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view libtommath/bn_mp_sqrtmod_prime.c @ 1857:6022df862942

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Use DSCP for IP QoS traffic classes The previous TOS values are deprecated and not used by modern traffic classifiers. This sets AF21 for "interactive" traffic (with a tty). Non-tty traffic sets AF11 - that indicates high throughput but is not lowest priority (which would be CS1 or LE). This differs from the CS1 used by OpenSSH, it lets interactive git over SSH have higher priority than background least effort traffic. Dropbear's settings here should be suitable with the diffservs used by CAKE qdisc.
author Matt Johnston <matt@ucc.asn.au>
date Tue, 25 Jan 2022 17:32:20 +0800
parents 1051e4eea25a
children
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#include "tommath_private.h"
#ifdef BN_MP_SQRTMOD_PRIME_C
/* LibTomMath, multiple-precision integer library -- Tom St Denis */
/* SPDX-License-Identifier: Unlicense */

/* Tonelli-Shanks algorithm
 * https://en.wikipedia.org/wiki/Tonelli%E2%80%93Shanks_algorithm
 * https://gmplib.org/list-archives/gmp-discuss/2013-April/005300.html
 *
 */

mp_err mp_sqrtmod_prime(const mp_int *n, const mp_int *prime, mp_int *ret)
{
   mp_err err;
   int legendre;
   mp_int t1, C, Q, S, Z, M, T, R, two;
   mp_digit i;

   /* first handle the simple cases */
   if (mp_cmp_d(n, 0uL) == MP_EQ) {
      mp_zero(ret);
      return MP_OKAY;
   }
   if (mp_cmp_d(prime, 2uL) == MP_EQ)                            return MP_VAL; /* prime must be odd */
   if ((err = mp_kronecker(n, prime, &legendre)) != MP_OKAY)        return err;
   if (legendre == -1)                                           return MP_VAL; /* quadratic non-residue mod prime */

   if ((err = mp_init_multi(&t1, &C, &Q, &S, &Z, &M, &T, &R, &two, NULL)) != MP_OKAY) {
      return err;
   }

   /* SPECIAL CASE: if prime mod 4 == 3
    * compute directly: err = n^(prime+1)/4 mod prime
    * Handbook of Applied Cryptography algorithm 3.36
    */
   if ((err = mp_mod_d(prime, 4uL, &i)) != MP_OKAY)               goto cleanup;
   if (i == 3u) {
      if ((err = mp_add_d(prime, 1uL, &t1)) != MP_OKAY)           goto cleanup;
      if ((err = mp_div_2(&t1, &t1)) != MP_OKAY)                  goto cleanup;
      if ((err = mp_div_2(&t1, &t1)) != MP_OKAY)                  goto cleanup;
      if ((err = mp_exptmod(n, &t1, prime, ret)) != MP_OKAY)      goto cleanup;
      err = MP_OKAY;
      goto cleanup;
   }

   /* NOW: Tonelli-Shanks algorithm */

   /* factor out powers of 2 from prime-1, defining Q and S as: prime-1 = Q*2^S */
   if ((err = mp_copy(prime, &Q)) != MP_OKAY)                    goto cleanup;
   if ((err = mp_sub_d(&Q, 1uL, &Q)) != MP_OKAY)                 goto cleanup;
   /* Q = prime - 1 */
   mp_zero(&S);
   /* S = 0 */
   while (MP_IS_EVEN(&Q)) {
      if ((err = mp_div_2(&Q, &Q)) != MP_OKAY)                    goto cleanup;
      /* Q = Q / 2 */
      if ((err = mp_add_d(&S, 1uL, &S)) != MP_OKAY)               goto cleanup;
      /* S = S + 1 */
   }

   /* find a Z such that the Legendre symbol (Z|prime) == -1 */
   mp_set_u32(&Z, 2u);
   /* Z = 2 */
   for (;;) {
      if ((err = mp_kronecker(&Z, prime, &legendre)) != MP_OKAY)     goto cleanup;
      if (legendre == -1) break;
      if ((err = mp_add_d(&Z, 1uL, &Z)) != MP_OKAY)               goto cleanup;
      /* Z = Z + 1 */
   }

   if ((err = mp_exptmod(&Z, &Q, prime, &C)) != MP_OKAY)         goto cleanup;
   /* C = Z ^ Q mod prime */
   if ((err = mp_add_d(&Q, 1uL, &t1)) != MP_OKAY)                goto cleanup;
   if ((err = mp_div_2(&t1, &t1)) != MP_OKAY)                    goto cleanup;
   /* t1 = (Q + 1) / 2 */
   if ((err = mp_exptmod(n, &t1, prime, &R)) != MP_OKAY)         goto cleanup;
   /* R = n ^ ((Q + 1) / 2) mod prime */
   if ((err = mp_exptmod(n, &Q, prime, &T)) != MP_OKAY)          goto cleanup;
   /* T = n ^ Q mod prime */
   if ((err = mp_copy(&S, &M)) != MP_OKAY)                       goto cleanup;
   /* M = S */
   mp_set_u32(&two, 2u);

   for (;;) {
      if ((err = mp_copy(&T, &t1)) != MP_OKAY)                    goto cleanup;
      i = 0;
      for (;;) {
         if (mp_cmp_d(&t1, 1uL) == MP_EQ) break;
         if ((err = mp_exptmod(&t1, &two, prime, &t1)) != MP_OKAY) goto cleanup;
         i++;
      }
      if (i == 0u) {
         if ((err = mp_copy(&R, ret)) != MP_OKAY)                  goto cleanup;
         err = MP_OKAY;
         goto cleanup;
      }
      if ((err = mp_sub_d(&M, i, &t1)) != MP_OKAY)                goto cleanup;
      if ((err = mp_sub_d(&t1, 1uL, &t1)) != MP_OKAY)             goto cleanup;
      if ((err = mp_exptmod(&two, &t1, prime, &t1)) != MP_OKAY)   goto cleanup;
      /* t1 = 2 ^ (M - i - 1) */
      if ((err = mp_exptmod(&C, &t1, prime, &t1)) != MP_OKAY)     goto cleanup;
      /* t1 = C ^ (2 ^ (M - i - 1)) mod prime */
      if ((err = mp_sqrmod(&t1, prime, &C)) != MP_OKAY)           goto cleanup;
      /* C = (t1 * t1) mod prime */
      if ((err = mp_mulmod(&R, &t1, prime, &R)) != MP_OKAY)       goto cleanup;
      /* R = (R * t1) mod prime */
      if ((err = mp_mulmod(&T, &C, prime, &T)) != MP_OKAY)        goto cleanup;
      /* T = (T * C) mod prime */
      mp_set(&M, i);
      /* M = i */
   }

cleanup:
   mp_clear_multi(&t1, &C, &Q, &S, &Z, &M, &T, &R, &two, NULL);
   return err;
}

#endif