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chromium / chromiumos / third_party / cryptoc / refs/heads/stabilize-meowth-10574.B / . / p256_ec.c
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// Copyright 2016 Google Inc.
//
// Licensed under the Apache License, Version 2.0 (the "License");
// you may not use this file except in compliance with the License.
// You may obtain a copy of the License at
//
// http://www.apache.org/licenses/LICENSE-2.0
//
// Unless required by applicable law or agreed to in writing, software
// distributed under the License is distributed on an "AS IS" BASIS,
// WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
// See the License for the specific language governing permissions and
// limitations under the License.
#include <stdint.h>
#include <string.h>
#include "cryptoc/p256.h"
typedef uint8_t u8;
typedef uint32_t u32;
typedef int32_t s32;
typedef uint64_t u64;
/* Our field elements are represented as nine 32-bit limbs.
*
* The value of an felem (field element) is:
* x[0] + (x[1] * 2**29) + (x[2] * 2**57) + ... + (x[8] * 2**228)
*
* That is, each limb is alternately 29 or 28-bits wide in little-endian
* order.
*
* This means that an felem hits 2**257, rather than 2**256 as we would like. A
* 28, 29, ... pattern would cause us to hit 2**256, but that causes problems
* when multiplying as terms end up one bit short of a limb which would require
* much bit-shifting to correct.
*
* Finally, the values stored in an felem are in Montgomery form. So the value
* |y| is stored as (y*R) mod p, where p is the P-256 prime and R is 2**257.
*/
typedef u32 limb;
#define NLIMBS 9
typedef limb felem[NLIMBS];
static const limb kBottom28Bits = 0xfffffff;
static const limb kBottom29Bits = 0x1fffffff;
/* kOne is the number 1 as an felem. It's 2**257 mod p split up into 29 and
* 28-bit words. */
static const felem kOne = {
2, 0, 0, 0xffff800,
0x1fffffff, 0xfffffff, 0x1fbfffff, 0x1ffffff,
0
};
static const felem kZero = {0};
static const felem kP = {
0x1fffffff, 0xfffffff, 0x1fffffff, 0x3ff,
0, 0, 0x200000, 0xf000000,
0xfffffff
};
static const felem k2P = {
0x1ffffffe, 0xfffffff, 0x1fffffff, 0x7ff,
0, 0, 0x400000, 0xe000000,
0x1fffffff
};
/* kPrecomputed contains precomputed values to aid the calculation of scalar
* multiples of the base point, G. It's actually two, equal length, tables
* concatenated.
*
* The first table contains (x,y) felem pairs for 16 multiples of the base
* point, G.
*
* Index | Index (binary) | Value
* 0 | 0000 | 0G (all zeros, omitted)
* 1 | 0001 | G
* 2 | 0010 | 2**64G
* 3 | 0011 | 2**64G + G
* 4 | 0100 | 2**128G
* 5 | 0101 | 2**128G + G
* 6 | 0110 | 2**128G + 2**64G
* 7 | 0111 | 2**128G + 2**64G + G
* 8 | 1000 | 2**192G
* 9 | 1001 | 2**192G + G
* 10 | 1010 | 2**192G + 2**64G
* 11 | 1011 | 2**192G + 2**64G + G
* 12 | 1100 | 2**192G + 2**128G
* 13 | 1101 | 2**192G + 2**128G + G
* 14 | 1110 | 2**192G + 2**128G + 2**64G
* 15 | 1111 | 2**192G + 2**128G + 2**64G + G
*
* The second table follows the same style, but the terms are 2**32G,
* 2**96G, 2**160G, 2**224G.
*
* This is ~2KB of data. */
static const limb kPrecomputed[NLIMBS * 2 * 15 * 2] = {
0x11522878, 0xe730d41, 0xdb60179, 0x4afe2ff, 0x12883add, 0xcaddd88, 0x119e7edc, 0xd4a6eab, 0x3120bee,
0x1d2aac15, 0xf25357c, 0x19e45cdd, 0x5c721d0, 0x1992c5a5, 0xa237487, 0x154ba21, 0x14b10bb, 0xae3fe3,
0xd41a576, 0x922fc51, 0x234994f, 0x60b60d3, 0x164586ae, 0xce95f18, 0x1fe49073, 0x3fa36cc, 0x5ebcd2c,
0xb402f2f, 0x15c70bf, 0x1561925c, 0x5a26704, 0xda91e90, 0xcdc1c7f, 0x1ea12446, 0xe1ade1e, 0xec91f22,
0x26f7778, 0x566847e, 0xa0bec9e, 0x234f453, 0x1a31f21a, 0xd85e75c, 0x56c7109, 0xa267a00, 0xb57c050,
0x98fb57, 0xaa837cc, 0x60c0792, 0xcfa5e19, 0x61bab9e, 0x589e39b, 0xa324c5, 0x7d6dee7, 0x2976e4b,
0x1fc4124a, 0xa8c244b, 0x1ce86762, 0xcd61c7e, 0x1831c8e0, 0x75774e1, 0x1d96a5a9, 0x843a649, 0xc3ab0fa,
0x6e2e7d5, 0x7673a2a, 0x178b65e8, 0x4003e9b, 0x1a1f11c2, 0x7816ea, 0xf643e11, 0x58c43df, 0xf423fc2,
0x19633ffa, 0x891f2b2, 0x123c231c, 0x46add8c, 0x54700dd, 0x59e2b17, 0x172db40f, 0x83e277d, 0xb0dd609,
0xfd1da12, 0x35c6e52, 0x19ede20c, 0xd19e0c0, 0x97d0f40, 0xb015b19, 0x449e3f5, 0xe10c9e, 0x33ab581,
0x56a67ab, 0x577734d, 0x1dddc062, 0xc57b10d, 0x149b39d, 0x26a9e7b, 0xc35df9f, 0x48764cd, 0x76dbcca,
0xca4b366, 0xe9303ab, 0x1a7480e7, 0x57e9e81, 0x1e13eb50, 0xf466cf3, 0x6f16b20, 0x4ba3173, 0xc168c33,
0x15cb5439, 0x6a38e11, 0x73658bd, 0xb29564f, 0x3f6dc5b, 0x53b97e, 0x1322c4c0, 0x65dd7ff, 0x3a1e4f6,
0x14e614aa, 0x9246317, 0x1bc83aca, 0xad97eed, 0xd38ce4a, 0xf82b006, 0x341f077, 0xa6add89, 0x4894acd,
0x9f162d5, 0xf8410ef, 0x1b266a56, 0xd7f223, 0x3e0cb92, 0xe39b672, 0x6a2901a, 0x69a8556, 0x7e7c0,
