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source: git/kernel/GBEngine/gr_kstd2.cc @ 51b9b3

spielwiese

Last change on this file since 51b9b3 was 51b9b3, checked in by Hans Schoenemann <hannes@…>, 3 years ago
fix: std for nc rings, local case: only for homog. or alternate algebra
Property mode set to `100644`
File size: 29.9 KB

Line
1	/****************************************
2	* Computer Algebra System SINGULAR *
3	****************************************/
4	/*
5	* ABSTRACT - Kernel: noncomm. alg. of Buchberger
6	*/
7	#define PLURAL_INTERNAL_DECLARATIONS
8
9	#include "kernel/mod2.h"
10
11	#ifdef HAVE_PLURAL
12
13	#include "misc/options.h"
14	#include "misc/intvec.h"
15
16	#include "polys/weight.h"
17	#include "kernel/polys.h"
18	#include "polys/monomials/ring.h"
19
20	#include "polys/nc/gb_hack.h"
21	#include "polys/nc/nc.h"
22	#include "polys/nc/sca.h"
23
24
25	#include "kernel/ideals.h"
26	#include "kernel/GBEngine/kstd1.h"
27	#include "kernel/GBEngine/khstd.h"
28	//#include "spolys.h"
29	//#include "cntrlc.h"
30	#include "kernel/GBEngine/ratgring.h"
31	#include "kernel/GBEngine/kutil.h"
32
33	#include "kernel/GBEngine/nc.h"
34
35	#if 0
36	/*3
37	* reduction of p2 with p1
38	* do not destroy p1 and p2
39	* p1 divides p2 -> for use in NF algorithm
40	*/
41	poly gnc_ReduceSpolyNew(const poly p1, poly p2/,poly spNoether/, const ring r)
42	{
43	return(nc_ReduceSPoly(p1,p_Copy(p2,r)/,spNoether/,r));
44	}
45	#endif
46
47	/*2
48	*reduces h with elements from T choosing the first possible
49	* element in t with respect to the given pDivisibleBy
50	*/
51	int redGrFirst (LObject* h,kStrategy strat)
52	{
53	int at,reddeg,d,i;
54	int pass = 0;
55	int j = 0;
56
57	d = currRing->pFDeg((h).p,currRing)+(h).ecart;
58	reddeg = strat->LazyDegree+d;
59	loop
60	{
61	if (j > strat->sl)
62	{
63	#ifdef KDEBUG
64	if (TEST_OPT_DEBUG) PrintLn();
65	#endif
66	return 0;
67	}
68	#ifdef KDEBUG
69	if (TEST_OPT_DEBUG) Print("%d",j);
70	#endif
71	if (pDivisibleBy(strat->S[j],(*h).p))
72	{
73	#ifdef KDEBUG
74	if (TEST_OPT_DEBUG) PrintS("+\n");
75	#endif
76	/*
77	* the polynomial to reduce with is;
78	* T[j].p
79	*/
80	if (!TEST_OPT_INTSTRATEGY)
81	pNorm(strat->S[j]);
82	#ifdef KDEBUG
83	if (TEST_OPT_DEBUG)
84	{
85	wrp(h->p);
86	PrintS(" with ");
87	wrp(strat->S[j]);
88	}
89	#endif
90	(h).p = nc_ReduceSpoly(strat->S[j],(h).p, currRing);
91	//spSpolyRed(strat->T[j].p,(*h).p,strat->kNoether);
92
93	#ifdef KDEBUG
94	if (TEST_OPT_DEBUG)
95	{
96	PrintS(" to ");
97	wrp(h->p);
98	}
99	#endif
100	if ((*h).p == NULL)
101	{
102	kDeleteLcm(h);
103	return 0;
104	}
105	if (TEST_OPT_INTSTRATEGY)
106	{
107	h->pCleardenom();// also removes Content
108	}
109	/computes the ecart/
110	d = currRing->pLDeg((h).p,&((h).length),currRing);
111	(h).FDeg=currRing->pFDeg((h).p,currRing);
112	(h).ecart = d-(h).FDeg; /pFDeg((h).p);*/
113	if ((strat->syzComp!=0) && !strat->honey)
114	{
115	if ((strat->syzComp>0) && (pMinComp((*h).p) > strat->syzComp))
116	{
117	#ifdef KDEBUG
118	if (TEST_OPT_DEBUG) PrintS(" > sysComp\n");
119	#endif
120	return 0;
121	}
122	}
123	/- try to reduce the s-polynomial -/
124	pass++;
125	/*
126	*test whether the polynomial should go to the lazyset L
127	*-if the degree jumps
128	*-if the number of pre-defined reductions jumps
129	*/
130	if ((strat->Ll >= 0)
131	&& ((d >= reddeg) \|\| (pass > strat->LazyPass))
132	&& !strat->homog)
133	{
134	at = strat->posInL(strat->L,strat->Ll,h,strat);
135	if (at <= strat->Ll)
136	{
137	i=strat->sl+1;
138	do
139	{
140	i--;
141	if (i<0) return 0;
142	} while (!pDivisibleBy(strat->S[i],(*h).p));
143	enterL(&strat->L,&strat->Ll,&strat->Lmax,*h,at);
144	#ifdef KDEBUG
145	if (TEST_OPT_DEBUG) Print(" degree jumped; ->L%d\n",at);
