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/* Copyright (c) 2015, Google Inc.
*
* Permission to use, copy, modify, and/or distribute this software for any
* purpose with or without fee is hereby granted, provided that the above
* copyright notice and this permission notice appear in all copies.
*
* THE SOFTWARE IS PROVIDED "AS IS" AND THE AUTHOR DISCLAIMS ALL WARRANTIES
* WITH REGARD TO THIS SOFTWARE INCLUDING ALL IMPLIED WARRANTIES OF
* MERCHANTABILITY AND FITNESS. IN NO EVENT SHALL THE AUTHOR BE LIABLE FOR ANY
* SPECIAL, DIRECT, INDIRECT, OR CONSEQUENTIAL DAMAGES OR ANY DAMAGES
* WHATSOEVER RESULTING FROM LOSS OF USE, DATA OR PROFITS, WHETHER IN AN ACTION
* OF CONTRACT, NEGLIGENCE OR OTHER TORTIOUS ACTION, ARISING OUT OF OR IN
* CONNECTION WITH THE USE OR PERFORMANCE OF THIS SOFTWARE. */
/* A 64-bit implementation of the NIST P-224 elliptic curve point multiplication
*
* Inspired by Daniel J. Bernstein's public domain nistp224 implementation
* and Adam Langley's public domain 64-bit C implementation of curve25519. */
#include <openssl/base.h>
#if defined(OPENSSL_64_BIT) && !defined(OPENSSL_WINDOWS) && \
!defined(OPENSSL_SMALL)
#include <openssl/bn.h>
#include <openssl/ec.h>
#include <openssl/err.h>
#include <openssl/mem.h>
#include <openssl/obj.h>
#include <string.h>
#include "internal.h"
typedef uint8_t u8;
typedef uint64_t u64;
typedef int64_t s64;
/* Field elements are represented as a_0 + 2^56*a_1 + 2^112*a_2 + 2^168*a_3
* using 64-bit coefficients called 'limbs', and sometimes (for multiplication
* results) as b_0 + 2^56*b_1 + 2^112*b_2 + 2^168*b_3 + 2^224*b_4 + 2^280*b_5 +
* 2^336*b_6 using 128-bit coefficients called 'widelimbs'. A 4-limb
* representation is an 'felem'; a 7-widelimb representation is a 'widefelem'.
* Even within felems, bits of adjacent limbs overlap, and we don't always
* reduce the representations: we ensure that inputs to each felem
* multiplication satisfy a_i < 2^60, so outputs satisfy b_i < 4*2^60*2^60, and
* fit into a 128-bit word without overflow. The coefficients are then again
* partially reduced to obtain an felem satisfying a_i < 2^57. We only reduce
* to the unique minimal representation at the end of the computation. */
typedef uint64_t limb;
typedef __uint128_t widelimb;
typedef limb felem[4];
typedef widelimb widefelem[7];
/* Field element represented as a byte arrary. 28*8 = 224 bits is also the
* group order size for the elliptic curve, and we also use this type for
* scalars for point multiplication. */
typedef u8 felem_bytearray[28];
static const felem_bytearray nistp224_curve_params[5] = {
{0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, /* p */
0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00,
0x00, 0x00, 0x00, 0x00, 0x00, 0x01},
{0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, /* a */
0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFE, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFF,
0xFF, 0xFF, 0xFF, 0xFF, 0xFF, 0xFE},
{0xB4, 0x05, 0x0A, 0x85, 0x0C, 0x04, 0xB3, 0xAB, 0xF5, 0x41, /* b */
0x32, 0x56, 0x50, 0x44, 0xB0, 0xB7, 0xD7, 0xBF, 0xD8, 0xBA, 0x27, 0x0B,
0x39, 0x43, 0x23, 0x55, 0xFF, 0xB4},
{0xB7, 0x0E, 0x0C, 0xBD, 0x6B, 0xB4, 0xBF, 0x7F, 0x32, 0x13, /* x */
0x90, 0xB9, 0x4A, 0x03, 0xC1, 0xD3, 0x56, 0xC2, 0x11, 0x22, 0x34, 0x32,
0x80, 0xD6, 0x11, 0x5C, 0x1D, 0x21},
{0xbd, 0x37, 0x63, 0x88, 0xb5, 0xf7, 0x23, 0xfb, 0x4c, 0x22, /* y */
0xdf, 0xe6, 0xcd, 0x43, 0x75, 0xa0, 0x5a, 0x07, 0x47, 0x64, 0x44, 0xd5,
0x81, 0x99, 0x85, 0x00, 0x7e, 0x34}};
/* Precomputed multiples of the standard generator
* Points are given in coordinates (X, Y, Z) where Z normally is 1
* (0 for the point at infinity).