0x9b7d8d3, 0x309a80, 0x1ad05f7f, 0xc2fb5dd, 0xcbfd41d, 0x9ceb638, 0x1051825c, 0xda0cf5b, 0x812e881,
0x6f35669, 0x6a56f2c, 0x1df8d184, 0x345820, 0x1477d477, 0x1645db1, 0xbe80c51, 0xc22be3e, 0xe35e65a,
0x1aeb7aa0, 0xc375315, 0xf67bc99, 0x7fdd7b9, 0x191fc1be, 0x61235d, 0x2c184e9, 0x1c5a839, 0x47a1e26,
0xb7cb456, 0x93e225d, 0x14f3c6ed, 0xccc1ac9, 0x17fe37f3, 0x4988989, 0x1a90c502, 0x2f32042, 0xa17769b,
0xafd8c7c, 0x8191c6e, 0x1dcdb237, 0x16200c0, 0x107b32a1, 0x66c08db, 0x10d06a02, 0x3fc93, 0x5620023,
0x16722b27, 0x68b5c59, 0x270fcfc, 0xfad0ecc, 0xe5de1c2, 0xeab466b, 0x2fc513c, 0x407f75c, 0xbaab133,
0x9705fe9, 0xb88b8e7, 0x734c993, 0x1e1ff8f, 0x19156970, 0xabd0f00, 0x10469ea7, 0x3293ac0, 0xcdc98aa,
0x1d843fd, 0xe14bfe8, 0x15be825f, 0x8b5212, 0xeb3fb67, 0x81cbd29, 0xbc62f16, 0x2b6fcc7, 0xf5a4e29,
0x13560b66, 0xc0b6ac2, 0x51ae690, 0xd41e271, 0xf3e9bd4, 0x1d70aab, 0x1029f72, 0x73e1c35, 0xee70fbc,
0xad81baf, 0x9ecc49a, 0x86c741e, 0xfe6be30, 0x176752e7, 0x23d416, 0x1f83de85, 0x27de188, 0x66f70b8,
0x181cd51f, 0x96b6e4c, 0x188f2335, 0xa5df759, 0x17a77eb6, 0xfeb0e73, 0x154ae914, 0x2f3ec51, 0x3826b59,
0xb91f17d, 0x1c72949, 0x1362bf0a, 0xe23fddf, 0xa5614b0, 0xf7d8f, 0x79061, 0x823d9d2, 0x8213f39,
0x1128ae0b, 0xd095d05, 0xb85c0c2, 0x1ecb2ef, 0x24ddc84, 0xe35e901, 0x18411a4a, 0xf5ddc3d, 0x3786689,
0x52260e8, 0x5ae3564, 0x542b10d, 0x8d93a45, 0x19952aa4, 0x996cc41, 0x1051a729, 0x4be3499, 0x52b23aa,
0x109f307e, 0x6f5b6bb, 0x1f84e1e7, 0x77a0cfa, 0x10c4df3f, 0x25a02ea, 0xb048035, 0xe31de66, 0xc6ecaa3,
0x28ea335, 0x2886024, 0x1372f020, 0xf55d35, 0x15e4684c, 0xf2a9e17, 0x1a4a7529, 0xcb7beb1, 0xb2a78a1,
0x1ab21f1f, 0x6361ccf, 0x6c9179d, 0xb135627, 0x1267b974, 0x4408bad, 0x1cbff658, 0xe3d6511, 0xc7d76f,
0x1cc7a69, 0xe7ee31b, 0x54fab4f, 0x2b914f, 0x1ad27a30, 0xcd3579e, 0xc50124c, 0x50daa90, 0xb13f72,
0xb06aa75, 0x70f5cc6, 0x1649e5aa, 0x84a5312, 0x329043c, 0x41c4011, 0x13d32411, 0xb04a838, 0xd760d2d,
0x1713b532, 0xbaa0c03, 0x84022ab, 0x6bcf5c1, 0x2f45379, 0x18ae070, 0x18c9e11e, 0x20bca9a, 0x66f496b,
0x3eef294, 0x67500d2, 0xd7f613c, 0x2dbbeb, 0xb741038, 0xe04133f, 0x1582968d, 0xbe985f7, 0x1acbc1a,
0x1a6a939f, 0x33e50f6, 0xd665ed4, 0xb4b7bd6, 0x1e5a3799, 0x6b33847, 0x17fa56ff, 0x65ef930, 0x21dc4a,
0x2b37659, 0x450fe17, 0xb357b65, 0xdf5efac, 0x15397bef, 0x9d35a7f, 0x112ac15f, 0x624e62e, 0xa90ae2f,
0x107eecd2, 0x1f69bbe, 0x77d6bce, 0x5741394, 0x13c684fc, 0x950c910, 0x725522b, 0xdc78583, 0x40eeabb,
0x1fde328a, 0xbd61d96, 0xd28c387, 0x9e77d89, 0x12550c40, 0x759cb7d, 0x367ef34, 0xae2a960, 0x91b8bdc,
0x93462a9, 0xf469ef, 0xb2e9aef, 0xd2ca771, 0x54e1f42, 0x7aaa49, 0x6316abb, 0x2413c8e, 0x5425bf9,
0x1bed3e3a, 0xf272274, 0x1f5e7326, 0x6416517, 0xea27072, 0x9cedea7, 0x6e7633, 0x7c91952, 0xd806dce,
0x8e2a7e1, 0xe421e1a, 0x418c9e1, 0x1dbc890, 0x1b395c36, 0xa1dc175, 0x1dc4ef73, 0x8956f34, 0xe4b5cf2,
0x1b0d3a18, 0x3194a36, 0x6c2641f, 0xe44124c, 0xa2f4eaa, 0xa8c25ba, 0xf927ed7, 0x627b614, 0x7371cca,
0xba16694, 0x417bc03, 0x7c0a7e3, 0x9c35c19, 0x1168a205, 0x8b6b00d, 0x10e3edc9, 0x9c19bf2, 0x5882229,
0x1b2b4162, 0xa5cef1a, 0x1543622b, 0x9bd433e, 0x364e04d, 0x7480792, 0x5c9b5b3, 0xe85ff25, 0x408ef57,
0x1814cfa4, 0x121b41b, 0xd248a0f, 0x3b05222, 0x39bb16a, 0xc75966d, 0xa038113, 0xa4a1769, 0x11fbc6c,
0x917e50e, 0xeec3da8, 0x169d6eac, 0x10c1699, 0xa416153, 0xf724912, 0x15cd60b7, 0x4acbad9, 0x5efc5fa,
0xf150ed7, 0x122b51, 0x1104b40a, 0xcb7f442, 0xfbb28ff, 0x6ac53ca, 0x196142cc, 0x7bf0fa9, 0x957651,
0x4e0f215, 0xed439f8, 0x3f46bd5, 0x5ace82f, 0x110916b6, 0x6db078, 0xffd7d57, 0xf2ecaac, 0xca86dec,
0x15d6b2da, 0x965ecc9, 0x1c92b4c2, 0x1f3811, 0x1cb080f5, 0x2d8b804, 0x19d1c12d, 0xf20bd46, 0x1951fa7,
0xa3656c3, 0x523a425, 0xfcd0692, 0xd44ddc8, 0x131f0f5b, 0xaf80e4a, 0xcd9fc74, 0x99bb618, 0x2db944c,
0xa673090, 0x1c210e1, 0x178c8d23, 0x1474383, 0x10b8743d, 0x985a55b, 0x2e74779, 0x576138, 0x9587927,
0x133130fa, 0xbe05516, 0x9f4d619, 0xbb62570, 0x99ec591, 0xd9468fe, 0x1d07782d, 0xfc72e0b, 0x701b298,
0x1863863b, 0x85954b8, 0x121a0c36, 0x9e7fedf, 0xf64b429, 0x9b9d71e, 0x14e2f5d8, 0xf858d3a, 0x942eea8,
0xda5b765, 0x6edafff, 0xa9d18cc, 0xc65e4ba, 0x1c747e86, 0xe4ea915, 0x1981d7a1, 0x8395659, 0x52ed4e2,
0x87d43b7, 0x37ab11b, 0x19d292ce, 0xf8d4692, 0x18c3053f, 0x8863e13, 0x4c146c0, 0x6bdf55a, 0x4e4457d,
0x16152289, 0xac78ec2, 0x1a59c5a2, 0x2028b97, 0x71c2d01, 0x295851f, 0x404747b, 0x878558d, 0x7d29aa4,
0x13d8341f, 0x8daefd7, 0x139c972d, 0x6b7ea75, 0xd4a9dde, 0xff163d8, 0x81d55d7, 0xa5bef68, 0xb7b30d8,
0xbe73d6f, 0xaa88141, 0xd976c81, 0x7e7a9cc, 0x18beb771, 0xd773cbd, 0x13f51951, 0x9d0c177, 0x1c49a78,
};
/* Field element operations: */
/* NON_ZERO_TO_ALL_ONES returns:
* 0xffffffff for 0 < x <= 2**31
* 0 for x == 0 or x > 2**31.
