third_party/gmp/mpn/generic/trialdiv.c - RealtimeRoboticsGroup/test - Gitiles

 /* mpn_trialdiv -- find small factors of an mpn number using trial division.

    Contributed to the GNU project by Torbjorn Granlund.

    THE FUNCTION IN THIS FILE IS INTERNAL WITH A MUTABLE INTERFACE.  IT IS ONLY
    SAFE TO REACH IT THROUGH DOCUMENTED INTERFACES.  IN FACT, IT IS ALMOST
    GUARANTEED THAT IT WILL CHANGE OR DISAPPEAR IN A FUTURE GNU MP RELEASE.

 Copyright 2009, 2010, 2012, 2013 Free Software Foundation, Inc.

 This file is part of the GNU MP Library.

 The GNU MP Library is free software; you can redistribute it and/or modify
 it under the terms of either:

   * the GNU Lesser General Public License as published by the Free
     Software Foundation; either version 3 of the License, or (at your
     option) any later version.

 or

   * the GNU General Public License as published by the Free Software
     Foundation; either version 2 of the License, or (at your option) any
     later version.

 or both in parallel, as here.

 The GNU MP Library is distributed in the hope that it will be useful, but
 WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY
 or FITNESS FOR A PARTICULAR PURPOSE.  See the GNU General Public License
 for more details.

 You should have received copies of the GNU General Public License and the
 GNU Lesser General Public License along with the GNU MP Library.  If not,
 see https://www.gnu.org/licenses/.  */

 /*
    This function finds the first (smallest) factor represented in
    trialdivtab.h.  It does not stop the factoring effort just because it has
    reached some sensible limit, such as the square root of the input number.

    The caller can limit the factoring effort by passing NPRIMES.  The function
    will then divide until that limit, or perhaps a few primes more.  A position
    which only mpn_trialdiv can make sense of is returned in the WHERE
    parameter.  It can be used for restarting the factoring effort; the first
    call should pass 0 here.

    Input:        1. A non-negative number T = {tp,tn}
                  2. NPRIMES as described above,
                  3. *WHERE as described above.
    Output:       1. *WHERE updated as described above.
                  2. Return value is non-zero if we found a factor, else zero
                     To get the actual prime factor, compute the mod B inverse
                     of the return value.
 */

 #include "gmp-impl.h"

 struct gmp_primes_dtab {
   mp_limb_t binv;
   mp_limb_t lim;
 };

 struct gmp_primes_ptab {
   mp_limb_t ppp;	/* primes, multiplied together */
   mp_limb_t cps[7];	/* ppp values pre-computed for mpn_mod_1s_4p */
   gmp_uint_least32_t idx:24;	/* index of  first primes in dtab */
   gmp_uint_least32_t np :8;	/* number of primes related to this entry */
 };


 static const struct gmp_primes_dtab gmp_primes_dtab[] =
 {
 #define WANT_dtab
 #define P(p,inv,lim) {inv,lim}
 #include "trialdivtab.h"
 #undef WANT_dtab
 #undef P
   {0,0}
 };

 static const struct gmp_primes_ptab gmp_primes_ptab[] =
 {
 #define WANT_ptab
 #include "trialdivtab.h"
 #undef WANT_ptab
 };

 #define PTAB_LINES (sizeof (gmp_primes_ptab) / sizeof (gmp_primes_ptab[0]))

 /* FIXME: We could optimize out one of the outer loop conditions if we
    had a final ptab entry with a huge np field.  */
 mp_limb_t
 mpn_trialdiv (mp_srcptr tp, mp_size_t tn, mp_size_t nprimes, int *where)
 {
   mp_limb_t ppp;
   const mp_limb_t *cps;
   const struct gmp_primes_dtab *dp;
   long i, j, idx, np;
   mp_limb_t r, q;

   ASSERT (tn >= 1);

   for (i = *where; i < PTAB_LINES; i++)
     {
       ppp = gmp_primes_ptab[i].ppp;
       cps = gmp_primes_ptab[i].cps;

       r = mpn_mod_1s_4p (tp, tn, ppp << cps[1], cps);

       idx = gmp_primes_ptab[i].idx;
       np = gmp_primes_ptab[i].np;

       /* Check divisibility by individual primes.  */
       dp = &gmp_primes_dtab[idx] + np;
       for (j = -np; j < 0; j++)
 	{
 	  q = r * dp[j].binv;
 	  if (q <= dp[j].lim)
 	    {
 	      *where = i;
 	      return dp[j].binv;
 	    }
 	}

       nprimes -= np;
       if (nprimes <= 0)
 	return 0;
     }
   return 0;
 }
	/* mpn_trialdiv -- find small factors of an mpn number using trial division.

