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source: git/kernel/rmodulo2m.cc @ b14855

fieker-DuValspielwiese

Last change on this file since b14855 was 91d286, checked in by Oliver Wienand <wienand@…>, 13 years ago
* Error in component check while creating gcd polys (fixed #300) * Further changed return value of nDivComp to match return values of pDivComp git-svn-id: file:///usr/local/Singular/svn/trunk@13717 2c84dea3-7e68-4137-9b89-c4e89433aadc
Property mode set to `100644`
File size: 14.3 KB

Line
1	/****************************************
2	* Computer Algebra System SINGULAR *
3	****************************************/
4	/* $Id$ */
5	/*
6	* ABSTRACT: numbers modulo 2^m
7	*/
8
9	#include <string.h>
10	#include <kernel/mod2.h>
11
12	#ifdef HAVE_RINGS
13	#include <omalloc/mylimits.h>
14	#include <kernel/structs.h>
15	#include <kernel/febase.h>
16	#include <omalloc/omalloc.h>
17	#include <kernel/numbers.h>
18	#include <kernel/longrat.h>
19	#include <kernel/mpr_complex.h>
20	#include <kernel/ring.h>
21	#include <kernel/rmodulo2m.h>
22	#include <kernel/si_gmp.h>
23
24	int nr2mExp;
25
26	/*
27	* Multiply two numbers
28	*/
29	number nr2mMult (number a, number b)
30	{
31	if (((NATNUMBER)a == 0) \|\| ((NATNUMBER)b == 0))
32	return (number)0;
33	else
34	return nr2mMultM(a,b);
35	}
36
37	/*
38	* Give the smallest non unit k, such that a * x = k = b * y has a solution
39	*/
40	number nr2mLcm (number a,number b,ring r)
41	{
42	NATNUMBER res = 0;
43	if ((NATNUMBER) a == 0) a = (number) 1;
44	if ((NATNUMBER) b == 0) b = (number) 1;
45	while ((NATNUMBER) a % 2 == 0)
46	{
47	a = (number) ((NATNUMBER) a / 2);
48	if ((NATNUMBER) b % 2 == 0) b = (number) ((NATNUMBER) b / 2);
49	res++;
50	}
51	while ((NATNUMBER) b % 2 == 0)
52	{
53	b = (number) ((NATNUMBER) b / 2);
54	res++;
55	}
56	return (number) (1L << res); // (2**res)
57	}
58
59	/*
60	* Give the largest non unit k, such that a = x * k, b = y * k has
61	* a solution.
62	*/
63	number nr2mGcd (number a,number b,ring r)
64	{
65	NATNUMBER res = 0;
66	if ((NATNUMBER) a == 0 && (NATNUMBER) b == 0) return (number) 1;
67	while ((NATNUMBER) a % 2 == 0 && (NATNUMBER) b % 2 == 0)
68	{
69	a = (number) ((NATNUMBER) a / 2);
70	b = (number) ((NATNUMBER) b / 2);
71	res++;
72	}
73	// if ((NATNUMBER) b % 2 == 0)
74	// {
75	// return (number) ((1L << res));// * (NATNUMBER) a); // (2*res)a a ist Einheit
76	// }
77	// else
78	// {
79	return (number) ((1L << res));// * (NATNUMBER) b); // (2*res)b b ist Einheit
80	// }
81	}
82
83	/*
84	* Give the largest non unit k, such that a = x * k, b = y * k has
85	* a solution.
