https://github.com/Singular/Sources
Tip revision: b2cb7b48301812323aeeb1e1bd6dd5fce53626b4 authored by Oleksandr Motsak on 20 December 2013, 14:28:06 UTC
Merge pull request #454 from jankoboehm/spielwiese
Merge pull request #454 from jankoboehm/spielwiese
Tip revision: b2cb7b4
ideals.cc
/****************************************
* Computer Algebra System SINGULAR *
****************************************/
/*
* ABSTRACT - all basic methods to manipulate ideals
*/
/* includes */
#ifdef HAVE_CONFIG_H
#include "singularconfig.h"
#endif /* HAVE_CONFIG_H */
#include "mod2.h"
#include <omalloc/omalloc.h>
#ifndef NDEBUG
# define MYTEST 0
#else /* ifndef NDEBUG */
# define MYTEST 0
#endif /* ifndef NDEBUG */
#include <omalloc/omalloc.h>
#include <misc/options.h>
#include <misc/intvec.h>
#include <coeffs/coeffs.h>
#include <coeffs/numbers.h>
#include <kernel/polys.h>
#include <polys/monomials/ring.h>
#include <polys/matpol.h>
#include <polys/weight.h>
#include <polys/sparsmat.h>
#include <polys/prCopy.h>
#include <polys/nc/nc.h>
#include <kernel/ideals.h>
#include <kernel/febase.h>
#include <kernel/kstd1.h>
#include <kernel/syz.h>
#include <libpolys/coeffs/longrat.h>
/* #define WITH_OLD_MINOR */
#define pCopy_noCheck(p) pCopy(p)
/*0 implementation*/
/*2
*returns a minimized set of generators of h1
*/
ideal idMinBase (ideal h1)
{
ideal h2, h3,h4,e;
int j,k;
int i,l,ll;
intvec * wth;
BOOLEAN homog;
homog = idHomModule(h1,currQuotient,&wth);
if (rHasGlobalOrdering(currRing))
{
if(!homog)
{
WarnS("minbase applies only to the local or homogeneous case");
e=idCopy(h1);
return e;
}
else
{
ideal re=kMin_std(h1,currQuotient,(tHomog)homog,&wth,h2,NULL,0,3);
idDelete(&re);
return h2;
}
}
e=idInit(1,h1->rank);
if (idIs0(h1))
{
return e;
}
pEnlargeSet(&(e->m),IDELEMS(e),15);
IDELEMS(e) = 16;
h2 = kStd(h1,currQuotient,isNotHomog,NULL);
h3 = idMaxIdeal(1);
h4=idMult(h2,h3);
idDelete(&h3);
h3=kStd(h4,currQuotient,isNotHomog,NULL);
k = IDELEMS(h3);
while ((k > 0) && (h3->m[k-1] == NULL)) k--;
j = -1;
l = IDELEMS(h2);
while ((l > 0) && (h2->m[l-1] == NULL)) l--;
for (i=l-1; i>=0; i--)
{
if (h2->m[i] != NULL)
{
ll = 0;
while ((ll < k) && ((h3->m[ll] == NULL)
|| !pDivisibleBy(h3->m[ll],h2->m[i])))
ll++;
if (ll >= k)
{
j++;
if (j > IDELEMS(e)-1)
{
pEnlargeSet(&(e->m),IDELEMS(e),16);
IDELEMS(e) += 16;
}
e->m[j] = pCopy(h2->m[i]);
}
}
}
idDelete(&h2);
idDelete(&h3);
idDelete(&h4);
if (currQuotient!=NULL)
{
h3=idInit(1,e->rank);
h2=kNF(h3,currQuotient,e);
idDelete(&h3);
idDelete(&e);
e=h2;
}
idSkipZeroes(e);
return e;
}
/*2
*initialized a field with r numbers between beg and end for the
*procedure idNextChoise
*/
ideal idSectWithElim (ideal h1,ideal h2)
// does not destroy h1,h2
{
if (TEST_OPT_PROT) PrintS("intersect by elimination method\n");
assume(!idIs0(h1));
assume(!idIs0(h2));
assume(IDELEMS(h1)<=IDELEMS(h2));
assume(id_RankFreeModule(h1,currRing)==0);
assume(id_RankFreeModule(h2,currRing)==0);
// add a new variable:
int j;
ring origRing=currRing;
ring r=rCopy0(origRing);
r->N++;
r->block0[0]=1;
r->block1[0]= r->N;
omFree(r->order);
r->order=(int*)omAlloc0(3*sizeof(int*));
r->order[0]=ringorder_dp;
r->order[1]=ringorder_C;
char **names=(char**)omAlloc0(rVar(r) * sizeof(char_ptr));
for (j=0;j<r->N-1;j++) names[j]=r->names[j];
names[r->N-1]=omStrDup("@");
omFree(r->names);
r->names=names;
rComplete(r,TRUE);
// fetch h1, h2
ideal h;
h1=idrCopyR(h1,origRing,r);
h2=idrCopyR(h2,origRing,r);
// switch to temp. ring r
rChangeCurrRing(r);
// create 1-t, t
poly omt=p_One(currRing);
p_SetExp(omt,r->N,1,currRing);
poly t=p_Copy(omt,currRing);
p_Setm(omt,currRing);
omt=p_Neg(omt,currRing);
omt=p_Add_q(omt,pOne(),currRing);
// compute (1-t)*h1
h1=(ideal)mp_MultP((matrix)h1,omt,currRing);
// compute t*h2
h2=(ideal)mp_MultP((matrix)h2,pCopy(t),currRing);
// (1-t)h1 + t*h2
h=idInit(IDELEMS(h1)+IDELEMS(h2),1);
int l;
for (l=IDELEMS(h1)-1; l>=0; l--)
{
h->m[l] = h1->m[l]; h1->m[l]=NULL;
}
j=IDELEMS(h1);
for (l=IDELEMS(h2)-1; l>=0; l--)
{
h->m[l+j] = h2->m[l]; h2->m[l]=NULL;
}
idDelete(&h1);
idDelete(&h2);
// eliminate t:
ideal res=idElimination(h,t);
// cleanup
idDelete(&h);
if (res!=NULL) res=idrMoveR(res,r,origRing);
rChangeCurrRing(origRing);
rDelete(r);
return res;
}
/*2
* h3 := h1 intersect h2
*/
ideal idSect (ideal h1,ideal h2)
{
int i,j,k,length;
int flength = id_RankFreeModule(h1,currRing);
int slength = id_RankFreeModule(h2,currRing);
int rank=si_min(flength,slength);
if ((idIs0(h1)) || (idIs0(h2))) return idInit(1,rank);
ideal first,second,temp,temp1,result;
poly p,q;
if (IDELEMS(h1)<IDELEMS(h2))
{
first = h1;
second = h2;
}
else
{
first = h2;
second = h1;
int t=flength; flength=slength; slength=t;
}
length = si_max(flength,slength);
if (length==0)
{
if ((currQuotient==NULL)
&& (currRing->OrdSgn==1)
&& (!rIsPluralRing(currRing))
&& ((TEST_V_INTERSECT_ELIM) || (!TEST_V_INTERSECT_SYZ)))
return idSectWithElim(first,second);
else length = 1;
}
if (TEST_OPT_PROT) PrintS("intersect by syzygy methods\n");
j = IDELEMS(first);
ring orig_ring=currRing;
ring syz_ring=rAssure_SyzComp(orig_ring,TRUE); rChangeCurrRing(syz_ring);
rSetSyzComp(length, syz_ring);
while ((j>0) && (first->m[j-1]==NULL)) j--;
temp = idInit(j /*IDELEMS(first)*/+IDELEMS(second),length+j);
k = 0;
for (i=0;i<j;i++)
{
if (first->m[i]!=NULL)
{
if (syz_ring==orig_ring)
temp->m[k] = pCopy(first->m[i]);
else
temp->m[k] = prCopyR(first->m[i], orig_ring, syz_ring);
q = pOne();
pSetComp(q,i+1+length);
pSetmComp(q);
if (flength==0) p_Shift(&(temp->m[k]),1,currRing);
p = temp->m[k];
while (pNext(p)!=NULL) pIter(p);
pNext(p) = q;
k++;
}
}
for (i=0;i<IDELEMS(second);i++)
{
if (second->m[i]!=NULL)
{
if (syz_ring==orig_ring)
temp->m[k] = pCopy(second->m[i]);
else
temp->m[k] = prCopyR(second->m[i], orig_ring,currRing);
if (slength==0) p_Shift(&(temp->m[k]),1,currRing);
k++;
}
}
intvec *w=NULL;
temp1 = kStd(temp,currQuotient,testHomog,&w,NULL,length);
if (w!=NULL) delete w;
idDelete(&temp);
if(syz_ring!=orig_ring)
rChangeCurrRing(orig_ring);
result = idInit(IDELEMS(temp1),rank);
j = 0;
for (i=0;i<IDELEMS(temp1);i++)
{
if ((temp1->m[i]!=NULL)
&& (p_GetComp(temp1->m[i],syz_ring)>length))
{
if(syz_ring==orig_ring)