146	#endif
147	(*h).p = NULL;
148	return 0;
149	}
150	}
151	if ((TEST_OPT_PROT) && (strat->Ll < 0) && (d >= reddeg))
152	{
153	reddeg = d+1;
154	Print(".%d",d);mflush();
155	}
156	j = 0;
157	#ifdef KDEBUG
158	if TEST_OPT_DEBUG PrintLn();
159	#endif
160	}
161	else
162	{
163	#ifdef KDEBUG
164	if (TEST_OPT_DEBUG) PrintS("-");
165	#endif
166	j++;
167	}
168	}
169	}
170	void ratGB_divide_out(poly p)
171	{
172	/* extracts monomial content from localized expression */
173	/* searches for an m (monomial in var 1.. real_var_start-1)
174	* such that m divides p and divides p by this m if it exist*/
175	if (p==NULL) return;
176	poly root=p;
177	assume(rIsRatGRing(currRing));
178	poly f=pHead(p);
179	int i;
180	for (i=currRing->real_var_start;i<=currRing->real_var_end;i++)
181	{
182	pSetExp(f,i,0);
183	}
184	loop
185	{
186	pIter(p);
187	if (p==NULL) { pSetm(f); break;}
188	for (i=1;i<=rVar(currRing);i++)
189	{
190	pSetExp(f,i,si_min(pGetExp(f,i),pGetExp(p,i)));
191	}
192	}
193	if (!pIsConstant(f))
194	{
195	#ifdef KDEBUG
196	if (TEST_OPT_DEBUG)
197	{
198	PrintS("divide out:");p_wrp(f,currRing);
199	PrintS(" from ");pWrite(root);
200	}
201	#endif
202	p=root;
203	loop
204	{
205	if (p==NULL) break;
206	for (i=1;i<=rVar(currRing);i++)
207	{
208	pSetExp(p,i,pGetExp(p,i)-pGetExp(f,i));
209	}
210	pSetm(p);
211	pIter(p);
212	}
213	}
214	pDelete(&f);
215	}
216
217	#ifdef HAVE_RATGRING
218	/*2
219	*reduces h with elements from T choosing the first possible
220	* element in t with respect to the given pDivisibleBy
221	* for use in ratGB
222	*/
223	int redGrRatGB (LObject* h,kStrategy strat)
224	{
225	int at,reddeg,d,i;
226	int pass = 0;
227	int j = 0;
228	int c_j=-1, c_e=-2;
229	poly c_p=NULL;
230	assume(strat->tailRing==currRing);
231
232	ratGB_divide_out((*h).p);
233	d = currRing->pFDeg((h).p,currRing)+(h).ecart;
234	reddeg = strat->LazyDegree+d;
235	if (!TEST_OPT_INTSTRATEGY)
236	{
237	h->pCleardenom();// also does a pContentRat
238	}
239	loop
240	{
241	if (j > strat->sl)
242	{
243	if (c_j>=0)
244	{
245	/*
246	* the polynomial to reduce with is;
247	* S[c_j]
248	*/
249	if (!TEST_OPT_INTSTRATEGY)
250	pNorm(strat->S[c_j]);
251	#ifdef KDEBUG
252	if (TEST_OPT_DEBUG)
253	if (TEST_OPT_DEBUG)
254	{
255	wrp(h->p);
256	Print(" with S[%d]= ",c_j);
257	wrp(strat->S[c_j]);
258	}
259	#endif
260	//poly hh = nc_CreateSpoly(strat->S[c_j],(*h).p, currRing);
261	// Print("vor nc_rat_ReduceSpolyNew (ce:%d) ",c_e);wrp(h->p);PrintLn();
262	//if(c_e==-1)
263	// c_p = nc_CreateSpoly(pCopy(strat->S[c_j]),pCopy((*h).p), currRing);
264	//else
265	// c_p=nc_rat_ReduceSpolyNew(strat->S[c_j],pCopy((*h).p), currRing->real_var_start-1,currRing);
266	// Print("nach nc_rat_ReduceSpolyNew ");wrp(c_p);PrintLn();
267	// pDelete(&((*h).p));
268
269	c_p=nc_rat_ReduceSpolyNew(strat->S[c_j],(*h).p, currRing->real_var_start-1,currRing);
270	(*h).p=c_p;
271	if (!TEST_OPT_INTSTRATEGY)
272	{
273	h->pCleardenom();// also removes Content
274	}
275
276	#ifdef KDEBUG
277	if (TEST_OPT_DEBUG)
278	{
279	PrintS(" to ");
280	wrp(h->p);
281	PrintLn();
282	}
283	#endif
284	if ((*h).p == NULL)
285	{
286	kDeleteLcm(h);
287	return 0;
288	}
289	ratGB_divide_out((*h).p);
290	d = currRing->pLDeg((h).p,&((h).length),currRing);
291	(h).FDeg=currRing->pFDeg((h).p,currRing);
292	(h).ecart = d-(h).FDeg; /pFDeg((h).p);*/
293	/- try to reduce the s-polynomial again -/
294	pass++;
295	j=0;
296	c_j=-1; c_e=-2; c_p=NULL;
297	}
298	else
299	{ // nothing found
300	return 0;
301	}
302	}
303	// first try usal division
304	if (p_LmDivisibleBy(strat->S[j],(*h).p,currRing))
305	{
306	#ifdef KDEBUG
307	if(TEST_OPT_DEBUG)
308	{
309	p_wrp(h->p,currRing); Print(" divisible by S[%d]=",j);
310	p_wrp(strat->S[j],currRing); PrintS(" e=-1\n");