* For each field element, slice a_0 is word 0, etc.
*
* The table has 2 * 16 elements, starting with the following:
* index | bits | point
* ------+---------+------------------------------
* 0 | 0 0 0 0 | 0G
* 1 | 0 0 0 1 | 1G
* 2 | 0 0 1 0 | 2^56G
* 3 | 0 0 1 1 | (2^56 + 1)G
* 4 | 0 1 0 0 | 2^112G
* 5 | 0 1 0 1 | (2^112 + 1)G
* 6 | 0 1 1 0 | (2^112 + 2^56)G
* 7 | 0 1 1 1 | (2^112 + 2^56 + 1)G
* 8 | 1 0 0 0 | 2^168G
* 9 | 1 0 0 1 | (2^168 + 1)G
* 10 | 1 0 1 0 | (2^168 + 2^56)G
* 11 | 1 0 1 1 | (2^168 + 2^56 + 1)G
* 12 | 1 1 0 0 | (2^168 + 2^112)G
* 13 | 1 1 0 1 | (2^168 + 2^112 + 1)G
* 14 | 1 1 1 0 | (2^168 + 2^112 + 2^56)G
* 15 | 1 1 1 1 | (2^168 + 2^112 + 2^56 + 1)G
* followed by a copy of this with each element multiplied by 2^28.
*
* The reason for this is so that we can clock bits into four different
* locations when doing simple scalar multiplies against the base point,
* and then another four locations using the second 16 elements. */
static const felem g_pre_comp[2][16][3] = {
{{{0, 0, 0, 0}, {0, 0, 0, 0}, {0, 0, 0, 0}},
{{0x3280d6115c1d21, 0xc1d356c2112234, 0x7f321390b94a03, 0xb70e0cbd6bb4bf},
{0xd5819985007e34, 0x75a05a07476444, 0xfb4c22dfe6cd43, 0xbd376388b5f723},
{1, 0, 0, 0}},
{{0xfd9675666ebbe9, 0xbca7664d40ce5e, 0x2242df8d8a2a43, 0x1f49bbb0f99bc5},
{0x29e0b892dc9c43, 0xece8608436e662, 0xdc858f185310d0, 0x9812dd4eb8d321},
{1, 0, 0, 0}},
{{0x6d3e678d5d8eb8, 0x559eed1cb362f1, 0x16e9a3bbce8a3f, 0xeedcccd8c2a748},
{0xf19f90ed50266d, 0xabf2b4bf65f9df, 0x313865468fafec, 0x5cb379ba910a17},
{1, 0, 0, 0}},
{{0x0641966cab26e3, 0x91fb2991fab0a0, 0xefec27a4e13a0b, 0x0499aa8a5f8ebe},
{0x7510407766af5d, 0x84d929610d5450, 0x81d77aae82f706, 0x6916f6d4338c5b},
{1, 0, 0, 0}},
{{0xea95ac3b1f15c6, 0x086000905e82d4, 0xdd323ae4d1c8b1, 0x932b56be7685a3},
{0x9ef93dea25dbbf, 0x41665960f390f0, 0xfdec76dbe2a8a7, 0x523e80f019062a},
{1, 0, 0, 0}},
{{0x822fdd26732c73, 0xa01c83531b5d0f, 0x363f37347c1ba4, 0xc391b45c84725c},
{0xbbd5e1b2d6ad24, 0xddfbcde19dfaec, 0xc393da7e222a7f, 0x1efb7890ede244},
{1, 0, 0, 0}},
{{0x4c9e90ca217da1, 0xd11beca79159bb, 0xff8d33c2c98b7c, 0x2610b39409f849},
{0x44d1352ac64da0, 0xcdbb7b2c46b4fb, 0x966c079b753c89, 0xfe67e4e820b112},
{1, 0, 0, 0}},
{{0xe28cae2df5312d, 0xc71b61d16f5c6e, 0x79b7619a3e7c4c, 0x05c73240899b47},
{0x9f7f6382c73e3a, 0x18615165c56bda, 0x641fab2116fd56, 0x72855882b08394},
{1, 0, 0, 0}},
{{0x0469182f161c09, 0x74a98ca8d00fb5, 0xb89da93489a3e0, 0x41c98768fb0c1d},
{0xe5ea05fb32da81, 0x3dce9ffbca6855, 0x1cfe2d3fbf59e6, 0x0e5e03408738a7},
{1, 0, 0, 0}},