{
p = temp1->m[i];
}
else
{
p = prMoveR(temp1->m[i], syz_ring,orig_ring);
}
temp1->m[i]=NULL;
while (p!=NULL)
{
q = pNext(p);
pNext(p) = NULL;
k = pGetComp(p)-1-length;
pSetComp(p,0);
pSetmComp(p);
/* Warning! multiply only from the left! it's very important for Plural */
result->m[j] = pAdd(result->m[j],pMult(p,pCopy(first->m[k])));
p = q;
}
j++;
}
}
if(syz_ring!=orig_ring)
{
rChangeCurrRing(syz_ring);
idDelete(&temp1);
rChangeCurrRing(orig_ring);
rDelete(syz_ring);
}
else
{
idDelete(&temp1);
}
idSkipZeroes(result);
if (TEST_OPT_RETURN_SB)
{
w=NULL;
temp1=kStd(result,currQuotient,testHomog,&w);
if (w!=NULL) delete w;
idDelete(&result);
idSkipZeroes(temp1);
return temp1;
}
else //temp1=kInterRed(result,currQuotient);
return result;
}
/*2
* ideal/module intersection for a list of objects
* given as 'resolvente'
*/
ideal idMultSect(resolvente arg, int length)
{
int i,j=0,k=0,syzComp,l,maxrk=-1,realrki;
ideal bigmat,tempstd,result;
poly p;
int isIdeal=0;
intvec * w=NULL;
/* find 0-ideals and max rank -----------------------------------*/
for (i=0;i<length;i++)
{
if (!idIs0(arg[i]))
{
realrki=id_RankFreeModule(arg[i],currRing);
k++;
j += IDELEMS(arg[i]);
if (realrki>maxrk) maxrk = realrki;
}
else
{
if (arg[i]!=NULL)
{
return idInit(1,arg[i]->rank);
}
}
}
if (maxrk == 0)
{
isIdeal = 1;
maxrk = 1;
}
/* init -----------------------------------------------------------*/
j += maxrk;
syzComp = k*maxrk;
ring orig_ring=currRing;
ring syz_ring=rAssure_SyzComp(orig_ring,TRUE); rChangeCurrRing(syz_ring);
rSetSyzComp(syzComp, syz_ring);
bigmat = idInit(j,(k+1)*maxrk);
/* create unit matrices ------------------------------------------*/
for (i=0;i<maxrk;i++)
{
for (j=0;j<=k;j++)
{
p = pOne();
pSetComp(p,i+1+j*maxrk);
pSetmComp(p);
bigmat->m[i] = pAdd(bigmat->m[i],p);
}
}
/* enter given ideals ------------------------------------------*/
i = maxrk;
k = 0;
for (j=0;j<length;j++)
{
if (arg[j]!=NULL)
{
for (l=0;l<IDELEMS(arg[j]);l++)
{
if (arg[j]->m[l]!=NULL)
{
if (syz_ring==orig_ring)
bigmat->m[i] = pCopy(arg[j]->m[l]);
else
bigmat->m[i] = prCopyR(arg[j]->m[l], orig_ring,currRing);
p_Shift(&(bigmat->m[i]),k*maxrk+isIdeal,currRing);
i++;
}
}
k++;
}
}
/* std computation --------------------------------------------*/
tempstd = kStd(bigmat,currQuotient,testHomog,&w,NULL,syzComp);
if (w!=NULL) delete w;
idDelete(&bigmat);
if(syz_ring!=orig_ring)
rChangeCurrRing(orig_ring);
/* interprete result ----------------------------------------*/
result = idInit(IDELEMS(tempstd),maxrk);
k = 0;
for (j=0;j<IDELEMS(tempstd);j++)
{
if ((tempstd->m[j]!=NULL) && (p_GetComp(tempstd->m[j],syz_ring)>syzComp))
{
if (syz_ring==orig_ring)
p = pCopy(tempstd->m[j]);
else
p = prCopyR(tempstd->m[j], syz_ring,currRing);
p_Shift(&p,-syzComp-isIdeal,currRing);
result->m[k] = p;
k++;
}
}
/* clean up ----------------------------------------------------*/
if(syz_ring!=orig_ring)
rChangeCurrRing(syz_ring);
idDelete(&tempstd);
if(syz_ring!=orig_ring)
{
rChangeCurrRing(orig_ring);
rDelete(syz_ring);
}
idSkipZeroes(result);
return result;
}
/*2
*computes syzygies of h1,
*if quot != NULL it computes in the quotient ring modulo "quot"
*works always in a ring with ringorder_s
*/
static ideal idPrepare (ideal h1, tHomog hom, int syzcomp, intvec **w)
{
ideal h2, h3;
int i;
int j,k;
poly p,q;
if (idIs0(h1)) return NULL;
k = id_RankFreeModule(h1,currRing);
h2=idCopy(h1);
i = IDELEMS(h2)-1;
if (k == 0)
{
for (j=0; j<=i; j++) p_Shift(&(h2->m[j]),1,currRing);
k = 1;
}
if (syzcomp<k)
{
Warn("syzcomp too low, should be %d instead of %d",k,syzcomp);
syzcomp = k;
rSetSyzComp(k,currRing);
}
h2->rank = syzcomp+i+1;
//if (hom==testHomog)
//{
// if(idHomIdeal(h1,currQuotient))
// {
// hom=TRUE;
// }
//}
#if MYTEST
#ifdef RDEBUG
Print("Prepare::h2: ");
idPrint(h2);
for(j=0;j<IDELEMS(h2);j++) pTest(h2->m[j]);
#endif
#endif
for (j=0; j<=i; j++)
{
p = h2->m[j];
q = pOne();
pSetComp(q,syzcomp+1+j);
pSetmComp(q);
if (p!=NULL)
{
while (pNext(p)) pIter(p);
p->next = q;
}
else
h2->m[j]=q;
}
#ifdef PDEBUG
for(j=0;j<IDELEMS(h2);j++) pTest(h2->m[j]);
#if MYTEST
#ifdef RDEBUG
Print("Prepare::Input: ");
idPrint(h2);
Print("Prepare::currQuotient: ");
idPrint(currQuotient);
#endif
#endif
#endif
idTest(h2);
h3 = kStd(h2,currQuotient,hom,w,NULL,syzcomp);
#if MYTEST
#ifdef RDEBUG
Print("Prepare::Output: ");
idPrint(h3);
for(j=0;j<IDELEMS(h2);j++) pTest(h3->m[j]);
#endif
#endif
idDelete(&h2);
return h3;
}
/*2
* compute the syzygies of h1 in R/quot,
* weights of components are in w
* if setRegularity, return the regularity in deg
* do not change h1, w
*/
ideal idSyzygies (ideal h1, tHomog h,intvec **w, BOOLEAN setSyzComp,
BOOLEAN setRegularity, int *deg)
{
ideal s_h1;
int j, k, length=0,reg;
BOOLEAN isMonomial=TRUE;
int ii, idElemens_h1;
assume(h1 != NULL);
idElemens_h1=IDELEMS(h1);
#ifdef PDEBUG
for(ii=0;ii<idElemens_h1 /*IDELEMS(h1)*/;ii++) pTest(h1->m[ii]);
#endif
if (idIs0(h1))
{
ideal result=idFreeModule(idElemens_h1/*IDELEMS(h1)*/);
int curr_syz_limit=rGetCurrSyzLimit(currRing);
if (curr_syz_limit>0)
for (ii=0;ii<idElemens_h1/*IDELEMS(h1)*/;ii++)
{
if (h1->m[ii]!=NULL)
p_Shift(&h1->m[ii],curr_syz_limit,currRing);
}
return result;
}
int slength=(int)id_RankFreeModule(h1,currRing);
k=si_max(1,slength /*id_RankFreeModule(h1)*/);
assume(currRing != NULL);
ring orig_ring=currRing;
ring syz_ring=rAssure_SyzComp(orig_ring,TRUE); rChangeCurrRing(syz_ring);
if (setSyzComp)
rSetSyzComp(k,syz_ring);
if (orig_ring != syz_ring)
{
s_h1=idrCopyR_NoSort(h1,orig_ring,syz_ring);
}
else
{
s_h1 = h1;
}
idTest(s_h1);
ideal s_h3=idPrepare(s_h1,h,k,w); // main (syz) GB computation
if (s_h3==NULL)
{
return idFreeModule( idElemens_h1 /*IDELEMS(h1)*/);
}
if (orig_ring != syz_ring)
{
idDelete(&s_h1);
for (j=0; j<IDELEMS(s_h3); j++)
{
if (s_h3->m[j] != NULL)
{
if (p_MinComp(s_h3->m[j],syz_ring) > k)
p_Shift(&s_h3->m[j], -k,syz_ring);
else
p_Delete(&s_h3->m[j],syz_ring);
}
}
idSkipZeroes(s_h3);
s_h3->rank -= k;
rChangeCurrRing(orig_ring);
s_h3 = idrMoveR_NoSort(s_h3, syz_ring, orig_ring);
rDelete(syz_ring);
#ifdef HAVE_PLURAL
if (rIsPluralRing(orig_ring))
{
id_DelMultiples(s_h3,orig_ring);
idSkipZeroes(s_h3);
}
#endif
idTest(s_h3);