311	}
312	#endif
313	if ((c_j<0)\|\|(c_e>=0))
314	{
315	c_e=-1; c_j=j;
316	}
317	}
318	else
319	if (p_LmDivisibleByPart(strat->S[j],(*h).p,currRing,
320	currRing->real_var_start,currRing->real_var_end))
321	{
322	int a_e=(p_Totaldegree(strat->S[j],currRing)-currRing->pFDeg(strat->S[j],currRing));
323	#ifdef KDEBUG
324	if(TEST_OPT_DEBUG)
325	{
326	p_wrp(h->p,currRing); Print(" divisibly by S[%d]=",j);
327	p_wrp(strat->S[j],currRing); Print(" e=%d\n",a_e);
328	}
329	#endif
330	if ((c_j<0)\|\|(c_e>a_e))
331	{
332	c_e=a_e; c_j=j;
333	//c_p = nc_CreateSpoly(pCopy(strat->S[c_j]),pCopy((*h).p), currRing);
334	}
335	/computes the ecart/
336	if ((strat->syzComp!=0) && !strat->honey)
337	{
338	if ((strat->syzComp>0) && (pMinComp((*h).p) > strat->syzComp))
339	{
340	#ifdef KDEBUG
341	if (TEST_OPT_DEBUG) PrintS(" > sysComp\n");
342	#endif
343	return 0;
344	}
345	}
346	}
347	else
348	{
349	#ifdef KDEBUG
350	if(TEST_OPT_DEBUG)
351	{
352	p_wrp(h->p,currRing); Print(" not divisibly by S[%d]=",j);
353	p_wrp(strat->S[j],currRing); PrintLn();
354	}
355	#endif
356	}
357	j++;
358	}
359	}
360	#endif
361
362	/*2
363	* reduction procedure for the homogeneous case
364	* and the case of a degree-ordering
365	*/
366	#if 0
367	// currently unused
368	static int nc_redHomog (LObject* h,kStrategy strat)
369	{
370	if (strat->tl<0)
371	{
372	enterT((*h),strat);
373	return 1;
374	}
375
376	int j = 0;
377
378	if (TEST_OPT_DEBUG)
379	{
380	PrintS("red:");
381	wrp(h->p);
382	PrintS(" ");
383	}
384	loop
385	{
386	if (TEST_OPT_DEBUG) Print("%d",j);
387	if (pDivisibleBy(strat->S[j],(*h).p))
388	{
389	if (TEST_OPT_DEBUG)
390	{
391	PrintS("+\nwith ");
392	wrp(strat->S[j]);
393	}
394	/- compute the s-polynomial -/
395	(h).p = nc_ReduceSpoly(strat->S[j],(h).p,currRing);
396	if ((*h).p == NULL)
397	{
398	if (TEST_OPT_DEBUG) PrintS(" to 0\n");
399	kDeleteLcm(h);
400	return 0;
401	}
402	/*
403	* else if (strat->syzComp)
404	* {
405	* if (pMinComp((*h).p) > strat->syzComp)
406	* {
407	* enterT((*h),strat);
408	* return;
409	* }
410	* }
411	*/
412	/- try to reduce the s-polynomial -/
413	j = 0;
414	}
415	else
416	{
417	if (j >= strat->sl)
418	{
419	enterT((*h),strat);
420	return 1;
421	}
422	j++;
423	}
424	}
425	}
426	#endif
427
428	#if 0
429	/*2
430	* reduction procedure for the homogeneous case
431	* and the case of a degree-ordering
432	*/
433	static int nc_redHomog0 (LObject* h,kStrategy strat)
434	{
435	if (strat->tl<0)
436	{
437	enterT((*h),strat);
438	return 0;
439	}
440
441	int j = 0;
442	int k = 0;
443
444	if (TEST_OPT_DEBUG)
445	{
446	PrintS("red:");
447	wrp(h->p);
448	PrintS(" ");
449	}
450	loop
451	{
452	if (TEST_OPT_DEBUG) Print("%d",j);
453	if (pDivisibleBy(strat->T[j].p,(*h).p))
454	{
455	if (TEST_OPT_DEBUG)
456	{
457	PrintS("+\nwith ");
458	wrp(strat->S[j]);
459	}
460	/- compute the s-polynomial -/
461	(h).p = nc_ReduceSpoly(strat->T[j].p,(h).p,strat->kNoether,currRing);
462	if ((*h).p == NULL)
463	{
464	if (TEST_OPT_DEBUG) PrintS(" to 0\n");
465	kDeleteLcm(h);
466	return 0;
467	}
468	else
469	{
470	if (TEST_OPT_INTSTRATEGY)
471	{
472	h->pCleardenom();// also removes Content
473	}
474	if (strat->syzComp!=0)
475	{
476	if ((strat->syzComp>0) && (pMinComp((*h).p) > strat->syzComp))
477	{
478	/*
479	* (h).length=pLength0((h).p);
480	*/
481	enterT((*h),strat);
482	return 0;
483	}
484	}
485	}
486	/- try to reduce the s-polynomial -/
487	j = 0;
488	}
489	else
490	{
491	if (j >= strat->tl)
492	{
493	if (TEST_OPT_INTSTRATEGY)
494	{
495	h->pCleardenom();// also removes Content
496	}
497	/*
498	* (h).length=pLength0((h).p);
499	*/
500	enterT((*h),strat);
501	return 0;
502	}
503	j++;
504	}
505	}
506	}
507
508	/*2
509	* reduction procedure for the inhomogeneous case
