void ep2_curve_get_vs(bn_t *v) {
bn_t x, t;
bn_null(x);
bn_null(t);
TRY {
bn_new(x);
bn_new(t);
fp_param_get_var(x);
bn_mul_dig(v[0], x, 3);
bn_add_dig(v[0], v[0], 1);
bn_copy(v[1], x);
bn_copy(v[2], x);
bn_copy(v[3], x);
bn_sqr(x, x);
bn_lsh(t, x, 1);
bn_add(v[0], v[0], t);
bn_add(v[3], v[3], t);
bn_lsh(t, t, 1);
bn_add(v[2], v[2], t);
bn_lsh(t, t, 1);
bn_add(v[1], v[1], t);
fp_param_get_var(t);
bn_mul(x, x, t);
bn_mul_dig(t, x, 6);
bn_add(v[2], v[2], t);
bn_lsh(t, t, 1);
bn_add(v[1], v[1], t);
bn_neg(v[3], v[3]);
} CATCH_ANY {
THROW(ERR_CAUGHT);
} FINALLY {
bn_free(x);
bn_free(t);
}
}
void bn_read_str(bn_t a, const char *str, int len, int radix) {
int sign, i, j;
char c;
bn_zero(a);
if (radix < 2 || radix > 64) {
THROW(ERR_NO_VALID)
}
j = 0;
if (str[0] == '-') {
j++;
sign = BN_NEG;
} else {
sign = BN_POS;
}
while (str[j] && j < len) {
c = (char)((radix < 36) ? TOUPPER(str[j]) : str[j]);
for (i = 0; i < 64; i++) {
if (c == util_conv_char(i)) {
break;
}
}
if (i < radix) {
bn_mul_dig(a, a, (dig_t)radix);
bn_add_dig(a, a, (dig_t)i);
} else {
break;
}
j++;
}
a->sign = sign;
}
int cp_bdpe_gen(bdpe_t pub, bdpe_t prv, dig_t block, int bits) {
bn_t t, r;
int result = STS_OK;
bn_null(t);
bn_null(r);
TRY {
bn_new(t);
bn_new(r);
prv->t = pub->t = block;
/* Make sure that block size is prime. */
bn_set_dig(t, block);
if (bn_is_prime_basic(t) == 0) {
THROW(ERR_NO_VALID);
}
/* Generate prime q such that gcd(block, (q - 1)) = 1. */
do {
bn_gen_prime(prv->q, bits / 2);
bn_sub_dig(prv->q, prv->q, 1);
bn_gcd_dig(t, prv->q, block);
bn_add_dig(prv->q, prv->q, 1);
} while (bn_cmp_dig(t, 1) != CMP_EQ);
/* Generate different primes p and q. */
do {
/* Compute p = block * (x * block + b) + 1, 0 < b < block random. */
bn_rand(prv->p, BN_POS, bits / 2 - 2 * util_bits_dig(block));
bn_mul_dig(prv->p, prv->p, block);
bn_rand(t, BN_POS, util_bits_dig(block));
bn_add_dig(prv->p, prv->p, t->dp[0]);
/* We know that block divides (p-1). */
bn_gcd_dig(t, prv->p, block);
bn_mul_dig(prv->p, prv->p, block);
bn_add_dig(prv->p, prv->p, 1);
} while (bn_cmp_dig(t, 1) != CMP_EQ || bn_is_prime(prv->p) == 0);
/* Compute t = (p-1)*(q-1). */
bn_sub_dig(prv->q, prv->q, 1);
bn_sub_dig(prv->p, prv->p, 1);
bn_mul(t, prv->p, prv->q);
bn_div_dig(t, t, block);
/* Restore factors p and q and compute n = p * q. */
bn_add_dig(prv->p, prv->p, 1);
