167 lines
4.5 KiB
C
167 lines
4.5 KiB
C
/* LibTomMath, multiple-precision integer library -- Tom St Denis
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*
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* LibTomMath is library that provides for multiple-precision
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* integer arithmetic as well as number theoretic functionality.
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*
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* The library is designed directly after the MPI library by
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* Michael Fromberger but has been written from scratch with
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* additional optimizations in place.
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*
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* The library is free for all purposes without any express
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* guarantee it works.
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*
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* Tom St Denis, tomstdenis@iahu.ca, http://math.libtomcrypt.org
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*/
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#include <tommath.h>
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/* finds the next prime after the number "a" using "t" trials
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* of Miller-Rabin.
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*
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* bbs_style = 1 means the prime must be congruent to 3 mod 4
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*/
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int mp_prime_next_prime(mp_int *a, int t, int bbs_style)
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{
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int err, res, x, y;
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mp_digit res_tab[PRIME_SIZE], step, kstep;
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mp_int b;
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/* ensure t is valid */
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if (t <= 0 || t > PRIME_SIZE) {
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return MP_VAL;
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}
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/* force positive */
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if (a->sign == MP_NEG) {
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a->sign = MP_ZPOS;
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}
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/* simple algo if a is less than the largest prime in the table */
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if (mp_cmp_d(a, __prime_tab[PRIME_SIZE-1]) == MP_LT) {
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/* find which prime it is bigger than */
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for (x = PRIME_SIZE - 2; x >= 0; x--) {
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if (mp_cmp_d(a, __prime_tab[x]) != MP_LT) {
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if (bbs_style == 1) {
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/* ok we found a prime smaller or
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* equal [so the next is larger]
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*
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* however, the prime must be
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* congruent to 3 mod 4
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*/
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if ((__prime_tab[x + 1] & 3) != 3) {
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/* scan upwards for a prime congruent to 3 mod 4 */
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for (y = x + 1; y < PRIME_SIZE; y++) {
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if ((__prime_tab[y] & 3) == 3) {
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mp_set(a, __prime_tab[y]);
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return MP_OKAY;
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}
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}
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}
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} else {
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mp_set(a, __prime_tab[x + 1]);
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return MP_OKAY;
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}
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}
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}
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/* at this point a maybe 1 */
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if (mp_cmp_d(a, 1) == MP_EQ) {
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mp_set(a, 2);
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return MP_OKAY;
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}
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/* fall through to the sieve */
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}
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/* generate a prime congruent to 3 mod 4 or 1/3 mod 4? */
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if (bbs_style == 1) {
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kstep = 4;
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} else {
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kstep = 2;
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}
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/* at this point we will use a combination of a sieve and Miller-Rabin */
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if (bbs_style == 1) {
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/* if a mod 4 != 3 subtract the correct value to make it so */
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if ((a->dp[0] & 3) != 3) {
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if ((err = mp_sub_d(a, (a->dp[0] & 3) + 1, a)) != MP_OKAY) { return err; };
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}
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} else {
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if (mp_iseven(a) == 1) {
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/* force odd */
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if ((err = mp_sub_d(a, 1, a)) != MP_OKAY) {
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return err;
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}
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}
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}
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/* generate the restable */
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for (x = 1; x < PRIME_SIZE; x++) {
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if ((err = mp_mod_d(a, __prime_tab[x], res_tab + x)) != MP_OKAY) {
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return err;
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}
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}
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/* init temp used for Miller-Rabin Testing */
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if ((err = mp_init(&b)) != MP_OKAY) {
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return err;
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}
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for (;;) {
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/* skip to the next non-trivially divisible candidate */
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step = 0;
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do {
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/* y == 1 if any residue was zero [e.g. cannot be prime] */
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y = 0;
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/* increase step to next candidate */
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step += kstep;
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/* compute the new residue without using division */
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for (x = 1; x < PRIME_SIZE; x++) {
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/* add the step to each residue */
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res_tab[x] += kstep;
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/* subtract the modulus [instead of using division] */
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if (res_tab[x] >= __prime_tab[x]) {
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res_tab[x] -= __prime_tab[x];
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}
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/* set flag if zero */
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if (res_tab[x] == 0) {
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y = 1;
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}
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}
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} while (y == 1 && step < ((((mp_digit)1)<<DIGIT_BIT) - kstep));
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/* add the step */
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if ((err = mp_add_d(a, step, a)) != MP_OKAY) {
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goto __ERR;
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}
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/* if step == MAX then skip test */
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if (step >= ((((mp_digit)1)<<DIGIT_BIT) - kstep)) {
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continue;
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}
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/* is this prime? */
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for (x = 0; x < t; x++) {
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mp_set(&b, __prime_tab[t]);
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if ((err = mp_prime_miller_rabin(a, &b, &res)) != MP_OKAY) {
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goto __ERR;
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}
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if (res == 0) {
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break;
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}
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}
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if (res == 1) {
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break;
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}
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}
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err = MP_OKAY;
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__ERR:
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mp_clear(&b);
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return err;
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}
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