return s_h3;
}
ideal e = idInit(IDELEMS(s_h3), s_h3->rank);
for (j=IDELEMS(s_h3)-1; j>=0; j--)
{
if (s_h3->m[j] != NULL)
{
if (p_MinComp(s_h3->m[j],syz_ring) <= k)
{
e->m[j] = s_h3->m[j];
isMonomial=isMonomial && (pNext(s_h3->m[j])==NULL);
p_Delete(&pNext(s_h3->m[j]),syz_ring);
s_h3->m[j] = NULL;
}
}
}
idSkipZeroes(s_h3);
idSkipZeroes(e);
if ((deg != NULL)
&& (!isMonomial)
&& (!TEST_OPT_NOTREGULARITY)
&& (setRegularity)
&& (h==isHomog)
&& (!rIsPluralRing(currRing))
)
{
ring dp_C_ring = rAssure_dp_C(syz_ring); // will do rChangeCurrRing later
if (dp_C_ring != syz_ring)
{
rChangeCurrRing(dp_C_ring);
e = idrMoveR_NoSort(e, syz_ring, dp_C_ring);
}
resolvente res = sySchreyerResolvente(e,-1,&length,TRUE, TRUE);
intvec * dummy = syBetti(res,length,®, *w);
*deg = reg+2;
delete dummy;
for (j=0;j<length;j++)
{
if (res[j]!=NULL) idDelete(&(res[j]));
}
omFreeSize((ADDRESS)res,length*sizeof(ideal));
idDelete(&e);
if (dp_C_ring != syz_ring)
{
rChangeCurrRing(syz_ring);
rDelete(dp_C_ring);
}
}
else
{
idDelete(&e);
}
idTest(s_h3);
if (currQuotient != NULL)
{
ideal ts_h3=kStd(s_h3,currQuotient,h,w);
idDelete(&s_h3);
s_h3 = ts_h3;
}
return s_h3;
}
/*2
*/
ideal idXXX (ideal h1, int k)
{
ideal s_h1;
intvec *w=NULL;
assume(currRing != NULL);
ring orig_ring=currRing;
ring syz_ring=rAssure_SyzComp(orig_ring,TRUE); rChangeCurrRing(syz_ring);
rSetSyzComp(k,syz_ring);
if (orig_ring != syz_ring)
{
s_h1=idrCopyR_NoSort(h1,orig_ring, syz_ring);
}
else
{
s_h1 = h1;
}
ideal s_h3=kStd(s_h1,NULL,testHomog,&w,NULL,k);
if (s_h3==NULL)
{
return idFreeModule(IDELEMS(h1));
}
if (orig_ring != syz_ring)
{
idDelete(&s_h1);
idSkipZeroes(s_h3);
rChangeCurrRing(orig_ring);
s_h3 = idrMoveR_NoSort(s_h3, syz_ring, orig_ring);
rDelete(syz_ring);
idTest(s_h3);
return s_h3;
}
idSkipZeroes(s_h3);
idTest(s_h3);
return s_h3;
}
/*
*computes a standard basis for h1 and stores the transformation matrix
* in ma
*/
ideal idLiftStd (ideal h1, matrix* ma, tHomog hi, ideal * syz)
{
int i, j, t, inputIsIdeal=id_RankFreeModule(h1,currRing);
long k;
poly p=NULL, q;
intvec *w=NULL;
idDelete((ideal*)ma);
BOOLEAN lift3=FALSE;
if (syz!=NULL) { lift3=TRUE; idDelete(syz); }
if (idIs0(h1))
{
*ma=mpNew(1,0);
if (lift3)
{
*syz=idFreeModule(IDELEMS(h1));
int curr_syz_limit=rGetCurrSyzLimit(currRing);
if (curr_syz_limit>0)
for (int ii=0;ii<IDELEMS(h1);ii++)
{
if (h1->m[ii]!=NULL)
p_Shift(&h1->m[ii],curr_syz_limit,currRing);
}
}
return idInit(1,h1->rank);
}
BITSET save2;
SI_SAVE_OPT2(save2);
k=si_max((long)1,id_RankFreeModule(h1,currRing));
if ((k==1) && (!lift3)) si_opt_2 |=Sy_bit(V_IDLIFT);
ring orig_ring = currRing;
ring syz_ring = rAssure_SyzComp(orig_ring,TRUE); rChangeCurrRing(syz_ring);
rSetSyzComp(k,syz_ring);
ideal s_h1=h1;
if (orig_ring != syz_ring)
s_h1 = idrCopyR_NoSort(h1,orig_ring,syz_ring);
else
s_h1 = h1;
ideal s_h3=idPrepare(s_h1,hi,k,&w); // main (syz) GB computation
ideal s_h2 = idInit(IDELEMS(s_h3), s_h3->rank);
if (lift3) (*syz)=idInit(IDELEMS(s_h3),IDELEMS(h1));
if (w!=NULL) delete w;
i = 0;
// now sort the result, SB : leave in s_h3
// T: put in s_h2
// syz: put in *syz
for (j=0; j<IDELEMS(s_h3); j++)
{
if (s_h3->m[j] != NULL)
{
//if (p_MinComp(s_h3->m[j],syz_ring) <= k)
if (pGetComp(s_h3->m[j]) <= k) // syz_ring == currRing
{
i++;
q = s_h3->m[j];
while (pNext(q) != NULL)
{
if (pGetComp(pNext(q)) > k)
{
s_h2->m[j] = pNext(q);
pNext(q) = NULL;
}
else
{
pIter(q);
}
}
if (!inputIsIdeal) p_Shift(&(s_h3->m[j]), -1,currRing);
}
else
{
// we a syzygy here:
if (lift3)
{
p_Shift(&s_h3->m[j], -k,currRing);
(*syz)->m[j]=s_h3->m[j];
s_h3->m[j]=NULL;
}
else
p_Delete(&(s_h3->m[j]),currRing);
}
}
}
idSkipZeroes(s_h3);
//extern char * iiStringMatrix(matrix im, int dim,char ch);
//PrintS("SB: ----------------------------------------\n");
//PrintS(iiStringMatrix((matrix)s_h3,k,'\n'));
//PrintLn();
//PrintS("T: ----------------------------------------\n");
//PrintS(iiStringMatrix((matrix)s_h2,h1->rank,'\n'));
//PrintLn();
if (lift3) idSkipZeroes(*syz);
j = IDELEMS(s_h1);
if (syz_ring!=orig_ring)
{
idDelete(&s_h1);
rChangeCurrRing(orig_ring);
}
*ma = mpNew(j,i);
i = 1;
for (j=0; j<IDELEMS(s_h2); j++)
{
if (s_h2->m[j] != NULL)
{
q = prMoveR( s_h2->m[j], syz_ring,orig_ring);
s_h2->m[j] = NULL;
while (q != NULL)
{
p = q;
pIter(q);
pNext(p) = NULL;
t=pGetComp(p);
pSetComp(p,0);
pSetmComp(p);
MATELEM(*ma,t-k,i) = pAdd(MATELEM(*ma,t-k,i),p);
}
i++;
}
}
idDelete(&s_h2);
for (i=0; i<IDELEMS(s_h3); i++)
{
s_h3->m[i] = prMoveR_NoSort(s_h3->m[i], syz_ring,orig_ring);
}
if (lift3)
{
for (i=0; i<IDELEMS(*syz); i++)
{
(*syz)->m[i] = prMoveR_NoSort((*syz)->m[i], syz_ring,orig_ring);
}
}
if (syz_ring!=orig_ring) rDelete(syz_ring);
SI_RESTORE_OPT2(save2);
return s_h3;
}
static void idPrepareStd(ideal s_temp, int k)
{
int j,rk=id_RankFreeModule(s_temp,currRing);
poly p,q;
if (rk == 0)
{
for (j=0; j<IDELEMS(s_temp); j++)
{
if (s_temp->m[j]!=NULL) pSetCompP(s_temp->m[j],1);
}
k = si_max(k,1);
}
for (j=0; j<IDELEMS(s_temp); j++)
{
if (s_temp->m[j]!=NULL)
{
p = s_temp->m[j];
q = pOne();
//pGetCoeff(q)=nNeg(pGetCoeff(q)); //set q to -1
pSetComp(q,k+1+j);
pSetmComp(q);
while (pNext(p)) pIter(p);
pNext(p) = q;
}
}
}
/*2
*computes a representation of the generators of submod with respect to those
* of mod
*/
ideal idLift(ideal mod, ideal submod,ideal *rest, BOOLEAN goodShape,
BOOLEAN isSB, BOOLEAN divide, matrix *unit)
{
int lsmod =id_RankFreeModule(submod,currRing), j, k;
int comps_to_add=0;
poly p;
if (idIs0(submod))
{
if (unit!=NULL)
{
*unit=mpNew(1,1);
MATELEM(*unit,1,1)=pOne();
}
if (rest!=NULL)
{
*rest=idInit(1,mod->rank);
}
return idInit(1,mod->rank);
}
if (idIs0(mod)) /* and not idIs0(submod) */
{
WerrorS("2nd module does not lie in the first");
return NULL;
}
if (unit!=NULL)
{
comps_to_add = IDELEMS(submod);
while ((comps_to_add>0) && (submod->m[comps_to_add-1]==NULL))
comps_to_add--;
}
k=si_max(id_RankFreeModule(mod,currRing),id_RankFreeModule(submod,currRing));
if ((k!=0) && (lsmod==0)) lsmod=1;
k=si_max(k,(int)mod->rank);
if (k<submod->rank) { WarnS("rk(submod) > rk(mod) ?");k=submod->rank; }
ring orig_ring=currRing;
ring syz_ring=rAssure_SyzComp(orig_ring,TRUE); rChangeCurrRing(syz_ring);