bn_add_dig(prv->q, prv->q, 1);
bn_mul(pub->n, prv->p, prv->q);
bn_copy(prv->n, pub->n);
/* Select random y such that y^{(p-1)(q-1)}/block \neq 1 mod N. */
do {
bn_rand(pub->y, BN_POS, bits);
bn_mxp(r, pub->y, t, pub->n);
} while (bn_cmp_dig(r, 1) == CMP_EQ);
bn_copy(prv->y, pub->y);
}
CATCH_ANY {
result = STS_ERR;
}
FINALLY {
bn_free(t);
bn_free(r);
}
return result;
}
void bn_gen_prime_stron(bn_t a, int bits) {
dig_t i, j;
int found, k;
bn_t r, s, t;
bn_null(r);
bn_null(s);
bn_null(t);
TRY {
bn_new(r);
bn_new(s);
bn_new(t);
do {
do {
/* Generate two large primes r and s. */
bn_rand(s, BN_POS, bits / 2 - BN_DIGIT / 2);
bn_rand(t, BN_POS, bits / 2 - BN_DIGIT / 2);
} while (!bn_is_prime(s) || !bn_is_prime(t));
found = 1;
bn_rand(a, BN_POS, bits / 2 - bn_bits(t) - 1);
i = a->dp[0];
bn_dbl(t, t);
do {
/* Find first prime r = 2 * i * t + 1. */
bn_mul_dig(r, t, i);
bn_add_dig(r, r, 1);
i++;
if (bn_bits(r) > bits / 2 - 1) {
found = 0;
break;
}
} while (!bn_is_prime(r));
if (found == 0) {
continue;
}
/* Compute t = 2 * (s^(r-2) mod r) * s - 1. */
bn_sub_dig(t, r, 2);
#if BN_MOD != PMERS
bn_mxp(t, s, t, r);
#else
bn_exp(t, s, t, r);
#endif
bn_mul(t, t, s);
bn_dbl(t, t);
bn_sub_dig(t, t, 1);
k = bits - bn_bits(r);
k -= bn_bits(s);
bn_rand(a, BN_POS, k);
j = a->dp[0];
do {
/* Find first prime a = t + 2 * j * r * s. */
bn_mul(a, r, s);
bn_mul_dig(a, a, j);
bn_dbl(a, a);
bn_add(a, a, t);
j++;
if (bn_bits(a) > bits) {
found = 0;
break;
}
} while (!bn_is_prime(a));
} while (found == 0 && bn_bits(a) != bits);
}
CATCH_ANY {
THROW(ERR_CAUGHT);
}
FINALLY {
bn_free(r);
bn_free(s);
bn_free(t);
}
}
void pp_map_sim_oatep_k12(fp12_t r, ep_t *p, ep2_t *q, int m) {
ep_t _p[m];
ep2_t t[m], _q[m];
bn_t a;
int i, j, len = FP_BITS, s[FP_BITS];
TRY {
bn_null(a);
bn_new(a);
for (i = 0; i < m; i++) {
ep_null(_p[i]);
ep2_null(_q[i]);
ep2_null(t[i]);
ep_new(_p[i]);
ep2_new(_q[i]);
ep2_new(t[i]);
}
j = 0;
for (i = 0; i < m; i++) {
if (!ep_is_infty(p[i]) && !ep2_is_infty(q[i])) {
ep_norm(_p[j], p[i]);
ep2_norm(_q[j++], q[i]);
}
}
fp12_set_dig(r, 1);
fp_param_get_var(a);
bn_mul_dig(a, a, 6);
bn_add_dig(a, a, 2);
fp_param_get_map(s, &len);
if (j > 0) {
switch (ep_param_get()) {
case BN_P158:
case BN_P254:
case BN_P256:
case BN_P638:
/* r = f_{|a|,Q}(P). */
pp_mil_sps_k12(r, t, _q, _p, j, s, len);
if (bn_sign(a) == BN_NEG) {