86	*/
87	number nr2mExtGcd (number a, number b, number s, number t)
88	{
89	NATNUMBER res = 0;
90	if ((NATNUMBER) a == 0 && (NATNUMBER) b == 0) return (number) 1;
91	while ((NATNUMBER) a % 2 == 0 && (NATNUMBER) b % 2 == 0)
92	{
93	a = (number) ((NATNUMBER) a / 2);
94	b = (number) ((NATNUMBER) b / 2);
95	res++;
96	}
97	if ((NATNUMBER) b % 2 == 0)
98	{
99	*t = NULL;
100	*s = nr2mInvers(a);
101	return (number) ((1L << res));// * (NATNUMBER) a); // (2*res)a a ist Einheit
102	}
103	else
104	{
105	*s = NULL;
106	*t = nr2mInvers(b);
107	return (number) ((1L << res));// * (NATNUMBER) b); // (2*res)b b ist Einheit
108	}
109	}
110
111	void nr2mPower (number a, int i, number * result)
112	{
113	if (i==0)
114	{
115	(NATNUMBER )result = 1;
116	}
117	else if (i==1)
118	{
119	*result = a;
120	}
121	else
122	{
123	nr2mPower(a,i-1,result);
124	result = nr2mMultM(a,result);
125	}
126	}
127
128	/*
129	* create a number from int
130	*/
131	number nr2mInit (int i, const ring r)
132	{
133	if (i == 0) return (number)(NATNUMBER)i;
134
135	long ii = i;
136	NATNUMBER j = (NATNUMBER)1;
137	if (ii < 0) { j = currRing->nr2mModul; ii = -ii; }
138	NATNUMBER k = (NATNUMBER)ii;
139	k = k & currRing->nr2mModul;
140	/* now we have: from = j * k mod 2^m */
141	return (number)nr2mMult((number)j, (number)k);
142	}
143
144	/*
145	* convert a number to an int in ]-k/2 .. k/2],
146	* where k = 2^m; i.e., an int in ]-2^(m-1) .. 2^(m-1)];
147	* note that the code computes a long which will then
148	* automatically casted to int
149	*/
150	int nr2mInt(number &n, const ring r)
151	{
152	NATNUMBER nn = (unsigned long)(NATNUMBER)n & r->nr2mModul;
153	unsigned long l = r->nr2mModul >> 1; l++; /* now: l = 2^(m-1) */
154	if ((NATNUMBER)nn > l)
155	return (int)((NATNUMBER)nn - r->nr2mModul - 1);
156	else
157	return (int)((NATNUMBER)nn);
158	}
159
160	number nr2mAdd (number a, number b)
161	{
162	return nr2mAddM(a,b);
163	}
164
165	number nr2mSub (number a, number b)
166	{
167	return nr2mSubM(a,b);
168	}
169
170	BOOLEAN nr2mIsUnit (number a)
171	{
172	return ((NATNUMBER) a % 2 == 1);
173	}
174
175	number nr2mGetUnit (number k)
176	{
177	if (k == NULL)
178	return (number) 1;
179	NATNUMBER tmp = (NATNUMBER) k;
180	while (tmp % 2 == 0)
181	tmp = tmp / 2;
182	return (number) tmp;
183	}
184
185	BOOLEAN nr2mIsZero (number a)
186	{
187	return 0 == (NATNUMBER)a;
188	}
189
190	BOOLEAN nr2mIsOne (number a)
191	{
192	return 1 == (NATNUMBER)a;
193	}
194
195	BOOLEAN nr2mIsMOne (number a)
196	{
197	return (currRing->nr2mModul == (NATNUMBER)a);
198	}
199
200	BOOLEAN nr2mEqual (number a, number b)
201	{
202	return nr2mEqualM(a,b);
203	}
204
205	BOOLEAN nr2mGreater (number a, number b)
206	{
207	return nr2mDivBy(a, b);
208	}
209
210	/* This does not seem to be the predicate whether a
211	is divisible by b in Z/2^m: if a is NULL then
212	the answer is not necessarily TRUE. */
213	BOOLEAN nr2mDivBy (number a, number b)
214	{
215	if (a == NULL)
216	{
217	NATNUMBER c = currRing->nr2mModul + 1;
218	if (c != 0) /* i.e., if no overflow */
219	return (c % (NATNUMBER)b) == 0;
220	else
221	{
222	/* overflow: we need to check whether b
223	is a power of 2: */
224	c = (NATNUMBER)b;
225	while (c != 0)
226	{
227	if ((c % 2) != 0) return FALSE;
228	c = c >> 1;
229	}
230	return TRUE;
231	}
232	}
233	else
234	return ((NATNUMBER)a % (NATNUMBER)b) == 0;
235	}
236
237	int nr2mDivComp(number as, number bs)
238	{
239	NATNUMBER a = (NATNUMBER) as;
240	NATNUMBER b = (NATNUMBER) bs;
241	assume(a != 0 && b != 0);
242	while (a % 2 == 0 && b % 2 == 0)
243	{
244	a = a / 2;
245	b = b / 2;
246	}
247	if (a % 2 == 0)
248	{
249	return -1;
250	}
251	else
252	{
253	if (b % 2 == 1)
254	{
