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openssl/crypto/rsa/rsa_sp800_56b_gen.c
Shane Lontis 952abb1521 Fixed unmatched BN_CTX_start/end if an invalid exponent is used. 
Reviewed-by: Tim Hudson <tjh@openssl.org>
Reviewed-by: Kurt Roeckx <kurt@roeckx.be>
Reviewed-by: Paul Dale <paul.dale@oracle.com>
(Merged from https://github.com/openssl/openssl/pull/8569)
2019-03-29 12:41:43 +10:00

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/*
* Copyright 2018-2019 The OpenSSL Project Authors. All Rights Reserved.
* Copyright (c) 2018-2019, Oracle and/or its affiliates. All rights reserved.
*
* Licensed under the OpenSSL license (the "License"). You may not use
* this file except in compliance with the License. You can obtain a copy
* in the file LICENSE in the source distribution or at
* https://www.openssl.org/source/license.html
*/
#include <openssl/err.h>
#include <openssl/bn.h>
#include "internal/bn_int.h"
#include "rsa_locl.h"
#define RSA_FIPS1864_MIN_KEYGEN_KEYSIZE 2048
#define RSA_FIPS1864_MIN_KEYGEN_STRENGTH 112
#define RSA_FIPS1864_MAX_KEYGEN_STRENGTH 256
/*
* Generate probable primes 'p' & 'q'. See FIPS 186-4 Section B.3.6
* "Generation of Probable Primes with Conditions Based on Auxiliary Probable
* Primes".
*
* Params:
* rsa Object used to store primes p & q.
* p1, p2 The returned auxiliary primes for p. If NULL they are not returned.
* Xpout An optionally returned random number used during generation of p.
* Xp An optional passed in value (that is random number used during
* generation of p).
* Xp1, Xp2 Optionally passed in randomly generated numbers from which
* auxiliary primes p1 & p2 are calculated. If NULL these values
* are generated internally.
* q1, q2 The returned auxiliary primes for q. If NULL they are not returned.
* Xqout An optionally returned random number used during generation of q.
* Xq An optional passed in value (that is random number used during
* generation of q).
* Xq1, Xq2 Optionally passed in randomly generated numbers from which
* auxiliary primes q1 & q2 are calculated. If NULL these values
* are generated internally.
* nbits The key size in bits (The size of the modulus n).
* e The public exponent.
* ctx A BN_CTX object.
* cb An optional BIGNUM callback.
* Returns: 1 if successful, or 0 otherwise.
* Notes:
* p1, p2, q1, q2, Xpout, Xqout are returned if they are not NULL.
* Xp, Xp1, Xp2, Xq, Xq1, Xq2 are optionally passed in.
* (Required for CAVS testing).
*/
int rsa_fips186_4_gen_prob_primes(RSA *rsa, BIGNUM *p1, BIGNUM *p2,
BIGNUM *Xpout, const BIGNUM *Xp,
const BIGNUM *Xp1, const BIGNUM *Xp2,
BIGNUM *q1, BIGNUM *q2, BIGNUM *Xqout,
const BIGNUM *Xq, const BIGNUM *Xq1,
const BIGNUM *Xq2, int nbits,
const BIGNUM *e, BN_CTX *ctx, BN_GENCB *cb)
{
int ret = 0, ok;
BIGNUM *Xpo = NULL, *Xqo = NULL, *tmp = NULL;
/* (Step 1) Check key length
* NOTE: SP800-131A Rev1 Disallows key lengths of < 2048 bits for RSA
* Signature Generation and Key Agree/Transport.
*/
if (nbits < RSA_FIPS1864_MIN_KEYGEN_KEYSIZE) {
RSAerr(RSA_F_RSA_FIPS186_4_GEN_PROB_PRIMES, RSA_R_INVALID_KEY_LENGTH);
return 0;
}
if (!rsa_check_public_exponent(e)) {
RSAerr(RSA_F_RSA_FIPS186_4_GEN_PROB_PRIMES,
RSA_R_PUB_EXPONENT_OUT_OF_RANGE);
return 0;
}
/* (Step 3) Determine strength and check rand generator strength is ok -
* this step is redundant because the generator always returns a higher
* strength than is required.