/* f_{-a,Q}(P) = 1/f_{a,Q}(P). */
fp12_inv_uni(r, r);
}
for (i = 0; i < j; i++) {
if (bn_sign(a) == BN_NEG) {
ep2_neg(t[i], t[i]);
}
pp_fin_k12_oatep(r, t[i], _q[i], _p[i]);
}
pp_exp_k12(r, r);
break;
case B12_P638:
/* r = f_{|a|,Q}(P). */
pp_mil_sps_k12(r, t, _q, _p, j, s, len);
if (bn_sign(a) == BN_NEG) {
fp12_inv_uni(r, r);
}
pp_exp_k12(r, r);
break;
}
}
}
CATCH_ANY {
THROW(ERR_CAUGHT);
}
FINALLY {
bn_free(a);
for (i = 0; i < m; i++) {
ep_free(_p[i]);
ep2_free(_q[i]);
ep2_free(t[i]);
}
}
}
void pp_map_oatep_k12(fp12_t r, ep_t p, ep2_t q) {
ep_t _p[1];
ep2_t t[1], _q[1];
bn_t a;
int len = FP_BITS, s[FP_BITS];
ep_null(_p[0]);
ep2_null(_q[0]);
ep2_null(t[0]);
bn_null(a);
TRY {
ep_new(_p[0]);
ep2_new(_q[0]);
ep2_new(t[0]);
bn_new(a);
fp_param_get_var(a);
bn_mul_dig(a, a, 6);
bn_add_dig(a, a, 2);
fp_param_get_map(s, &len);
fp12_set_dig(r, 1);
ep_norm(_p[0], p);
ep2_norm(_q[0], q);
if (!ep_is_infty(_p[0]) && !ep2_is_infty(_q[0])) {
switch (ep_param_get()) {
case BN_P158:
case BN_P254:
case BN_P256:
case BN_P638:
/* r = f_{|a|,Q}(P). */
pp_mil_sps_k12(r, t, _q, _p, 1, s, len);
if (bn_sign(a) == BN_NEG) {
/* f_{-a,Q}(P) = 1/f_{a,Q}(P). */
fp12_inv_uni(r, r);
ep2_neg(t[0], t[0]);
}
pp_fin_k12_oatep(r, t[0], _q[0], _p[0]);
pp_exp_k12(r, r);
break;
case B12_P638:
/* r = f_{|a|,Q}(P). */
pp_mil_sps_k12(r, t, _q, _p, 1, s, len);
if (bn_sign(a) == BN_NEG) {
fp12_inv_uni(r, r);
ep2_neg(t[0], t[0]);
}
pp_exp_k12(r, r);
break;
}
}
}
CATCH_ANY {
THROW(ERR_CAUGHT);
}
FINALLY {
ep_free(_p[0]);
ep2_free(_q[0]);
ep2_free(t[0]);
bn_free(a);
}
}
void fp_param_set(int param) {
bn_t t0, t1, t2, p;
int f[10] = { 0 };
bn_null(t0);
bn_null(t1);
bn_null(t2);
bn_null(p);
/* Suppress possible unused parameter warning. */
(void) f;
TRY {
bn_new(t0);
bn_new(t1);
bn_new(t2);
bn_new(p);
core_get()->fp_id = param;
switch (param) {
#if FP_PRIME == 158
case BN_158:
/* x = 4000000031. */
fp_param_get_var(t0);
/* p = 36 * x^4 + 36 * x^3 + 24 * x^2 + 6 * x + 1. */
bn_set_dig(p, 1);
bn_mul_dig(t1, t0, 6);
bn_add(p, p, t1);
bn_mul(t1, t0, t0);
bn_mul_dig(t1, t1, 24);
bn_add(p, p, t1);
bn_mul(t1, t0, t0);
bn_mul(t1, t1, t0);
bn_mul_dig(t1, t1, 36);
bn_add(p, p, t1);
bn_mul(t0, t0, t0);
bn_mul(t1, t0, t0);
bn_mul_dig(t1, t1, 36);
bn_add(p, p, t1);
fp_prime_set_dense(p);
break;
#elif FP_PRIME == 160
case SECG_160:
/* p = 2^160 - 2^31 + 1. */