rSetSyzComp(k,syz_ring);
ideal s_mod, s_temp;
if (orig_ring != syz_ring)
{
s_mod = idrCopyR_NoSort(mod,orig_ring,syz_ring);
s_temp = idrCopyR_NoSort(submod,orig_ring,syz_ring);
}
else
{
s_mod = mod;
s_temp = idCopy(submod);
}
ideal s_h3;
if (isSB)
{
s_h3 = idCopy(s_mod);
idPrepareStd(s_h3, k+comps_to_add);
}
else
{
s_h3 = idPrepare(s_mod,(tHomog)FALSE,k+comps_to_add,NULL);
}
if (!goodShape)
{
for (j=0;j<IDELEMS(s_h3);j++)
{
if ((s_h3->m[j] != NULL) && (pMinComp(s_h3->m[j]) > k))
p_Delete(&(s_h3->m[j]),currRing);
}
}
idSkipZeroes(s_h3);
if (lsmod==0)
{
for (j=IDELEMS(s_temp);j>0;j--)
{
if (s_temp->m[j-1]!=NULL)
p_Shift(&(s_temp->m[j-1]),1,currRing);
}
}
if (unit!=NULL)
{
for(j = 0;j<comps_to_add;j++)
{
p = s_temp->m[j];
if (p!=NULL)
{
while (pNext(p)!=NULL) pIter(p);
pNext(p) = pOne();
pIter(p);
pSetComp(p,1+j+k);
pSetmComp(p);
p = pNeg(p);
}
}
}
ideal s_result = kNF(s_h3,currQuotient,s_temp,k);
s_result->rank = s_h3->rank;
ideal s_rest = idInit(IDELEMS(s_result),k);
idDelete(&s_h3);
idDelete(&s_temp);
for (j=0;j<IDELEMS(s_result);j++)
{
if (s_result->m[j]!=NULL)
{
if (pGetComp(s_result->m[j])<=k)
{
if (!divide)
{
if (isSB)
{
WarnS("first module not a standardbasis\n"
"// ** or second not a proper submodule");
}
else
WerrorS("2nd module does not lie in the first");
idDelete(&s_result);
idDelete(&s_rest);
s_result=idInit(IDELEMS(submod),submod->rank);
break;
}
else
{
p = s_rest->m[j] = s_result->m[j];
while ((pNext(p)!=NULL) && (pGetComp(pNext(p))<=k)) pIter(p);
s_result->m[j] = pNext(p);
pNext(p) = NULL;
}
}
p_Shift(&(s_result->m[j]),-k,currRing);
pNeg(s_result->m[j]);
}
}
if ((lsmod==0) && (!idIs0(s_rest)))
{
for (j=IDELEMS(s_rest);j>0;j--)
{
if (s_rest->m[j-1]!=NULL)
{
p_Shift(&(s_rest->m[j-1]),-1,currRing);
s_rest->m[j-1] = s_rest->m[j-1];
}
}
}
if(syz_ring!=orig_ring)
{
idDelete(&s_mod);
rChangeCurrRing(orig_ring);
s_result = idrMoveR_NoSort(s_result, syz_ring, orig_ring);
s_rest = idrMoveR_NoSort(s_rest, syz_ring, orig_ring);
rDelete(syz_ring);
}
if (rest!=NULL)
*rest = s_rest;
else
idDelete(&s_rest);
//idPrint(s_result);
if (unit!=NULL)
{
*unit=mpNew(comps_to_add,comps_to_add);
int i;
for(i=0;i<IDELEMS(s_result);i++)
{
poly p=s_result->m[i];
poly q=NULL;
while(p!=NULL)
{
if(pGetComp(p)<=comps_to_add)
{
pSetComp(p,0);
if (q!=NULL)
{
pNext(q)=pNext(p);
}
else
{
pIter(s_result->m[i]);
}
pNext(p)=NULL;
MATELEM(*unit,i+1,i+1)=pAdd(MATELEM(*unit,i+1,i+1),p);
if(q!=NULL) p=pNext(q);
else p=s_result->m[i];
}
else
{
q=p;
pIter(p);
}
}
p_Shift(&s_result->m[i],-comps_to_add,currRing);
}
}
return s_result;
}
/*2
*computes division of P by Q with remainder up to (w-weighted) degree n
*P, Q, and w are not changed
*/
void idLiftW(ideal P,ideal Q,int n,matrix &T, ideal &R,short *w)
{
long N=0;
int i;
for(i=IDELEMS(Q)-1;i>=0;i--)
if(w==NULL)
N=si_max(N,p_Deg(Q->m[i],currRing));
else
N=si_max(N,p_DegW(Q->m[i],w,currRing));
N+=n;
T=mpNew(IDELEMS(Q),IDELEMS(P));
R=idInit(IDELEMS(P),P->rank);
for(i=IDELEMS(P)-1;i>=0;i--)
{
poly p;
if(w==NULL)
p=ppJet(P->m[i],N);
else
p=ppJetW(P->m[i],N,w);
int j=IDELEMS(Q)-1;
while(p!=NULL)
{
if(pDivisibleBy(Q->m[j],p))
{
poly p0=p_DivideM(pHead(p),pHead(Q->m[j]),currRing);
if(w==NULL)
p=pJet(pSub(p,ppMult_mm(Q->m[j],p0)),N);
else
p=pJetW(pSub(p,ppMult_mm(Q->m[j],p0)),N,w);
pNormalize(p);
if(((w==NULL)&&(p_Deg(p0,currRing)>n))||((w!=NULL)&&(p_DegW(p0,w,currRing)>n)))
p_Delete(&p0,currRing);
else
MATELEM(T,j+1,i+1)=pAdd(MATELEM(T,j+1,i+1),p0);
j=IDELEMS(Q)-1;
}
else
{
if(j==0)
{
poly p0=p;
pIter(p);
pNext(p0)=NULL;
if(((w==NULL)&&(p_Deg(p0,currRing)>n))
||((w!=NULL)&&(p_DegW(p0,w,currRing)>n)))
p_Delete(&p0,currRing);
else
R->m[i]=pAdd(R->m[i],p0);
j=IDELEMS(Q)-1;
}
else
j--;
}
}
}
}
/*2
*computes the quotient of h1,h2 : internal routine for idQuot
*BEWARE: the returned ideals may contain incorrectly ordered polys !
*
*/
static ideal idInitializeQuot (ideal h1, ideal h2, BOOLEAN h1IsStb,
BOOLEAN *addOnlyOne, int *kkmax)
{
ideal temph1;
poly p,q = NULL;
int i,l,ll,k,kkk,kmax;
int j = 0;
int k1 = id_RankFreeModule(h1,currRing);
int k2 = id_RankFreeModule(h2,currRing);
tHomog hom=isNotHomog;
k=si_max(k1,k2);
if (k==0)
k = 1;
if ((k2==0) && (k>1)) *addOnlyOne = FALSE;
intvec * weights;
hom = (tHomog)idHomModule(h1,currQuotient,&weights);
if /**addOnlyOne &&*/ (/*(*/ !h1IsStb /*)*/)
temph1 = kStd(h1,currQuotient,hom,&weights,NULL);
else
temph1 = idCopy(h1);
if (weights!=NULL) delete weights;
idTest(temph1);
/*--- making a single vector from h2 ---------------------*/
for (i=0; i<IDELEMS(h2); i++)
{
if (h2->m[i] != NULL)
{
p = pCopy(h2->m[i]);
if (k2 == 0)
p_Shift(&p,j*k+1,currRing);
else
p_Shift(&p,j*k,currRing);
q = pAdd(q,p);
j++;
}
}
*kkmax = kmax = j*k+1;
/*--- adding a monomial for the result (syzygy) ----------*/
p = q;
while (pNext(p)!=NULL) pIter(p);
pNext(p) = pOne();
pIter(p);
pSetComp(p,kmax);
pSetmComp(p);
/*--- constructing the big matrix ------------------------*/
ideal h4 = idInit(16,kmax+k-1);
h4->m[0] = q;
if (k2 == 0)
{
if (k > IDELEMS(h4))
{
pEnlargeSet(&(h4->m),IDELEMS(h4),k-IDELEMS(h4));
IDELEMS(h4) = k;
}
for (i=1; i<k; i++)
{
if (h4->m[i-1]!=NULL)
{
p = pCopy_noCheck(h4->m[i-1]);
p_Shift(&p,1,currRing);
h4->m[i] = p;
}
}
}
idSkipZeroes(h4);
kkk = IDELEMS(h4);
i = IDELEMS(temph1);
for (l=0; l<i; l++)
{
if(temph1->m[l]!=NULL)
{
for (ll=0; ll<j; ll++)
{
p = pCopy(temph1->m[l]);
if (k1 == 0)
p_Shift(&p,ll*k+1,currRing);
else
p_Shift(&p,ll*k,currRing);
if (kkk >= IDELEMS(h4))
{
pEnlargeSet(&(h4->m),IDELEMS(h4),16);
IDELEMS(h4) += 16;
}
h4->m[kkk] = p;
kkk++;
}
}
}
/*--- if h2 goes in as single vector - the h1-part is just SB ---*/
if (*addOnlyOne)
{
idSkipZeroes(h4);
p = h4->m[0];
for (i=0;i<IDELEMS(h4)-1;i++)
{
h4->m[i] = h4->m[i+1];
}
h4->m[IDELEMS(h4)-1] = p;
si_opt_1 |= Sy_bit(OPT_SB_1);
}
idDelete(&temph1);
return h4;
}
/*2
*computes the quotient of h1,h2
*/
ideal idQuot (ideal h1, ideal h2, BOOLEAN h1IsStb, BOOLEAN resultIsIdeal)
{
// first check for special case h1:(0)
if (idIs0(h2))
{
ideal res;
if (resultIsIdeal)
{
res = idInit(1,1);
res->m[0] = pOne();
}
else
res = idFreeModule(h1->rank);
return res;
}
BITSET old_test1;
SI_SAVE_OPT1(old_test1);
int i, kmax;
BOOLEAN addOnlyOne=TRUE;
