/* * Number Theory Functions * (C) 1999-2009 Jack Lloyd * * Distributed under the terms of the Botan license */ #include #include #include namespace Botan { namespace { /* * Miller-Rabin Iterations */ u32bit miller_rabin_test_iterations(u32bit bits, bool verify) { struct mapping { u32bit bits; u32bit verify_iter; u32bit check_iter; }; const mapping tests[] = { { 50, 55, 25 }, { 100, 38, 22 }, { 160, 32, 18 }, { 163, 31, 17 }, { 168, 30, 16 }, { 177, 29, 16 }, { 181, 28, 15 }, { 185, 27, 15 }, { 190, 26, 15 }, { 195, 25, 14 }, { 201, 24, 14 }, { 208, 23, 14 }, { 215, 22, 13 }, { 222, 21, 13 }, { 231, 20, 13 }, { 241, 19, 12 }, { 252, 18, 12 }, { 264, 17, 12 }, { 278, 16, 11 }, { 294, 15, 10 }, { 313, 14, 9 }, { 334, 13, 8 }, { 360, 12, 8 }, { 392, 11, 7 }, { 430, 10, 7 }, { 479, 9, 6 }, { 542, 8, 6 }, { 626, 7, 5 }, { 746, 6, 4 }, { 926, 5, 3 }, { 1232, 4, 2 }, { 1853, 3, 2 }, { 0, 0, 0 } }; for(u32bit i = 0; tests[i].bits; ++i) { if(bits <= tests[i].bits) { if(verify) return tests[i].verify_iter; else return tests[i].check_iter; } } return 2; } } /* * Return the number of 0 bits at the end of n */ u32bit low_zero_bits(const BigInt& n) { if(n.is_negative() || n.is_zero()) return 0; u32bit low_zero = 0; if(n.is_positive() && n.is_nonzero()) { for(u32bit i = 0; i != n.size(); ++i) { word x = n[i]; if(x) { low_zero += ctz(x); break; } else low_zero += BOTAN_MP_WORD_BITS; } } return low_zero; } /* * Calculate the GCD */ BigInt gcd(const BigInt& a, const BigInt& b) { if(a.is_zero() || b.is_zero()) return 0; if(a == 1 || b == 1) return 1; BigInt x = a, y = b; x.set_sign(BigInt::Positive); y.set_sign(BigInt::Positive); u32bit shift = std::min(low_zero_bits(x), low_zero_bits(y)); x >>= shift; y >>= shift; while(x.is_nonzero()) { x >>= low_zero_bits(x); y >>= low_zero_bits(y); if(x >= y) { x -= y; x >>= 1; } else { y -= x; y >>= 1; } } return (y << shift); } /* * Calculate the LCM */ BigInt lcm(const BigInt& a, const BigInt& b) { return ((a * b) / gcd(a, b)); } /* * Find the Modular Inverse */ BigInt inverse_mod(const BigInt& n, const BigInt& mod) { if(mod.is_zero()) throw BigInt::DivideByZero(); if(mod.is_negative() || n.is_negative()) throw Invalid_Argument("inverse_mod: arguments must be non-negative"); if(n.is_zero() || (n.is_even() && mod.is_even())) return 0; BigInt x = mod, y = n, u = mod, v = n; BigInt A = 1, B = 0, C = 0, D = 1; while(u.is_nonzero()) { u32bit zero_bits = low_zero_bits(u); u >>= zero_bits; for(u32bit i = 0; i != zero_bits; ++i) { if(A.is_odd() || B.is_odd()) { A += y; B -= x; } A >>= 1; B >>= 1; } zero_bits = low_zero_bits(v); v >>= zero_bits; for(u32bit i = 0; i != zero_bits; ++i) { if(C.is_odd() || D.is_odd()) { C += y; D -= x; } C >>= 1; D >>= 1; } if(u >= v) { u -= v; A -= C; B -= D; } else { v -= u; C -= A; D -= B; } } if(v != 1) return 0; while(D.is_negative()) D += mod; while(D >= mod) D -= mod; return D; } /* * Modular Exponentiation */ BigInt power_mod(const BigInt& base, const BigInt& exp, const BigInt& mod) { Power_Mod pow_mod(mod); pow_mod.set_base(base); pow_mod.set_exponent(exp); return pow_mod.execute(); } /* * Do simple tests of primality */ s32bit simple_primality_tests(const BigInt& n) { const s32bit NOT_PRIME = -1, UNKNOWN = 0, PRIME = 1; if(n == 2) return PRIME; if(n <= 1 || n.is_even()) return NOT_PRIME; if(n <= PRIMES[PRIME_TABLE_SIZE-1]) { const word num = n.word_at(0); for(u32bit i = 0; PRIMES[i]; ++i) { if(num == PRIMES[i]) return PRIME; if(num < PRIMES[i]) return NOT_PRIME; } return NOT_PRIME; } u32bit check_first = std::min(n.bits() / 32, PRIME_PRODUCTS_TABLE_SIZE); for(u32bit i = 0; i != check_first; ++i) if(gcd(n, PRIME_PRODUCTS[i]) != 1) return NOT_PRIME; return UNKNOWN; } /* * Fast check of primality */ bool check_prime(const BigInt& n, RandomNumberGenerator& rng) { return run_primality_tests(rng, n, 0); } /* * Test for primality */ bool is_prime(const BigInt& n, RandomNumberGenerator& rng) { return run_primality_tests(rng, n, 1); } /* * Verify primality */ bool verify_prime(const BigInt& n, RandomNumberGenerator& rng) { return run_primality_tests(rng, n, 2); } /* * Verify primality */ bool run_primality_tests(RandomNumberGenerator& rng, const BigInt& n, u32bit level) { s32bit simple_tests = simple_primality_tests(n); if(simple_tests) return (simple_tests == 1) ? true : false; return passes_mr_tests(rng, n, level); } /* * Test for primaility using Miller-Rabin */ bool passes_mr_tests(RandomNumberGenerator& rng, const BigInt& n, u32bit level) { const u32bit PREF_NONCE_BITS = 40; if(level > 2) level = 2; MillerRabin_Test mr(n); if(!mr.passes_test(2)) return false; if(level == 0) return true; const u32bit NONCE_BITS = std::min(n.bits() - 1, PREF_NONCE_BITS); const bool verify = (level == 2); u32bit tests = miller_rabin_test_iterations(n.bits(), verify); BigInt nonce; for(u32bit i = 0; i != tests; ++i) { if(!verify && PRIMES[i] < (n-1)) nonce = PRIMES[i]; else { while(nonce < 2 || nonce >= (n-1)) nonce.randomize(rng, NONCE_BITS); } if(!mr.passes_test(nonce)) return false; } return true; } /* * Miller-Rabin Test */ bool MillerRabin_Test::passes_test(const BigInt& a) { if(a < 2 || a >= n_minus_1) throw Invalid_Argument("Bad size for nonce in Miller-Rabin test"); BigInt y = pow_mod(a); if(y == 1 || y == n_minus_1) return true; for(u32bit i = 1; i != s; ++i) { y = reducer.square(y); if(y == 1) return false; if(y == n_minus_1) return true; } return false; } /* * Miller-Rabin Constructor */ MillerRabin_Test::MillerRabin_Test(const BigInt& num) { if(num.is_even() || num < 3) throw Invalid_Argument("MillerRabin_Test: Invalid number for testing"); n = num; n_minus_1 = n - 1; s = low_zero_bits(n_minus_1); r = n_minus_1 >> s; pow_mod = Fixed_Exponent_Power_Mod(r, n); reducer = Modular_Reducer(n); } }