*
* x must be a u32 or an equivalent type such as limb. */
#define NON_ZERO_TO_ALL_ONES(x) ((((u32)(x) - 1) >> 31) - 1)
/* felem_reduce_carry adds a multiple of p in order to cancel |carry|,
* which is a term at 2**257.
*
* On entry: carry < 2**3, inout[0,2,...] < 2**29, inout[1,3,...] < 2**28.
* On exit: inout[0,2,..] < 2**30, inout[1,3,...] < 2**29. */
static void felem_reduce_carry(felem inout, limb carry) {
const u32 carry_mask = NON_ZERO_TO_ALL_ONES(carry);
inout[0] += carry << 1;
inout[3] += 0x10000000 & carry_mask;
/* carry < 2**3 thus (carry << 11) < 2**14 and we added 2**28 in the
* previous line therefore this doesn't underflow. */
inout[3] -= carry << 11;
inout[4] += (0x20000000 - 1) & carry_mask;
inout[5] += (0x10000000 - 1) & carry_mask;
inout[6] += (0x20000000 - 1) & carry_mask;
inout[6] -= carry << 22;
/* This may underflow if carry is non-zero but, if so, we'll fix it in the
* next line. */
inout[7] -= 1 & carry_mask;
inout[7] += carry << 25;
}
/* felem_sum sets out = in+in2.
*
* On entry, in[i]+in2[i] must not overflow a 32-bit word.
* On exit: out[0,2,...] < 2**30, out[1,3,...] < 2**29 */
static void felem_sum(felem out, const felem in, const felem in2) {
limb carry = 0;
unsigned i;
for (i = 0;; i++) {
out[i] = in[i] + in2[i];
out[i] += carry;
carry = out[i] >> 29;
out[i] &= kBottom29Bits;
i++;
if (i == NLIMBS)
break;
out[i] = in[i] + in2[i];
out[i] += carry;
carry = out[i] >> 28;
out[i] &= kBottom28Bits;
}
felem_reduce_carry(out, carry);
}
#define two31m3 (((limb)1) << 31) - (((limb)1) << 3)
#define two30m2 (((limb)1) << 30) - (((limb)1) << 2)
#define two30p13m2 (((limb)1) << 30) + (((limb)1) << 13) - (((limb)1) << 2)
#define two31m2 (((limb)1) << 31) - (((limb)1) << 2)
#define two31p24m2 (((limb)1) << 31) + (((limb)1) << 24) - (((limb)1) << 2)
#define two30m27m2 (((limb)1) << 30) - (((limb)1) << 27) - (((limb)1) << 2)
/* zero31 is 0 mod p. */
static const felem zero31 = { two31m3, two30m2, two31m2, two30p13m2, two31m2, two30m2, two31p24m2, two30m27m2, two31m2 };
/* felem_diff sets out = in-in2.
*
* On entry: in[0,2,...] < 2**30, in[1,3,...] < 2**29 and
* in2[0,2,...] < 2**30, in2[1,3,...] < 2**29.
* On exit: out[0,2,...] < 2**30, out[1,3,...] < 2**29. */
static void felem_diff(felem out, const felem in, const felem in2) {
limb carry = 0;
unsigned i;
for (i = 0;; i++) {
out[i] = in[i] - in2[i];
out[i] += zero31[i];
out[i] += carry;
carry = out[i] >> 29;
out[i] &= kBottom29Bits;
i++;
if (i == NLIMBS)
break;
out[i] = in[i] - in2[i];
out[i] += zero31[i];
out[i] += carry;
carry = out[i] >> 28;
out[i] &= kBottom28Bits;
}
felem_reduce_carry(out, carry);
}
/* felem_reduce_degree sets out = tmp/R mod p where tmp contains 64-bit words
* with the same 29,28,... bit positions as an felem.
*
* The values in felems are in Montgomery form: x*R mod p where R = 2**257.
* Since we just multiplied two Montgomery values together, the result is
* x*y*R*R mod p. We wish to divide by R in order for the result also to be
* in Montgomery form.
*
* On entry: tmp[i] < 2**64
* On exit: out[0,2,...] < 2**30, out[1,3,...] < 2**29 */
static void felem_reduce_degree(felem out, u64 tmp[17]) {
/* The following table may be helpful when reading this code:
*
* Limb number: 0 | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10...
* Width (bits): 29| 28| 29| 28| 29| 28| 29| 28| 29| 28| 29
* Start bit: 0 | 29| 57| 86|114|143|171|200|228|257|285
* (odd phase): 0 | 28| 57| 85|114|142|171|199|228|256|285 */
limb tmp2[18], carry, x, xMask;
unsigned i;
/* tmp contains 64-bit words with the same 29,28,29-bit positions as an
* felem. So the top of an element of tmp might overlap with another
* element two positions down. The following loop eliminates this
* overlap. */
tmp2[0] = (limb)(tmp[0] & kBottom29Bits);
/* In the following we use "(limb) tmp[x]" and "(limb) (tmp[x]>>32)" to try
* and hint to the compiler that it can do a single-word shift by selecting
* the right register rather than doing a double-word shift and truncating
* afterwards. */
tmp2[1] = ((limb) tmp[0]) >> 29;
tmp2[1] |= (((limb)(tmp[0] >> 32)) << 3) & kBottom28Bits;
tmp2[1] += ((limb) tmp[1]) & kBottom28Bits;
carry = tmp2[1] >> 28;
tmp2[1] &= kBottom28Bits;
for (i = 2; i < 17; i++) {
tmp2[i] = ((limb)(tmp[i - 2] >> 32)) >> 25;
tmp2[i] += ((limb)(tmp[i - 1])) >> 28;
tmp2[i] += (((limb)(tmp[i - 1] >> 32)) << 4) & kBottom29Bits;
tmp2[i] += ((limb) tmp[i]) & kBottom29Bits;
tmp2[i] += carry;
carry = tmp2[i] >> 29;
tmp2[i] &= kBottom29Bits;
i++;
if (i == 17)
break;
tmp2[i] = ((limb)(tmp[i - 2] >> 32)) >> 25;
tmp2[i] += ((limb)(tmp[i - 1])) >> 29;
tmp2[i] += (((limb)(tmp[i - 1] >> 32)) << 3) & kBottom28Bits;
tmp2[i] += ((limb) tmp[i]) & kBottom28Bits;
tmp2[i] += carry;
carry = tmp2[i] >> 28;
tmp2[i] &= kBottom28Bits;
}
tmp2[17] = ((limb)(tmp[15] >> 32)) >> 25;
tmp2[17] += ((limb)(tmp[16])) >> 29;
tmp2[17] += (((limb)(tmp[16] >> 32)) << 3);
tmp2[17] += carry;
/* Montgomery elimination of terms.
*
* Since R is 2**257, we can divide by R with a bitwise shift if we can
* ensure that the right-most 257 bits are all zero. We can make that true by
* adding multiplies of p without affecting the value.
*
* So we eliminate limbs from right to left. Since the bottom 29 bits of p
* are all ones, then by adding tmp2[0]*p to tmp2 we'll make tmp2[0] == 0.
* We can do that for 8 further limbs and then right shift to eliminate the
* extra factor of R. */
for (i = 0;; i += 2) {
tmp2[i + 1] += tmp2[i] >> 29;
x = tmp2[i] & kBottom29Bits;
xMask = NON_ZERO_TO_ALL_ONES(x);
tmp2[i] = 0;
/* The bounds calculations for this loop are tricky. Each iteration of
* the loop eliminates two words by adding values to words to their
* right.