510	* and not a degree-ordering
511	*/
512	static int nc_redLazy (LObject* h,kStrategy strat)
513	{
514	if (strat->tl<0)
515	{
516	enterT((*h),strat);
517	return 0;
518	}
519
520	int at,d,i;
521	int j = 0;
522	int pass = 0;
523	int reddeg = currRing->pFDeg((*h).p,currRing);
524
525	if (TEST_OPT_DEBUG)
526	{
527	PrintS("red:");
528	wrp(h->p);
529	PrintS(" ");
530	}
531	loop
532	{
533	if (TEST_OPT_DEBUG) Print("%d",j);
534	if (pDivisibleBy(strat->S[j],(*h).p))
535	{
536	if (TEST_OPT_DEBUG)
537	{
538	PrintS("+\nwith ");
539	wrp(strat->S[j]);
540	}
541	/- compute the s-polynomial -/
542	(h).p = nc_ReduceSpoly(strat->S[j],(h).p,strat->kNoether,currRing);
543	if ((*h).p == NULL)
544	{
545	if (TEST_OPT_DEBUG) PrintS(" to 0\n");
546	kDeleteLcm(h);
547	return 0;
548	}
549	// else if (strat->syzComp)
550	// {
551	// if ((strat->syzComp>0) && (pMinComp((*h).p) > strat->syzComp))
552	// {
553	// if (TEST_OPT_DEBUG) PrintS(" > syzComp\n");
554	// if (TEST_OPT_INTSTRATEGY) p_Content(h->p,currRing);
555	// enterTBba((*h),strat->tl+1,strat);
556	// return;
557	// }
558	// }
559	else
560	{
561	if (TEST_OPT_DEBUG)
562	{
563	PrintS("to:");
564	wrp((*h).p);
565	PrintLn();
566	}
567	if (TEST_OPT_INTSTRATEGY)
568	{
569	pCleardenom(h->p);// also removes Content
570	}
571	}
572	/- try to reduce the s-polynomial -/
573	pass++;
574	d = currRing->pFDeg((*h).p,currRing);
575	if ((strat->Ll >= 0) && ((d > reddeg) \|\| (pass > strat->LazyPass)))
576	{
577	at = posInL11(strat->L,strat->Ll,h,strat);
578	if (at <= strat->Ll)
579	{
580	i=strat->sl+1;
581	do
582	{
583	i--;
584	if (i<0)
585	{
586	enterT((*h),strat);
587	return 0;
588	}
589	}
590	while (!pDivisibleBy(strat->S[i],(*h).p));
591	if (TEST_OPT_DEBUG) Print(" ->L[%d]\n",at);
592	enterL(&strat->L,&strat->Ll,&strat->Lmax,*h,at);
593	(*h).p = NULL;
594	return 0;
595	}
596	}
597	else if ((TEST_OPT_PROT) && (strat->Ll < 0) && (d != reddeg))
598	{
599	Print(".%d",d);mflush();
600	reddeg = d;
601	}
602	j = 0;
603	}
604	else
605	{
606	if (TEST_OPT_DEBUG) PrintS("-");
607	if (j >= strat->sl)
608	{
609	if (TEST_OPT_DEBUG) PrintLn();
610	if (TEST_OPT_INTSTRATEGY)
611	{
612	h->pCleardenom();// also removes Content
613	}
614	enterT((*h),strat);
615	return 0;
616	}
617	j++;
618	}
619	}
620	}
621
622	/*2
623	* reduction procedure for the sugar-strategy (honey)
624	* reduces h with elements from T choosing first possible
625	* element in T with respect to the given ecart
626	*/
627	static int nc_redHoney (LObject* h,kStrategy strat)
628	{
629	if (strat->tl<0)
630	{
631	enterT((*h),strat);
632	return 0;
633	}
634
635	poly pi;
636	int i,j,at,reddeg,d,pass,ei;
637
638	pass = j = 0;
639	d = reddeg = currRing->pFDeg((h).p,currRing)+(h).ecart;
640	if (TEST_OPT_DEBUG)
641	{
642	PrintS("red:");
643	wrp((*h).p);
644	}
645	loop
646	{
647	if (TEST_OPT_DEBUG) Print("%d",j);
648	if (pDivisibleBy(strat->T[j].p,(*h).p))
649	{
650	if (TEST_OPT_DEBUG) PrintS("+");
651	pi = strat->T[j].p;
652	ei = strat->T[j].ecart;
653	/*
654	* the polynomial to reduce with (up to the moment) is;
655	* pi with ecart ei
656	*/
657	i = j;
658	loop
659	{
660	/- takes the first possible with respect to ecart -/
661	i++;
662	if (i > strat->tl)
663	break;
664	if ((!BTEST1(20)) && (ei <= (*h).ecart))
665	break;
666	if (TEST_OPT_DEBUG) Print("%d",i);
667	if ((strat->T[i].ecart < ei) && pDivisibleBy(strat->T[i].p,(*h).p))
668	{
669	if (TEST_OPT_DEBUG) PrintS("+");
670	/*
671	* the polynomial to reduce with is now;
672	*/
673	pi = strat->T[i].p;
674	ei = strat->T[i].ecart;
675	}
676	else if (TEST_OPT_DEBUG) PrintS("-");
677	}
678
679	/*
680	* end of search: have to reduce with pi
681	*/
682	if (ei > (*h).ecart)
683	{
684	/*
685	* It is not possible to reduce h with smaller ecart;