255	return 2;
256	}
257	else
258	{
259	return 1;
260	}
261	}
262	}
263
264	/* TRUE iff 0 < k <= 2^m / 2 */
265	BOOLEAN nr2mGreaterZero (number k)
266	{
267	if ((NATNUMBER)k == 0) return FALSE;
268	if ((NATNUMBER)k > ((currRing->nr2mModul >> 1) + 1)) return FALSE;
269	return TRUE;
270	}
271
272	/* assumes that 'a' is odd, i.e., a unit in Z/2^m, and computes
273	the extended gcd of 'a' and 2^m, in order to find some 's'
274	and 't' such that a * s + 2^m * t = gcd(a, 2^m) = 1;
275	this code will always find a positive 's' */
276	void specialXGCD(unsigned long& s, unsigned long a)
277	{
278	int_number u = (int_number)omAlloc(sizeof(mpz_t));
279	mpz_init_set_ui(u, a);
280	int_number u0 = (int_number)omAlloc(sizeof(mpz_t));
281	mpz_init(u0);
282	int_number u1 = (int_number)omAlloc(sizeof(mpz_t));
283	mpz_init_set_ui(u1, 1);
284	int_number u2 = (int_number)omAlloc(sizeof(mpz_t));
285	mpz_init(u2);
286	int_number v = (int_number)omAlloc(sizeof(mpz_t));
287	mpz_init_set_ui(v, currRing->nr2mModul);
288	mpz_add_ui(v, v, 1); /* now: v = 2^m */
289	int_number v0 = (int_number)omAlloc(sizeof(mpz_t));
290	mpz_init(v0);
291	int_number v1 = (int_number)omAlloc(sizeof(mpz_t));
292	mpz_init(v1);
293	int_number v2 = (int_number)omAlloc(sizeof(mpz_t));
294	mpz_init_set_ui(v2, 1);
295	int_number q = (int_number)omAlloc(sizeof(mpz_t));
296	mpz_init(q);
297	int_number r = (int_number)omAlloc(sizeof(mpz_t));
298	mpz_init(r);
299
300	while (mpz_cmp_ui(v, 0) != 0) /* i.e., while v != 0 */
301	{
302	mpz_div(q, u, v);
303	mpz_mod(r, u, v);
304	mpz_set(u, v);
305	mpz_set(v, r);
306	mpz_set(u0, u2);
307	mpz_set(v0, v2);
308	mpz_mul(u2, u2, q); mpz_sub(u2, u1, u2); /* u2 = u1 - q * u2 */
309	mpz_mul(v2, v2, q); mpz_sub(v2, v1, v2); /* v2 = v1 - q * v2 */
310	mpz_set(u1, u0);
311	mpz_set(v1, v0);
312	}
313
314	while (mpz_cmp_ui(u1, 0) < 0) /* i.e., while u1 < 0 */
315	{
316	/* we add 2^m = (2^m - 1) + 1 to u1: */
317	mpz_add_ui(u1, u1, currRing->nr2mModul);
318	mpz_add_ui(u1, u1, 1);
319	}
320	s = mpz_get_ui(u1); /* now: 0 <= s <= 2^m - 1 */
321
322	mpz_clear(u); omFree((ADDRESS)u);
323	mpz_clear(u0); omFree((ADDRESS)u0);
324	mpz_clear(u1); omFree((ADDRESS)u1);
325	mpz_clear(u2); omFree((ADDRESS)u2);
326	mpz_clear(v); omFree((ADDRESS)v);
327	mpz_clear(v0); omFree((ADDRESS)v0);
328	mpz_clear(v1); omFree((ADDRESS)v1);
329	mpz_clear(v2); omFree((ADDRESS)v2);
330	mpz_clear(q); omFree((ADDRESS)q);
331	mpz_clear(r); omFree((ADDRESS)r);
332	}
333
334	NATNUMBER InvMod(NATNUMBER a)
335	{
336	assume((NATNUMBER)a % 2 != 0);
337	unsigned long s;
338	specialXGCD(s, a);
339	return s;
340	}
341	//#endif
342
343	inline number nr2mInversM (number c)
344	{
345	assume((NATNUMBER)c % 2 != 0);
346	return (number)InvMod((NATNUMBER)c);
347	}
348
349	number nr2mDiv (number a,number b)
350	{
351	if ((NATNUMBER)a==0)
352	return (number)0;
353	else if ((NATNUMBER)b%2==0)
354	{
355	if ((NATNUMBER)b != 0)
356	{
357	while ((NATNUMBER) b%2 == 0 && (NATNUMBER) a%2 == 0)
358	{
359	a = (number) ((NATNUMBER) a / 2);
360	b = (number) ((NATNUMBER) b / 2);
361	}
362	}
363	if ((NATNUMBER) b%2 == 0)
364	{
365	WerrorS("Division not possible, even by cancelling zero divisors.");
366	WerrorS("Result is integer division without remainder.");
367	return (number) ((NATNUMBER) a / (NATNUMBER) b);
368	}
369	}
370	return (number) nr2mMult(a, nr2mInversM(b));
371	}
372
373	number nr2mMod (number a, number b)
374	{
375	/*
376	We need to return the number r which is uniquely determined by the
377	following two properties:
378	(1) 0 <= r < \|b\| (with respect to '<' and '<=' performed in Z x Z)
379	(2) There exists some k in the integers Z such that a = k * b + r.
