/* PRIME.C - primality-testing routines */ /* Copyright (C) 1991-2 RSA Laboratories, a division of RSA Data Security, Inc. All rights reserved. */ #include "global.h" #include "rsaref.h" #include "nn.h" #include "prime.h" static unsigned int SMALL_PRIMES[] = { 3, 5, 7, 11 }; #define SMALL_PRIME_COUNT 4 static int RSAPrime PROTO_LIST ((NN_DIGIT *, unsigned int, NN_DIGIT *, unsigned int)); static int ProbablePrime PROTO_LIST ((NN_DIGIT *, unsigned int)); static int SmallFactor PROTO_LIST ((NN_DIGIT *, unsigned int)); static int FermatTest PROTO_LIST ((NN_DIGIT *, unsigned int)); static int RelativelyPrime PROTO_LIST ((NN_DIGIT *, unsigned int, NN_DIGIT *, unsigned int)); /* Find a probable prime a between 3*2^(b-2) and 2^b-1, starting at 3*2^(b-2) + (c mod 2^(b-2)), such that gcd (a-1, d) = 1. Lengths: a[cDigits], c[cDigits], d[dDigits]. Assumes b > 2, b < cDigits * NN_DIGIT_BITS, d is odd, cDigits < MAX_NN_DIGITS, dDigits < MAX_NN_DIGITS, and a probable prime can be found. */ void FindRSAPrime (a, b, c, cDigits, d, dDigits) NN_DIGIT *a, *c, *d; unsigned int b, cDigits, dDigits; { NN_DIGIT t[MAX_NN_DIGITS], u[MAX_NN_DIGITS], v[MAX_NN_DIGITS], w[MAX_NN_DIGITS]; /* Compute t = 2^(b-2), u = 3*2^(b-2). */ NN_Assign2Exp (t, b-2, cDigits); NN_Assign2Exp (u, b-1, cDigits); NN_Add (u, u, t, cDigits); /* Compute v = 3*2^(b-2) + (c mod 2^(b-2)); add one if even. */ NN_Mod (v, c, cDigits, t, cDigits); NN_Add (v, v, u, cDigits); if (NN_EVEN (v, cDigits)) { NN_ASSIGN_DIGIT (w, 1, cDigits); NN_Add (v, v, w, cDigits); } /* Compute w = 2, u = 2^b - 2. */ NN_ASSIGN_DIGIT (w, 2, cDigits); NN_Sub (u, u, w, cDigits); NN_Add (u, u, t, cDigits); /* Search to 2^b-1 from starting point, then from 3*2^(b-2)+1. */ while (! RSAPrime (v, cDigits, d, dDigits)) { if (NN_Cmp (v, u, cDigits) > 0) NN_Sub (v, v, t, cDigits); NN_Add (v, v, w, cDigits); } NN_Assign (a, v, cDigits); /* Zeroize sensitive information. */ R_memset ((POINTER)v, 0, sizeof (v)); } /* Returns nonzero iff a is a probable prime and GCD (a-1, b) = 1. Lengths: a[aDigits], b[bDigits]. Assumes aDigits < MAX_NN_DIGITS, bDigits < MAX_NN_DIGITS. */ static int RSAPrime (a, aDigits, b, bDigits) NN_DIGIT *a, *b; unsigned int aDigits, bDigits; { int status; NN_DIGIT aMinus1[MAX_NN_DIGITS], t[MAX_NN_DIGITS]; NN_ASSIGN_DIGIT (t, 1, aDigits); NN_Sub (aMinus1, a, t, aDigits); status = ProbablePrime (a, aDigits) && RelativelyPrime (aMinus1, aDigits, b, bDigits); /* Zeroize sensitive information. */ R_memset ((POINTER)aMinus1, 0, sizeof (aMinus1)); return (status); } /* Returns nonzero iff a is a probable prime. Lengths: a[aDigits]. Assumes aDigits < MAX_NN_DIGITS. */ static int ProbablePrime (a, aDigits) NN_DIGIT *a; unsigned int aDigits; { return (! SmallFactor (a, aDigits) && FermatTest (a, aDigits)); } /* Returns nonzero iff a has a prime factor in SMALL_PRIMES. Lengths: a[aDigits]. Assumes aDigits < MAX_NN_DIGITS. */ static int SmallFactor (a, aDigits) NN_DIGIT *a; unsigned int aDigits; { int status; NN_DIGIT t[1]; unsigned int i; status = 0; for (i = 0; i < SMALL_PRIME_COUNT; i++) { NN_ASSIGN_DIGIT (t, SMALL_PRIMES[i], 1); NN_Mod (t, a, aDigits, t, 1); if (NN_Zero (t, 1)) { status = 1; break; } } /* Zeroize sensitive information. */ i = 0; R_memset ((POINTER)t, 0, sizeof (t)); return (status); } /* Returns nonzero iff a passes Fermat's test for witness 2. (All primes pass the test, and nearly all composites fail.) Lengths: a[aDigits]. Assumes aDigits < MAX_NN_DIGITS. */ static int FermatTest (a, aDigits) NN_DIGIT *a; unsigned int aDigits; { int status; NN_DIGIT t[MAX_NN_DIGITS], u[MAX_NN_DIGITS]; NN_ASSIGN_DIGIT (t, 2, aDigits); NN_ModExp (u, t, a, aDigits, a, aDigits); status = NN_EQUAL (t, u, aDigits); /* Zeroize sensitive information. */ R_memset ((POINTER)u, 0, sizeof (u)); return (status); } /* Returns nonzero iff a and b are relatively prime. Lengths: a[aDigits], b[bDigits]. Assumes aDigits >= bDigits, aDigits < MAX_NN_DIGITS. */ static int RelativelyPrime (a, aDigits, b, bDigits) NN_DIGIT *a, *b; unsigned int aDigits, bDigits; { int status; NN_DIGIT t[MAX_NN_DIGITS], u[MAX_NN_DIGITS]; NN_AssignZero (t, aDigits); NN_Assign (t, b, bDigits); NN_Gcd (t, a, t, aDigits); NN_ASSIGN_DIGIT (u, 1, aDigits); status = NN_EQUAL (t, u, aDigits); /* Zeroize sensitive information. */ R_memset ((POINTER)t, 0, sizeof (t)); return (status); }