[u/mdw/catacomb] / mpcrt.h

/* -*-c-*-
 *
 * $Id: mpcrt.h,v 1.2 1999/12/10 23:22:32 mdw Exp $
 *
 * Chinese Remainder Theorem computations (Gauss's algorithm)
 *
 * (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.
 */

/*----- Revision history --------------------------------------------------* 
 *
 * $Log: mpcrt.h,v $
 * Revision 1.2  1999/12/10 23:22:32  mdw
 * Interface changes for suggested destinations.  Use Barrett reduction.
 *
 * Revision 1.1  1999/11/22 20:50:57  mdw
 * Add support for solving Chinese Remainder Theorem problems.
 *
 */

#ifndef CATACOMB_MPCRT_H
#define CATACOMB_MPCRT_H

#ifdef __cplusplus
  extern "C" {
#endif

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

#include <stddef.h>

#ifndef CATACOMB_MP_H
#  include "mp.h"
#endif

#ifndef CATACOMB_MPBARRETT_H
#  include "mpbarrett.h"
#endif

/*----- Data structures ---------------------------------------------------*/

typedef struct mpcrt_mod {
  mp *m;				/* %$n_i$% -- the modulus */
  mp *n;				/* %$N_i = n / n_i$% */
  mp *ni;				/* %$M_i = N_i^{-1} \bmod n_i$% */
  mp *nni;				/* %$N_i M_i \bmod m$% */
} mpcrt_mod;

typedef struct mpcrt {
  size_t k;				/* Number of distinct moduli */
  mpbarrett mb;				/* Barrett context for product */
  mpcrt_mod *v;				/* Vector of information for each */
} mpcrt;

/*----- Functions provided ------------------------------------------------*/

/* --- @mpcrt_create@ --- *
 *
 * Arguments:	@mpcrt *c@ = pointer to CRT context
 *		@mpcrt_mod *v@ = pointer to vector of moduli
 *		@size_t k@ = number of moduli
 *		@mp *n@ = product of all moduli (@MP_NEW@ if unknown)
 *
 * Returns:	---
 *
 * Use:		Initializes a context for solving Chinese Remainder Theorem
 *		problems.  The vector of moduli can be incomplete.  Omitted
 *		items must be left as null pointers.  Not all combinations of
 *		missing things can be coped with, even if there is
 *		technically enough information to cope.  For example, if @n@
 *		is unspecified, all the @m@ values must be present, even if
 *		there is one modulus with both @m@ and @n@ (from which the
 *		product of all moduli could clearly be calculated).
 */

extern void mpcrt_create(mpcrt */*c*/, mpcrt_mod */*v*/,
			 size_t /*k*/, mp */*n*/);

/* --- @mpcrt_destroy@ --- *
 *
 * Arguments:	@mpcrt *c@ - pointer to CRT context
 *
 * Returns:	---
 *
 * Use:		Destroys a CRT context, releasing all the resources it holds.
 */

extern void mpcrt_destroy(mpcrt */*c*/);

/* --- @mpcrt_solve@ --- *
 *
 * Arguments:	@mpcrt *c@ = pointer to CRT context
 *		@mp *d@ = fake destination
 *		@mp **v@ = array of residues
 *
 * Returns:	The unique solution modulo the product of the individual
 *		moduli, which leaves the given residues.
 *
 * Use:		Constructs a result given its residue modulo an array of
 *		coprime integers.  This can be used to improve performance of
 *		RSA encryption or Blum-Blum-Shub generation if the factors
 *		of the modulus are known, since results can be computed mod
 *		each of the individual factors and then combined at the end.
 *		This is rather faster than doing the full-scale modular
 *		exponentiation.
 */

extern mp *mpcrt_solve(mpcrt */*c*/, mp */*d*/, mp **/*v*/);