f[0] = -1;
f[1] = -31;
f[2] = 160;
fp_prime_set_pmers(f, 3);
break;
case SECG_160D:
/* p = 2^160 - 2^32 - 2^14 - 2^12 - 2^9 - 2^8 - 2^7 - 2^3 - 2^2 - 1.*/
f[0] = -1;
f[1] = -2;
f[2] = -3;
f[3] = -7;
f[4] = -8;
f[5] = -9;
f[6] = -12;
f[7] = -14;
f[8] = -32;
f[9] = 160;
fp_prime_set_pmers(f, 10);
break;
#elif FP_PRIME == 192
case NIST_192:
/* p = 2^192 - 2^64 - 1. */
f[0] = -1;
f[1] = -64;
f[2] = 192;
fp_prime_set_pmers(f, 3);
break;
case SECG_192:
/* p = 2^192 - 2^32 - 2^12 - 2^8 - 2^7 - 2^6 - 2^3 - 1.*/
f[0] = -1;
f[1] = -3;
f[2] = -6;
f[3] = -7;
f[4] = -8;
f[5] = -12;
f[6] = -32;
f[7] = 192;
fp_prime_set_pmers(f, 8);
break;
#elif FP_PRIME == 224
case NIST_224:
/* p = 2^224 - 2^96 + 1. */
f[0] = 1;
f[1] = -96;
f[2] = 224;
fp_prime_set_pmers(f, 3);
break;
case SECG_224:
/* p = 2^224 - 2^32 - 2^12 - 2^11 - 2^9 - 2^7 - 2^4 - 2 - 1.*/
f[0] = -1;
f[1] = -1;
f[2] = -4;
f[3] = -7;
f[4] = -9;
f[5] = -11;
f[6] = -12;
f[7] = -32;
f[8] = 224;
fp_prime_set_pmers(f, 9);
break;
#elif FP_PRIME == 254
case BN_254:
/* x = -4080000000000001. */
fp_param_get_var(t0);
/* p = 36 * x^4 + 36 * x^3 + 24 * x^2 + 6 * x + 1. */
bn_set_dig(p, 1);
bn_mul_dig(t1, t0, 6);
bn_add(p, p, t1);
bn_mul(t1, t0, t0);
bn_mul_dig(t1, t1, 24);
bn_add(p, p, t1);
bn_mul(t1, t0, t0);
bn_mul(t1, t1, t0);
bn_mul_dig(t1, t1, 36);
bn_add(p, p, t1);
bn_mul(t0, t0, t0);
bn_mul(t1, t0, t0);
bn_mul_dig(t1, t1, 36);
bn_add(p, p, t1);
fp_prime_set_dense(p);
break;
#elif FP_PRIME == 256
case NIST_256:
/* p = 2^256 - 2^224 + 2^192 + 2^96 - 1. */
f[0] = -1;
f[1] = 96;
f[2] = 192;
f[3] = -224;
f[4] = 256;
fp_prime_set_pmers(f, 5);
break;
case SECG_256:
/* p = 2^256 - 2^32 - 2^9 - 2^8 - 2^7 - 2^6 - 2^4 - 1. */
f[0] = -1;
f[1] = -4;
f[2] = -6;
f[3] = -7;
f[4] = -8;
f[5] = -9;
f[6] = -32;
f[7] = 256;
fp_prime_set_pmers(f, 8);
break;
case BN_256:
/* x = 6000000000001F2D. */
fp_param_get_var(t0);
/* p = 36 * x^4 + 36 * x^3 + 24 * x^2 + 6 * x + 1. */
bn_set_dig(p, 1);
bn_mul_dig(t1, t0, 6);
bn_add(p, p, t1);
bn_mul(t1, t0, t0);
bn_mul_dig(t1, t1, 24);
bn_add(p, p, t1);
bn_mul(t1, t0, t0);
bn_mul(t1, t1, t0);
bn_mul_dig(t1, t1, 36);
bn_add(p, p, t1);
bn_mul(t0, t0, t0);
bn_mul(t1, t0, t0);
bn_mul_dig(t1, t1, 36);
bn_add(p, p, t1);
fp_prime_set_dense(p);
break;
#elif FP_PRIME == 384
case NIST_384:
/* p = 2^384 - 2^128 - 2^96 + 2^32 - 1. */
f[0] = -1;
f[1] = 32;
