[u/mdw/catacomb] / mprand.c

/* -*-c-*-
 *
 * $Id: mprand.c,v 1.5 2004/04/08 01:36:15 mdw Exp $
 *
 * Generate a random multiprecision integer
 *
 * (c) 1999 Straylight/Edgeware
 */

/*----- Licensing notice --------------------------------------------------*
 *
 * This file is part of Catacomb.
 *
 * Catacomb is free software; you can redistribute it and/or modify
 * it under the terms of the GNU Library General Public License as
 * published by the Free Software Foundation; either version 2 of the
 * License, or (at your option) any later version.
 *
 * Catacomb 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 Library General Public License for more details.
 *
 * You should have received a copy of the GNU Library General Public
 * License along with Catacomb; if not, write to the Free
 * Software Foundation, Inc., 59 Temple Place - Suite 330, Boston,
 * MA 02111-1307, USA.
 */

/*----- Header files ------------------------------------------------------*/

#include <mLib/alloc.h>

#include "grand.h"
#include "mp.h"
#include "mprand.h"

/*----- Main code ---------------------------------------------------------*/

/* --- @mprand@ --- *
 *
 * Arguments:	@mp *d@ = destination integer
 *		@unsigned b@ = number of bits
 *		@grand *r@ = pointer to random number source
 *		@mpw or@ = mask to OR with low-order bits
 *
 * Returns:	A random integer with the requested number of bits.
 *
 * Use:		Constructs an arbitrarily large pseudorandom integer.
 *		Assuming that the generator @r@ is good, the result is
 *		uniformly distributed in the interval %$[2^{b - 1}, 2^b)$%.
 *		The result is then ORred with the given @or@ value.  This
 *		will often be 1, to make the result odd.
 */

mp *mprand(mp *d, unsigned b, grand *r, mpw or)
{
  size_t sz = (b + 7) >> 3;
  arena *a = (d && (d->f & MP_BURN)) ? arena_secure : arena_global;
  octet *v = x_alloc(a, sz);
  unsigned m;

  /* --- Fill buffer with random data --- */

  r->ops->fill(r, v, sz);

  /* --- Force into the correct range --- *
   *
   * This is slightly tricky.  Oh, well.
   */

  b = (b - 1) & 7;
  m = (1 << b);
  v[0] = (v[0] & (m - 1)) | m;

  /* --- Mask, load and return --- */

  d = mp_loadb(d, v, sz);
  d->v[0] |= or;
  memset(v, 0, sz);
  x_free(a, v);
  return (d);
}

/* --- @mprand_range@ --- *
 *
 * Arguments:	@mp *d@ = destination integer
 *		@mp *l@ = limit for random number
 *		@grand *r@ = random number source
 *		@mpw or@ = mask for low-order bits
 *
 * Returns:	A pseudorandom integer, unformly distributed over the
 *		interval %$[0, l)$%.
 *
 * Use:		Generates a uniformly-distributed pseudorandom number in the
 *		appropriate range.
 */

mp *mprand_range(mp *d, mp *l, grand *r, mpw or)
{
  size_t b = mp_bits(l);
  size_t sz = (b + 7) >> 3;
  arena *a = (d && (d->f & MP_BURN)) ? arena_secure : arena_global;
  octet *v = x_alloc(a, sz);
  unsigned m;

  /* --- The algorithm --- *
   *
   * Rather simpler than most.  Find the number of bits in the number %$l$%
   * (i.e., the integer %$b$% such that %$2^{b - 1} \le l < 2^b$%), and
   * generate pseudorandom integers with %$n$% bits (but not, unlike in the
   * function above, with the top bit forced to 1).  If the integer is
   * greater than or equal to %$l$%, try again.
   *
   * This is similar to the algorithms used in @lcrand_range@ and friends,
   * except that I've forced the `raw' range of the random numbers such that
   * %$l$% itself is the largest multiple of %$l$% in the range (since, by
   * the inequality above, %$2^b \le 2l$%).  This removes the need for costly
   * division and remainder operations.
   *
   * As usual, the number of iterations expected is two.
   */

  b = ((b - 1) & 7) + 1;
  m = (1 << b) - 1;
  do {
    r->ops->fill(r, v, sz);
    v[0] &= m;
    d = mp_loadb(d, v, sz);
    d->v[0] |= or;
  } while (MP_CMP(d, >=, l));