686	* if possible h goes to the lazy-set L,i.e
687	* if its position in L would be not the last one
688	*/
689	if (strat->Ll >= 0) /* L is not empty */
690	{
691	at = strat->posInL(strat->L,strat->Ll,h,strat);
692	if(at <= strat->Ll)
693	/- h will not become the next element to reduce -/
694	{
695	enterL(&strat->L,&strat->Ll,&strat->Lmax,*h,at);
696	if (TEST_OPT_DEBUG) Print(" ecart too big: -> L%d\n",at);
697	(*h).p = NULL;
698	return 0;
699	}
700	}
701	}
702	if (TEST_OPT_DEBUG)
703	{
704	PrintS("\nwith ");
705	wrp(pi);
706	}
707	if (strat->fromT)
708	{
709	strat->fromT=FALSE;
710	(h).p = nc_ReduceSpoly(pi,(h).p,strat->kNoether,currRing);
711	}
712	else
713	(h).p = nc_ReduceSpoly(pi,(h).p,strat->kNoether,currRing);
714	if (TEST_OPT_DEBUG)
715	{
716	PrintS(" to ");
717	wrp((*h).p);
718	PrintLn();
719	}
720	if ((*h).p == NULL)
721	{
722	kDeleteLcm(h);
723	return 0;
724	}
725	if (TEST_OPT_INTSTRATEGY)
726	{
727	h->pCleardenom();// also does remove Content
728	}
729	/* compute the ecart */
730	if (ei <= (*h).ecart)
731	(h).ecart = d-currRing->pFDeg((h).p,currRing);
732	else
733	(h).ecart = d-currRing->pFDeg((h).p,currRing)+ei-(*h).ecart;
734	// if (strat->syzComp)
735	// {
736	// if ((strat->syzComp>0) && (pMinComp((*h).p) > strat->syzComp))
737	// {
738	// if (TEST_OPT_DEBUG)
739	// PrintS(" >syzComp\n");
740	// if (TEST_OPT_INTSTRATEGY) p_Content(h->p,currRing);
741	// at=strat->posInT(strat->T,strat->tl,(*h));
742	// enterTBba((*h),at,strat);
743	// return;
744	// }
745	// }
746	/*
747	* try to reduce the s-polynomial h
748	*test first whether h should go to the lazyset L
749	*-if the degree jumps
750	*-if the number of pre-defined reductions jumps
751	*/
752	pass++;
753	d = currRing->pFDeg((h).p,currRing)+(h).ecart;
754	if ((strat->Ll >= 0) && ((d > reddeg) \|\| (pass > strat->LazyPass)))
755	{
756	at = strat->posInL(strat->L,strat->Ll,h,strat);
757	if (at <= strat->Ll)
758	{
759	/test if h is already standardbasis element/
760	i=strat->sl+1;
761	do
762	{
763	i--;
764	if (i<0)
765	{
766	enterT((*h),strat);
767	return 0;
768	}
769	} while (!pDivisibleBy(strat->S[i],(*h).p));
770	enterL(&strat->L,&strat->Ll,&strat->Lmax,*h,at);
771	if (TEST_OPT_DEBUG)
772	Print(" degree jumped: -> L%d\n",at);
773	(*h).p = NULL;
774	return 0;
775	}
776	}
777	else if (TEST_OPT_PROT && (strat->Ll < 0) && (d > reddeg))
778	{
779	reddeg = d;
780	Print(".%d",d); mflush();
781	}
782	j = 0;
783	}
784	else
785	{
786	if (TEST_OPT_DEBUG) PrintS("-");
787	if (j >= strat->tl)
788	{
789	if (TEST_OPT_DEBUG) PrintLn();
790	if (TEST_OPT_INTSTRATEGY)
791	{
792	h->pCleardenom();// also does remove Content
793	}
794	enterT((*h),strat);
795	return 0;
796	}
797	j++;
798	}
799	}
800	}
801
802	/*2
803	* reduction procedure for tests only
804	* reduces with elements from T and chooses the best possible
805	*/
806	static int nc_redBest (LObject* h,kStrategy strat)
807	{
808	if (strat->tl<0)
809	{
810	enterT((*h),strat);
811	return 0;
812	}
813
814	int j,jbest,at,reddeg,d,pass;
815	poly p,ph;
816	pass = j = 0;
817
818	if (strat->honey)
819	reddeg = currRing->pFDeg((h).p,currRing)+(h).ecart;
820	else
821	reddeg = currRing->pFDeg((*h).p,currRing);
822	loop
823	{
824	if (pDivisibleBy(strat->T[j].p,(*h).p))
825	{
826	/* compute the s-polynomial */
827	if (!TEST_OPT_INTSTRATEGY) pNorm((*h).p);
828	#ifdef SDRING
829	// spSpolyShortBba will not work in the SRING case
830	if (pSDRING)
831	{
832	p=spSpolyCreate(strat->T[j].p,(*h).p,strat->kNoether);
833	if (p!=NULL) pDelete(&pNext(p));
834	}
835	else
836	#endif
837	p = nc_CreateShortSpoly(strat->T[j].p,(*h).p);
838	/* computes only the first monomial of the spoly */
839	if (p)
840	{
841	jbest = j;
842	/* looking for the best possible reduction */