*
* The following table contains the amounts added to each word (as an
* offset from the value of i at the top of the loop). The amounts are
* accounted for from the first and second half of the loop separately
* and are written as, for example, 28 to mean a value <2**28.
*
* Word: 3 4 5 6 7 8 9 10
* Added in top half: 28 11 29 21 29 28
* 28 29
* 29
* Added in bottom half: 29 10 28 21 28 28
* 29
*
* The value that is currently offset 7 will be offset 5 for the next
* iteration and then offset 3 for the iteration after that. Therefore
* the total value added will be the values added at 7, 5 and 3.
*
* The following table accumulates these values. The sums at the bottom
* are written as, for example, 29+28, to mean a value < 2**29+2**28.
*
* Word: 3 4 5 6 7 8 9 10 11 12 13
* 28 11 10 29 21 29 28 28 28 28 28
* 29 28 11 28 29 28 29 28 29 28
* 29 28 21 21 29 21 29 21
* 10 29 28 21 28 21 28
* 28 29 28 29 28 29 28
* 11 10 29 10 29 10
* 29 28 11 28 11
* 29 29
* --------------------------------------------
* 30+ 31+ 30+ 31+ 30+
* 28+ 29+ 28+ 29+ 21+
* 21+ 28+ 21+ 28+ 10
* 10 21+ 10 21+
* 11 11
*
* So the greatest amount is added to tmp2[10] and tmp2[12]. If
* tmp2[10/12] has an initial value of <2**29, then the maximum value
* will be < 2**31 + 2**30 + 2**28 + 2**21 + 2**11, which is < 2**32,
* as required. */
tmp2[i + 3] += (x << 10) & kBottom28Bits;
tmp2[i + 4] += (x >> 18);
tmp2[i + 6] += (x << 21) & kBottom29Bits;
tmp2[i + 7] += x >> 8;
/* At position 200, which is the starting bit position for word 7, we
* have a factor of 0xf000000 = 2**28 - 2**24. */
tmp2[i + 7] += 0x10000000 & xMask;
/* Word 7 is 28 bits wide, so the 2**28 term exactly hits word 8. */
tmp2[i + 8] += (x - 1) & xMask;
tmp2[i + 7] -= (x << 24) & kBottom28Bits;
tmp2[i + 8] -= x >> 4;
tmp2[i + 8] += 0x20000000 & xMask;
tmp2[i + 8] -= x;
tmp2[i + 8] += (x << 28) & kBottom29Bits;
tmp2[i + 9] += ((x >> 1) - 1) & xMask;
if (i+1 == NLIMBS)
break;
tmp2[i + 2] += tmp2[i + 1] >> 28;
x = tmp2[i + 1] & kBottom28Bits;
xMask = NON_ZERO_TO_ALL_ONES(x);
tmp2[i + 1] = 0;
tmp2[i + 4] += (x << 11) & kBottom29Bits;
tmp2[i + 5] += (x >> 18);
tmp2[i + 7] += (x << 21) & kBottom28Bits;
tmp2[i + 8] += x >> 7;
/* At position 199, which is the starting bit of the 8th word when
* dealing with a context starting on an odd word, we have a factor of
* 0x1e000000 = 2**29 - 2**25. Since we have not updated i, the 8th
* word from i+1 is i+8. */
tmp2[i + 8] += 0x20000000 & xMask;
tmp2[i + 9] += (x - 1) & xMask;
tmp2[i + 8] -= (x << 25) & kBottom29Bits;
tmp2[i + 9] -= x >> 4;
tmp2[i + 9] += 0x10000000 & xMask;
tmp2[i + 9] -= x;
tmp2[i + 10] += (x - 1) & xMask;
}
/* We merge the right shift with a carry chain. The words above 2**257 have
* widths of 28,29,... which we need to correct when copying them down. */
carry = 0;
for (i = 0; i < 8; i++) {
/* The maximum value of tmp2[i + 9] occurs on the first iteration and
* is < 2**30+2**29+2**28. Adding 2**29 (from tmp2[i + 10]) is
* therefore safe. */
out[i] = tmp2[i + 9];
out[i] += carry;
out[i] += (tmp2[i + 10] << 28) & kBottom29Bits;
carry = out[i] >> 29;
out[i] &= kBottom29Bits;
i++;
out[i] = tmp2[i + 9] >> 1;
out[i] += carry;
carry = out[i] >> 28;
out[i] &= kBottom28Bits;
}
out[8] = tmp2[17];
out[8] += carry;
carry = out[8] >> 29;
out[8] &= kBottom29Bits;
felem_reduce_carry(out, carry);
}
/* felem_square sets out=in*in.
*
* On entry: in[0,2,...] < 2**30, in[1,3,...] < 2**29.
* On exit: out[0,2,...] < 2**30, out[1,3,...] < 2**29. */
static void felem_square(felem out, const felem in) {
u64 tmp[17];
tmp[0] = ((u64) in[0]) * in[0];
tmp[1] = ((u64) in[0]) * (in[1] << 1);
tmp[2] = ((u64) in[0]) * (in[2] << 1) +
((u64) in[1]) * (in[1] << 1);
tmp[3] = ((u64) in[0]) * (in[3] << 1) +
((u64) in[1]) * (in[2] << 1);
tmp[4] = ((u64) in[0]) * (in[4] << 1) +
((u64) in[1]) * (in[3] << 2) + ((u64) in[2]) * in[2];
tmp[5] = ((u64) in[0]) * (in[5] << 1) + ((u64) in[1]) *
(in[4] << 1) + ((u64) in[2]) * (in[3] << 1);
tmp[6] = ((u64) in[0]) * (in[6] << 1) + ((u64) in[1]) *
(in[5] << 2) + ((u64) in[2]) * (in[4] << 1) +
((u64) in[3]) * (in[3] << 1);
tmp[7] = ((u64) in[0]) * (in[7] << 1) + ((u64) in[1]) *
(in[6] << 1) + ((u64) in[2]) * (in[5] << 1) +
((u64) in[3]) * (in[4] << 1);
/* tmp[8] has the greatest value of 2**61 + 2**60 + 2**61 + 2**60 + 2**60,
* which is < 2**64 as required. */
tmp[8] = ((u64) in[0]) * (in[8] << 1) + ((u64) in[1]) *
(in[7] << 2) + ((u64) in[2]) * (in[6] << 1) +
((u64) in[3]) * (in[5] << 2) + ((u64) in[4]) * in[4];
tmp[9] = ((u64) in[1]) * (in[8] << 1) + ((u64) in[2]) *
(in[7] << 1) + ((u64) in[3]) * (in[6] << 1) +
((u64) in[4]) * (in[5] << 1);
tmp[10] = ((u64) in[2]) * (in[8] << 1) + ((u64) in[3]) *
(in[7] << 2) + ((u64) in[4]) * (in[6] << 1) +
((u64) in[5]) * (in[5] << 1);
tmp[11] = ((u64) in[3]) * (in[8] << 1) + ((u64) in[4]) *
(in[7] << 1) + ((u64) in[5]) * (in[6] << 1);
tmp[12] = ((u64) in[4]) * (in[8] << 1) +
((u64) in[5]) * (in[7] << 2) + ((u64) in[6]) * in[6];
tmp[13] = ((u64) in[5]) * (in[8] << 1) +
((u64) in[6]) * (in[7] << 1);
tmp[14] = ((u64) in[6]) * (in[8] << 1) +
((u64) in[7]) * (in[7] << 1);
tmp[15] = ((u64) in[7]) * (in[8] << 1);
tmp[16] = ((u64) in[8]) * in[8];
felem_reduce_degree(out, tmp);
}
/* felem_mul sets out=in*in2.
*
* On entry: in[0,2,...] < 2**30, in[1,3,...] < 2**29 and
* in2[0,2,...] < 2**30, in2[1,3,...] < 2**29.
