |
---|
1012 | int typ0; |
---|
1013 | syStrategy result=(syStrategy)omAlloc0(sizeof(ssyStrategy)); |
---|
1014 | result->length=rl; |
---|
1015 | result->fullres = (resolvente)omAlloc0((rl /*result->length*/+1)*sizeof(ideal)); |
---|
1016 | for (int i=rl /*result->length*/-1;i>=0;i--) |
---|
1017 | { |
---|
1018 | if (fr[i]!=NULL) |
---|
1019 | result->fullres[i] = fr[i]; |
---|
1020 | fr[i] = NULL; |
---|
1021 | } |
---|
1022 | if (currQuotient!=NULL) |
---|
1023 | { |
---|
1024 | for (int i=0; i<rl; i++) |
---|
1025 | { |
---|
1026 | if (result->fullres[i]!=NULL) |
---|
1027 | { |
---|
1028 | ideal t=kNF(currQuotient,NULL,result->fullres[i]); |
---|
1029 | idDelete(&result->fullres[i]); |
---|
1030 | result->fullres[i]=t; |
---|
1031 | if (i<rl-1) |
---|
1032 | { |
---|
1033 | for(int j=IDELEMS(t)-1;j>=0; j--) |
---|
1034 | { |
---|
1035 | if ((t->m[j]==NULL) && (result->fullres[i+1]!=NULL)) |
---|
1036 | { |
---|
1037 | for(int k=IDELEMS(result->fullres[i+1])-1;k>=0; k--) |
---|
1038 | { |
---|
1039 | if (result->fullres[i+1]->m[k]!=NULL) |
---|
1040 | { |
---|
1041 | pDeleteComp(&(result->fullres[i+1]->m[k]),j+1); |
---|
1042 | } |
---|
1043 | } |
---|
1044 | } |
---|
1045 | } |
---|
1046 | } |
---|
1047 | idSkipZeroes(result->fullres[i]); |
---|
1048 | } |
---|
1049 | } |
---|
1050 | if ((rl>maxlength) && (result->fullres[rl-1]!=NULL)) |
---|
1051 | { |
---|
1052 | idDelete(&result->fullres[rl-1]); |
---|
1053 | } |
---|
1054 | } |
---|
1055 | omFreeSize((ADDRESS)fr,(rl /*result->length*/)*sizeof(ideal)); |
---|
1056 | return result; |
---|
1057 | } |
---|
1058 | |
---|