tHomog hom=isNotHomog;
intvec * weights1;
ideal s_h4 = idInitializeQuot (h1,h2,h1IsStb,&addOnlyOne,&kmax);
hom = (tHomog)idHomModule(s_h4,currQuotient,&weights1);
ring orig_ring=currRing;
ring syz_ring=rAssure_SyzComp(orig_ring,TRUE); rChangeCurrRing(syz_ring);
rSetSyzComp(kmax-1,syz_ring);
if (orig_ring!=syz_ring)
// s_h4 = idrMoveR_NoSort(s_h4,orig_ring, syz_ring);
s_h4 = idrMoveR(s_h4,orig_ring, syz_ring);
idTest(s_h4);
#if 0
void ipPrint_MA0(matrix m, const char *name);
matrix m=idModule2Matrix(idCopy(s_h4));
PrintS("start:\n");
ipPrint_MA0(m,"Q");
idDelete((ideal *)&m);
PrintS("last elem:");wrp(s_h4->m[IDELEMS(s_h4)-1]);PrintLn();
#endif
ideal s_h3;
if (addOnlyOne)
{
s_h3 = kStd(s_h4,currQuotient,hom,&weights1,NULL,0/*kmax-1*/,IDELEMS(s_h4)-1);
}
else
{
s_h3 = kStd(s_h4,currQuotient,hom,&weights1,NULL,kmax-1);
}
SI_RESTORE_OPT1(old_test1);
#if 0
// only together with the above debug stuff
idSkipZeroes(s_h3);
m=idModule2Matrix(idCopy(s_h3));
Print("result, kmax=%d:\n",kmax);
ipPrint_MA0(m,"S");
idDelete((ideal *)&m);
#endif
idTest(s_h3);
if (weights1!=NULL) delete weights1;
idDelete(&s_h4);
for (i=0;i<IDELEMS(s_h3);i++)
{
if ((s_h3->m[i]!=NULL) && (pGetComp(s_h3->m[i])>=kmax))
{
if (resultIsIdeal)
p_Shift(&s_h3->m[i],-kmax,currRing);
else
p_Shift(&s_h3->m[i],-kmax+1,currRing);
}
else
p_Delete(&s_h3->m[i],currRing);
}
if (resultIsIdeal)
s_h3->rank = 1;
else
s_h3->rank = h1->rank;
if(syz_ring!=orig_ring)
{
rChangeCurrRing(orig_ring);
s_h3 = idrMoveR_NoSort(s_h3, syz_ring, orig_ring);
rDelete(syz_ring);
}
idSkipZeroes(s_h3);
idTest(s_h3);
return s_h3;
}
/*2
* eliminate delVar (product of vars) in h1
*/
ideal idElimination (ideal h1,poly delVar,intvec *hilb)
{
int i,j=0,k,l;
ideal h,hh, h3;
int *ord,*block0,*block1;
int ordersize=2;
int **wv;
tHomog hom;
intvec * w;
ring tmpR;
ring origR = currRing;
if (delVar==NULL)
{
return idCopy(h1);
}
if ((currQuotient!=NULL) && rIsPluralRing(origR))
{
WerrorS("cannot eliminate in a qring");
return NULL;
}
if (idIs0(h1)) return idInit(1,h1->rank);
#ifdef HAVE_PLURAL
if (rIsPluralRing(origR))
/* in the NC case, we have to check the admissibility of */
/* the subalgebra to be intersected with */
{
if ((ncRingType(origR) != nc_skew) && (ncRingType(origR) != nc_exterior)) /* in (quasi)-commutative algebras every subalgebra is admissible */
{
if (nc_CheckSubalgebra(delVar,origR))
{
WerrorS("no elimination is possible: subalgebra is not admissible");
return NULL;
}
}
}
#endif
hom=(tHomog)idHomModule(h1,NULL,&w); //sets w to weight vector or NULL
h3=idInit(16,h1->rank);
for (k=0;; k++)
{
if (origR->order[k]!=0) ordersize++;
else break;
}
#if 0
if (rIsPluralRing(origR)) // we have too keep the odering: it may be needed
// for G-algebra
{
for (k=0;k<ordersize-1; k++)
{
block0[k+1] = origR->block0[k];
block1[k+1] = origR->block1[k];
ord[k+1] = origR->order[k];
if (origR->wvhdl[k]!=NULL) wv[k+1] = (int*) omMemDup(origR->wvhdl[k]);
}
}
else
{
block0[1] = 1;
block1[1] = (currRing->N);
if (origR->OrdSgn==1) ord[1] = ringorder_wp;
else ord[1] = ringorder_ws;
wv[1]=(int*)omAlloc0((currRing->N)*sizeof(int));
double wNsqr = (double)2.0 / (double)(currRing->N);
wFunctional = wFunctionalBuch;
int *x= (int * )omAlloc(2 * ((currRing->N) + 1) * sizeof(int));
int sl=IDELEMS(h1) - 1;
wCall(h1->m, sl, x, wNsqr);
for (sl = (currRing->N); sl!=0; sl--)
wv[1][sl-1] = x[sl + (currRing->N) + 1];
omFreeSize((ADDRESS)x, 2 * ((currRing->N) + 1) * sizeof(int));
ord[2]=ringorder_C;
ord[3]=0;
}
#else
#endif
if ((hom==TRUE) && (origR->OrdSgn==1) && (!rIsPluralRing(origR)))
{
#if 1
// we change to an ordering:
// aa(1,1,1,...,0,0,0),wp(...),C
// this seems to be better than version 2 below,
// according to Tst/../elimiate_[3568].tat (- 17 %)
ord=(int*)omAlloc0(4*sizeof(int));
block0=(int*)omAlloc0(4*sizeof(int));
block1=(int*)omAlloc0(4*sizeof(int));
wv=(int**) omAlloc0(4*sizeof(int**));
block0[0] = block0[1] = 1;
block1[0] = block1[1] = rVar(origR);
wv[0]=(int*)omAlloc0((rVar(origR) + 1)*sizeof(int));
// use this special ordering: like ringorder_a, except that pFDeg, pWeights
// ignore it
ord[0] = ringorder_aa;
for (j=0;j<rVar(origR);j++)
if (pGetExp(delVar,j+1)!=0) wv[0][j]=1;
BOOLEAN wp=FALSE;
for (j=0;j<rVar(origR);j++)
if (pWeight(j+1,origR)!=1) { wp=TRUE;break; }
if (wp)
{
wv[1]=(int*)omAlloc0((rVar(origR) + 1)*sizeof(int));
for (j=0;j<rVar(origR);j++)
wv[1][j]=pWeight(j+1,origR);
ord[1] = ringorder_wp;
}
else
ord[1] = ringorder_dp;
#else
// we change to an ordering:
// a(w1,...wn),wp(1,...0.....),C
ord=(int*)omAlloc0(4*sizeof(int));
block0=(int*)omAlloc0(4*sizeof(int));
block1=(int*)omAlloc0(4*sizeof(int));
wv=(int**) omAlloc0(4*sizeof(int**));
block0[0] = block0[1] = 1;
block1[0] = block1[1] = rVar(origR);
wv[0]=(int*)omAlloc0((rVar(origR) + 1)*sizeof(int));
wv[1]=(int*)omAlloc0((rVar(origR) + 1)*sizeof(int));
ord[0] = ringorder_a;
for (j=0;j<rVar(origR);j++)
wv[0][j]=pWeight(j+1,origR);
ord[1] = ringorder_wp;
for (j=0;j<rVar(origR);j++)
if (pGetExp(delVar,j+1)!=0) wv[1][j]=1;
#endif
ord[2] = ringorder_C;
ord[3] = 0;
}
else
{
// we change to an ordering:
// aa(....),orig_ordering
ord=(int*)omAlloc0(ordersize*sizeof(int));
block0=(int*)omAlloc0(ordersize*sizeof(int));
block1=(int*)omAlloc0(ordersize*sizeof(int));
wv=(int**) omAlloc0(ordersize*sizeof(int**));
for (k=0;k<ordersize-1; k++)
{
block0[k+1] = origR->block0[k];
block1[k+1] = origR->block1[k];
ord[k+1] = origR->order[k];
if (origR->wvhdl[k]!=NULL) wv[k+1] = (int*) omMemDup(origR->wvhdl[k]);
}
block0[0] = 1;
block1[0] = rVar(origR);
wv[0]=(int*)omAlloc0((rVar(origR) + 1)*sizeof(int));
for (j=0;j<rVar(origR);j++)
if (pGetExp(delVar,j+1)!=0) wv[0][j]=1;
// use this special ordering: like ringorder_a, except that pFDeg, pWeights
// ignore it
ord[0] = ringorder_aa;
}
// fill in tmp ring to get back the data later on
tmpR = rCopy0(origR,FALSE,FALSE); // qring==NULL
//rUnComplete(tmpR);
tmpR->p_Procs=NULL;
tmpR->order = ord;
tmpR->block0 = block0;
tmpR->block1 = block1;
tmpR->wvhdl = wv;
rComplete(tmpR, 1);
#ifdef HAVE_PLURAL
/* update nc structure on tmpR */
if (rIsPluralRing(origR))
{
if ( nc_rComplete(origR, tmpR, false) ) // no quotient ideal!
