зеркало из https://github.com/github/putty.git
1105 строки
28 KiB
C
1105 строки
28 KiB
C
/*
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* RSA implementation for PuTTY.
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*/
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#include <stdio.h>
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#include <stdlib.h>
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#include <string.h>
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#include <assert.h>
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#include "ssh.h"
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#include "misc.h"
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int makekey(unsigned char *data, int len, struct RSAKey *result,
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unsigned char **keystr, int order)
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{
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unsigned char *p = data;
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int i, n;
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if (len < 4)
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return -1;
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if (result) {
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result->bits = 0;
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for (i = 0; i < 4; i++)
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result->bits = (result->bits << 8) + *p++;
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} else
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p += 4;
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len -= 4;
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/*
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* order=0 means exponent then modulus (the keys sent by the
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* server). order=1 means modulus then exponent (the keys
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* stored in a keyfile).
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*/
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if (order == 0) {
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n = ssh1_read_bignum(p, len, result ? &result->exponent : NULL);
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if (n < 0) return -1;
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p += n;
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len -= n;
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}
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n = ssh1_read_bignum(p, len, result ? &result->modulus : NULL);
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if (n < 0 || (result && bignum_bitcount(result->modulus) == 0)) return -1;
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if (result)
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result->bytes = n - 2;
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if (keystr)
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*keystr = p + 2;
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p += n;
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len -= n;
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if (order == 1) {
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n = ssh1_read_bignum(p, len, result ? &result->exponent : NULL);
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if (n < 0) return -1;
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p += n;
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len -= n;
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}
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return p - data;
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}
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int makeprivate(unsigned char *data, int len, struct RSAKey *result)
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{
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return ssh1_read_bignum(data, len, &result->private_exponent);
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}
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int rsaencrypt(unsigned char *data, int length, struct RSAKey *key)
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{
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Bignum b1, b2;
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int i;
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unsigned char *p;
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if (key->bytes < length + 4)
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return 0; /* RSA key too short! */
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memmove(data + key->bytes - length, data, length);
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data[0] = 0;
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data[1] = 2;
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for (i = 2; i < key->bytes - length - 1; i++) {
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do {
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data[i] = random_byte();
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} while (data[i] == 0);
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}
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data[key->bytes - length - 1] = 0;
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b1 = bignum_from_bytes(data, key->bytes);
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b2 = modpow(b1, key->exponent, key->modulus);
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p = data;
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for (i = key->bytes; i--;) {
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*p++ = bignum_byte(b2, i);
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}
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freebn(b1);
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freebn(b2);
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return 1;
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}
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static void sha512_mpint(SHA512_State * s, Bignum b)
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{
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unsigned char lenbuf[4];
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int len;
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len = (bignum_bitcount(b) + 8) / 8;
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PUT_32BIT(lenbuf, len);
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SHA512_Bytes(s, lenbuf, 4);
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while (len-- > 0) {
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lenbuf[0] = bignum_byte(b, len);
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SHA512_Bytes(s, lenbuf, 1);
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}
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smemclr(lenbuf, sizeof(lenbuf));
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}
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/*
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* Compute (base ^ exp) % mod, provided mod == p * q, with p,q
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* distinct primes, and iqmp is the multiplicative inverse of q mod p.
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* Uses Chinese Remainder Theorem to speed computation up over the
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* obvious implementation of a single big modpow.
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*/
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Bignum crt_modpow(Bignum base, Bignum exp, Bignum mod,
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Bignum p, Bignum q, Bignum iqmp)
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{
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Bignum pm1, qm1, pexp, qexp, presult, qresult, diff, multiplier, ret0, ret;
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/*
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* Reduce the exponent mod phi(p) and phi(q), to save time when
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* exponentiating mod p and mod q respectively. Of course, since p
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* and q are prime, phi(p) == p-1 and similarly for q.
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*/
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pm1 = copybn(p);
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decbn(pm1);
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qm1 = copybn(q);
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decbn(qm1);
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pexp = bigmod(exp, pm1);
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qexp = bigmod(exp, qm1);
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/*
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* Do the two modpows.
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*/
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presult = modpow(base, pexp, p);
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qresult = modpow(base, qexp, q);
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/*
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* Recombine the results. We want a value which is congruent to
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* qresult mod q, and to presult mod p.
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*
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* We know that iqmp * q is congruent to 1 * mod p (by definition
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* of iqmp) and to 0 mod q (obviously). So we start with qresult
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* (which is congruent to qresult mod both primes), and add on
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* (presult-qresult) * (iqmp * q) which adjusts it to be congruent
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* to presult mod p without affecting its value mod q.
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*/
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if (bignum_cmp(presult, qresult) < 0) {
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/*
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* Can't subtract presult from qresult without first adding on
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* p.
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*/
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Bignum tmp = presult;
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presult = bigadd(presult, p);
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freebn(tmp);
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}
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diff = bigsub(presult, qresult);
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multiplier = bigmul(iqmp, q);
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ret0 = bigmuladd(multiplier, diff, qresult);
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/*
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* Finally, reduce the result mod n.