843	if ((strat->syzComp==0) \|\| (pMinComp(p) <= strat->syzComp))
844	{
845	loop
846	{
847	j++;
848	if (j > strat->tl)
849	break;
850	if (pDivisibleBy(strat->T[j].p,(*h).p))
851	{
852	#ifdef SDRING
853	// spSpolyShortBba will not work in the SRING case
854	if (pSDRING)
855	{
856	ph=spSpolyCreate(strat->T[j].p,(*h).p,strat->kNoether);
857	if (ph!=NULL) pDelete(&pNext(ph));
858	}
859	else
860	#endif
861	ph = nc_CreateShortSpoly(strat->T[j].p,(*h).p);
862	if (ph==NULL)
863	{
864	pLmFree(p);
865	pDelete(&((*h).p));
866	kDeleteLcm(h);
867	return 0;
868	}
869	else if (pLmCmp(ph,p) == -1)
870	{
871	pLmFree(p);
872	p = ph;
873	jbest = j;
874	}
875	else
876	{
877	pLmFree(ph);
878	}
879	}
880	}
881	}
882	pLmFree(p);
883	(h).p = nc_ReduceSpoly(strat->T[jbest].p,(h).p,strat->kNoether,currRing);
884	}
885	else
886	{
887	kDeleteLcm(h);
888	return 0;
889	}
890	if (strat->honey && currRing->pLexOrder)
891	strat->initEcart(h);
892	/* h.length:=l; */
893	/* try to reduce the s-polynomial */
894	// if (strat->syzComp)
895	// {
896	// if ((strat->syzComp>0) && (pMinComp((*h).p) > strat->syzComp))
897	// {
898	// if (TEST_OPT_DEBUG)
899	// PrintS(" >syzComp\n");
900	// if (TEST_OPT_INTSTRATEGY) p_Content(h->p,currRing);
901	// at=strat->posInT(strat->T,strat->tl,(*h));
902	// enterTBba((*h),at,strat);
903	// return;
904	// }
905	// }
906	if (strat->honey \|\| currRing->pLexOrder)
907	{
908	pass++;
909	d = currRing->pFDeg((*h).p,currRing);
910	if (strat->honey)
911	d += (*h).ecart;
912	if ((strat->Ll >= 0) && ((pass > strat->LazyPass) \|\| (d > reddeg)))
913	{
914	at = strat->posInL(strat->L,strat->Ll,h,strat);
915	if (at <= strat->Ll)
916	{
917	enterL(&strat->L,&strat->Ll,&strat->Lmax,*h,at);
918	(*h).p = NULL;
919	return 0;
920	}
921	}
922	else if (TEST_OPT_PROT && (strat->Ll < 0) && (d != reddeg))
923	{
924	reddeg = d;
925	Print("%d.");
926	mflush();
927	}
928	}
929	j = 0;
930	}
931	else
932	{
933	if (j >= strat->tl)
934	{
935	if (TEST_OPT_INTSTRATEGY)
936	{
937	h->pCleardenom();// also removes Content
938	}
939	enterT((*h),strat);
940	return 0;
941	}
942	j++;
943	}
944	}
945	}
946
947	#endif
948
949	#ifdef HAVE_RATGRING
950	void nc_gr_initBba(ideal F, kStrategy strat)
951	#else
952	void nc_gr_initBba(ideal, kStrategy strat)
953	#endif
954	{
955	assume(rIsPluralRing(currRing));
956
957	// int i;
958	// idhdl h;
959	/* setting global variables ------------------- */
960	strat->enterS = enterSBba;
961
962	/*
963	if ((BTEST1(20)) && (!strat->honey))
964	strat->red = nc_redBest;
965	else if (strat->honey)
966	strat->red = nc_redHoney;
967	else if (currRing->pLexOrder && !strat->homog)
968	strat->red = nc_redLazy;
969	else if (TEST_OPT_INTSTRATEGY && strat->homog)
970	strat->red = nc_redHomog0;
971	else
972	strat->red = nc_redHomog;
973	*/
974
975	// if (rIsPluralRing(currRing))
976	strat->red = redGrFirst;
977	#ifdef HAVE_RATGRING
978	if (rIsRatGRing(currRing))
979	{
980	int ii=IDELEMS(F)-1;
981	int jj;
982	BOOLEAN is_rat_id=FALSE;
983	for(;ii>=0;ii--)
984	{
985	for(jj=currRing->real_var_start;jj<=currRing->real_var_end;jj++)
986	{
987	if(pGetExp(F->m[ii],jj)>0) { is_rat_id=TRUE; break; }
988	}
989	if (is_rat_id) break;
990	}
991	if (is_rat_id) strat->red=redGrRatGB;
992	}
993	#endif
994
995	if (currRing->pLexOrder && strat->honey)
996	strat->initEcart = initEcartNormal;
997	else
998	strat->initEcart = initEcartBBA;
999	if (strat->honey)
1000	strat->initEcartPair = initEcartPairMora;
1001	else
1002	strat->initEcartPair = initEcartPairBba;
1003	// if ((TEST_OPT_WEIGHTM)&&(F!=NULL))
1004	// {
1005	// //interred machen Aenderung
1006	// pFDegOld=currRing->pFDeg;
1007	// pLDegOld=currRing->pLDeg;
1008	// // h=ggetid("ecart");