*/
BN_CTX_start(ctx);
tmp = BN_CTX_get(ctx);
Xpo = (Xpout != NULL) ? Xpout : BN_CTX_get(ctx);
Xqo = (Xqout != NULL) ? Xqout : BN_CTX_get(ctx);
if (tmp == NULL || Xpo == NULL || Xqo == NULL)
goto err;
if (rsa->p == NULL)
rsa->p = BN_secure_new();
if (rsa->q == NULL)
rsa->q = BN_secure_new();
if (rsa->p == NULL || rsa->q == NULL)
goto err;
/* (Step 4) Generate p, Xp */
if (!bn_rsa_fips186_4_gen_prob_primes(rsa->p, Xpo, p1, p2, Xp, Xp1, Xp2,
nbits, e, ctx, cb))
goto err;
for(;;) {
/* (Step 5) Generate q, Xq*/
if (!bn_rsa_fips186_4_gen_prob_primes(rsa->q, Xqo, q1, q2, Xq, Xq1,
Xq2, nbits, e, ctx, cb))
goto err;
/* (Step 6) |Xp - Xq| > 2^(nbitlen/2 - 100) */
ok = rsa_check_pminusq_diff(tmp, Xpo, Xqo, nbits);
if (ok < 0)
goto err;
if (ok == 0)
continue;
/* (Step 6) |p - q| > 2^(nbitlen/2 - 100) */
ok = rsa_check_pminusq_diff(tmp, rsa->p, rsa->q, nbits);
if (ok < 0)
goto err;
if (ok == 0)
continue;
break; /* successfully finished */
}
ret = 1;
err:
/* Zeroize any internally generated values that are not returned */
if (Xpo != Xpout)
BN_clear(Xpo);
if (Xqo != Xqout)
BN_clear(Xqo);
BN_clear(tmp);
BN_CTX_end(ctx);
return ret;
}
/*
* Validates the RSA key size based on the target strength.
* See SP800-56Br1 6.3.1.1 (Steps 1a-1b)
*
* Params:
* nbits The key size in bits.
* strength The target strength in bits. -1 means the target
* strength is unknown.
* Returns: 1 if the key size matches the target strength, or 0 otherwise.
*/
int rsa_sp800_56b_validate_strength(int nbits, int strength)
{
int s = (int)rsa_compute_security_bits(nbits);
if (s < RSA_FIPS1864_MIN_KEYGEN_STRENGTH
|| s > RSA_FIPS1864_MAX_KEYGEN_STRENGTH) {
RSAerr(RSA_F_RSA_SP800_56B_VALIDATE_STRENGTH, RSA_R_INVALID_MODULUS);
return 0;
}
if (strength != -1 && s != strength) {
RSAerr(RSA_F_RSA_SP800_56B_VALIDATE_STRENGTH, RSA_R_INVALID_STRENGTH);
return 0;
}
return 1;
}
/*
*
* Using p & q, calculate other required parameters such as n, d.
* as well as the CRT parameters dP, dQ, qInv.
*
* See SP800-56Br1
* 6.3.1.1 rsakpg1 - basic (Steps 3-4)
* 6.3.1.3 rsakpg1 - crt (Step 5)
*
* Params:
* rsa An rsa object.
* nbits The key size.
* e The public exponent.
* ctx A BN_CTX object.
* Notes:
* There is a small chance that the generated d will be too small.
* Returns: -1 = error,
* 0 = d is too small,
* 1 = success.
*/
int rsa_sp800_56b_derive_params_from_pq(RSA *rsa, int nbits,
const BIGNUM *e, BN_CTX *ctx)
{
int ret = -1;
BIGNUM *p1, *q1, *lcm, *p1q1, *gcd;
BN_CTX_start(ctx);
p1 = BN_CTX_get(ctx);
q1 = BN_CTX_get(ctx);
lcm = BN_CTX_get(ctx);
p1q1 = BN_CTX_get(ctx);
gcd = BN_CTX_get(ctx);
if (gcd == NULL)
goto err;
/* LCM((p-1, q-1)) */
if (rsa_get_lcm(ctx, rsa->p, rsa->q, lcm, gcd, p1, q1, p1q1) != 1)
goto err;
/* copy e */
BN_free(rsa->e);
rsa->e = BN_dup(e);
if (rsa->e == NULL)
goto err;
BN_clear_free(rsa->d);
/* (Step 3) d = (e^-1) mod (LCM(p-1, q-1)) */
rsa->d = BN_secure_new();
if (rsa->d == NULL || BN_mod_inverse(rsa->d, e, lcm, ctx) == NULL)
goto err;
/* (Step 3) return an error if d is too small */
if (BN_num_bits(rsa->d) <= (nbits >> 1)) {
ret = 0;
goto err;
}
/* (Step 4) n = pq */
if (rsa->n == NULL)
rsa->n = BN_new();
if (rsa->n == NULL || !BN_mul(rsa->n, rsa->p, rsa->q, ctx))
goto err;
/* (Step 5a) dP = d mod (p-1) */
if (rsa->dmp1 == NULL)
rsa->dmp1 = BN_new();
if (rsa->dmp1 == NULL || !BN_mod(rsa->dmp1, rsa->d, p1, ctx))
goto err;
/* (Step 5b) dQ = d mod (q-1) */
if (rsa->dmq1 == NULL)
rsa->dmq1 = BN_secure_new();
if (rsa->dmq1 == NULL || !BN_mod(rsa->dmq1, rsa->d, q1, ctx))
goto err;
/* (Step 5c) qInv = (inverse of q) mod p */
BN_free(rsa->iqmp);
rsa->iqmp = BN_secure_new();
if (rsa->iqmp == NULL
|| BN_mod_inverse(rsa->iqmp, rsa->q, rsa->p, ctx) == NULL)
goto err;
ret = 1;
err:
if (ret != 1) {
BN_free(rsa->e);
rsa->e = NULL;
BN_free(rsa->d);
rsa->d = NULL;
BN_free(rsa->n);
rsa->n = NULL;
BN_free(rsa->iqmp);
rsa->iqmp = NULL;
BN_free(rsa->dmq1);
rsa->dmq1 = NULL;
BN_free(rsa->dmp1);
rsa->dmp1 = NULL;
}
BN_clear(p1);
BN_clear(q1);
BN_clear(lcm);
BN_clear(p1q1);
BN_clear(gcd);
BN_CTX_end(ctx);
return ret;
}
/*
* Generate a SP800-56B RSA key.