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*/
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ret = bigmod(ret0, mod);
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/*
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* Free all the intermediate results before returning.
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*/
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freebn(pm1);
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freebn(qm1);
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freebn(pexp);
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freebn(qexp);
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freebn(presult);
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freebn(qresult);
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freebn(diff);
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freebn(multiplier);
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freebn(ret0);
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return ret;
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}
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/*
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* This function is a wrapper on modpow(). It has the same effect as
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* modpow(), but employs RSA blinding to protect against timing
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* attacks and also uses the Chinese Remainder Theorem (implemented
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* above, in crt_modpow()) to speed up the main operation.
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*/
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static Bignum rsa_privkey_op(Bignum input, struct RSAKey *key)
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{
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Bignum random, random_encrypted, random_inverse;
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Bignum input_blinded, ret_blinded;
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Bignum ret;
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SHA512_State ss;
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unsigned char digest512[64];
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int digestused = lenof(digest512);
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int hashseq = 0;
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/*
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* Start by inventing a random number chosen uniformly from the
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* range 2..modulus-1. (We do this by preparing a random number
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* of the right length and retrying if it's greater than the
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* modulus, to prevent any potential Bleichenbacher-like
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* attacks making use of the uneven distribution within the
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* range that would arise from just reducing our number mod n.
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* There are timing implications to the potential retries, of
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* course, but all they tell you is the modulus, which you
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* already knew.)
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*
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* To preserve determinism and avoid Pageant needing to share
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* the random number pool, we actually generate this `random'
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* number by hashing stuff with the private key.
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*/
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while (1) {
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int bits, byte, bitsleft, v;
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random = copybn(key->modulus);
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/*
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* Find the topmost set bit. (This function will return its
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* index plus one.) Then we'll set all bits from that one
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* downwards randomly.
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*/
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bits = bignum_bitcount(random);
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byte = 0;
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bitsleft = 0;
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while (bits--) {
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if (bitsleft <= 0) {
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bitsleft = 8;
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/*
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* Conceptually the following few lines are equivalent to
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* byte = random_byte();
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*/
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if (digestused >= lenof(digest512)) {
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unsigned char seqbuf[4];
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PUT_32BIT(seqbuf, hashseq);
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SHA512_Init(&ss);
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SHA512_Bytes(&ss, "RSA deterministic blinding", 26);
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SHA512_Bytes(&ss, seqbuf, sizeof(seqbuf));
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sha512_mpint(&ss, key->private_exponent);
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SHA512_Final(&ss, digest512);
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hashseq++;
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/*
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* Now hash that digest plus the signature
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* input.
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*/
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SHA512_Init(&ss);
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SHA512_Bytes(&ss, digest512, sizeof(digest512));
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sha512_mpint(&ss, input);
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SHA512_Final(&ss, digest512);
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digestused = 0;
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}
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byte = digest512[digestused++];
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}
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v = byte & 1;
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byte >>= 1;
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bitsleft--;
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bignum_set_bit(random, bits, v);
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}
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/*
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* Now check that this number is strictly greater than
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* zero, and strictly less than modulus.
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*/
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if (bignum_cmp(random, Zero) <= 0 ||
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bignum_cmp(random, key->modulus) >= 0) {
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freebn(random);
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continue;
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}
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/*
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* Also, make sure it has an inverse mod modulus.
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*/
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random_inverse = modinv(random, key->modulus);
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if (!random_inverse) {
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freebn(random);
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continue;
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}
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break;
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}
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/*
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* RSA blinding relies on the fact that (xy)^d mod n is equal
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* to (x^d mod n) * (y^d mod n) mod n. We invent a random pair
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* y and y^d; then we multiply x by y, raise to the power d mod
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* n as usual, and divide by y^d to recover x^d. Thus an
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* attacker can't correlate the timing of the modpow with the
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* input, because they don't know anything about the number
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* that was input to the actual modpow.
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*
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* The clever bit is that we don't have to do a huge modpow to
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* get y and y^d; we will use the number we just invented as
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* _y^d_, and use the _public_ exponent to compute (y^d)^e = y
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* from it, which is much faster to do.