f[2] = -96;
f[3] = -128;
f[4] = 384;
fp_prime_set_pmers(f, 5);
break;
#elif FP_PRIME == 477
case B24_477:
fp_param_get_var(t0);
/* p = (u - 1)^2 * (u^8 - u^4 + 1) div 3 + u. */
bn_sub_dig(p, t0, 1);
bn_sqr(p, p);
bn_sqr(t1, t0);
bn_sqr(t1, t1);
bn_sqr(t2, t1);
bn_sub(t2, t2, t1);
bn_add_dig(t2, t2, 1);
bn_mul(p, p, t2);
bn_div_dig(p, p, 3);
bn_add(p, p, t0);
fp_prime_set_dense(p);
break;
#elif FP_PRIME == 508
case KSS_508:
fp_param_get_var(t0);
/* h = (49*u^2 + 245 * u + 343)/3 */
bn_mul_dig(p, t0, 245);
bn_add_dig(p, p, 200);
bn_add_dig(p, p, 143);
bn_sqr(t1, t0);
bn_mul_dig(t2, t1, 49);
bn_add(p, p, t2);
bn_div_dig(p, p, 3);
/* n = (u^6 + 37 * u^3 + 343)/343. */
bn_mul(t1, t1, t0);
bn_mul_dig(t2, t1, 37);
bn_sqr(t1, t1);
bn_add(t2, t2, t1);
bn_add_dig(t2, t2, 200);
bn_add_dig(t2, t2, 143);
bn_div_dig(t2, t2, 49);
bn_div_dig(t2, t2, 7);
bn_mul(p, p, t2);
/* t = (u^4 + 16 * u + 7)/7. */
bn_mul_dig(t1, t0, 16);
bn_add_dig(t1, t1, 7);
bn_sqr(t2, t0);
bn_sqr(t2, t2);
bn_add(t2, t2, t1);
bn_div_dig(t2, t2, 7);
bn_add(p, p, t2);
bn_sub_dig(p, p, 1);
fp_prime_set_dense(p);
break;
#elif FP_PRIME == 521
case NIST_521:
/* p = 2^521 - 1. */
f[0] = -1;
f[1] = 521;
fp_prime_set_pmers(f, 2);
break;
#elif FP_PRIME == 638
case BN_638:
fp_param_get_var(t0);
/* p = 36 * x^4 + 36 * x^3 + 24 * x^2 + 6 * x + 1. */
bn_set_dig(p, 1);
bn_mul_dig(t1, t0, 6);
bn_add(p, p, t1);
bn_mul(t1, t0, t0);
bn_mul_dig(t1, t1, 24);
bn_add(p, p, t1);
bn_mul(t1, t0, t0);
bn_mul(t1, t1, t0);
bn_mul_dig(t1, t1, 36);
bn_add(p, p, t1);
bn_mul(t0, t0, t0);
bn_mul(t1, t0, t0);
bn_mul_dig(t1, t1, 36);
bn_add(p, p, t1);
fp_prime_set_dense(p);
break;
case B12_638:
fp_param_get_var(t0);
/* p = (x^2 - 2x + 1) * (x^4 - x^2 + 1)/3 + x. */
bn_sqr(t1, t0);
bn_sqr(p, t1);
bn_sub(p, p, t1);
bn_add_dig(p, p, 1);
bn_sub(t1, t1, t0);
bn_sub(t1, t1, t0);
bn_add_dig(t1, t1, 1);
bn_mul(p, p, t1);
bn_div_dig(p, p, 3);
bn_add(p, p, t0);
fp_prime_set_dense(p);
break;
#elif FP_PRIME == 1536
case SS_1536:
fp_param_get_var(t0);
bn_read_str(p, SS_P1536, strlen(SS_P1536), 16);
bn_mul(p, p, t0);
bn_dbl(p, p);
bn_sub_dig(p, p, 1);
fp_prime_set_dense(p);
break;
#else
default:
bn_gen_prime(p, FP_BITS);
fp_prime_set_dense(p);
core_get()->fp_id = 0;
break;
#endif
}
}
CATCH_ANY {
THROW(ERR_CAUGHT);
}
FINALLY {
bn_free(t0);
bn_free(t1);
bn_free(t2);
bn_free(p);
}
}