{
Werror("no elimination is possible: ordering condition is violated");
// cleanup
rDelete(tmpR);
if (w!=NULL)
delete w;
return NULL;
}
}
#endif
// change into the new ring
//pChangeRing((currRing->N),currRing->OrdSgn,ord,block0,block1,wv);
rChangeCurrRing(tmpR);
//h = idInit(IDELEMS(h1),h1->rank);
// fetch data from the old ring
//for (k=0;k<IDELEMS(h1);k++) h->m[k] = prCopyR( h1->m[k], origR);
h=idrCopyR(h1,origR,currRing);
if (origR->qideal!=NULL)
{
WarnS("eliminate in q-ring: experimental");
ideal q=idrCopyR(origR->qideal,origR,currRing);
ideal s=idSimpleAdd(h,q);
idDelete(&h);
idDelete(&q);
h=s;
}
// compute kStd
#if 1
//rWrite(tmpR);PrintLn();
//BITSET save1;
//SI_SAVE_OPT1(save1);
//si_opt_1 |=1;
//Print("h: %d gen, rk=%d\n",IDELEMS(h),h->rank);
//extern char * showOption();
//Print("%s\n",showOption());
hh = kStd(h,NULL,hom,&w,hilb);
//SI_RESTORE_OPT1(save1);
idDelete(&h);
#else
extern ideal kGroebner(ideal F, ideal Q);
hh=kGroebner(h,NULL);
#endif
// go back to the original ring
rChangeCurrRing(origR);
i = IDELEMS(hh)-1;
while ((i >= 0) && (hh->m[i] == NULL)) i--;
j = -1;
// fetch data from temp ring
for (k=0; k<=i; k++)
{
l=(currRing->N);
while ((l>0) && (p_GetExp( hh->m[k],l,tmpR)*pGetExp(delVar,l)==0)) l--;
if (l==0)
{
j++;
if (j >= IDELEMS(h3))
{
pEnlargeSet(&(h3->m),IDELEMS(h3),16);
IDELEMS(h3) += 16;
}
h3->m[j] = prMoveR( hh->m[k], tmpR,origR);
hh->m[k] = NULL;
}
}
id_Delete(&hh, tmpR);
idSkipZeroes(h3);
rDelete(tmpR);
if (w!=NULL)
delete w;
return h3;
}
/*2
* compute the which-th ar-minor of the matrix a
*/
poly idMinor(matrix a, int ar, unsigned long which, ideal R)
{
int i,j/*,k,size*/;
unsigned long curr;
int *rowchoise,*colchoise;
BOOLEAN rowch,colch;
// ideal result;
matrix tmp;
poly p,q;
i = binom(a->rows(),ar);
j = binom(a->cols(),ar);
rowchoise=(int *)omAlloc(ar*sizeof(int));
colchoise=(int *)omAlloc(ar*sizeof(int));
// if ((i>512) || (j>512) || (i*j >512)) size=512;
// else size=i*j;
// result=idInit(size,1);
tmp=mpNew(ar,ar);
// k = 0; /* the index in result*/
curr = 0; /* index of current minor */
idInitChoise(ar,1,a->rows(),&rowch,rowchoise);
while (!rowch)
{
idInitChoise(ar,1,a->cols(),&colch,colchoise);
while (!colch)
{
if (curr == which)
{
for (i=1; i<=ar; i++)
{
for (j=1; j<=ar; j++)
{
MATELEM(tmp,i,j) = MATELEM(a,rowchoise[i-1],colchoise[j-1]);
}
}
p = mp_DetBareiss(tmp,currRing);
if (p!=NULL)
{
if (R!=NULL)
{
q = p;
p = kNF(R,currQuotient,q);
p_Delete(&q,currRing);
}
/*delete the matrix tmp*/
for (i=1; i<=ar; i++)
{
for (j=1; j<=ar; j++) MATELEM(tmp,i,j) = NULL;
}
idDelete((ideal*)&tmp);
omFreeSize((ADDRESS)rowchoise,ar*sizeof(int));
omFreeSize((ADDRESS)colchoise,ar*sizeof(int));
return (p);
}
}
curr++;
idGetNextChoise(ar,a->cols(),&colch,colchoise);
}
idGetNextChoise(ar,a->rows(),&rowch,rowchoise);
}
return (poly) 1;
}
#ifdef WITH_OLD_MINOR
/*2
* compute all ar-minors of the matrix a
*/
ideal idMinors(matrix a, int ar, ideal R)
{
int i,j,/*k,*/size;
int *rowchoise,*colchoise;
BOOLEAN rowch,colch;
ideal result;
matrix tmp;
poly p,q;
i = binom(a->rows(),ar);
j = binom(a->cols(),ar);
rowchoise=(int *)omAlloc(ar*sizeof(int));
colchoise=(int *)omAlloc(ar*sizeof(int));
if ((i>512) || (j>512) || (i*j >512)) size=512;
else size=i*j;
result=idInit(size,1);
tmp=mpNew(ar,ar);
// k = 0; /* the index in result*/
idInitChoise(ar,1,a->rows(),&rowch,rowchoise);
while (!rowch)
{
idInitChoise(ar,1,a->cols(),&colch,colchoise);
while (!colch)
{
for (i=1; i<=ar; i++)
{
for (j=1; j<=ar; j++)
{
MATELEM(tmp,i,j) = MATELEM(a,rowchoise[i-1],colchoise[j-1]);
}
}
p = mp_DetBareiss(tmp,vcurrRing);
if (p!=NULL)
{
if (R!=NULL)
{
q = p;
p = kNF(R,currQuotient,q);
p_Delete(&q,currRing);
}
if (p!=NULL)
{
if (k>=size)
{
pEnlargeSet(&result->m,size,32);
size += 32;
}
result->m[k] = p;
k++;
}
}
idGetNextChoise(ar,a->cols(),&colch,colchoise);
}
idGetNextChoise(ar,a->rows(),&rowch,rowchoise);
}
/*delete the matrix tmp*/
for (i=1; i<=ar; i++)
{
for (j=1; j<=ar; j++) MATELEM(tmp,i,j) = NULL;
}
idDelete((ideal*)&tmp);
if (k==0)
{
k=1;
result->m[0]=NULL;
}
omFreeSize((ADDRESS)rowchoise,ar*sizeof(int));
omFreeSize((ADDRESS)colchoise,ar*sizeof(int));
pEnlargeSet(&result->m,size,k-size);
IDELEMS(result) = k;
return (result);
}
#else
/*2
* compute all ar-minors of the matrix a
* the caller of mpRecMin
* the elements of the result are not in R (if R!=NULL)
*/
ideal idMinors(matrix a, int ar, ideal R)
{
int elems=0;
int r=a->nrows,c=a->ncols;
int i;
matrix b;
ideal result,h;
ring origR=currRing;
ring tmpR;
long bound;
if((ar<=0) || (ar>r) || (ar>c))
{
Werror("%d-th minor, matrix is %dx%d",ar,r,c);
return NULL;
}
h = id_Matrix2Module(mp_Copy(a,origR),origR);
bound = sm_ExpBound(h,c,r,ar,origR);
idDelete(&h);
tmpR=sm_RingChange(origR,bound);
b = mpNew(r,c);
for (i=r*c-1;i>=0;i--)
{
if (a->m[i])
b->m[i] = prCopyR(a->m[i],origR,tmpR);
}
if (R!=NULL)
{
R = idrCopyR(R,origR,tmpR);
//if (ar>1) // otherwise done in mpMinorToResult
//{
// matrix bb=(matrix)kNF(R,currQuotient,(ideal)b);
// bb->rank=b->rank; bb->nrows=b->nrows; bb->ncols=b->ncols;
// idDelete((ideal*)&b); b=bb;
//}
}
result=idInit(32,1);
if(ar>1) mp_RecMin(ar-1,result,elems,b,r,c,NULL,R,tmpR);
else mp_MinorToResult(result,elems,b,r,c,R,tmpR);
idDelete((ideal *)&b);
if (R!=NULL) idDelete(&R);
idSkipZeroes(result);
rChangeCurrRing(origR);
result = idrMoveR(result,tmpR,origR);
sm_KillModifiedRing(tmpR);
idTest(result);
return result;
}
#endif
/*2
*returns TRUE if id1 is a submodule of id2
*/
BOOLEAN idIsSubModule(ideal id1,ideal id2)
{
int i;
poly p;
if (idIs0(id1)) return TRUE;
for (i=0;i<IDELEMS(id1);i++)
{
if (id1->m[i] != NULL)
{
p = kNF(id2,currQuotient,id1->m[i]);
if (p != NULL)
{
p_Delete(&p,currRing);
return FALSE;
}
}
}
return TRUE;
}
BOOLEAN idTestHomModule(ideal m, ideal Q, intvec *w)
{
if ((Q!=NULL) && (!idHomIdeal(Q,NULL))) { PrintS(" Q not hom\n"); return FALSE;}
if (idIs0(m)) return TRUE;
int cmax=-1;
int i;
poly p=NULL;
int length=IDELEMS(m);
polyset P=m->m;
for (i=length-1;i>=0;i--)
{
p=P[i];
if (p!=NULL) cmax=si_max(cmax,(int)pMaxComp(p)+1);
}
if (w != NULL)
if (w->length()+1 < cmax)
{
// Print("length: %d - %d \n", w->length(),cmax);
return FALSE;
}
if(w!=NULL)
p_SetModDeg(w, currRing);
for (i=length-1;i>=0;i--)
{
p=P[i];
if (p!=NULL)
{
int d=currRing->pFDeg(p,currRing);
loop
{
pIter(p);
if (p==NULL) break;
if (d!=currRing->pFDeg(p,currRing))
{
//pWrite(q); wrp(p); Print(" -> %d - %d\n",d,pFDeg(p,currRing));
if(w!=NULL)
p_SetModDeg(NULL, currRing);
return FALSE;
}
}
}
}
if(w!=NULL)
p_SetModDeg(NULL, currRing);
return TRUE;
}
ideal idSeries(int n,ideal M,matrix U,intvec *w)
{
for(int i=IDELEMS(M)-1;i>=0;i--)
{
if(U==NULL)
M->m[i]=pSeries(n,M->m[i],NULL,w);
else
{
M->m[i]=pSeries(n,M->m[i],MATELEM(U,i+1,i+1),w);
MATELEM(U,i+1,i+1)=NULL;
}
}
if(U!=NULL)
idDelete((ideal*)&U);
return M;
}
matrix idDiff(matrix i, int k)
{
int e=MATCOLS(i)*MATROWS(i);
matrix r=mpNew(MATROWS(i),MATCOLS(i));
r->rank=i->rank;
int j;
for(j=0; j<e; j++)
{
r->m[j]=pDiff(i->m[j],k);
}
return r;
}
matrix idDiffOp(ideal I, ideal J,BOOLEAN multiply)
{