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*/
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random_encrypted = crt_modpow(random, key->exponent,
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key->modulus, key->p, key->q, key->iqmp);
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input_blinded = modmul(input, random_encrypted, key->modulus);
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ret_blinded = crt_modpow(input_blinded, key->private_exponent,
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key->modulus, key->p, key->q, key->iqmp);
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ret = modmul(ret_blinded, random_inverse, key->modulus);
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freebn(ret_blinded);
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freebn(input_blinded);
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freebn(random_inverse);
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freebn(random_encrypted);
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freebn(random);
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return ret;
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}
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Bignum rsadecrypt(Bignum input, struct RSAKey *key)
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{
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return rsa_privkey_op(input, key);
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}
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int rsastr_len(struct RSAKey *key)
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{
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Bignum md, ex;
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int mdlen, exlen;
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md = key->modulus;
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ex = key->exponent;
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mdlen = (bignum_bitcount(md) + 15) / 16;
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exlen = (bignum_bitcount(ex) + 15) / 16;
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return 4 * (mdlen + exlen) + 20;
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}
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void rsastr_fmt(char *str, struct RSAKey *key)
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{
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Bignum md, ex;
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int len = 0, i, nibbles;
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static const char hex[] = "0123456789abcdef";
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md = key->modulus;
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ex = key->exponent;
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len += sprintf(str + len, "0x");
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nibbles = (3 + bignum_bitcount(ex)) / 4;
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if (nibbles < 1)
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nibbles = 1;
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for (i = nibbles; i--;)
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str[len++] = hex[(bignum_byte(ex, i / 2) >> (4 * (i % 2))) & 0xF];
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len += sprintf(str + len, ",0x");
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nibbles = (3 + bignum_bitcount(md)) / 4;
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if (nibbles < 1)
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nibbles = 1;
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for (i = nibbles; i--;)
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str[len++] = hex[(bignum_byte(md, i / 2) >> (4 * (i % 2))) & 0xF];
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str[len] = '\0';
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}
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/*
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* Generate a fingerprint string for the key. Compatible with the
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* OpenSSH fingerprint code.
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*/
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void rsa_fingerprint(char *str, int len, struct RSAKey *key)
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{
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struct MD5Context md5c;
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unsigned char digest[16];
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char buffer[16 * 3 + 40];
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int numlen, slen, i;
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MD5Init(&md5c);
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numlen = ssh1_bignum_length(key->modulus) - 2;
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for (i = numlen; i--;) {
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unsigned char c = bignum_byte(key->modulus, i);
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MD5Update(&md5c, &c, 1);
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}
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numlen = ssh1_bignum_length(key->exponent) - 2;
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for (i = numlen; i--;) {
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unsigned char c = bignum_byte(key->exponent, i);
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MD5Update(&md5c, &c, 1);
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}
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MD5Final(digest, &md5c);
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sprintf(buffer, "%d ", bignum_bitcount(key->modulus));
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for (i = 0; i < 16; i++)
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sprintf(buffer + strlen(buffer), "%s%02x", i ? ":" : "",
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digest[i]);
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strncpy(str, buffer, len);
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str[len - 1] = '\0';
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slen = strlen(str);
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if (key->comment && slen < len - 1) {
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str[slen] = ' ';
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strncpy(str + slen + 1, key->comment, len - slen - 1);
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str[len - 1] = '\0';
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}
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}
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/*
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* Verify that the public data in an RSA key matches the private
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* data. We also check the private data itself: we ensure that p >
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* q and that iqmp really is the inverse of q mod p.
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*/
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int rsa_verify(struct RSAKey *key)
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{
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Bignum n, ed, pm1, qm1;
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int cmp;
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/* n must equal pq. */
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n = bigmul(key->p, key->q);
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cmp = bignum_cmp(n, key->modulus);
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freebn(n);
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if (cmp != 0)
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return 0;
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/* e * d must be congruent to 1, modulo (p-1) and modulo (q-1). */
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pm1 = copybn(key->p);
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decbn(pm1);
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ed = modmul(key->exponent, key->private_exponent, pm1);
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freebn(pm1);
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cmp = bignum_cmp(ed, One);
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freebn(ed);
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if (cmp != 0)
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return 0;
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qm1 = copybn(key->q);
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decbn(qm1);
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ed = modmul(key->exponent, key->private_exponent, qm1);
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freebn(qm1);
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cmp = bignum_cmp(ed, One);
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freebn(ed);
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if (cmp != 0)
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return 0;
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/*
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* Ensure p > q.
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*
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* I have seen key blobs in the wild which were generated with
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* p < q, so instead of rejecting the key in this case we
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* should instead flip them round into the canonical order of
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* p > q. This also involves regenerating iqmp.
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*/
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if (bignum_cmp(key->p, key->q) <= 0) {
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Bignum tmp = key->p;
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key->p = key->q;
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key->q = tmp;
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freebn(key->iqmp);
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key->iqmp = modinv(key->q, key->p);
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if (!key->iqmp)
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return 0;
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}
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/*
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* Ensure iqmp * q is congruent to 1, modulo p.