* On exit: out[0,2,...] < 2**30, out[1,3,...] < 2**29. */
static void felem_mul(felem out, const felem in, const felem in2) {
u64 tmp[17];
tmp[0] = ((u64) in[0]) * in2[0];
tmp[1] = ((u64) in[0]) * (in2[1] << 0) +
((u64) in[1]) * (in2[0] << 0);
tmp[2] = ((u64) in[0]) * (in2[2] << 0) + ((u64) in[1]) *
(in2[1] << 1) + ((u64) in[2]) * (in2[0] << 0);
tmp[3] = ((u64) in[0]) * (in2[3] << 0) + ((u64) in[1]) *
(in2[2] << 0) + ((u64) in[2]) * (in2[1] << 0) +
((u64) in[3]) * (in2[0] << 0);
tmp[4] = ((u64) in[0]) * (in2[4] << 0) + ((u64) in[1]) *
(in2[3] << 1) + ((u64) in[2]) * (in2[2] << 0) +
((u64) in[3]) * (in2[1] << 1) +
((u64) in[4]) * (in2[0] << 0);
tmp[5] = ((u64) in[0]) * (in2[5] << 0) + ((u64) in[1]) *
(in2[4] << 0) + ((u64) in[2]) * (in2[3] << 0) +
((u64) in[3]) * (in2[2] << 0) + ((u64) in[4]) *
(in2[1] << 0) + ((u64) in[5]) * (in2[0] << 0);
tmp[6] = ((u64) in[0]) * (in2[6] << 0) + ((u64) in[1]) *
(in2[5] << 1) + ((u64) in[2]) * (in2[4] << 0) +
((u64) in[3]) * (in2[3] << 1) + ((u64) in[4]) *
(in2[2] << 0) + ((u64) in[5]) * (in2[1] << 1) +
((u64) in[6]) * (in2[0] << 0);
tmp[7] = ((u64) in[0]) * (in2[7] << 0) + ((u64) in[1]) *
(in2[6] << 0) + ((u64) in[2]) * (in2[5] << 0) +
((u64) in[3]) * (in2[4] << 0) + ((u64) in[4]) *
(in2[3] << 0) + ((u64) in[5]) * (in2[2] << 0) +
((u64) in[6]) * (in2[1] << 0) +
((u64) in[7]) * (in2[0] << 0);
/* tmp[8] has the greatest value but doesn't overflow. See logic in
* felem_square. */
tmp[8] = ((u64) in[0]) * (in2[8] << 0) + ((u64) in[1]) *
(in2[7] << 1) + ((u64) in[2]) * (in2[6] << 0) +
((u64) in[3]) * (in2[5] << 1) + ((u64) in[4]) *
(in2[4] << 0) + ((u64) in[5]) * (in2[3] << 1) +
((u64) in[6]) * (in2[2] << 0) + ((u64) in[7]) *
(in2[1] << 1) + ((u64) in[8]) * (in2[0] << 0);
tmp[9] = ((u64) in[1]) * (in2[8] << 0) + ((u64) in[2]) *
(in2[7] << 0) + ((u64) in[3]) * (in2[6] << 0) +
((u64) in[4]) * (in2[5] << 0) + ((u64) in[5]) *
(in2[4] << 0) + ((u64) in[6]) * (in2[3] << 0) +
((u64) in[7]) * (in2[2] << 0) +
((u64) in[8]) * (in2[1] << 0);
tmp[10] = ((u64) in[2]) * (in2[8] << 0) + ((u64) in[3]) *
(in2[7] << 1) + ((u64) in[4]) * (in2[6] << 0) +
((u64) in[5]) * (in2[5] << 1) + ((u64) in[6]) *
(in2[4] << 0) + ((u64) in[7]) * (in2[3] << 1) +
((u64) in[8]) * (in2[2] << 0);
tmp[11] = ((u64) in[3]) * (in2[8] << 0) + ((u64) in[4]) *
(in2[7] << 0) + ((u64) in[5]) * (in2[6] << 0) +
((u64) in[6]) * (in2[5] << 0) + ((u64) in[7]) *
(in2[4] << 0) + ((u64) in[8]) * (in2[3] << 0);
tmp[12] = ((u64) in[4]) * (in2[8] << 0) + ((u64) in[5]) *
(in2[7] << 1) + ((u64) in[6]) * (in2[6] << 0) +
((u64) in[7]) * (in2[5] << 1) +
((u64) in[8]) * (in2[4] << 0);
tmp[13] = ((u64) in[5]) * (in2[8] << 0) + ((u64) in[6]) *
(in2[7] << 0) + ((u64) in[7]) * (in2[6] << 0) +
((u64) in[8]) * (in2[5] << 0);
tmp[14] = ((u64) in[6]) * (in2[8] << 0) + ((u64) in[7]) *
(in2[7] << 1) + ((u64) in[8]) * (in2[6] << 0);
tmp[15] = ((u64) in[7]) * (in2[8] << 0) +
((u64) in[8]) * (in2[7] << 0);
tmp[16] = ((u64) in[8]) * (in2[8] << 0);
felem_reduce_degree(out, tmp);
}
static void felem_assign(felem out, const felem in) {
memcpy(out, in, sizeof(felem));
}
/* felem_inv calculates |out| = |in|^{-1}
*
* Based on Fermat's Little Theorem:
* a^p = a (mod p)
* a^{p-1} = 1 (mod p)
* a^{p-2} = a^{-1} (mod p)
*/
static void felem_inv(felem out, const felem in) {
felem ftmp, ftmp2;
/* each e_I will hold |in|^{2^I - 1} */
felem e2, e4, e8, e16, e32, e64;
unsigned i;
felem_square(ftmp, in); /* 2^1 */
felem_mul(ftmp, in, ftmp); /* 2^2 - 2^0 */
felem_assign(e2, ftmp);
felem_square(ftmp, ftmp); /* 2^3 - 2^1 */
felem_square(ftmp, ftmp); /* 2^4 - 2^2 */
felem_mul(ftmp, ftmp, e2); /* 2^4 - 2^0 */
felem_assign(e4, ftmp);
felem_square(ftmp, ftmp); /* 2^5 - 2^1 */
felem_square(ftmp, ftmp); /* 2^6 - 2^2 */
felem_square(ftmp, ftmp); /* 2^7 - 2^3 */
felem_square(ftmp, ftmp); /* 2^8 - 2^4 */
felem_mul(ftmp, ftmp, e4); /* 2^8 - 2^0 */
felem_assign(e8, ftmp);
for (i = 0; i < 8; i++) {
felem_square(ftmp, ftmp);
} /* 2^16 - 2^8 */
felem_mul(ftmp, ftmp, e8); /* 2^16 - 2^0 */
felem_assign(e16, ftmp);
for (i = 0; i < 16; i++) {
felem_square(ftmp, ftmp);
} /* 2^32 - 2^16 */
felem_mul(ftmp, ftmp, e16); /* 2^32 - 2^0 */
felem_assign(e32, ftmp);
for (i = 0; i < 32; i++) {
felem_square(ftmp, ftmp);
} /* 2^64 - 2^32 */
felem_assign(e64, ftmp);
felem_mul(ftmp, ftmp, in); /* 2^64 - 2^32 + 2^0 */
for (i = 0; i < 192; i++) {
felem_square(ftmp, ftmp);
} /* 2^256 - 2^224 + 2^192 */
felem_mul(ftmp2, e64, e32); /* 2^64 - 2^0 */
for (i = 0; i < 16; i++) {
felem_square(ftmp2, ftmp2);
} /* 2^80 - 2^16 */
felem_mul(ftmp2, ftmp2, e16); /* 2^80 - 2^0 */
for (i = 0; i < 8; i++) {
felem_square(ftmp2, ftmp2);
} /* 2^88 - 2^8 */
felem_mul(ftmp2, ftmp2, e8); /* 2^88 - 2^0 */
for (i = 0; i < 4; i++) {
felem_square(ftmp2, ftmp2);
} /* 2^92 - 2^4 */
felem_mul(ftmp2, ftmp2, e4); /* 2^92 - 2^0 */
felem_square(ftmp2, ftmp2); /* 2^93 - 2^1 */
felem_square(ftmp2, ftmp2); /* 2^94 - 2^2 */
felem_mul(ftmp2, ftmp2, e2); /* 2^94 - 2^0 */
felem_square(ftmp2, ftmp2); /* 2^95 - 2^1 */
felem_square(ftmp2, ftmp2); /* 2^96 - 2^2 */
felem_mul(ftmp2, ftmp2, in); /* 2^96 - 3 */
felem_mul(out, ftmp2, ftmp); /* 2^256 - 2^224 + 2^192 + 2^96 - 3 */
}
/* felem_scalar_3 sets out=3*out.