matrix r=mpNew(IDELEMS(I),IDELEMS(J));
int i,j;
for(i=0; i<IDELEMS(I); i++)
{
for(j=0; j<IDELEMS(J); j++)
{
MATELEM(r,i+1,j+1)=pDiffOp(I->m[i],J->m[j],multiply);
}
}
return r;
}
/*3
*handles for some ideal operations the ring/syzcomp managment
*returns all syzygies (componentwise-)shifted by -syzcomp
*or -syzcomp-1 (in case of ideals as input)
static ideal idHandleIdealOp(ideal arg,int syzcomp,int isIdeal=FALSE)
{
ring orig_ring=currRing;
ring syz_ring=rAssure_SyzComp(orig_ring, TRUE); rChangeCurrRing(syz_ring);
rSetSyzComp(length, syz_ring);
ideal s_temp;
if (orig_ring!=syz_ring)
s_temp=idrMoveR_NoSort(arg,orig_ring, syz_ring);
else
s_temp=arg;
ideal s_temp1 = kStd(s_temp,currQuotient,testHomog,&w,NULL,length);
if (w!=NULL) delete w;
if (syz_ring!=orig_ring)
{
idDelete(&s_temp);
rChangeCurrRing(orig_ring);
}
idDelete(&temp);
ideal temp1=idRingCopy(s_temp1,syz_ring);
if (syz_ring!=orig_ring)
{
rChangeCurrRing(syz_ring);
idDelete(&s_temp1);
rChangeCurrRing(orig_ring);
rDelete(syz_ring);
}
for (i=0;i<IDELEMS(temp1);i++)
{
if ((temp1->m[i]!=NULL)
&& (pGetComp(temp1->m[i])<=length))
{
pDelete(&(temp1->m[i]));
}
else
{
p_Shift(&(temp1->m[i]),-length,currRing);
}
}
temp1->rank = rk;
idSkipZeroes(temp1);
return temp1;
}
*/
/*2
* represents (h1+h2)/h2=h1/(h1 intersect h2)
*/
//ideal idModulo (ideal h2,ideal h1)
ideal idModulo (ideal h2,ideal h1, tHomog hom, intvec ** w)
{
intvec *wtmp=NULL;
int i,k,rk,flength=0,slength,length;
poly p,q;
if (idIs0(h2))
return idFreeModule(si_max(1,h2->ncols));
if (!idIs0(h1))
flength = id_RankFreeModule(h1,currRing);
slength = id_RankFreeModule(h2,currRing);
length = si_max(flength,slength);
if (length==0)
{
length = 1;
}
ideal temp = idInit(IDELEMS(h2),length+IDELEMS(h2));
if ((w!=NULL)&&((*w)!=NULL))
{
//Print("input weights:");(*w)->show(1);PrintLn();
int d;
int k;
wtmp=new intvec(length+IDELEMS(h2));
for (i=0;i<length;i++)
((*wtmp)[i])=(**w)[i];
for (i=0;i<IDELEMS(h2);i++)
{
poly p=h2->m[i];
if (p!=NULL)
{
d = p_Deg(p,currRing);
k= pGetComp(p);
if (slength>0) k--;
d +=((**w)[k]);
((*wtmp)[i+length]) = d;
}
}
//Print("weights:");wtmp->show(1);PrintLn();
}
for (i=0;i<IDELEMS(h2);i++)
{
temp->m[i] = pCopy(h2->m[i]);
q = pOne();
pSetComp(q,i+1+length);
pSetmComp(q);
if(temp->m[i]!=NULL)
{
if (slength==0) p_Shift(&(temp->m[i]),1,currRing);
p = temp->m[i];
while (pNext(p)!=NULL) pIter(p);
pNext(p) = q;
}
else
temp->m[i]=q;
}
rk = k = IDELEMS(h2);
if (!idIs0(h1))
{
pEnlargeSet(&(temp->m),IDELEMS(temp),IDELEMS(h1));
IDELEMS(temp) += IDELEMS(h1);
for (i=0;i<IDELEMS(h1);i++)
{
if (h1->m[i]!=NULL)
{
temp->m[k] = pCopy(h1->m[i]);
if (flength==0) p_Shift(&(temp->m[k]),1,currRing);
k++;
}
}
}
ring orig_ring=currRing;
ring syz_ring=rAssure_SyzComp(orig_ring, TRUE); rChangeCurrRing(syz_ring);
rSetSyzComp(length, syz_ring);
ideal s_temp;
if (syz_ring != orig_ring)
{
s_temp = idrMoveR_NoSort(temp, orig_ring, syz_ring);
}
else
{
s_temp = temp;
}
idTest(s_temp);
ideal s_temp1 = kStd(s_temp,currQuotient,hom,&wtmp,NULL,length);
//if (wtmp!=NULL) Print("output weights:");wtmp->show(1);PrintLn();
if ((w!=NULL) && (*w !=NULL) && (wtmp!=NULL))
{
delete *w;
*w=new intvec(IDELEMS(h2));
for (i=0;i<IDELEMS(h2);i++)
((**w)[i])=(*wtmp)[i+length];
}
if (wtmp!=NULL) delete wtmp;
for (i=0;i<IDELEMS(s_temp1);i++)
{
if ((s_temp1->m[i]!=NULL)
&& (((int)pGetComp(s_temp1->m[i]))<=length))
{
p_Delete(&(s_temp1->m[i]),currRing);
}
else
{
p_Shift(&(s_temp1->m[i]),-length,currRing);
}
}
s_temp1->rank = rk;
idSkipZeroes(s_temp1);
if (syz_ring!=orig_ring)
{
rChangeCurrRing(orig_ring);
s_temp1 = idrMoveR_NoSort(s_temp1, syz_ring, orig_ring);
rDelete(syz_ring);
// Hmm ... here seems to be a memory leak
// However, simply deleting it causes memory trouble
// idDelete(&s_temp);
}
else
{
idDelete(&temp);
}
idTest(s_temp1);
return s_temp1;
}
/*
*computes module-weights for liftings of homogeneous modules
*/
intvec * idMWLift(ideal mod,intvec * weights)
{
if (idIs0(mod)) return new intvec(2);
int i=IDELEMS(mod);
while ((i>0) && (mod->m[i-1]==NULL)) i--;
intvec *result = new intvec(i+1);
while (i>0)
{
(*result)[i]=currRing->pFDeg(mod->m[i],currRing)+(*weights)[pGetComp(mod->m[i])];
}
return result;
}
/*2
*sorts the kbase for idCoef* in a special way (lexicographically
*with x_max,...,x_1)
*/
ideal idCreateSpecialKbase(ideal kBase,intvec ** convert)
{
int i;
ideal result;
if (idIs0(kBase)) return NULL;
result = idInit(IDELEMS(kBase),kBase->rank);
*convert = idSort(kBase,FALSE);
for (i=0;i<(*convert)->length();i++)
{
result->m[i] = pCopy(kBase->m[(**convert)[i]-1]);
}
return result;
}
/*2
*returns the index of a given monom in the list of the special kbase
*/
int idIndexOfKBase(poly monom, ideal kbase)
{
int j=IDELEMS(kbase);
while ((j>0) && (kbase->m[j-1]==NULL)) j--;
if (j==0) return -1;
int i=(currRing->N);
while (i>0)
{
loop
{
if (pGetExp(monom,i)>pGetExp(kbase->m[j-1],i)) return -1;
if (pGetExp(monom,i)==pGetExp(kbase->m[j-1],i)) break;
j--;
if (j==0) return -1;
}
if (i==1)
{
while(j>0)
{
if (pGetComp(monom)==pGetComp(kbase->m[j-1])) return j-1;
if (pGetComp(monom)>pGetComp(kbase->m[j-1])) return -1;
j--;
}
}
i--;
}
return -1;
}
/*2
*decomposes the monom in a part of coefficients described by the
*complement of how and a monom in variables occuring in how, the
*index of which in kbase is returned as integer pos (-1 if it don't
*exists)
*/
poly idDecompose(poly monom, poly how, ideal kbase, int * pos)
{
int i;
poly coeff=pOne(), base=pOne();
for (i=1;i<=(currRing->N);i++)
{
if (pGetExp(how,i)>0)
{
pSetExp(base,i,pGetExp(monom,i));
}
else
{
pSetExp(coeff,i,pGetExp(monom,i));
}
}
pSetComp(base,pGetComp(monom));
pSetm(base);
pSetCoeff(coeff,nCopy(pGetCoeff(monom)));
pSetm(coeff);
*pos = idIndexOfKBase(base,kbase);
if (*pos<0)
p_Delete(&coeff,currRing);
p_Delete(&base,currRing);
return coeff;
}
/*2
*returns a matrix A of coefficients with kbase*A=arg
*if all monomials in variables of how occur in kbase
*the other are deleted
*/
matrix idCoeffOfKBase(ideal arg, ideal kbase, poly how)
{
matrix result;
ideal tempKbase;
poly p,q;
intvec * convert;
int i=IDELEMS(kbase),j=IDELEMS(arg),k,pos;
#if 0
while ((i>0) && (kbase->m[i-1]==NULL)) i--;
if (idIs0(arg))
return mpNew(i,1);
while ((j>0) && (arg->m[j-1]==NULL)) j--;
result = mpNew(i,j);
#else
result = mpNew(i, j);
while ((j>0) && (arg->m[j-1]==NULL)) j--;
#endif
tempKbase = idCreateSpecialKbase(kbase,&convert);
for (k=0;k<j;k++)
{
p = arg->m[k];
while (p!=NULL)
{
q = idDecompose(p,how,tempKbase,&pos);
if (pos>=0)
{
MATELEM(result,(*convert)[pos],k+1) =
pAdd(MATELEM(result,(*convert)[pos],k+1),q);
}
else
p_Delete(&q,currRing);
pIter(p);
}
}
idDelete(&tempKbase);
return result;
}
static void idDeleteComps(ideal arg,int* red_comp,int del)
// red_comp is an array [0..args->rank]
{
int i,j;
poly p;
for (i=IDELEMS(arg)-1;i>=0;i--)
{
p = arg->m[i];
while (p!=NULL)
{
j = pGetComp(p);
if (red_comp[j]!=j)
{
pSetComp(p,red_comp[j]);
pSetmComp(p);
}
pIter(p);
}
}
(arg->rank) -= del;
}
/*2
* returns the presentation of an isomorphic, minimally
* embedded module (arg represents the quotient!)