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*/
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n = modmul(key->iqmp, key->q, key->p);
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cmp = bignum_cmp(n, One);
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freebn(n);
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if (cmp != 0)
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return 0;
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return 1;
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}
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/* Public key blob as used by Pageant: exponent before modulus. */
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unsigned char *rsa_public_blob(struct RSAKey *key, int *len)
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{
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int length, pos;
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unsigned char *ret;
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length = (ssh1_bignum_length(key->modulus) +
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ssh1_bignum_length(key->exponent) + 4);
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ret = snewn(length, unsigned char);
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PUT_32BIT(ret, bignum_bitcount(key->modulus));
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pos = 4;
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pos += ssh1_write_bignum(ret + pos, key->exponent);
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pos += ssh1_write_bignum(ret + pos, key->modulus);
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*len = length;
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return ret;
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}
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/* Given a public blob, determine its length. */
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int rsa_public_blob_len(void *data, int maxlen)
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{
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unsigned char *p = (unsigned char *)data;
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int n;
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if (maxlen < 4)
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return -1;
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p += 4; /* length word */
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maxlen -= 4;
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n = ssh1_read_bignum(p, maxlen, NULL); /* exponent */
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if (n < 0)
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return -1;
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p += n;
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n = ssh1_read_bignum(p, maxlen, NULL); /* modulus */
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if (n < 0)
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return -1;
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p += n;
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return p - (unsigned char *)data;
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}
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void freersakey(struct RSAKey *key)
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{
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if (key->modulus)
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freebn(key->modulus);
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if (key->exponent)
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freebn(key->exponent);
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if (key->private_exponent)
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freebn(key->private_exponent);
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if (key->p)
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freebn(key->p);
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if (key->q)
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freebn(key->q);
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if (key->iqmp)
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|
freebn(key->iqmp);
|
|
if (key->comment)
|
|
sfree(key->comment);
|
|
}
|
|
|
|
/* ----------------------------------------------------------------------
|
|
* Implementation of the ssh-rsa signing key type.
|
|
*/
|
|
|
|
static void getstring(char **data, int *datalen, char **p, int *length)
|
|
{
|
|
*p = NULL;
|
|
if (*datalen < 4)
|
|
return;
|
|
*length = toint(GET_32BIT(*data));
|
|
if (*length < 0)
|
|
return;
|
|
*datalen -= 4;
|
|
*data += 4;
|
|
if (*datalen < *length)
|
|
return;
|
|
*p = *data;
|
|
*data += *length;
|
|
*datalen -= *length;
|
|
}
|
|
static Bignum getmp(char **data, int *datalen)
|
|
{
|
|
char *p;
|
|
int length;
|
|
Bignum b;
|
|
|
|
getstring(data, datalen, &p, &length);
|
|
if (!p)
|
|
return NULL;
|
|
b = bignum_from_bytes((unsigned char *)p, length);
|
|
return b;
|
|
}
|
|
|
|
static void rsa2_freekey(void *key); /* forward reference */
|
|
|
|
static void *rsa2_newkey(char *data, int len)
|
|
{
|
|
char *p;
|
|
int slen;
|
|
struct RSAKey *rsa;
|
|
|
|
rsa = snew(struct RSAKey);
|
|
getstring(&data, &len, &p, &slen);
|
|
|
|
if (!p || slen != 7 || memcmp(p, "ssh-rsa", 7)) {
|
|
sfree(rsa);
|
|
return NULL;
|
|
}
|
|
rsa->exponent = getmp(&data, &len);
|
|
rsa->modulus = getmp(&data, &len);
|
|
rsa->private_exponent = NULL;
|
|
rsa->p = rsa->q = rsa->iqmp = NULL;
|
|
rsa->comment = NULL;
|
|
|
|
if (!rsa->exponent || !rsa->modulus) {
|
|
rsa2_freekey(rsa);
|
|
return NULL;
|
|
}
|
|
|
|
return rsa;
|
|
}
|
|
|
|
static void rsa2_freekey(void *key)
|
|
{
|
|
struct RSAKey *rsa = (struct RSAKey *) key;
|
|
freersakey(rsa);
|
|
sfree(rsa);
|
|
}
|
|
|
|
static char *rsa2_fmtkey(void *key)
|
|
{
|
|
struct RSAKey *rsa = (struct RSAKey *) key;
|
|
char *p;
|
|
int len;
|
|
|
|
len = rsastr_len(rsa);
|
|
p = snewn(len, char);
|
|
rsastr_fmt(p, rsa);
|
|
return p;
|
|
}
|
|
|
|
static unsigned char *rsa2_public_blob(void *key, int *len)
|
|
{
|
|
struct RSAKey *rsa = (struct RSAKey *) key;
|
|
int elen, mlen, bloblen;
|
|
int i;
|
|
unsigned char *blob, *p;
|
|
|
|
elen = (bignum_bitcount(rsa->exponent) + 8) / 8;
|
|
mlen = (bignum_bitcount(rsa->modulus) + 8) / 8;
|
|
|
|
/*
|
|
* string "ssh-rsa", mpint exp, mpint mod. Total 19+elen+mlen.
|
|
* (three length fields, 12+7=19).
