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f388f3 |
diff -up openssl-1.0.2k/crypto/bn/bn_sqrt.c.cve_2022_0778 openssl-1.0.2k/crypto/bn/bn_sqrt.c
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f388f3 |
--- openssl-1.0.2k/crypto/bn/bn_sqrt.c.cve_2022_0778 2022-03-23 11:23:25.900783626 +0100
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f388f3 |
+++ openssl-1.0.2k/crypto/bn/bn_sqrt.c 2022-03-23 11:27:14.447109005 +0100
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@@ -64,7 +64,8 @@ BIGNUM *BN_mod_sqrt(BIGNUM *in, const BI
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f388f3 |
/*
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* Returns 'ret' such that ret^2 == a (mod p), using the Tonelli/Shanks
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* algorithm (cf. Henri Cohen, "A Course in Algebraic Computational Number
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- * Theory", algorithm 1.5.1). 'p' must be prime!
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+ * Theory", algorithm 1.5.1). 'p' must be prime, otherwise an error or
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+ * an incorrect "result" will be returned.
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f388f3 |
*/
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{
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BIGNUM *ret = in;
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@@ -350,18 +351,23 @@ BIGNUM *BN_mod_sqrt(BIGNUM *in, const BI
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goto vrfy;
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}
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- /* find smallest i such that b^(2^i) = 1 */
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- i = 1;
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- if (!BN_mod_sqr(t, b, p, ctx))
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- goto end;
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- while (!BN_is_one(t)) {
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- i++;
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- if (i == e) {
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- BNerr(BN_F_BN_MOD_SQRT, BN_R_NOT_A_SQUARE);
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- goto end;
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+ /* Find the smallest i, 0 < i < e, such that b^(2^i) = 1. */
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+ for (i = 1; i < e; i++) {
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+ if (i == 1) {
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f388f3 |
+ if (!BN_mod_sqr(t, b, p, ctx))
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f388f3 |
+ goto end;
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f388f3 |
+
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+ } else {
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+ if (!BN_mod_mul(t, t, t, p, ctx))
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+ goto end;
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}
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- if (!BN_mod_mul(t, t, t, p, ctx))
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- goto end;
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+ if (BN_is_one(t))
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+ break;
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f388f3 |
+ }
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+ /* If not found, a is not a square or p is not prime. */
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+ if (i >= e) {
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+ BNerr(BN_F_BN_MOD_SQRT, BN_R_NOT_A_SQUARE);
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+ goto end;
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f388f3 |
}
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f388f3 |
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f388f3 |
/* t := y^2^(e - i - 1) */
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