{{0xdab22b2333e87f, 0x4430137a5dd2f6, 0xe03ab9f738beb8, 0xcb0c5d0dc34f24},
{0x764a7df0c8fda5, 0x185ba5c3fa2044, 0x9281d688bcbe50, 0xc40331df893881},
{1, 0, 0, 0}},
{{0xb89530796f0f60, 0xade92bd26909a3, 0x1a0c83fb4884da, 0x1765bf22a5a984},
{0x772a9ee75db09e, 0x23bc6c67cec16f, 0x4c1edba8b14e2f, 0xe2a215d9611369},
{1, 0, 0, 0}},
{{0x571e509fb5efb3, 0xade88696410552, 0xc8ae85fada74fe, 0x6c7e4be83bbde3},
{0xff9f51160f4652, 0xb47ce2495a6539, 0xa2946c53b582f4, 0x286d2db3ee9a60},
{1, 0, 0, 0}},
{{0x40bbd5081a44af, 0x0995183b13926c, 0xbcefba6f47f6d0, 0x215619e9cc0057},
{0x8bc94d3b0df45e, 0xf11c54a3694f6f, 0x8631b93cdfe8b5, 0xe7e3f4b0982db9},
{1, 0, 0, 0}},
{{0xb17048ab3e1c7b, 0xac38f36ff8a1d8, 0x1c29819435d2c6, 0xc813132f4c07e9},
{0x2891425503b11f, 0x08781030579fea, 0xf5426ba5cc9674, 0x1e28ebf18562bc},
{1, 0, 0, 0}},
{{0x9f31997cc864eb, 0x06cd91d28b5e4c, 0xff17036691a973, 0xf1aef351497c58},
{0xdd1f2d600564ff, 0xdead073b1402db, 0x74a684435bd693, 0xeea7471f962558},
{1, 0, 0, 0}}},
{{{0, 0, 0, 0}, {0, 0, 0, 0}, {0, 0, 0, 0}},
{{0x9665266dddf554, 0x9613d78b60ef2d, 0xce27a34cdba417, 0xd35ab74d6afc31},
{0x85ccdd22deb15e, 0x2137e5783a6aab, 0xa141cffd8c93c6, 0x355a1830e90f2d},
{1, 0, 0, 0}},
{{0x1a494eadaade65, 0xd6da4da77fe53c, 0xe7992996abec86, 0x65c3553c6090e3},
{0xfa610b1fb09346, 0xf1c6540b8a4aaf, 0xc51a13ccd3cbab, 0x02995b1b18c28a},
{1, 0, 0, 0}},
{{0x7874568e7295ef, 0x86b419fbe38d04, 0xdc0690a7550d9a, 0xd3966a44beac33},
{0x2b7280ec29132f, 0xbeaa3b6a032df3, 0xdc7dd88ae41200, 0xd25e2513e3a100},
{1, 0, 0, 0}},
{{0x924857eb2efafd, 0xac2bce41223190, 0x8edaa1445553fc, 0x825800fd3562d5},
{0x8d79148ea96621, 0x23a01c3dd9ed8d, 0xaf8b219f9416b5, 0xd8db0cc277daea},
{1, 0, 0, 0}},
{{0x76a9c3b1a700f0, 0xe9acd29bc7e691, 0x69212d1a6b0327, 0x6322e97fe154be},
{0x469fc5465d62aa, 0x8d41ed18883b05, 0x1f8eae66c52b88, 0xe4fcbe9325be51},
{1, 0, 0, 0}},
{{0x825fdf583cac16, 0x020b857c7b023a, 0x683c17744b0165, 0x14ffd0a2daf2f1},
{0x323b36184218f9, 0x4944ec4e3b47d4, 0xc15b3080841acf, 0x0bced4b01a28bb},
{1, 0, 0, 0}},
{{0x92ac22230df5c4, 0x52f33b4063eda8, 0xcb3f19870c0c93, 0x40064f2ba65233},
{0xfe16f0924f8992, 0x012da25af5b517, 0x1a57bb24f723a6, 0x06f8bc76760def},
{1, 0, 0, 0}},
{{0x4a7084f7817cb9, 0xbcab0738ee9a78, 0x3ec11e11d9c326, 0xdc0fe90e0f1aae},
{0xcf639ea5f98390, 0x5c350aa22ffb74, 0x9afae98a4047b7, 0x956ec2d617fc45},
{1, 0, 0, 0}},
{{0x4306d648c1be6a, 0x9247cd8bc9a462, 0xf5595e377d2f2e, 0xbd1c3caff1a52e},
{0x045e14472409d0, 0x29f3e17078f773, 0x745a602b2d4f7d, 0x191837685cdfbb},
{1, 0, 0, 0}},
{{0x5b6ee254a8cb79, 0x4953433f5e7026, 0xe21faeb1d1def4, 0xc4c225785c09de},