|
|
*/
|
|
bloblen = 19 + elen + mlen;
|
|
blob = snewn(bloblen, unsigned char);
|
|
p = blob;
|
|
PUT_32BIT(p, 7);
|
|
p += 4;
|
|
memcpy(p, "ssh-rsa", 7);
|
|
p += 7;
|
|
PUT_32BIT(p, elen);
|
|
p += 4;
|
|
for (i = elen; i--;)
|
|
*p++ = bignum_byte(rsa->exponent, i);
|
|
PUT_32BIT(p, mlen);
|
|
p += 4;
|
|
for (i = mlen; i--;)
|
|
*p++ = bignum_byte(rsa->modulus, i);
|
|
assert(p == blob + bloblen);
|
|
*len = bloblen;
|
|
return blob;
|
|
}
|
|
|
|
static unsigned char *rsa2_private_blob(void *key, int *len)
|
|
{
|
|
struct RSAKey *rsa = (struct RSAKey *) key;
|
|
int dlen, plen, qlen, ulen, bloblen;
|
|
int i;
|
|
unsigned char *blob, *p;
|
|
|
|
dlen = (bignum_bitcount(rsa->private_exponent) + 8) / 8;
|
|
plen = (bignum_bitcount(rsa->p) + 8) / 8;
|
|
qlen = (bignum_bitcount(rsa->q) + 8) / 8;
|
|
ulen = (bignum_bitcount(rsa->iqmp) + 8) / 8;
|
|
|
|
/*
|
|
* mpint private_exp, mpint p, mpint q, mpint iqmp. Total 16 +
|
|
* sum of lengths.
|
|
*/
|
|
bloblen = 16 + dlen + plen + qlen + ulen;
|
|
blob = snewn(bloblen, unsigned char);
|
|
p = blob;
|
|
PUT_32BIT(p, dlen);
|
|
p += 4;
|
|
for (i = dlen; i--;)
|
|
*p++ = bignum_byte(rsa->private_exponent, i);
|
|
PUT_32BIT(p, plen);
|
|
p += 4;
|
|
for (i = plen; i--;)
|
|
*p++ = bignum_byte(rsa->p, i);
|
|
PUT_32BIT(p, qlen);
|
|
p += 4;
|
|
for (i = qlen; i--;)
|
|
*p++ = bignum_byte(rsa->q, i);
|
|
PUT_32BIT(p, ulen);
|
|
p += 4;
|
|
for (i = ulen; i--;)
|
|
*p++ = bignum_byte(rsa->iqmp, i);
|
|
assert(p == blob + bloblen);
|
|
*len = bloblen;
|
|
return blob;
|
|
}
|
|
|
|
static void *rsa2_createkey(unsigned char *pub_blob, int pub_len,
|
|
unsigned char *priv_blob, int priv_len)
|
|
{
|
|
struct RSAKey *rsa;
|
|
char *pb = (char *) priv_blob;
|
|
|
|
rsa = rsa2_newkey((char *) pub_blob, pub_len);
|
|
rsa->private_exponent = getmp(&pb, &priv_len);
|
|
rsa->p = getmp(&pb, &priv_len);
|
|
rsa->q = getmp(&pb, &priv_len);
|
|
rsa->iqmp = getmp(&pb, &priv_len);
|
|
|
|
if (!rsa_verify(rsa)) {
|
|
rsa2_freekey(rsa);
|
|
return NULL;
|
|
}
|
|
|
|
return rsa;
|
|
}
|
|
|
|
static void *rsa2_openssh_createkey(unsigned char **blob, int *len)
|
|
{
|
|
char **b = (char **) blob;
|
|
struct RSAKey *rsa;
|
|
|
|
rsa = snew(struct RSAKey);
|
|
rsa->comment = NULL;
|
|
|
|
rsa->modulus = getmp(b, len);
|
|
rsa->exponent = getmp(b, len);
|
|
rsa->private_exponent = getmp(b, len);
|
|
rsa->iqmp = getmp(b, len);
|
|
rsa->p = getmp(b, len);
|
|
rsa->q = getmp(b, len);
|
|
|
|
if (!rsa->modulus || !rsa->exponent || !rsa->private_exponent ||
|
|
!rsa->iqmp || !rsa->p || !rsa->q) {
|
|
rsa2_freekey(rsa);
|
|
return NULL;
|
|
}
|
|
|
|
if (!rsa_verify(rsa)) {
|
|
rsa2_freekey(rsa);
|
|
return NULL;
|
|
}
|
|
|
|
return rsa;
|
|
}
|
|
|
|
static int rsa2_openssh_fmtkey(void *key, unsigned char *blob, int len)
|
|
{
|
|
struct RSAKey *rsa = (struct RSAKey *) key;
|
|
int bloblen, i;
|
|
|
|
bloblen =
|
|
ssh2_bignum_length(rsa->modulus) +
|
|
ssh2_bignum_length(rsa->exponent) +
|
|
ssh2_bignum_length(rsa->private_exponent) +
|
|
ssh2_bignum_length(rsa->iqmp) +
|
|
ssh2_bignum_length(rsa->p) + ssh2_bignum_length(rsa->q);
|
|
|
|
if (bloblen > len)
|
|
return bloblen;
|
|
|
|
bloblen = 0;
|
|
#define ENC(x) \
|
|
PUT_32BIT(blob+bloblen, ssh2_bignum_length((x))-4); bloblen += 4; \
|
|
for (i = ssh2_bignum_length((x))-4; i-- ;) blob[bloblen++]=bignum_byte((x),i);
|
|
ENC(rsa->modulus);
|
|
ENC(rsa->exponent);
|
|
ENC(rsa->private_exponent);
|
|