*
* On entry: out[0,2,...] < 2**30, out[1,3,...] < 2**29.
* On exit: out[0,2,...] < 2**30, out[1,3,...] < 2**29. */
static void felem_scalar_3(felem out) {
limb carry = 0;
unsigned i;
for (i = 0;; i++) {
out[i] *= 3;
out[i] += carry;
carry = out[i] >> 29;
out[i] &= kBottom29Bits;
i++;
if (i == NLIMBS)
break;
out[i] *= 3;
out[i] += carry;
carry = out[i] >> 28;
out[i] &= kBottom28Bits;
}
felem_reduce_carry(out, carry);
}
/* felem_scalar_4 sets out=4*out.
*
* On entry: out[0,2,...] < 2**30, out[1,3,...] < 2**29.
* On exit: out[0,2,...] < 2**30, out[1,3,...] < 2**29. */
static void felem_scalar_4(felem out) {
limb carry = 0, next_carry;
unsigned i;
for (i = 0;; i++) {
next_carry = out[i] >> 27;
out[i] <<= 2;
out[i] &= kBottom29Bits;
out[i] += carry;
carry = next_carry + (out[i] >> 29);
out[i] &= kBottom29Bits;
i++;
if (i == NLIMBS)
break;
next_carry = out[i] >> 26;
out[i] <<= 2;
out[i] &= kBottom28Bits;
out[i] += carry;
carry = next_carry + (out[i] >> 28);
out[i] &= kBottom28Bits;
}
felem_reduce_carry(out, carry);
}
/* felem_scalar_8 sets out=8*out.
*
* On entry: out[0,2,...] < 2**30, out[1,3,...] < 2**29.
* On exit: out[0,2,...] < 2**30, out[1,3,...] < 2**29. */
static void felem_scalar_8(felem out) {
limb carry = 0, next_carry;
unsigned i;
for (i = 0;; i++) {
next_carry = out[i] >> 26;
out[i] <<= 3;
out[i] &= kBottom29Bits;
out[i] += carry;
carry = next_carry + (out[i] >> 29);
out[i] &= kBottom29Bits;
i++;
if (i == NLIMBS)
break;
next_carry = out[i] >> 25;
out[i] <<= 3;
out[i] &= kBottom28Bits;
out[i] += carry;
carry = next_carry + (out[i] >> 28);
out[i] &= kBottom28Bits;
}
felem_reduce_carry(out, carry);
}
/* felem_is_zero_vartime returns 1 iff |in| == 0. It takes a variable amount of
* time depending on the value of |in|. */
static char felem_is_zero_vartime(const felem in) {
limb carry;
int i;
limb tmp[NLIMBS];
felem_assign(tmp, in);
/* First, reduce tmp to a minimal form. */
do {
carry = 0;
for (i = 0;; i++) {
tmp[i] += carry;
carry = tmp[i] >> 29;
tmp[i] &= kBottom29Bits;
i++;
if (i == NLIMBS)
break;
tmp[i] += carry;
carry = tmp[i] >> 28;
tmp[i] &= kBottom28Bits;
}
felem_reduce_carry(tmp, carry);
} while (carry);
/* tmp < 2**257, so the only possible zero values are 0, p and 2p. */
return memcmp(tmp, kZero, sizeof(tmp)) == 0 ||
memcmp(tmp, kP, sizeof(tmp)) == 0 ||
memcmp(tmp, k2P, sizeof(tmp)) == 0;
}
/* Group operations:
*
* Elements of the elliptic curve group are represented in Jacobian
* coordinates: (x, y, z). An affine point (x', y') is x'=x/z**2, y'=y/z**3 in
* Jacobian form. */
/* point_double sets {x_out,y_out,z_out} = 2*{x,y,z}.
*
* See http://www.hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-0.html#doubling-dbl-2009-l */
static void point_double(felem x_out, felem y_out, felem z_out, const felem x,
const felem y, const felem z) {
felem delta, gamma, alpha, beta, tmp, tmp2;
felem_square(delta, z);
felem_square(gamma, y);
felem_mul(beta, x, gamma);
felem_sum(tmp, x, delta);
felem_diff(tmp2, x, delta);
felem_mul(alpha, tmp, tmp2);
felem_scalar_3(alpha);
felem_sum(tmp, y, z);
felem_square(tmp, tmp);
felem_diff(tmp, tmp, gamma);
felem_diff(z_out, tmp, delta);
felem_scalar_4(beta);
felem_square(x_out, alpha);
felem_diff(x_out, x_out, beta);
felem_diff(x_out, x_out, beta);
felem_diff(tmp, beta, x_out);
felem_mul(tmp, alpha, tmp);
felem_square(tmp2, gamma);
felem_scalar_8(tmp2);
felem_diff(y_out, tmp, tmp2);
}
/* point_add_mixed sets {x_out,y_out,z_out} = {x1,y1,z1} + {x2,y2,1}.
* (i.e. the second point is affine.)
*
* See http://www.hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-0.html#addition-add-2007-bl
*
* Note that this function does not handle P+P, infinity+P nor P+infinity
* correctly. */
static void point_add_mixed(felem x_out, felem y_out, felem z_out,
const felem x1, const felem y1, const felem z1,
const felem x2, const felem y2) {
felem z1z1, z1z1z1, s2, u2, h, i, j, r, rr, v, tmp;
felem_square(z1z1, z1);
felem_sum(tmp, z1, z1);
felem_mul(u2, x2, z1z1);
felem_mul(z1z1z1, z1, z1z1);
felem_mul(s2, y2, z1z1z1);
felem_diff(h, u2, x1);
felem_sum(i, h, h);
felem_square(i, i);
felem_mul(j, h, i);
felem_diff(r, s2, y1);
felem_sum(r, r, r);
felem_mul(v, x1, i);
felem_mul(z_out, tmp, h);
felem_square(rr, r);
felem_diff(x_out, rr, j);
felem_diff(x_out, x_out, v);
felem_diff(x_out, x_out, v);
felem_diff(tmp, v, x_out);
felem_mul(y_out, tmp, r);
felem_mul(tmp, y1, j);
felem_diff(y_out, y_out, tmp);
felem_diff(y_out, y_out, tmp);
}
/* point_add sets {x_out,y_out,z_out} = {x1,y1,z1} + {x2,y2,z2}.