{0x307ce7bba1e518, 0x31b125b1036db8, 0x47e91868839e8f, 0xc765866e33b9f3},
{1, 0, 0, 0}},
{{0x3bfece24f96906, 0x4794da641e5093, 0xde5df64f95db26, 0x297ecd89714b05},
{0x701bd3ebb2c3aa, 0x7073b4f53cb1d5, 0x13c5665658af16, 0x9895089d66fe58},
{1, 0, 0, 0}},
{{0x0fef05f78c4790, 0x2d773633b05d2e, 0x94229c3a951c94, 0xbbbd70df4911bb},
{0xb2c6963d2c1168, 0x105f47a72b0d73, 0x9fdf6111614080, 0x7b7e94b39e67b0},
{1, 0, 0, 0}},
{{0xad1a7d6efbe2b3, 0xf012482c0da69d, 0x6b3bdf12438345, 0x40d7558d7aa4d9},
{0x8a09fffb5c6d3d, 0x9a356e5d9ffd38, 0x5973f15f4f9b1c, 0xdcd5f59f63c3ea},
{1, 0, 0, 0}},
{{0xacf39f4c5ca7ab, 0x4c8071cc5fd737, 0xc64e3602cd1184, 0x0acd4644c9abba},
{0x6c011a36d8bf6e, 0xfecd87ba24e32a, 0x19f6f56574fad8, 0x050b204ced9405},
{1, 0, 0, 0}},
{{0xed4f1cae7d9a96, 0x5ceef7ad94c40a, 0x778e4a3bf3ef9b, 0x7405783dc3b55e},
{0x32477c61b6e8c6, 0xb46a97570f018b, 0x91176d0a7e95d1, 0x3df90fbc4c7d0e},
{1, 0, 0, 0}}}};
/* Helper functions to convert field elements to/from internal representation */
static void bin28_to_felem(felem out, const u8 in[28]) {
out[0] = *((const uint64_t *)(in)) & 0x00ffffffffffffff;
out[1] = (*((const uint64_t *)(in + 7))) & 0x00ffffffffffffff;
out[2] = (*((const uint64_t *)(in + 14))) & 0x00ffffffffffffff;
out[3] = (*((const uint64_t *)(in + 20))) >> 8;
}
static void felem_to_bin28(u8 out[28], const felem in) {
unsigned i;
for (i = 0; i < 7; ++i) {
out[i] = in[0] >> (8 * i);
out[i + 7] = in[1] >> (8 * i);
out[i + 14] = in[2] >> (8 * i);
out[i + 21] = in[3] >> (8 * i);
}
}
/* To preserve endianness when using BN_bn2bin and BN_bin2bn */
static void flip_endian(u8 *out, const u8 *in, unsigned len) {
unsigned i;
for (i = 0; i < len; ++i) {
out[i] = in[len - 1 - i];
}
}
/* From OpenSSL BIGNUM to internal representation */
static int BN_to_felem(felem out, const BIGNUM *bn) {
/* BN_bn2bin eats leading zeroes */
felem_bytearray b_out;
memset(b_out, 0, sizeof(b_out));
unsigned num_bytes = BN_num_bytes(bn);
if (num_bytes > sizeof(b_out) ||
BN_is_negative(bn)) {
OPENSSL_PUT_ERROR(EC, EC_R_BIGNUM_OUT_OF_RANGE);
return 0;
}
felem_bytearray b_in;
num_bytes = BN_bn2bin(bn, b_in);
flip_endian(b_out, b_in, num_bytes);
bin28_to_felem(out, b_out);
return 1;
}
/* From internal representation to OpenSSL BIGNUM */
static BIGNUM *felem_to_BN(BIGNUM *out, const felem in) {
felem_bytearray b_in, b_out;
felem_to_bin28(b_in, in);
flip_endian(b_out, b_in, sizeof(b_out));
return BN_bin2bn(b_out, sizeof(b_out), out);
}
/* Field operations, using the internal representation of field elements.