ENC(rsa->iqmp);
|
|
ENC(rsa->p);
|
|
ENC(rsa->q);
|
|
|
|
return bloblen;
|
|
}
|
|
|
|
static int rsa2_pubkey_bits(void *blob, int len)
|
|
{
|
|
struct RSAKey *rsa;
|
|
int ret;
|
|
|
|
rsa = rsa2_newkey((char *) blob, len);
|
|
ret = bignum_bitcount(rsa->modulus);
|
|
rsa2_freekey(rsa);
|
|
|
|
return ret;
|
|
}
|
|
|
|
static char *rsa2_fingerprint(void *key)
|
|
{
|
|
struct RSAKey *rsa = (struct RSAKey *) key;
|
|
struct MD5Context md5c;
|
|
unsigned char digest[16], lenbuf[4];
|
|
char buffer[16 * 3 + 40];
|
|
char *ret;
|
|
int numlen, i;
|
|
|
|
MD5Init(&md5c);
|
|
MD5Update(&md5c, (unsigned char *)"\0\0\0\7ssh-rsa", 11);
|
|
|
|
#define ADD_BIGNUM(bignum) \
|
|
numlen = (bignum_bitcount(bignum)+8)/8; \
|
|
PUT_32BIT(lenbuf, numlen); MD5Update(&md5c, lenbuf, 4); \
|
|
for (i = numlen; i-- ;) { \
|
|
unsigned char c = bignum_byte(bignum, i); \
|
|
MD5Update(&md5c, &c, 1); \
|
|
}
|
|
ADD_BIGNUM(rsa->exponent);
|
|
ADD_BIGNUM(rsa->modulus);
|
|
#undef ADD_BIGNUM
|
|
|
|
MD5Final(digest, &md5c);
|
|
|
|
sprintf(buffer, "ssh-rsa %d ", bignum_bitcount(rsa->modulus));
|
|
for (i = 0; i < 16; i++)
|
|
sprintf(buffer + strlen(buffer), "%s%02x", i ? ":" : "",
|
|
digest[i]);
|
|
ret = snewn(strlen(buffer) + 1, char);
|
|
if (ret)
|
|
strcpy(ret, buffer);
|
|
return ret;
|
|
}
|
|
|
|
/*
|
|
* This is the magic ASN.1/DER prefix that goes in the decoded
|
|
* signature, between the string of FFs and the actual SHA hash
|
|
* value. The meaning of it is:
|
|
*
|
|
* 00 -- this marks the end of the FFs; not part of the ASN.1 bit itself
|
|
*
|
|
* 30 21 -- a constructed SEQUENCE of length 0x21
|
|
* 30 09 -- a constructed sub-SEQUENCE of length 9
|
|
* 06 05 -- an object identifier, length 5
|
|
* 2B 0E 03 02 1A -- object id { 1 3 14 3 2 26 }
|
|
* (the 1,3 comes from 0x2B = 43 = 40*1+3)
|
|
* 05 00 -- NULL
|
|
* 04 14 -- a primitive OCTET STRING of length 0x14
|
|
* [0x14 bytes of hash data follows]
|
|
*
|
|
* The object id in the middle there is listed as `id-sha1' in
|
|
* ftp://ftp.rsasecurity.com/pub/pkcs/pkcs-1/pkcs-1v2-1d2.asn (the
|
|
* ASN module for PKCS #1) and its expanded form is as follows:
|
|
*
|
|
* id-sha1 OBJECT IDENTIFIER ::= {
|
|
* iso(1) identified-organization(3) oiw(14) secsig(3)
|
|
* algorithms(2) 26 }
|
|
*/
|
|
static const unsigned char asn1_weird_stuff[] = {
|
|
0x00, 0x30, 0x21, 0x30, 0x09, 0x06, 0x05, 0x2B,
|
|
0x0E, 0x03, 0x02, 0x1A, 0x05, 0x00, 0x04, 0x14,
|
|
};
|
|
|
|
#define ASN1_LEN ( (int) sizeof(asn1_weird_stuff) )
|
|
|
|
static int rsa2_verifysig(void *key, char *sig, int siglen,
|
|
char *data, int datalen)
|
|
{
|
|
struct RSAKey *rsa = (struct RSAKey *) key;
|
|
Bignum in, out;
|
|
char *p;
|
|
int slen;
|
|
int bytes, i, j, ret;
|
|
unsigned char hash[20];
|
|
|
|
getstring(&sig, &siglen, &p, &slen);
|
|
if (!p || slen != 7 || memcmp(p, "ssh-rsa", 7)) {
|
|
return 0;
|
|
}
|
|
in = getmp(&sig, &siglen);
|
|
if (!in)
|
|
return 0;
|
|
out = modpow(in, rsa->exponent, rsa->modulus);
|
|
freebn(in);
|
|
|
|
ret = 1;
|
|
|
|
bytes = (bignum_bitcount(rsa->modulus)+7) / 8;
|
|
/* Top (partial) byte should be zero. */
|
|
if (bignum_byte(out, bytes - 1) != 0)
|
|
ret = 0;
|
|
/* First whole byte should be 1. */
|
|
if (bignum_byte(out, bytes - 2) != 1)
|
|
ret = 0;
|
|
/* Most of the rest should be FF. */
|
|
for (i = bytes - 3; i >= 20 + ASN1_LEN; i--) {
|
|
if (bignum_byte(out, i) != 0xFF)
|
|
ret = 0;
|
|
}
|
|
/* Then we expect to see the asn1_weird_stuff. */