380	Consider g := gcd(2^m, \|b\|). Note that then \|b\|/g is a unit in Z/2^m.
381	Now, there are three cases:
382	(a) g = 1
383	Then \|b\| is a unit in Z/2^m, i.e. \|b\| (and also b) divides a.
384	Thus r = 0.
385	(b) g <> 1 and g divides a
386	Then a = (a/g) * (\|b\|/g)^(-1) * b (up to sign), i.e. again r = 0.
387	(c) g <> 1 and g does not divide a
388	Let's denote the division with remainder of a by g as follows:
389	a = s * g + t. Then t = a - s * g = a - s * (\|b\|/g)^(-1) * \|b\|
390	fulfills (1) and (2), i.e. r := t is the correct result. Hence
391	in this third case, r is the remainder of division of a by g in Z.
392	This algorithm is the same as for the case Z/n, except that we may
393	compute the gcd of \|b\| and 2^m "by hand": We just extract the highest
394	power of 2 (<= 2^m) that is contained in b.
395	*/
396	assume((NATNUMBER)b != 0);
397	NATNUMBER g = 1;
398	NATNUMBER b_div = (NATNUMBER)b;
399	if (b_div < 0) b_div = -b_div; // b_div now represents \|b\|
400	NATNUMBER r = 0;
401	while ((g < currRing->nr2mModul) && (b_div > 0) && (b_div % 2 == 0))
402	{
403	b_div = b_div >> 1;
404	g = g << 1;
405	} // g is now the gcd of 2^m and \|b\|
406
407	if (g != 1) r = (NATNUMBER)a % g;
408	return (number)r;
409	}
410
411	number nr2mIntDiv (number a, number b)
412	{
413	if ((NATNUMBER)a == 0)
414	{
415	if ((NATNUMBER)b == 0)
416	return (number)1;
417	if ((NATNUMBER)b == 1)
418	return (number)0;
419	NATNUMBER c = currRing->nr2mModul + 1;
420	if (c != 0) /* i.e., if no overflow */
421	return (number)(c / (NATNUMBER)b);
422	else
423	{
424	/* overflow: c = 2^32 resp. 2^64, depending on platform */
425	int_number cc = (int_number)omAlloc(sizeof(mpz_t));
426	mpz_init_set_ui(cc, currRing->nr2mModul); mpz_add_ui(cc, cc, 1);
427	mpz_div_ui(cc, cc, (unsigned long)(NATNUMBER)b);
428	unsigned long s = mpz_get_ui(cc);
429	mpz_clear(cc); omFree((ADDRESS)cc);
430	return (number)(NATNUMBER)s;
431	}
432	}
433	else
434	{
435	if ((NATNUMBER)b == 0)
436	return (number)0;
437	return (number)((NATNUMBER) a / (NATNUMBER) b);
438	}
439	}
440
441	number nr2mInvers (number c)
442	{
443	if ((NATNUMBER)c%2==0)
444	{
445	WerrorS("division by zero divisor");
446	return (number)0;
447	}
448	return nr2mInversM(c);
449	}
450
451	number nr2mNeg (number c)
452	{
453	if ((NATNUMBER)c==0) return c;
454	return nr2mNegM(c);
455	}
456
457	number nr2mMapMachineInt(number from)
458	{
459	NATNUMBER i = ((NATNUMBER) from) & currRing->nr2mModul;
460	return (number) i;
461	}
462
463	number nr2mMapZp(number from)
464	{
465	long ii = (long)from;
466	NATNUMBER j = (NATNUMBER)1;
467	if (ii < 0) { j = currRing->nr2mModul; ii = -ii; }
468	NATNUMBER i = (NATNUMBER)ii;
469	i = i & currRing->nr2mModul;
470	/* now we have: from = j * i mod 2^m */
471	return (number)nr2mMult((number)i, (number)j);
472	}
473
474	number nr2mMapQ(number from)
475	{
476	int_number erg = (int_number) omAlloc(sizeof(mpz_t));
477	mpz_init(erg);
478	int_number k = (int_number) omAlloc(sizeof(mpz_t));
479	mpz_init_set_ui(k, currRing->nr2mModul);
480
481	nlGMP(from, (number)erg);
482	mpz_and(erg, erg, k);
483	number r = (number)mpz_get_ui(erg);
484