/*----- That's all, folks -------------------------------------------------*/

#ifdef __cplusplus
  }
#endif

#endif
Commit	Line	Data
5ee4c893	1	/* --c--
5ee4c893	2	*
5bda60bd	3	* $Id: mpcrt.h,v 1.2 1999/12/10 23:22:32 mdw Exp $
5ee4c893	4	*
	5	* Chinese Remainder Theorem computations (Gauss's algorithm)
	6	*
	7	* (c) 1999 Straylight/Edgeware
	8	*/
	9
	10	/----- Licensing notice --------------------------------------------------
	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.
	18	*
	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.
	23	*
	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
	30	/----- Revision history --------------------------------------------------
	31	*
	32	* $Log: mpcrt.h,v $
5bda60bd	33	* Revision 1.2 1999/12/10 23:22:32 mdw
	34	* Interface changes for suggested destinations. Use Barrett reduction.
	35	*
5ee4c893	36	* Revision 1.1 1999/11/22 20:50:57 mdw
	37	* Add support for solving Chinese Remainder Theorem problems.
	38	*
	39	*/
	40
5bda60bd	41	#ifndef CATACOMB_MPCRT_H
5bda60bd	42	#define CATACOMB_MPCRT_H
5ee4c893	43
	44	#ifdef __cplusplus
	45	extern "C" {
	46	#endif
	47
	48	/----- Header files ------------------------------------------------------/
	49
	50	#include <stddef.h>
	51
5bda60bd	52	#ifndef CATACOMB_MP_H
5ee4c893	53	# include "mp.h"
	54	#endif
	55
5bda60bd	56	#ifndef CATACOMB_MPBARRETT_H
5bda60bd	57	# include "mpbarrett.h"
5ee4c893	58	#endif
	59
	60	/----- Data structures ---------------------------------------------------/
	61
	62	typedef struct mpcrt_mod {
	63	mp m; / %$n_i$% -- the modulus */
	64	mp n; / %$N_i = n / n_i$% */
	65	mp ni; / %$M_i = N_i^{-1} \bmod n_i$% */
5bda60bd	66	mp nni; / %$N_i M_i \bmod m$% */
5ee4c893	67	} mpcrt_mod;
	68
	69	typedef struct mpcrt {
	70	size_t k; /* Number of distinct moduli */
5bda60bd	71	mpbarrett mb; /* Barrett context for product */
5ee4c893	72	mpcrt_mod v; / Vector of information for each */
	73	} mpcrt;
	74
	75	/----- Functions provided ------------------------------------------------/
	76
	77	/* --- @mpcrt_create@ --- *
	78	*
	79	* Arguments: @mpcrt *c@ = pointer to CRT context
	80	* @mpcrt_mod *v@ = pointer to vector of moduli
	81	* @size_t k@ = number of moduli
	82	* @mp *n@ = product of all moduli (@MP_NEW@ if unknown)
	83	*
	84	* Returns: ---
	85	*
	86	* Use: Initializes a context for solving Chinese Remainder Theorem
	87	* problems. The vector of moduli can be incomplete. Omitted
	88	* items must be left as null pointers. Not all combinations of
	89	* missing things can be coped with, even if there is
	90	* technically enough information to cope. For example, if @n@
	91	* is unspecified, all the @m@ values must be present, even if
	92	* there is one modulus with both @m@ and @n@ (from which the
	93	* product of all moduli could clearly be calculated).
	94	*/
	95
	96	extern void mpcrt_create(mpcrt /c/, mpcrt_mod /v/,
	97	size_t /k/, mp /n*/);
	98
	99	/* --- @mpcrt_destroy@ --- *
	100	*
	101	* Arguments: @mpcrt *c@ - pointer to CRT context
	102	*
	103	* Returns: ---
	104	*
	105	* Use: Destroys a CRT context, releasing all the resources it holds.
	106	*/
	107
	108	extern void mpcrt_destroy(mpcrt /c*/);
	109
	110	/* --- @mpcrt_solve@ --- *
	111	*
	112	* Arguments: @mpcrt *c@ = pointer to CRT context
5bda60bd	113	* @mp *d@ = fake destination
5ee4c893	114	* @mp **v@ = array of residues
	115	*
	116	* Returns: The unique solution modulo the product of the individual
	117	* moduli, which leaves the given residues.
	118	*
	119	* Use: Constructs a result given its residue modulo an array of
	120	* coprime integers. This can be used to improve performance of
	121	* RSA encryption or Blum-Blum-Shub generation if the factors
	122	* of the modulus are known, since results can be computed mod
	123	* each of the individual factors and then combined at the end.
	124	* This is rather faster than doing the full-scale modular
	125	* exponentiation.
	126	*/
	127
5bda60bd	128	extern mp mpcrt_solve(mpcrt /c/, mp /d/, mp /v*/);
5ee4c893	129
	130	/----- That's all, folks -------------------------------------------------/
	131
	132	#ifdef __cplusplus
	133	}
	134	#endif
	135
	136	#endif