/* bignum-random.c * * Generating big random numbers */ /* nettle, low-level cryptographics library * * Copyright (C) 2002 Niels Möller * * The nettle library is free software; you can redistribute it and/or modify * it under the terms of the GNU Lesser General Public License as published by * the Free Software Foundation; either version 2.1 of the License, or (at your * option) any later version. * * The nettle 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 Lesser General Public * License for more details. * * You should have received a copy of the GNU Lesser General Public License * along with the nettle library; see the file COPYING.LIB. If not, write to * the Free Software Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, * MA 02111-1301, USA. */ #if HAVE_CONFIG_H # include "config.h" #endif #include #include "bignum.h" #include "nettle-internal.h" void nettle_mpz_random_size(mpz_t x, void *ctx, nettle_random_func *random, unsigned bits) { unsigned length = (bits + 7) / 8; TMP_DECL(data, uint8_t, NETTLE_MAX_BIGNUM_SIZE); TMP_ALLOC(data, length); random(ctx, length, data); nettle_mpz_set_str_256_u(x, length, data); if (bits % 8) mpz_fdiv_r_2exp(x, x, bits); } /* Returns a random number x, 0 <= x < n */ void nettle_mpz_random(mpz_t x, void *ctx, nettle_random_func *random, const mpz_t n) { /* NOTE: This leaves some bias, which may be bad for DSA. A better * way might be to generate a random number of mpz_sizeinbase(n, 2) * bits, and loop until one smaller than n is found. */ /* From Daniel Bleichenbacher (via coderpunks): * * There is still a theoretical attack possible with 8 extra bits. * But, the attack would need about 2^66 signatures 2^66 memory and * 2^66 time (if I remember that correctly). Compare that to DSA, * where the attack requires 2^22 signatures 2^40 memory and 2^64 * time. And of course, the numbers above are not a real threat for * PGP. Using 16 extra bits (i.e. generating a 176 bit random number * and reducing it modulo q) will defeat even this theoretical * attack. * * More generally log_2(q)/8 extra bits are enough to defeat my * attack. NIST also plans to update the standard. */ /* Add a few bits extra, to decrease the bias from the final modulo * operation. NIST FIPS 186-3 specifies 64 extra bits, for use with * DSA. */ nettle_mpz_random_size(x, ctx, random, mpz_sizeinbase(n, 2) + 64); mpz_fdiv_r(x, x, n); }