|
|
for (i = 20 + ASN1_LEN - 1, j = 0; i >= 20; i--, j++) {
|
|
if (bignum_byte(out, i) != asn1_weird_stuff[j])
|
|
ret = 0;
|
|
}
|
|
/* Finally, we expect to see the SHA-1 hash of the signed data. */
|
|
SHA_Simple(data, datalen, hash);
|
|
for (i = 19, j = 0; i >= 0; i--, j++) {
|
|
if (bignum_byte(out, i) != hash[j])
|
|
ret = 0;
|
|
}
|
|
freebn(out);
|
|
|
|
return ret;
|
|
}
|
|
|
|
static unsigned char *rsa2_sign(void *key, char *data, int datalen,
|
|
int *siglen)
|
|
{
|
|
struct RSAKey *rsa = (struct RSAKey *) key;
|
|
unsigned char *bytes;
|
|
int nbytes;
|
|
unsigned char hash[20];
|
|
Bignum in, out;
|
|
int i, j;
|
|
|
|
SHA_Simple(data, datalen, hash);
|
|
|
|
nbytes = (bignum_bitcount(rsa->modulus) - 1) / 8;
|
|
assert(1 <= nbytes - 20 - ASN1_LEN);
|
|
bytes = snewn(nbytes, unsigned char);
|
|
|
|
bytes[0] = 1;
|
|
for (i = 1; i < nbytes - 20 - ASN1_LEN; i++)
|
|
bytes[i] = 0xFF;
|
|
for (i = nbytes - 20 - ASN1_LEN, j = 0; i < nbytes - 20; i++, j++)
|
|
bytes[i] = asn1_weird_stuff[j];
|
|
for (i = nbytes - 20, j = 0; i < nbytes; i++, j++)
|
|
bytes[i] = hash[j];
|
|
|
|
in = bignum_from_bytes(bytes, nbytes);
|
|
sfree(bytes);
|
|
|
|
out = rsa_privkey_op(in, rsa);
|
|
freebn(in);
|
|
|
|
nbytes = (bignum_bitcount(out) + 7) / 8;
|
|
bytes = snewn(4 + 7 + 4 + nbytes, unsigned char);
|
|
PUT_32BIT(bytes, 7);
|
|
memcpy(bytes + 4, "ssh-rsa", 7);
|
|
PUT_32BIT(bytes + 4 + 7, nbytes);
|
|
for (i = 0; i < nbytes; i++)
|
|
bytes[4 + 7 + 4 + i] = bignum_byte(out, nbytes - 1 - i);
|
|
freebn(out);
|
|
|
|
*siglen = 4 + 7 + 4 + nbytes;
|
|
return bytes;
|
|
}
|
|
|
|
const struct ssh_signkey ssh_rsa = {
|
|
rsa2_newkey,
|
|
rsa2_freekey,
|
|
rsa2_fmtkey,
|
|
rsa2_public_blob,
|
|
rsa2_private_blob,
|
|
rsa2_createkey,
|
|
rsa2_openssh_createkey,
|
|
rsa2_openssh_fmtkey,
|
|
rsa2_pubkey_bits,
|
|
rsa2_fingerprint,
|
|
rsa2_verifysig,
|
|
rsa2_sign,
|
|
"ssh-rsa",
|
|
"rsa2"
|
|
};
|
|
|
|
void *ssh_rsakex_newkey(char *data, int len)
|
|
{
|
|
return rsa2_newkey(data, len);
|
|
}
|
|
|
|
void ssh_rsakex_freekey(void *key)
|
|
{
|
|
rsa2_freekey(key);
|
|
}
|
|
|
|
int ssh_rsakex_klen(void *key)
|
|
{
|
|
struct RSAKey *rsa = (struct RSAKey *) key;
|
|
|
|
return bignum_bitcount(rsa->modulus);
|
|
}
|
|
|
|
static void oaep_mask(const struct ssh_hash *h, void *seed, int seedlen,
|
|
void *vdata, int datalen)
|
|
{
|
|
unsigned char *data = (unsigned char *)vdata;
|
|
unsigned count = 0;
|
|
|
|
while (datalen > 0) {
|
|
int i, max = (datalen > h->hlen ? h->hlen : datalen);
|
|
void *s;
|
|
unsigned char counter[4], hash[SSH2_KEX_MAX_HASH_LEN];
|
|
|
|
assert(h->hlen <= SSH2_KEX_MAX_HASH_LEN);
|
|
PUT_32BIT(counter, count);
|
|
s = h->init();
|
|
h->bytes(s, seed, seedlen);
|
|
h->bytes(s, counter, 4);
|
|
h->final(s, hash);
|
|
count++;
|
|
|
|
for (i = 0; i < max; i++)
|
|
data[i] ^= hash[i];
|
|
|
|
data += max;
|
|
datalen -= max;
|
|
}
|
|
}
|
|
|
|
void ssh_rsakex_encrypt(const struct ssh_hash *h, unsigned char *in, int inlen,
|
|
unsigned char *out, int outlen,
|
|
void *key)
|
|
{
|
|
Bignum b1, b2;
|
|
struct RSAKey *rsa = (struct RSAKey *) key;
|
|
int k, i;
|
|
char *p;
|
|
const int HLEN = h->hlen;
|
|
|
|
/*
|
|
* Here we encrypt using RSAES-OAEP. Essentially this means:
|
|
*
|
|
* - we have a SHA-based `mask generation function' which
|
|
* creates a pseudo-random stream of mask data
|
|
* deterministically from an input chunk of data.