1009	// // if ((h!=NULL) && (IDTYP(h)==INTVEC_CMD))
1010	// // {
1011	// // ecartWeights=iv2array(IDINTVEC(h));
1012	// // }
1013	// // else
1014	// {
1015	// ecartWeights=(short )omAlloc(((currRing->N)+1)sizeof(short));
1016	// /uses automatic computation of the ecartWeights to set them/
1017	// kEcartWeights(F->m,IDELEMS(F)-1,ecartWeights);
1018	// }
1019	// currRing->pFDeg=totaldegreeWecart;
1020	// currRing->pLDeg=maxdegreeWecart;
1021	// for(i=1; i<=(currRing->N); i++)
1022	// Print(" %d",ecartWeights[i]);
1023	// PrintLn();
1024	// mflush();
1025	// }
1026	}
1027
1028	#define MYTEST 0
1029
1030	ideal k_gnc_gr_bba(const ideal F, const ideal Q, const intvec , const intvec , kStrategy strat, const ring _currRing)
1031	{
1032	const ring save = currRing; if( currRing != _currRing ) rChangeCurrRing(_currRing);
1033
1034	#if MYTEST
1035	PrintS("<gnc_gr_bba>\n");
1036	#endif
1037
1038	#ifdef HAVE_PLURAL
1039	#if MYTEST
1040	PrintS("currRing: \n");
1041	rWrite(currRing);
1042	#ifdef RDEBUG
1043	rDebugPrint(currRing);
1044	#endif
1045
1046	PrintS("F: \n");
1047	idPrint(F);
1048	PrintS("Q: \n");
1049	idPrint(Q);
1050	#endif
1051	#endif
1052
1053	assume(currRing->OrdSgn != -1); // no mora!!! it terminates only for global ordering!!! (?)// alternate algebra?
1054
1055	// intvec *w=NULL;
1056	// intvec *hilb=NULL;
1057	int olddeg,reduc;
1058	int red_result=1;
1059	int /hilbeledeg=1,/hilbcount=0/,minimcnt=0/;
1060
1061	initBuchMoraCrit(strat); /set Gebauer, honey, sugarCrit/
1062	// initHilbCrit(F,Q,&hilb,strat);
1063	/* in plural we don't need Hilb yet */
1064	nc_gr_initBba(F,strat);
1065	initBuchMoraPos(strat);
1066	if (rIsRatGRing(currRing))
1067	{
1068	strat->posInL=posInL0; // by pCmp of lcm
1069	}
1070	/set enterS, spSpolyShort, reduce, red, initEcart, initEcartPair/
1071	/Shdl=/initBuchMora(F, Q,strat);
1072	strat->posInT=posInT110;
1073	reduc = olddeg = 0;
1074
1075	/* compute------------------------------------------------------- */
1076	while (strat->Ll >= 0)
1077	{
1078	if (TEST_OPT_DEBUG) messageSets(strat);
1079
1080	if (strat->Ll== 0) strat->interpt=TRUE;
1081	if (TEST_OPT_DEGBOUND
1082	&& ((strat->honey
1083	&& (strat->L[strat->Ll].ecart+currRing->pFDeg(strat->L[strat->Ll].p,currRing)>Kstd1_deg))
1084	\|\| ((!strat->honey) && (currRing->pFDeg(strat->L[strat->Ll].p,currRing)>Kstd1_deg))))
1085	{
1086	/*
1087	*stops computation if
1088	* 24 IN test and the degree +ecart of L[strat->Ll] is bigger then
1089	*a predefined number Kstd1_deg
1090	*/
1091	while (strat->Ll >= 0) deleteInL(strat->L,&strat->Ll,strat->Ll,strat);
1092	break;
1093	}
1094	/* picks the last element from the lazyset L */
1095	strat->P = strat->L[strat->Ll];
1096	strat->Ll--;
1097	//kTest(strat);
1098
1099	if (strat->P.p != NULL)
1100	if (pNext(strat->P.p) == strat->tail)
1101	{
1102	/* deletes the short spoly and computes */
1103	pLmFree(strat->P.p);
1104	/* the real one */
1105	// if (ncRingType(currRing)==nc_lie) /* prod crit */
1106	// if(pHasNotCF(strat->P.p1,strat->P.p2))
1107	// {
1108	// strat->cp++;
1109	// /* prod.crit itself in nc_CreateSpoly */
1110	// }
1111
1112
1113	if( ! rIsRatGRing(currRing) )
1114	{
1115	strat->P.p = nc_CreateSpoly(strat->P.p1,strat->P.p2,currRing);
1116	}
1117	#ifdef HAVE_RATGRING
1118	else
1119	{
1120	/* rational case */
1121	strat->P.p = nc_rat_CreateSpoly(strat->P.p1,strat->P.p2,currRing->real_var_start-1,currRing);
1122	}
1123	#endif
1124
1125
1126	#ifdef PDEBUG
1127	p_Test(strat->P.p, currRing);
1128	#endif
1129
1130	#if MYTEST
1131	if (TEST_OPT_DEBUG)
1132	{
1133	PrintS("p1: "); pWrite(strat->P.p1);
1134	PrintS("p2: "); pWrite(strat->P.p2);
1135	PrintS("SPoly: "); pWrite(strat->P.p);
1136	}
1137	#endif
1138	}
1139
1140
1141	if (strat->P.p != NULL)