	Contributed to the GNU project by Torbjorn Granlund.

	THE FUNCTION IN THIS FILE IS INTERNAL WITH A MUTABLE INTERFACE. IT IS ONLY
	SAFE TO REACH IT THROUGH DOCUMENTED INTERFACES. IN FACT, IT IS ALMOST
	GUARANTEED THAT IT WILL CHANGE OR DISAPPEAR IN A FUTURE GNU MP RELEASE.

	Copyright 2009, 2010, 2012, 2013 Free Software Foundation, Inc.

	This file is part of the GNU MP Library.

	The GNU MP Library is free software; you can redistribute it and/or modify
	it under the terms of either:

	* the GNU Lesser General Public License as published by the Free
	Software Foundation; either version 3 of the License, or (at your
	option) any later version.

	or

	* the GNU General Public License as published by the Free Software
	Foundation; either version 2 of the License, or (at your option) any
	later version.

	or both in parallel, as here.

	The GNU MP Library is distributed in the hope that it will be useful, but
	WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY
	or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License
	for more details.

	You should have received copies of the GNU General Public License and the
	GNU Lesser General Public License along with the GNU MP Library. If not,
	see https://www.gnu.org/licenses/. */

	/*
	This function finds the first (smallest) factor represented in
	trialdivtab.h. It does not stop the factoring effort just because it has
	reached some sensible limit, such as the square root of the input number.

	The caller can limit the factoring effort by passing NPRIMES. The function
	will then divide until that limit, or perhaps a few primes more. A position
	which only mpn_trialdiv can make sense of is returned in the WHERE
	parameter. It can be used for restarting the factoring effort; the first
	call should pass 0 here.

	Input: 1. A non-negative number T = {tp,tn}
	2. NPRIMES as described above,
	3. *WHERE as described above.
	Output: 1. *WHERE updated as described above.
	2. Return value is non-zero if we found a factor, else zero
	To get the actual prime factor, compute the mod B inverse
	of the return value.
	*/

	#include "gmp-impl.h"

	struct gmp_primes_dtab {
	mp_limb_t binv;
	mp_limb_t lim;
	};

	struct gmp_primes_ptab {
	mp_limb_t ppp; /* primes, multiplied together */
	mp_limb_t cps[7]; /* ppp values pre-computed for mpn_mod_1s_4p */
	gmp_uint_least32_t idx:24; /* index of first primes in dtab */
	gmp_uint_least32_t np :8; /* number of primes related to this entry */
	};


	static const struct gmp_primes_dtab gmp_primes_dtab[] =
	{
	#define WANT_dtab
	#define P(p,inv,lim) {inv,lim}
	#include "trialdivtab.h"
	#undef WANT_dtab
	#undef P
	{0,0}
	};

	static const struct gmp_primes_ptab gmp_primes_ptab[] =
	{
	#define WANT_ptab
	#include "trialdivtab.h"
	#undef WANT_ptab
	};

	#define PTAB_LINES (sizeof (gmp_primes_ptab) / sizeof (gmp_primes_ptab[0]))

	/* FIXME: We could optimize out one of the outer loop conditions if we
	had a final ptab entry with a huge np field. */
	mp_limb_t
	mpn_trialdiv (mp_srcptr tp, mp_size_t tn, mp_size_t nprimes, int *where)
	{
	mp_limb_t ppp;
	const mp_limb_t *cps;
	const struct gmp_primes_dtab *dp;
	long i, j, idx, np;
	mp_limb_t r, q;

	ASSERT (tn >= 1);

	for (i = *where; i < PTAB_LINES; i++)
	{
	ppp = gmp_primes_ptab[i].ppp;
	cps = gmp_primes_ptab[i].cps;

	r = mpn_mod_1s_4p (tp, tn, ppp << cps[1], cps);

	idx = gmp_primes_ptab[i].idx;
	np = gmp_primes_ptab[i].np;

	/* Check divisibility by individual primes. */
	dp = &gmp_primes_dtab[idx] + np;
	for (j = -np; j < 0; j++)
	{
	q = r * dp[j].binv;
	if (q <= dp[j].lim)
	{
	*where = i;
	return dp[j].binv;
	}
	}

	nprimes -= np;
	if (nprimes <= 0)
	return 0;
	}
	return 0;
	}