|
|
*
|
|
* - we have a random chunk of data called a seed.
|
|
*
|
|
* - we use the seed to generate a mask which we XOR with our
|
|
* plaintext.
|
|
*
|
|
* - then we use _the masked plaintext_ to generate a mask
|
|
* which we XOR with the seed.
|
|
*
|
|
* - then we concatenate the masked seed and the masked
|
|
* plaintext, and RSA-encrypt that lot.
|
|
*
|
|
* The result is that the data input to the encryption function
|
|
* is random-looking and (hopefully) contains no exploitable
|
|
* structure such as PKCS1-v1_5 does.
|
|
*
|
|
* For a precise specification, see RFC 3447, section 7.1.1.
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* Some of the variable names below are derived from that, so
|
|
* it'd probably help to read it anyway.
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|
*/
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|
|
|
/* k denotes the length in octets of the RSA modulus. */
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|
k = (7 + bignum_bitcount(rsa->modulus)) / 8;
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|
|
|
/* The length of the input data must be at most k - 2hLen - 2. */
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assert(inlen > 0 && inlen <= k - 2*HLEN - 2);
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|
|
|
/* The length of the output data wants to be precisely k. */
|
|
assert(outlen == k);
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|
|
|
/*
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|
* Now perform EME-OAEP encoding. First set up all the unmasked
|
|
* output data.
|
|
*/
|
|
/* Leading byte zero. */
|
|
out[0] = 0;
|
|
/* At position 1, the seed: HLEN bytes of random data. */
|
|
for (i = 0; i < HLEN; i++)
|
|
out[i + 1] = random_byte();
|
|
/* At position 1+HLEN, the data block DB, consisting of: */
|
|
/* The hash of the label (we only support an empty label here) */
|
|
h->final(h->init(), out + HLEN + 1);
|
|
/* A bunch of zero octets */
|
|
memset(out + 2*HLEN + 1, 0, outlen - (2*HLEN + 1));
|
|
/* A single 1 octet, followed by the input message data. */
|
|
out[outlen - inlen - 1] = 1;
|
|
memcpy(out + outlen - inlen, in, inlen);
|
|
|
|
/*
|
|
* Now use the seed data to mask the block DB.
|
|
*/
|
|
oaep_mask(h, out+1, HLEN, out+HLEN+1, outlen-HLEN-1);
|
|
|
|
/*
|
|
* And now use the masked DB to mask the seed itself.
|
|
*/
|
|
oaep_mask(h, out+HLEN+1, outlen-HLEN-1, out+1, HLEN);
|
|
|
|
/*
|
|
* Now `out' contains precisely the data we want to
|
|
* RSA-encrypt.
|
|
*/
|
|
b1 = bignum_from_bytes(out, outlen);
|
|
b2 = modpow(b1, rsa->exponent, rsa->modulus);
|
|
p = (char *)out;
|
|
for (i = outlen; i--;) {
|
|
*p++ = bignum_byte(b2, i);
|
|
}
|
|
freebn(b1);
|
|
freebn(b2);
|
|
|
|
/*
|
|
* And we're done.
|
|
*/
|
|
}
|
|
|
|
static const struct ssh_kex ssh_rsa_kex_sha1 = {
|
|
"rsa1024-sha1", NULL, KEXTYPE_RSA, NULL, NULL, 0, 0, &ssh_sha1
|
|
};
|
|
|
|
static const struct ssh_kex ssh_rsa_kex_sha256 = {
|
|
"rsa2048-sha256", NULL, KEXTYPE_RSA, NULL, NULL, 0, 0, &ssh_sha256
|
|
};
|
|
|
|
static const struct ssh_kex *const rsa_kex_list[] = {
|
|
&ssh_rsa_kex_sha256,
|
|
&ssh_rsa_kex_sha1
|
|
};
|
|
|
|
const struct ssh_kexes ssh_rsa_kex = {
|
|
sizeof(rsa_kex_list) / sizeof(*rsa_kex_list),
|
|
rsa_kex_list
|
|
};
|