1142	{
1143	if (TEST_OPT_PROT)
1144	message((strat->honey ? strat->P.ecart : 0) + strat->P.pFDeg(),
1145	&olddeg,&reduc,strat, red_result);
1146
1147	#if MYTEST
1148	if (TEST_OPT_DEBUG)
1149	{
1150	PrintS("p1: "); pWrite(strat->P.p1);
1151	PrintS("p2: "); pWrite(strat->P.p2);
1152	PrintS("SPoly before: "); pWrite(strat->P.p);
1153	}
1154	#endif
1155
1156	/* reduction of the element chosen from L */
1157	strat->red(&strat->P,strat);
1158
1159	#if MYTEST
1160	if (TEST_OPT_DEBUG)
1161	{
1162	PrintS("red SPoly: "); pWrite(strat->P.p);
1163	}
1164	#endif
1165	}
1166	if (strat->P.p != NULL)
1167	{
1168	if (TEST_OPT_PROT)
1169	{
1170	PrintS("s\n");
1171	}
1172	/* enter P.p into s and L */
1173	{
1174	/* quick unit detection in the rational case */
1175	#ifdef HAVE_RATGRING
1176	if( rIsRatGRing(currRing) )
1177	{
1178	if ( p_LmIsConstantRat(strat->P.p, currRing) )
1179	{
1180	#ifdef PDEBUG
1181	PrintS("unit element detected:");
1182	p_wrp(strat->P.p,currRing);
1183	#endif
1184	p_Delete(&strat->P.p,currRing, strat->tailRing);
1185	strat->P.p = pOne();
1186	}
1187	}
1188	#endif
1189	strat->P.sev=0;
1190	int pos=posInS(strat,strat->sl,strat->P.p, strat->P.ecart);
1191	{
1192	if (TEST_OPT_INTSTRATEGY)
1193	{
1194	if ((strat->syzComp==0)\|\|(!strat->homog))
1195	{
1196	#ifdef HAVE_RATGRING
1197	if(!rIsRatGRing(currRing))
1198	#endif
1199	strat->P.p = redtailBba(strat->P.p,pos-1,strat);
1200	}
1201
1202	strat->P.p=p_Cleardenom(strat->P.p, currRing);
1203	}
1204	else
1205	{
1206	pNorm(strat->P.p);
1207	if ((strat->syzComp==0)\|\|(!strat->homog))
1208	{
1209	strat->P.p = redtailBba(strat->P.p,pos-1,strat);
1210	}
1211	}
1212	if (TEST_OPT_DEBUG)
1213	{
1214	PrintS("new s:"); wrp(strat->P.p);
1215	PrintLn();
1216	#if MYTEST
1217	PrintS("s: "); pWrite(strat->P.p);
1218	#endif
1219
1220	}
1221	// kTest(strat);
1222	//
1223	enterpairs(strat->P.p,strat->sl,strat->P.ecart,pos,strat);
1224
1225	if (strat->sl==-1) pos=0;
1226	else pos=posInS(strat,strat->sl,strat->P.p,strat->P.ecart);
1227
1228	strat->enterS(strat->P,pos,strat,-1);
1229	}
1230	// if (hilb!=NULL) khCheck(Q,w,hilb,hilbeledeg,hilbcount,strat);
1231	}
1232	kDeleteLcm(&strat->P);
1233	}
1234	//kTest(strat);
1235	}
1236	if (TEST_OPT_DEBUG) messageSets(strat);
1237
1238	/* complete reduction of the standard basis--------- */
1239	if (TEST_OPT_SB_1)
1240	{
1241	int k=1;
1242	int j;
1243	while(k<=strat->sl)
1244	{
1245	j=0;
1246	loop
1247	{
1248	if (j>=k) break;
1249	clearS(strat->S[j],strat->sevS[j],&k,&j,strat);
1250	j++;
1251	}
1252	k++;
1253	}
1254	}
1255
1256	if (TEST_OPT_REDSB)
1257	completeReduce(strat);
1258	/* release temp data-------------------------------- */
1259	exitBuchMora(strat);
1260	// if (TEST_OPT_WEIGHTM)
1261	// {
1262	// currRing->pFDeg=pFDegOld;
1263	// currRing->pLDeg=pLDegOld;
1264	// if (ecartWeights)
1265	// {
1266	// omFreeSize((ADDRESS)ecartWeights,((currRing->N)+1)*sizeof(short));
1267	// ecartWeights=NULL;
1268	// }
1269	// }
1270	if (TEST_OPT_PROT) messageStat(hilbcount,strat);
1271	if (Q!=NULL) updateResult(strat->Shdl,Q,strat);
1272
1273
1274	#if MYTEST
1275	PrintS("</gnc_gr_bba>\n");
1276	#endif
1277
1278	if( currRing != save ) rChangeCurrRing(save);
1279
1280	return (strat->Shdl);
1281	}
1282
1283	ideal k_gnc_gr_mora(const ideal F, const ideal Q, const intvec , const intvec , kStrategy strat, const ring _currRing)
1284	{
1285	if ((ncRingType(_currRing)==nc_skew)
1286	\|\| id_HomIdeal(F,Q,_currRing))
1287	return gnc_gr_bba(F, Q, NULL, NULL, strat, _currRing);
1288	else
1289	{
1290	WerrorS("not implemented: std for inhomogeneous ideasl in local orderings");
1291	return NULL;
1292	}
1293	}
1294
1295	#endif
1296

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