Mercurial > dropbear
view libtommath/etc/mersenne.c @ 301:fb3678bdb8c7
merge of 6ace12c71fc2773210f2f3d374c96622ca54fe48
and 84eb6fedc6df0666f8053b9018bf16635dbfb257
author | Matt Johnston <matt@ucc.asn.au> |
---|---|
date | Sat, 25 Mar 2006 12:57:44 +0000 |
parents | eed26cff980b |
children | 5ff8218bcee9 |
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/* Finds Mersenne primes using the Lucas-Lehmer test * * Tom St Denis, [email protected] */ #include <time.h> #include <tommath.h> int is_mersenne (long s, int *pp) { mp_int n, u; int res, k; *pp = 0; if ((res = mp_init (&n)) != MP_OKAY) { return res; } if ((res = mp_init (&u)) != MP_OKAY) { goto LBL_N; } /* n = 2^s - 1 */ if ((res = mp_2expt(&n, s)) != MP_OKAY) { goto LBL_MU; } if ((res = mp_sub_d (&n, 1, &n)) != MP_OKAY) { goto LBL_MU; } /* set u=4 */ mp_set (&u, 4); /* for k=1 to s-2 do */ for (k = 1; k <= s - 2; k++) { /* u = u^2 - 2 mod n */ if ((res = mp_sqr (&u, &u)) != MP_OKAY) { goto LBL_MU; } if ((res = mp_sub_d (&u, 2, &u)) != MP_OKAY) { goto LBL_MU; } /* make sure u is positive */ while (u.sign == MP_NEG) { if ((res = mp_add (&u, &n, &u)) != MP_OKAY) { goto LBL_MU; } } /* reduce */ if ((res = mp_reduce_2k (&u, &n, 1)) != MP_OKAY) { goto LBL_MU; } } /* if u == 0 then its prime */ if (mp_iszero (&u) == 1) { mp_prime_is_prime(&n, 8, pp); if (*pp != 1) printf("FAILURE\n"); } res = MP_OKAY; LBL_MU:mp_clear (&u); LBL_N:mp_clear (&n); return res; } /* square root of a long < 65536 */ long i_sqrt (long x) { long x1, x2; x2 = 16; do { x1 = x2; x2 = x1 - ((x1 * x1) - x) / (2 * x1); } while (x1 != x2); if (x1 * x1 > x) { --x1; } return x1; } /* is the long prime by brute force */ int isprime (long k) { long y, z; y = i_sqrt (k); for (z = 2; z <= y; z++) { if ((k % z) == 0) return 0; } return 1; } int main (void) { int pp; long k; clock_t tt; k = 3; for (;;) { /* start time */ tt = clock (); /* test if 2^k - 1 is prime */ if (is_mersenne (k, &pp) != MP_OKAY) { printf ("Whoa error\n"); return -1; } if (pp == 1) { /* count time */ tt = clock () - tt; /* display if prime */ printf ("2^%-5ld - 1 is prime, test took %ld ticks\n", k, tt); } /* goto next odd exponent */ k += 2; /* but make sure its prime */ while (isprime (k) == 0) { k += 2; } } return 0; }