};
/* Sign data. NB data must be smaller than modulus */
+#define RSA_MAX_MODBYTES 2048
+/* The largest modulus I've seen is 15360 bits, which works out at 1920
+ * bytes. Using keys this big is quite implausible, but it doesn't cost us
+ * much to support them.
+ */
+
static const char *hexchars="0123456789abcdef";
-static string_t rsa_sign(void *sst, uint8_t *data, int32_t datalen)
+static void emsa_pkcs1(MP_INT *n, MP_INT *m,
+ const uint8_t *data, int32_t datalen)
{
- struct rsapriv *st=sst;
- MP_INT a, b, u, v, tmp, tmp2;
- char buff[2048];
+ char buff[2*RSA_MAX_MODBYTES + 1];
int msize, i;
- string_t signature;
-
- mpz_init(&a);
- mpz_init(&b);
/* RSA PKCS#1 v1.5 signature padding:
*
* -iwj 17.9.2002
*/
- msize=mpz_sizeinbase(&st->n, 16);
+ msize=mpz_sizeinbase(n, 16);
if (datalen*2+6>=msize) {
fatal("rsa_sign: message too big");
buff[msize]=0;
- mpz_set_str(&a, buff, 16);
+ mpz_set_str(m, buff, 16);
+}
+
+static string_t rsa_sign(void *sst, uint8_t *data, int32_t datalen)
+{
+ struct rsapriv *st=sst;
+ MP_INT a, b, u, v, tmp, tmp2;
+ string_t signature;
+
+ mpz_init(&a);
+ mpz_init(&b);
+
+ /* Construct the message representative. */
+ emsa_pkcs1(&st->n, &a, data, datalen);
/*
* Produce an RSA signature (a^d mod n) using the Chinese
{
struct rsapub *st=sst;
MP_INT a, b, c;
- char buff[2048];
- int msize, i;
bool_t ok;
mpz_init(&a);
mpz_init(&b);
mpz_init(&c);
- msize=mpz_sizeinbase(&st->n, 16);
-
- strcpy(buff,"0001");
-
- for (i=0; i<datalen; i++) {
- buff[msize+(-datalen+i)*2]=hexchars[(data[i]&0xf0)>>4];
- buff[msize+(-datalen+i)*2+1]=hexchars[data[i]&0xf];
- }
-
- buff[msize-datalen*2-2]= '0';
- buff[msize-datalen*2-1]= '0';
-
- for (i=4; i<msize-datalen*2-2; i++)
- buff[i]='f';
-
- buff[msize]=0;
-
- mpz_set_str(&a, buff, 16);
+ emsa_pkcs1(&st->n, &a, data, datalen);
mpz_set_str(&b, signature, 16);
} else {
cfgfatal(loc,"rsa-public","you must provide an encryption key\n");
}
+ if (mpz_sizeinbase(&st->e, 256) > RSA_MAX_MODBYTES) {
+ cfgfatal(loc, "rsa-public", "implausibly large public exponent\n");
+ }
i=list_elem(args,1);
if (i) {
} else {
cfgfatal(loc,"rsa-public","you must provide a modulus\n");
}
+ if (mpz_sizeinbase(&st->n, 256) > RSA_MAX_MODBYTES) {
+ cfgfatal(loc, "rsa-public", "implausibly large modulus\n");
+ }
return new_closure(&st->cl);
}
/* Read the public key */
keyfile_get_int(loc,f); /* Not sure what this is */
length=(keyfile_get_short(loc,f)+7)/8;
- if (length>1024) {
+ if (length>RSA_MAX_MODBYTES) {
cfgfatal(loc,"rsa-private","implausible length %ld for modulus\n",
length);
}
read_mpbin(&st->n,b,length);
free(b);
length=(keyfile_get_short(loc,f)+7)/8;
- if (length>1024) {
+ if (length>RSA_MAX_MODBYTES) {
cfgfatal(loc,"rsa-private","implausible length %ld for e\n",length);
}
b=safe_malloc(length,"rsapriv_apply");
/* Read d */
length=(keyfile_get_short(loc,f)+7)/8;
- if (length>1024) {
+ if (length>RSA_MAX_MODBYTES) {
cfgfatal(loc,"rsa-private","implausibly long (%ld) decryption key\n",
length);
}
free(b);
/* Read iqmp (inverse of q mod p) */
length=(keyfile_get_short(loc,f)+7)/8;
- if (length>1024) {
+ if (length>RSA_MAX_MODBYTES) {
cfgfatal(loc,"rsa-private","implausibly long (%ld)"
" iqmp auxiliary value\n", length);
}
free(b);
/* Read q (the smaller of the two primes) */
length=(keyfile_get_short(loc,f)+7)/8;
- if (length>1024) {
+ if (length>RSA_MAX_MODBYTES) {
cfgfatal(loc,"rsa-private","implausibly long (%ld) q value\n",
length);
}
free(b);
/* Read p (the larger of the two primes) */
length=(keyfile_get_short(loc,f)+7)/8;
- if (length>1024) {
+ if (length>RSA_MAX_MODBYTES) {
cfgfatal(loc,"rsa-private","implausibly long (%ld) p value\n",
length);
}
/*
* Verify that d*e is congruent to 1 mod (p-1), and mod
* (q-1). This is equivalent to it being congruent to 1 mod
- * lcm(p-1,q-1), i.e. congruent to 1 mod phi(n). Note that
- * phi(n) is _not_ simply (p-1)*(q-1).
+ * lambda(n) = lcm(p-1,q-1). The usual `textbook' condition,
+ * that d e == 1 (mod (p-1)(q-1)) is sufficient, but not
+ * actually necessary.
*/
mpz_mul(&tmp, &d, &e);
mpz_sub_ui(&tmp2, &st->p, 1);