*
* See http://www.hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-0.html#addition-add-2007-bl
*
* Note that this function does not handle P+P, infinity+P nor P+infinity
* correctly. */
static void point_add(felem x_out, felem y_out, felem z_out, const felem x1,
const felem y1, const felem z1, const felem x2,
const felem y2, const felem z2) {
felem z1z1, z1z1z1, z2z2, z2z2z2, s1, s2, u1, u2, h, i, j, r, rr, v, tmp;
felem_square(z1z1, z1);
felem_square(z2z2, z2);
felem_mul(u1, x1, z2z2);
felem_sum(tmp, z1, z2);
felem_square(tmp, tmp);
felem_diff(tmp, tmp, z1z1);
felem_diff(tmp, tmp, z2z2);
felem_mul(z2z2z2, z2, z2z2);
felem_mul(s1, y1, z2z2z2);
felem_mul(u2, x2, z1z1);
felem_mul(z1z1z1, z1, z1z1);
felem_mul(s2, y2, z1z1z1);
felem_diff(h, u2, u1);
felem_sum(i, h, h);
felem_square(i, i);
felem_mul(j, h, i);
felem_diff(r, s2, s1);
felem_sum(r, r, r);
felem_mul(v, u1, i);
felem_mul(z_out, tmp, h);
felem_square(rr, r);
felem_diff(x_out, rr, j);
felem_diff(x_out, x_out, v);
felem_diff(x_out, x_out, v);
felem_diff(tmp, v, x_out);
felem_mul(y_out, tmp, r);
felem_mul(tmp, s1, j);
felem_diff(y_out, y_out, tmp);
felem_diff(y_out, y_out, tmp);
}
/* point_add_or_double_vartime sets {x_out,y_out,z_out} = {x1,y1,z1} +
* {x2,y2,z2}.
*
* See http://www.hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-0.html#addition-add-2007-bl
*
* This function handles the case where {x1,y1,z1}={x2,y2,z2}. */
static void point_add_or_double_vartime(
felem x_out, felem y_out, felem z_out, const felem x1, const felem y1,
const felem z1, const felem x2, const felem y2, const felem z2) {
felem z1z1, z1z1z1, z2z2, z2z2z2, s1, s2, u1, u2, h, i, j, r, rr, v, tmp;
char x_equal, y_equal;
felem_square(z1z1, z1);
felem_square(z2z2, z2);
felem_mul(u1, x1, z2z2);
felem_sum(tmp, z1, z2);
felem_square(tmp, tmp);
felem_diff(tmp, tmp, z1z1);
felem_diff(tmp, tmp, z2z2);
felem_mul(z2z2z2, z2, z2z2);
felem_mul(s1, y1, z2z2z2);
felem_mul(u2, x2, z1z1);
felem_mul(z1z1z1, z1, z1z1);
felem_mul(s2, y2, z1z1z1);
felem_diff(h, u2, u1);
x_equal = felem_is_zero_vartime(h);
felem_sum(i, h, h);
felem_square(i, i);
felem_mul(j, h, i);
felem_diff(r, s2, s1);
y_equal = felem_is_zero_vartime(r);
if (x_equal && y_equal) {
point_double(x_out, y_out, z_out, x1, y1, z1);
return;
}
felem_sum(r, r, r);
felem_mul(v, u1, i);
felem_mul(z_out, tmp, h);
felem_square(rr, r);
felem_diff(x_out, rr, j);
felem_diff(x_out, x_out, v);
felem_diff(x_out, x_out, v);
felem_diff(tmp, v, x_out);
felem_mul(y_out, tmp, r);
felem_mul(tmp, s1, j);
felem_diff(y_out, y_out, tmp);
felem_diff(y_out, y_out, tmp);
}
/* copy_conditional sets out=in if mask = 0xffffffff in constant time.
*
* On entry: mask is either 0 or 0xffffffff. */
static void copy_conditional(felem out, const felem in, limb mask) {
int i;
for (i = 0; i < NLIMBS; i++) {
const limb tmp = mask & (in[i] ^ out[i]);
out[i] ^= tmp;
}
}
/* select_affine_point sets {out_x,out_y} to the index'th entry of table.
* On entry: index < 16, table[0] must be zero. */
static void select_affine_point(felem out_x, felem out_y, const limb* table,
limb index) {
limb i, j;
memset(out_x, 0, sizeof(felem));
memset(out_y, 0, sizeof(felem));
for (i = 1; i < 16; i++) {
limb mask = i ^ index;
mask |= mask >> 2;
mask |= mask >> 1;
mask &= 1;
mask--;
for (j = 0; j < NLIMBS; j++, table++) {
out_x[j] |= *table & mask;
}
for (j = 0; j < NLIMBS; j++, table++) {
out_y[j] |= *table & mask;
}
}
}
/* select_jacobian_point sets {out_x,out_y,out_z} to the index'th entry of
* table. On entry: index < 16, table[0] must be zero. */
static void select_jacobian_point(felem out_x, felem out_y, felem out_z,
const limb* table, limb index) {
limb i, j;
memset(out_x, 0, sizeof(felem));
memset(out_y, 0, sizeof(felem));
memset(out_z, 0, sizeof(felem));
/* The implicit value at index 0 is all zero. We don't need to perform that
* iteration of the loop because we already set out_* to zero. */
table += 3 * NLIMBS;
// Hit all entries to obscure cache profiling.
for (i = 1; i < 16; i++) {
limb mask = i ^ index;
mask |= mask >> 2;
mask |= mask >> 1;
mask &= 1;
mask--;
for (j = 0; j < NLIMBS; j++, table++) {
out_x[j] |= *table & mask;
}
for (j = 0; j < NLIMBS; j++, table++) {
out_y[j] |= *table & mask;
}
for (j = 0; j < NLIMBS; j++, table++) {
out_z[j] |= *table & mask;
}
}
}
/* scalar_base_mult sets {nx,ny,nz} = scalar*G where scalar is a little-endian
* number. Note that the value of scalar must be less than the order of the
* group. */
static void scalar_base_mult(felem nx, felem ny, felem nz,
const p256_int* scalar) {
int i, j;
limb n_is_infinity_mask = -1, p_is_noninfinite_mask, mask;
u32 table_offset;
felem px, py;
felem tx, ty, tz;
memset(nx, 0, sizeof(felem));
memset(ny, 0, sizeof(felem));
memset(nz, 0, sizeof(felem));
/* The loop adds bits at positions 0, 64, 128 and 192, followed by
* positions 32,96,160 and 224 and does this 32 times. */
for (i = 0; i < 32; i++) {
if (i) {
point_double(nx, ny, nz, nx, ny, nz);
}
table_offset = 0;
for (j = 0; j <= 32; j += 32) {
char bit0 = p256_get_bit(scalar, 31 - i + j);
char bit1 = p256_get_bit(scalar, 95 - i + j);
char bit2 = p256_get_bit(scalar, 159 - i + j);
char bit3 = p256_get_bit(scalar, 223 - i + j);
limb index = bit0 | (bit1 << 1) | (bit2 << 2) | (bit3 << 3);
select_affine_point(px, py, kPrecomputed + table_offset, index);
table_offset += 30 * NLIMBS;
/* Since scalar is less than the order of the group, we know that
* {nx,ny,nz} != {px,py,1}, unless both are zero, which we handle
* below. */
point_add_mixed(tx, ty, tz, nx, ny, nz, px, py);
/* The result of point_add_mixed is incorrect if {nx,ny,nz} is zero
* (a.k.a. the point at infinity). We handle that situation by
* copying the point from the table. */
copy_conditional(nx, px, n_is_infinity_mask);
copy_conditional(ny, py, n_is_infinity_mask);
copy_conditional(nz, kOne, n_is_infinity_mask);
/* Equally, the result is also wrong if the point from the table is
* zero, which happens when the index is zero. We handle that by
* only copying from {tx,ty,tz} to {nx,ny,nz} if index != 0. */