*/
ideal idMinEmbedding(ideal arg,BOOLEAN inPlace, intvec **w)
{
if (idIs0(arg)) return idInit(1,arg->rank);
int i,next_gen,next_comp;
ideal res=arg;
if (!inPlace) res = idCopy(arg);
res->rank=si_max(res->rank,id_RankFreeModule(res,currRing));
int *red_comp=(int*)omAlloc((res->rank+1)*sizeof(int));
for (i=res->rank;i>=0;i--) red_comp[i]=i;
int del=0;
loop
{
next_gen = id_ReadOutPivot(res, &next_comp, currRing);
if (next_gen<0) break;
del++;
syGaussForOne(res,next_gen,next_comp,0,IDELEMS(res));
for(i=next_comp+1;i<=arg->rank;i++) red_comp[i]--;
if ((w !=NULL)&&(*w!=NULL))
{
for(i=next_comp;i<(*w)->length();i++) (**w)[i-1]=(**w)[i];
}
}
idDeleteComps(res,red_comp,del);
idSkipZeroes(res);
omFree(red_comp);
if ((w !=NULL)&&(*w!=NULL) &&(del>0))
{
intvec *wtmp=new intvec((*w)->length()-del);
for(i=0;i<res->rank;i++) (*wtmp)[i]=(**w)[i];
delete *w;
*w=wtmp;
}
return res;
}
#include <polys/clapsing.h>
#if 0
poly id_GCD(poly f, poly g, const ring r)
{
ring save_r=currRing;
rChangeCurrRing(r);
ideal I=idInit(2,1); I->m[0]=f; I->m[1]=g;
intvec *w = NULL;
ideal S=idSyzygies(I,testHomog,&w);
if (w!=NULL) delete w;
poly gg=pTakeOutComp(&(S->m[0]),2);
idDelete(&S);
poly gcd_p=singclap_pdivide(f,gg,r);
p_Delete(&gg,r);
rChangeCurrRing(save_r);
return gcd_p;
}
#else
poly id_GCD(poly f, poly g, const ring r)
{
ideal I=idInit(2,1); I->m[0]=f; I->m[1]=g;
intvec *w = NULL;
ring save_r = currRing; rChangeCurrRing(r); ideal S=idSyzygies(I,testHomog,&w); rChangeCurrRing(save_r);
if (w!=NULL) delete w;
poly gg=p_TakeOutComp(&(S->m[0]), 2, r);
id_Delete(&S, r);
poly gcd_p=singclap_pdivide(f,gg, r);
p_Delete(&gg, r);
return gcd_p;
}
#endif
#if 0
/*2
* xx,q: arrays of length 0..rl-1
* xx[i]: SB mod q[i]
* assume: char=0
* assume: q[i]!=0
* destroys xx
*/
ideal id_ChineseRemainder(ideal *xx, number *q, int rl, const ring R)
{
int cnt=IDELEMS(xx[0])*xx[0]->nrows;
ideal result=idInit(cnt,xx[0]->rank);
result->nrows=xx[0]->nrows; // for lifting matrices
result->ncols=xx[0]->ncols; // for lifting matrices
int i,j;
poly r,h,hh,res_p;
number *x=(number *)omAlloc(rl*sizeof(number));
for(i=cnt-1;i>=0;i--)
{
res_p=NULL;
loop
{
r=NULL;
for(j=rl-1;j>=0;j--)
{
h=xx[j]->m[i];
if ((h!=NULL)
&&((r==NULL)||(p_LmCmp(r,h,R)==-1)))
r=h;
}
if (r==NULL) break;
h=p_Head(r, R);
for(j=rl-1;j>=0;j--)
{
hh=xx[j]->m[i];
if ((hh!=NULL) && (p_LmCmp(r,hh, R)==0))
{
x[j]=p_GetCoeff(hh, R);
hh=p_LmFreeAndNext(hh, R);
xx[j]->m[i]=hh;
}
else
x[j]=n_Init(0, R->cf); // is R->cf really n_Q???, yes!
}
number n=n_ChineseRemainder(x,q,rl, R->cf);
for(j=rl-1;j>=0;j--)
{
x[j]=NULL; // nlInit(0...) takes no memory
}
if (n_IsZero(n, R->cf)) p_Delete(&h, R);
else
{
p_SetCoeff(h,n, R);
//Print("new mon:");pWrite(h);
res_p=p_Add_q(res_p, h, R);
}
}
result->m[i]=res_p;
}
omFree(x);
for(i=rl-1;i>=0;i--) id_Delete(&(xx[i]), R);
omFree(xx);
return result;
}
#endif
/* currently unsed:
ideal idChineseRemainder(ideal *xx, intvec *iv)
{
int rl=iv->length();
number *q=(number *)omAlloc(rl*sizeof(number));
int i;
for(i=0; i<rl; i++)
{
q[i]=nInit((*iv)[i]);
}
return idChineseRemainder(xx,q,rl);
}
*/
/*
* lift ideal with coeffs over Z (mod N) to Q via Farey
*/
ideal id_Farey(ideal x, number N, const ring r)
{
int cnt=IDELEMS(x)*x->nrows;
ideal result=idInit(cnt,x->rank);
result->nrows=x->nrows; // for lifting matrices
result->ncols=x->ncols; // for lifting matrices
int i;
for(i=cnt-1;i>=0;i--)
{
result->m[i]=p_Farey(x->m[i],N,r);
}
return result;
}
// uses glabl vars via pSetModDeg
/*
BOOLEAN idTestHomModule(ideal m, ideal Q, intvec *w)
{
if ((Q!=NULL) && (!idHomIdeal(Q,NULL))) { PrintS(" Q not hom\n"); return FALSE;}
if (idIs0(m)) return TRUE;
int cmax=-1;
int i;
poly p=NULL;
int length=IDELEMS(m);
poly* P=m->m;
for (i=length-1;i>=0;i--)
{
p=P[i];
if (p!=NULL) cmax=si_max(cmax,(int)pMaxComp(p)+1);
}
if (w != NULL)
if (w->length()+1 < cmax)
{
// Print("length: %d - %d \n", w->length(),cmax);
return FALSE;
}
if(w!=NULL)
p_SetModDeg(w, currRing);
for (i=length-1;i>=0;i--)
{
p=P[i];
poly q=p;
if (p!=NULL)
{
int d=p_FDeg(p,currRing);
loop
{
pIter(p);
if (p==NULL) break;
if (d!=p_FDeg(p,currRing))
{
//pWrite(q); wrp(p); Print(" -> %d - %d\n",d,pFDeg(p,currRing));
if(w!=NULL)
p_SetModDeg(NULL, currRing);
return FALSE;
}
}
}
}
if(w!=NULL)
p_SetModDeg(NULL, currRing);
return TRUE;
}
*/
/// keeps the first k (>= 1) entries of the given ideal
/// (Note that the kept polynomials may be zero.)
void idKeepFirstK(ideal id, const int k)
{
for (int i = IDELEMS(id)-1; i >= k; i--)
{
if (id->m[i] != NULL) pDelete(&id->m[i]);
}
int kk=k;
if (k==0) kk=1; /* ideals must have at least one element(0)*/
pEnlargeSet(&(id->m), IDELEMS(id), kk-IDELEMS(id));
IDELEMS(id) = kk;
}
/*
* compare the leading terms of a and b
*/
static int tCompare(const poly a, const poly b)
{
if (b == NULL) return(a != NULL);
if (a == NULL) return(-1);
/* a != NULL && b != NULL */
int r = pLmCmp(a, b);
if (r != 0) return(r);
number h = nSub(pGetCoeff(a), pGetCoeff(b));
r = -1 + nIsZero(h) + 2*nGreaterZero(h); /* -1: <, 0:==, 1: > */
nDelete(&h);
return(r);
}
/*
* compare a and b (rev-lex on terms)
*/
static int pCompare(const poly a, const poly b)
{
int r = tCompare(a, b);
if (r != 0) return(r);
poly aa = a;
poly bb = b;
while (r == 0 && aa != NULL && bb != NULL)
{
pIter(aa);
pIter(bb);
r = tCompare(aa, bb);
}
return(r);
}
typedef struct
{
poly p;
int index;
} poly_sort;
int pCompare_qsort(const void *a, const void *b)
{
int res = pCompare(((poly_sort *)a)->p, ((poly_sort *)b)->p);
return(res);
}
void idSort_qsort(poly_sort *id_sort, int idsize)
{
qsort(id_sort, idsize, sizeof(poly_sort), pCompare_qsort);
}
/*2
* ideal id = (id[i])
* if id[i] = id[j] then id[j] is deleted for j > i
*/
void idDelEquals(ideal id)
{
int idsize = IDELEMS(id);
poly_sort *id_sort = (poly_sort *)omAlloc0(idsize*sizeof(poly_sort));
for (int i = 0; i < idsize; i++)
{
id_sort[i].p = id->m[i];
id_sort[i].index = i;
}
idSort_qsort(id_sort, idsize);
int index, index_i, index_j;
int i = 0;
for (int j = 1; j < idsize; j++)
{
if (id_sort[i].p != NULL && pEqualPolys(id_sort[i].p, id_sort[j].p))
{
index_i = id_sort[i].index;
index_j = id_sort[j].index;
if (index_j > index_i)
{
index = index_j;
}
else
{
index = index_i;
i = j;
}
pDelete(&id->m[index]);
}
else
{
i = j;
}
}
omFreeSize((ADDRESS)(id_sort), idsize*sizeof(poly_sort));
}