  /* --- Done --- */

  memset(v, 0, sz);
  x_free(a, v);
  return (d);
}

/*----- That's all, folks -------------------------------------------------*/
Commit	Line	Data
893c6259	1	/* --c--
893c6259	2	*
b817bfc6	3	* $Id: mprand.c,v 1.5 2004/04/08 01:36:15 mdw Exp $
893c6259	4	*
	5	* Generate a random multiprecision integer
	6	*
	7	* (c) 1999 Straylight/Edgeware
	8	*/
	9
45c0fd36	10	/----- Licensing notice --------------------------------------------------
893c6259	11	*
	12	* This file is part of Catacomb.
	13	*
	14	* Catacomb is free software; you can redistribute it and/or modify
	15	* it under the terms of the GNU Library General Public License as
	16	* published by the Free Software Foundation; either version 2 of the
	17	* License, or (at your option) any later version.
45c0fd36	18	*
893c6259	19	* Catacomb is distributed in the hope that it will be useful,
	20	* but WITHOUT ANY WARRANTY; without even the implied warranty of
	21	* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
	22	* GNU Library General Public License for more details.
45c0fd36	23	*
893c6259	24	* You should have received a copy of the GNU Library General Public
	25	* License along with Catacomb; if not, write to the Free
	26	* Software Foundation, Inc., 59 Temple Place - Suite 330, Boston,
	27	* MA 02111-1307, USA.
	28	*/
	29
893c6259	30	/----- Header files ------------------------------------------------------/
	31
	32	#include <mLib/alloc.h>
	33
	34	#include "grand.h"
	35	#include "mp.h"
	36	#include "mprand.h"
	37
	38	/----- Main code ---------------------------------------------------------/
	39
	40	/* --- @mprand@ --- *
	41	*
	42	* Arguments: @mp *d@ = destination integer
	43	* @unsigned b@ = number of bits
	44	* @grand *r@ = pointer to random number source
	45	* @mpw or@ = mask to OR with low-order bits
	46	*
	47	* Returns: A random integer with the requested number of bits.
	48	*
	49	* Use: Constructs an arbitrarily large pseudorandom integer.
	50	* Assuming that the generator @r@ is good, the result is
	51	* uniformly distributed in the interval %$[2^{b - 1}, 2^b)$%.
	52	* The result is then ORred with the given @or@ value. This
	53	* will often be 1, to make the result odd.
	54	*/
	55
	56	mp mprand(mp d, unsigned b, grand *r, mpw or)
	57	{
ab9fc001	58	size_t sz = (b + 7) >> 3;
d34decd2	59	arena *a = (d && (d->f & MP_BURN)) ? arena_secure : arena_global;
d34decd2	60	octet *v = x_alloc(a, sz);
893c6259	61	unsigned m;
	62
	63	/* --- Fill buffer with random data --- */
	64
	65	r->ops->fill(r, v, sz);
	66
	67	/* --- Force into the correct range --- *
	68	*
	69	* This is slightly tricky. Oh, well.
	70	*/
	71
ab9fc001	72	b = (b - 1) & 7;
893c6259	73	m = (1 << b);
	74	v[0] = (v[0] & (m - 1)) \| m;
	75
	76	/* --- Mask, load and return --- */
	77
	78	d = mp_loadb(d, v, sz);
	79	d->v[0] \|= or;
d34decd2	80	memset(v, 0, sz);
d34decd2	81	x_free(a, v);
893c6259	82	return (d);
	83	}
	84
ab9fc001	85	/* --- @mprand_range@ --- *
	86	*
	87	* Arguments: @mp *d@ = destination integer
	88	* @mp *l@ = limit for random number
	89	* @grand *r@ = random number source
	90	* @mpw or@ = mask for low-order bits
	91	*
45c0fd36	92	* Returns: A pseudorandom integer, unformly distributed over the
ab9fc001	93	* interval %$[0, l)$%.
	94	*
	95	* Use: Generates a uniformly-distributed pseudorandom number in the
	96	* appropriate range.
	97	*/
	98
	99	mp mprand_range(mp d, mp l, grand r, mpw or)
	100	{
	101	size_t b = mp_bits(l);
	102	size_t sz = (b + 7) >> 3;
d34decd2	103	arena *a = (d && (d->f & MP_BURN)) ? arena_secure : arena_global;
d34decd2	104	octet *v = x_alloc(a, sz);
ab9fc001	105	unsigned m;
	106
	107	/* --- The algorithm --- *
	108	*
	109	* Rather simpler than most. Find the number of bits in the number %$l$%
	110	* (i.e., the integer %$b$% such that %$2^{b - 1} \le l < 2^b$%), and
	111	* generate pseudorandom integers with %$n$% bits (but not, unlike in the
	112	* function above, with the top bit forced to 1). If the integer is
	113	* greater than or equal to %$l$%, try again.
	114	*
	115	* This is similar to the algorithms used in @lcrand_range@ and friends,
	116	* except that I've forced the `raw' range of the random numbers such that
	117	* %$l$% itself is the largest multiple of %$l$% in the range (since, by
	118	* the inequality above, %$2^b \le 2l$%). This removes the need for costly
	119	* division and remainder operations.
	120	*
	121	* As usual, the number of iterations expected is two.
	122	*/
	123
7246869f	124	b = ((b - 1) & 7) + 1;
ab9fc001	125	m = (1 << b) - 1;
	126	do {
	127	r->ops->fill(r, v, sz);
	128	v[0] &= m;
	129	d = mp_loadb(d, v, sz);
	130	d->v[0] \|= or;
	131	} while (MP_CMP(d, >=, l));
	132
	133	/* --- Done --- */
	134
d34decd2	135	memset(v, 0, sz);
d34decd2	136	x_free(a, v);
ab9fc001	137	return (d);
	138	}
	139
893c6259	140	/----- That's all, folks -------------------------------------------------/