p_is_noninfinite_mask = NON_ZERO_TO_ALL_ONES(index);
mask = p_is_noninfinite_mask & ~n_is_infinity_mask;
copy_conditional(nx, tx, mask);
copy_conditional(ny, ty, mask);
copy_conditional(nz, tz, mask);
/* If p was not zero, then n is now non-zero. */
n_is_infinity_mask &= ~p_is_noninfinite_mask;
}
}
}
/* point_to_affine converts a Jacobian point to an affine point. If the input
* is the point at infinity then it returns (0, 0) in constant time. */
static void point_to_affine(felem x_out, felem y_out, const felem nx,
const felem ny, const felem nz) {
felem z_inv, z_inv_sq;
felem_inv(z_inv, nz);
felem_square(z_inv_sq, z_inv);
felem_mul(x_out, nx, z_inv_sq);
felem_mul(z_inv, z_inv, z_inv_sq);
felem_mul(y_out, ny, z_inv);
}
/* scalar_base_mult sets {nx,ny,nz} = scalar*{x,y}. */
static void scalar_mult(felem nx, felem ny, felem nz, const felem x,
const felem y, const p256_int* scalar) {
int i;
felem px, py, pz, tx, ty, tz;
felem precomp[16][3];
limb n_is_infinity_mask, index, p_is_noninfinite_mask, mask;
/* We precompute 0,1,2,... times {x,y}. */
memset(precomp, 0, sizeof(felem) * 3);
memcpy(&precomp[1][0], x, sizeof(felem));
memcpy(&precomp[1][1], y, sizeof(felem));
memcpy(&precomp[1][2], kOne, sizeof(felem));
for (i = 2; i < 16; i += 2) {
point_double(precomp[i][0], precomp[i][1], precomp[i][2],
precomp[i / 2][0], precomp[i / 2][1], precomp[i / 2][2]);
point_add_mixed(precomp[i + 1][0], precomp[i + 1][1], precomp[i + 1][2],
precomp[i][0], precomp[i][1], precomp[i][2], x, y);
}
memset(nx, 0, sizeof(felem));
memset(ny, 0, sizeof(felem));
memset(nz, 0, sizeof(felem));
n_is_infinity_mask = -1;
/* We add in a window of four bits each iteration and do this 64 times. */
for (i = 0; i < 256; i += 4) {
if (i) {
point_double(nx, ny, nz, nx, ny, nz);
point_double(nx, ny, nz, nx, ny, nz);
point_double(nx, ny, nz, nx, ny, nz);
point_double(nx, ny, nz, nx, ny, nz);
}
index = (p256_get_bit(scalar, 255 - i - 0) << 3) |
(p256_get_bit(scalar, 255 - i - 1) << 2) |
(p256_get_bit(scalar, 255 - i - 2) << 1) |
p256_get_bit(scalar, 255 - i - 3);
/* See the comments in scalar_base_mult about handling infinities. */
select_jacobian_point(px, py, pz, precomp[0][0], index);
point_add(tx, ty, tz, nx, ny, nz, px, py, pz);
copy_conditional(nx, px, n_is_infinity_mask);
copy_conditional(ny, py, n_is_infinity_mask);
copy_conditional(nz, pz, n_is_infinity_mask);
p_is_noninfinite_mask = NON_ZERO_TO_ALL_ONES(index);
mask = p_is_noninfinite_mask & ~n_is_infinity_mask;
copy_conditional(nx, tx, mask);
copy_conditional(ny, ty, mask);
copy_conditional(nz, tz, mask);
n_is_infinity_mask &= ~p_is_noninfinite_mask;
}
}
#define kRDigits {2, 0, 0, 0xfffffffe, 0xffffffff, 0xffffffff, 0xfffffffd, 1} // 2^257 mod p256.p
#define kRInvDigits {0x80000000, 1, 0xffffffff, 0, 0x80000001, 0xfffffffe, 1, 0x7fffffff} // 1 / 2^257 mod p256.p
static const p256_int kR = { kRDigits };
static const p256_int kRInv = { kRInvDigits };
/* to_montgomery sets out = R*in. */
static void to_montgomery(felem out, const p256_int* in) {
p256_int in_shifted;
int i;
p256_init(&in_shifted);
p256_modmul(&SECP256r1_p, in, 0, &kR, &in_shifted);
for (i = 0; i < NLIMBS; i++) {
if ((i & 1) == 0) {
out[i] = P256_DIGIT(&in_shifted, 0) & kBottom29Bits;
p256_shr(&in_shifted, 29, &in_shifted);
} else {
out[i] = P256_DIGIT(&in_shifted, 0) & kBottom28Bits;
p256_shr(&in_shifted, 28, &in_shifted);
}
}
p256_clear(&in_shifted);
}
/* from_montgomery sets out=in/R. */
static void from_montgomery(p256_int* out, const felem in) {
p256_int result, tmp;
int i, top;
p256_init(&result);
p256_init(&tmp);
p256_add_d(&tmp, in[NLIMBS - 1], &result);
for (i = NLIMBS - 2; i >= 0; i--) {
if ((i & 1) == 0) {
top = p256_shl(&result, 29, &tmp);
} else {
top = p256_shl(&result, 28, &tmp);
}
top |= p256_add_d(&tmp, in[i], &result);
}
p256_modmul(&SECP256r1_p, &kRInv, top, &result, out);
p256_clear(&result);
p256_clear(&tmp);
}
/* p256_base_point_mul sets {out_x,out_y} = nG, where n is < the
* order of the group. */
void p256_base_point_mul(const p256_int* n, p256_int* out_x, p256_int* out_y) {
felem x, y, z;
scalar_base_mult(x, y, z, n);
{
felem x_affine, y_affine;
point_to_affine(x_affine, y_affine, x, y, z);
from_montgomery(out_x, x_affine);
from_montgomery(out_y, y_affine);
}
}
/* p256_point_mul sets {out_x,out_y} = n*{in_x,in_y}, where n is <
* the order of the group. */
void p256_point_mul(const p256_int* n, const p256_int* in_x,
const p256_int* in_y, p256_int* out_x, p256_int* out_y) {
felem x, y, z, px, py;
to_montgomery(px, in_x);
to_montgomery(py, in_y);
scalar_mult(x, y, z, px, py, n);
point_to_affine(px, py, x, y, z);
from_montgomery(out_x, px);
from_montgomery(out_y, py);
}
/* p256_points_mul_vartime sets {out_x,out_y} = n1*G + n2*{in_x,in_y}, where
* n1 and n2 are < the order of the group.
*
* As indicated by the name, this function operates in variable time. This
* is safe because it's used for signature validation which doesn't deal
* with secrets. */
void p256_points_mul_vartime(
const p256_int* n1, const p256_int* n2, const p256_int* in_x,
const p256_int* in_y, p256_int* out_x, p256_int* out_y) {
felem x1, y1, z1, x2, y2, z2, px, py;
/* If both scalars are zero, then the result is the point at infinity. */
if (p256_is_zero(n1) != 0 && p256_is_zero(n2) != 0) {
p256_clear(out_x);
p256_clear(out_y);
return;
}
to_montgomery(px, in_x);
to_montgomery(py, in_y);
scalar_base_mult(x1, y1, z1, n1);
scalar_mult(x2, y2, z2, px, py, n2);
if (p256_is_zero(n2) != 0) {
/* If n2 == 0, then {x2,y2,z2} is zero and the result is just
* {x1,y1,z1}. */
} else if (p256_is_zero(n1) != 0) {
/* If n1 == 0, then {x1,y1,z1} is zero and the result is just
* {x2,y2,z2}. */
memcpy(x1, x2, sizeof(x2));
memcpy(y1, y2, sizeof(y2));
memcpy(z1, z2, sizeof(z2));
} else {
/* This function handles the case where {x1,y1,z1} == {x2,y2,z2}. */
point_add_or_double_vartime(x1, y1, z1, x1, y1, z1, x2, y2, z2);
}
point_to_affine(px, py, x1, y1, z1);
from_montgomery(out_x, px);
from_montgomery(out_y, py);
}