Mercurial > dropbear
view libtommath/bn_mp_prime_is_prime.c @ 1874:1c9215154d4a
Handle /proc/.../maps being reordered
We now search for the first r-xp line in the file
author | Matt Johnston <matt@ucc.asn.au> |
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date | Thu, 03 Feb 2022 22:13:06 +0800 |
parents | 1051e4eea25a |
children |
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#include "tommath_private.h" #ifdef BN_MP_PRIME_IS_PRIME_C /* LibTomMath, multiple-precision integer library -- Tom St Denis */ /* SPDX-License-Identifier: Unlicense */ /* portable integer log of two with small footprint */ static unsigned int s_floor_ilog2(int value) { unsigned int r = 0; while ((value >>= 1) != 0) { r++; } return r; } mp_err mp_prime_is_prime(const mp_int *a, int t, mp_bool *result) { mp_int b; int ix, p_max = 0, size_a, len; mp_bool res; mp_err err; unsigned int fips_rand, mask; /* default to no */ *result = MP_NO; /* Some shortcuts */ /* N > 3 */ if (a->used == 1) { if ((a->dp[0] == 0u) || (a->dp[0] == 1u)) { *result = MP_NO; return MP_OKAY; } if (a->dp[0] == 2u) { *result = MP_YES; return MP_OKAY; } } /* N must be odd */ if (MP_IS_EVEN(a)) { return MP_OKAY; } /* N is not a perfect square: floor(sqrt(N))^2 != N */ if ((err = mp_is_square(a, &res)) != MP_OKAY) { return err; } if (res != MP_NO) { return MP_OKAY; } /* is the input equal to one of the primes in the table? */ for (ix = 0; ix < PRIVATE_MP_PRIME_TAB_SIZE; ix++) { if (mp_cmp_d(a, s_mp_prime_tab[ix]) == MP_EQ) { *result = MP_YES; return MP_OKAY; } } #ifdef MP_8BIT /* The search in the loop above was exhaustive in this case */ if ((a->used == 1) && (PRIVATE_MP_PRIME_TAB_SIZE >= 31)) { return MP_OKAY; } #endif /* first perform trial division */ if ((err = s_mp_prime_is_divisible(a, &res)) != MP_OKAY) { return err; } /* return if it was trivially divisible */ if (res == MP_YES) { return MP_OKAY; } /* Run the Miller-Rabin test with base 2 for the BPSW test. */ if ((err = mp_init_set(&b, 2uL)) != MP_OKAY) { return err; } if ((err = mp_prime_miller_rabin(a, &b, &res)) != MP_OKAY) { goto LBL_B; } if (res == MP_NO) { goto LBL_B; } /* Rumours have it that Mathematica does a second M-R test with base 3. Other rumours have it that their strong L-S test is slightly different. It does not hurt, though, beside a bit of extra runtime. */ b.dp[0]++; if ((err = mp_prime_miller_rabin(a, &b, &res)) != MP_OKAY) { goto LBL_B; } if (res == MP_NO) { goto LBL_B; } /* * Both, the Frobenius-Underwood test and the the Lucas-Selfridge test are quite * slow so if speed is an issue, define LTM_USE_ONLY_MR to use M-R tests with * bases 2, 3 and t random bases. */ #ifndef LTM_USE_ONLY_MR if (t >= 0) { /* * Use a Frobenius-Underwood test instead of the Lucas-Selfridge test for * MP_8BIT (It is unknown if the Lucas-Selfridge test works with 16-bit * integers but the necesssary analysis is on the todo-list). */ #if defined (MP_8BIT) || defined (LTM_USE_FROBENIUS_TEST) err = mp_prime_frobenius_underwood(a, &res); if ((err != MP_OKAY) && (err != MP_ITER)) { goto LBL_B; } if (res == MP_NO) { goto LBL_B; } #else if ((err = mp_prime_strong_lucas_selfridge(a, &res)) != MP_OKAY) { goto LBL_B; } if (res == MP_NO) { goto LBL_B; } #endif } #endif /* run at least one Miller-Rabin test with a random base */ if (t == 0) { t = 1; } /* Only recommended if the input range is known to be < 3317044064679887385961981 It uses the bases necessary for a deterministic M-R test if the input is smaller than 3317044064679887385961981 The caller has to check the size. TODO: can be made a bit finer grained but comparing is not free. */ if (t < 0) { /* Sorenson, Jonathan; Webster, Jonathan (2015). "Strong Pseudoprimes to Twelve Prime Bases". */ /* 0x437ae92817f9fc85b7e5 = 318665857834031151167461 */ if ((err = mp_read_radix(&b, "437ae92817f9fc85b7e5", 16)) != MP_OKAY) { goto LBL_B; } if (mp_cmp(a, &b) == MP_LT) { p_max = 12; } else { /* 0x2be6951adc5b22410a5fd = 3317044064679887385961981 */ if ((err = mp_read_radix(&b, "2be6951adc5b22410a5fd", 16)) != MP_OKAY) { goto LBL_B; } if (mp_cmp(a, &b) == MP_LT) { p_max = 13; } else { err = MP_VAL; goto LBL_B; } } /* we did bases 2 and 3 already, skip them */ for (ix = 2; ix < p_max; ix++) { mp_set(&b, s_mp_prime_tab[ix]); if ((err = mp_prime_miller_rabin(a, &b, &res)) != MP_OKAY) { goto LBL_B; } if (res == MP_NO) { goto LBL_B; } } } /* Do "t" M-R tests with random bases between 3 and "a". See Fips 186.4 p. 126ff */ else if (t > 0) { /* * The mp_digit's have a defined bit-size but the size of the * array a.dp is a simple 'int' and this library can not assume full * compliance to the current C-standard (ISO/IEC 9899:2011) because * it gets used for small embeded processors, too. Some of those MCUs * have compilers that one cannot call standard compliant by any means. * Hence the ugly type-fiddling in the following code. */ size_a = mp_count_bits(a); mask = (1u << s_floor_ilog2(size_a)) - 1u; /* Assuming the General Rieman hypothesis (never thought to write that in a comment) the upper bound can be lowered to 2*(log a)^2. E. Bach, "Explicit bounds for primality testing and related problems," Math. Comp. 55 (1990), 355-380. size_a = (size_a/10) * 7; len = 2 * (size_a * size_a); E.g.: a number of size 2^2048 would be reduced to the upper limit floor(2048/10)*7 = 1428 2 * 1428^2 = 4078368 (would have been ~4030331.9962 with floats and natural log instead) That number is smaller than 2^28, the default bit-size of mp_digit. */ /* How many tests, you might ask? Dana Jacobsen of Math::Prime::Util fame does exactly 1. In words: one. Look at the end of _GMP_is_prime() in Math-Prime-Util-GMP-0.50/primality.c if you do not believe it. The function mp_rand() goes to some length to use a cryptographically good PRNG. That also means that the chance to always get the same base in the loop is non-zero, although very low. If the BPSW test and/or the addtional Frobenious test have been performed instead of just the Miller-Rabin test with the bases 2 and 3, a single extra test should suffice, so such a very unlikely event will not do much harm. To preemptivly answer the dangling question: no, a witness does not need to be prime. */ for (ix = 0; ix < t; ix++) { /* mp_rand() guarantees the first digit to be non-zero */ if ((err = mp_rand(&b, 1)) != MP_OKAY) { goto LBL_B; } /* * Reduce digit before casting because mp_digit might be bigger than * an unsigned int and "mask" on the other side is most probably not. */ fips_rand = (unsigned int)(b.dp[0] & (mp_digit) mask); #ifdef MP_8BIT /* * One 8-bit digit is too small, so concatenate two if the size of * unsigned int allows for it. */ if ((MP_SIZEOF_BITS(unsigned int)/2) >= MP_SIZEOF_BITS(mp_digit)) { if ((err = mp_rand(&b, 1)) != MP_OKAY) { goto LBL_B; } fips_rand <<= MP_SIZEOF_BITS(mp_digit); fips_rand |= (unsigned int) b.dp[0]; fips_rand &= mask; } #endif if (fips_rand > (unsigned int)(INT_MAX - MP_DIGIT_BIT)) { len = INT_MAX / MP_DIGIT_BIT; } else { len = (((int)fips_rand + MP_DIGIT_BIT) / MP_DIGIT_BIT); } /* Unlikely. */ if (len < 0) { ix--; continue; } /* * As mentioned above, one 8-bit digit is too small and * although it can only happen in the unlikely case that * an "unsigned int" is smaller than 16 bit a simple test * is cheap and the correction even cheaper. */ #ifdef MP_8BIT /* All "a" < 2^8 have been caught before */ if (len == 1) { len++; } #endif if ((err = mp_rand(&b, len)) != MP_OKAY) { goto LBL_B; } /* * That number might got too big and the witness has to be * smaller than "a" */ len = mp_count_bits(&b); if (len >= size_a) { len = (len - size_a) + 1; if ((err = mp_div_2d(&b, len, &b, NULL)) != MP_OKAY) { goto LBL_B; } } /* Although the chance for b <= 3 is miniscule, try again. */ if (mp_cmp_d(&b, 3uL) != MP_GT) { ix--; continue; } if ((err = mp_prime_miller_rabin(a, &b, &res)) != MP_OKAY) { goto LBL_B; } if (res == MP_NO) { goto LBL_B; } } } /* passed the test */ *result = MP_YES; LBL_B: mp_clear(&b); return err; } #endif