485	mpz_clear(erg); omFree((ADDRESS)erg);
486	mpz_clear(k); omFree((ADDRESS)k);
487
488	return (number) r;
489	}
490
491	number nr2mMapGMP(number from)
492	{
493	int_number erg = (int_number) omAlloc(sizeof(mpz_t));
494	mpz_init(erg);
495	int_number k = (int_number) omAlloc(sizeof(mpz_t));
496	mpz_init_set_ui(k, currRing->nr2mModul);
497
498	mpz_and(erg, (int_number)from, k);
499	number r = (number) mpz_get_ui(erg);
500
501	mpz_clear(erg); omFree((ADDRESS)erg);
502	mpz_clear(k); omFree((ADDRESS)k);
503
504	return (number) r;
505	}
506
507	nMapFunc nr2mSetMap(const ring src, const ring dst)
508	{
509	if (rField_is_Ring_2toM(src)
510	&& (src->ringflagb >= dst->ringflagb))
511	{
512	return nr2mMapMachineInt;
513	}
514	if (rField_is_Ring_Z(src))
515	{
516	return nr2mMapGMP;
517	}
518	if (rField_is_Q(src))
519	{
520	return nr2mMapQ;
521	}
522	if (rField_is_Zp(src)
523	&& (src->ch == 2)
524	&& (dst->ringflagb == 1))
525	{
526	return nr2mMapZp;
527	}
528	if (rField_is_Ring_PtoM(src) \|\| rField_is_Ring_ModN(src))
529	{
530	// Computing the n of Z/n
531	int_number modul = (int_number) omAlloc(sizeof(mpz_t)); // evtl. spaeter mit bin
532	mpz_init(modul);
533	mpz_set(modul, src->ringflaga);
534	mpz_pow_ui(modul, modul, src->ringflagb);
535	if (mpz_divisible_2exp_p(modul, dst->ringflagb))
536	{
537	mpz_clear(modul);
538	omFree((ADDRESS) modul);
539	return nr2mMapGMP;
540	}
541	mpz_clear(modul);
542	omFree((ADDRESS) modul);
543	}
544	return NULL; // default
545	}
546
547	/*
548	* set the exponent (allocate and init tables) (TODO)
549	*/
550
551	void nr2mSetExp(int m, const ring r)
552	{
553	if (m > 1)
554	{
555	nr2mExp = m;
556	/* we want nr2mModul to be the bit pattern '11..1' consisting
557	of m one's: */
558	r->nr2mModul = 1;
559	for (int i = 1; i < m; i++) r->nr2mModul = (r->nr2mModul * 2) + 1;
560	}
561	else
562	{
563	nr2mExp = 2;
564	r->nr2mModul = 3; /* i.e., '11' in binary representation */
565	}
566	}
567
568	void nr2mInitExp(int m, const ring r)
569	{
570	nr2mSetExp(m, r);
571	if (m < 2) WarnS("nr2mInitExp failed: we go on with Z/2^2");
572	}
573
574	#ifdef LDEBUG
575	BOOLEAN nr2mDBTest (number a, const char *f, const int l)
576	{
577	if ((NATNUMBER)a < 0) return FALSE;
578	if (((NATNUMBER)a & currRing->nr2mModul) != (NATNUMBER)a) return FALSE;
579	return TRUE;
580	}
581	#endif
582
583	void nr2mWrite (number &a, const ring r)
584	{
585	int i = nr2mInt(a, r);
586	StringAppend("%d", i);
587	}
588
589	static const char* nr2mEati(const char s, int i)
590	{
591
592	if (((s) >= '0') && ((s) <= '9'))
593	{
594	(*i) = 0;
595	do
596	{
597	(i) = 10;
598	(i) += s++ - '0';
599	if ((i) >= (MAX_INT_VAL / 10)) (i) = (*i) & currRing->nr2mModul;
600	}
601	while (((s) >= '0') && ((s) <= '9'));
602	(i) = (i) & currRing->nr2mModul;
603	}
604	else (*i) = 1;
605	return s;
606	}
607
608	const char * nr2mRead (const char s, number a)
609	{
610	int z;
611	int n=1;
612
613	s = nr2mEati(s, &z);
614	if ((*s) == '/')
615	{
616	s++;
617	s = nr2mEati(s, &n);
618	}
619	if (n == 1)
620	*a = (number)z;
621	else
622	*a = nr2mDiv((number)z,(number)n);
623	return s;
624	}
625	#endif

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