*
* See SP800-56Br1 6.3.1 "RSA Key-Pair Generation with a Fixed Public Exponent"
* 6.3.1.1 rsakpg1 - basic
* 6.3.1.3 rsakpg1 - crt
*
* See also FIPS 186-4 Section B.3.6
* "Generation of Probable Primes with Conditions Based on Auxiliary
* Probable Primes."
*
* Params:
* rsa The rsa object.
* nbits The intended key size in bits.
* efixed The public exponent. If NULL a default of 65537 is used.
* cb An optional BIGNUM callback.
* Returns: 1 if successfully generated otherwise it returns 0.
*/
int rsa_sp800_56b_generate_key(RSA *rsa, int nbits, const BIGNUM *efixed,
BN_GENCB *cb)
{
int ret = 0;
int ok;
BN_CTX *ctx = NULL;
BIGNUM *e = NULL;
/* (Steps 1a-1b) : Currently ignores the strength check */
if (!rsa_sp800_56b_validate_strength(nbits, -1))
return 0;
ctx = BN_CTX_new();
if (ctx == NULL)
return 0;
/* Set default if e is not passed in */
if (efixed == NULL) {
e = BN_new();
if (e == NULL || !BN_set_word(e, 65537))
goto err;
} else {
e = (BIGNUM *)efixed;
}
/* (Step 1c) fixed exponent is checked later . */
for (;;) {
/* (Step 2) Generate prime factors */
if (!rsa_fips186_4_gen_prob_primes(rsa, NULL, NULL, NULL, NULL, NULL,
NULL, NULL, NULL, NULL, NULL, NULL,
NULL, nbits, e, ctx, cb))
goto err;
/* (Steps 3-5) Compute params d, n, dP, dQ, qInv */
ok = rsa_sp800_56b_derive_params_from_pq(rsa, nbits, e, ctx);
if (ok < 0)
goto err;
if (ok > 0)
break;
/* Gets here if computed d is too small - so try again */
}
/* (Step 6) Do pairwise test - optional validity test has been omitted */
ret = rsa_sp800_56b_pairwise_test(rsa, ctx);
err:
if (efixed == NULL)
BN_free(e);
BN_CTX_free(ctx);
return ret;
}
/*
* See SP800-56Br1 6.3.1.3 (Step 6) Perform a pair-wise consistency test by
* verifying that: k = (k^e)^d mod n for some integer k where 1 < k < n-1.
*
* Returns 1 if the RSA key passes the pairwise test or 0 it it fails.
*/
int rsa_sp800_56b_pairwise_test(RSA *rsa, BN_CTX *ctx)
{
int ret = 0;
BIGNUM *k, *tmp;
BN_CTX_start(ctx);
tmp = BN_CTX_get(ctx);
k = BN_CTX_get(ctx);
if (k == NULL)
goto err;
ret = (BN_set_word(k, 2)
&& BN_mod_exp(tmp, k, rsa->e, rsa->n, ctx)
&& BN_mod_exp(tmp, tmp, rsa->d, rsa->n, ctx)
&& BN_cmp(k, tmp) == 0);
if (ret == 0)
RSAerr(RSA_F_RSA_SP800_56B_PAIRWISE_TEST, RSA_R_PAIRWISE_TEST_FAILURE);
err:
BN_CTX_end(ctx);
return ret;
}
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