* NB! These operations are specific to our point multiplication and cannot be
* expected to be correct in general - e.g., multiplication with a large scalar
* will cause an overflow. */
static void felem_one(felem out) {
out[0] = 1;
out[1] = 0;
out[2] = 0;
out[3] = 0;
}
static void felem_assign(felem out, const felem in) {
out[0] = in[0];
out[1] = in[1];
out[2] = in[2];
out[3] = in[3];
}
/* Sum two field elements: out += in */
static void felem_sum(felem out, const felem in) {
out[0] += in[0];
out[1] += in[1];
out[2] += in[2];
out[3] += in[3];
}
/* Get negative value: out = -in */
/* Assumes in[i] < 2^57 */
static void felem_neg(felem out, const felem in) {
static const limb two58p2 = (((limb)1) << 58) + (((limb)1) << 2);
static const limb two58m2 = (((limb)1) << 58) - (((limb)1) << 2);
static const limb two58m42m2 =
(((limb)1) << 58) - (((limb)1) << 42) - (((limb)1) << 2);
/* Set to 0 mod 2^224-2^96+1 to ensure out > in */
out[0] = two58p2 - in[0];
out[1] = two58m42m2 - in[1];
out[2] = two58m2 - in[2];
out[3] = two58m2 - in[3];
}
/* Subtract field elements: out -= in */
/* Assumes in[i] < 2^57 */
static void felem_diff(felem out, const felem in) {
static const limb two58p2 = (((limb)1) << 58) + (((limb)1) << 2);
static const limb two58m2 = (((limb)1) << 58) - (((limb)1) << 2);
static const limb two58m42m2 =
(((limb)1) << 58) - (((limb)1) << 42) - (((limb)1) << 2);
/* Add 0 mod 2^224-2^96+1 to ensure out > in */
out[0] += two58p2;
out[1] += two58m42m2;
out[2] += two58m2;
out[3] += two58m2;
out[0] -= in[0];
out[1] -= in[1];
out[2] -= in[2];
out[3] -= in[3];
}
/* Subtract in unreduced 128-bit mode: out -= in */
/* Assumes in[i] < 2^119 */
static void widefelem_diff(widefelem out, const widefelem in) {
static const widelimb two120 = ((widelimb)1) << 120;
static const widelimb two120m64 =
(((widelimb)1) << 120) - (((widelimb)1) << 64);
static const widelimb two120m104m64 =
(((widelimb)1) << 120) - (((widelimb)1) << 104) - (((widelimb)1) << 64);
/* Add 0 mod 2^224-2^96+1 to ensure out > in */
out[0] += two120;
out[1] += two120m64;
out[2] += two120m64;
out[3] += two120;
out[4] += two120m104m64;
out[5] += two120m64;
out[6] += two120m64;
out[0] -= in[0];
out[1] -= in[1];
out[2] -= in[2];
out[3] -= in[3];
out[4] -= in[4];
out[5] -= in[5];
out[6] -= in[6];
}
/* Subtract in mixed mode: out128 -= in64 */
/* in[i] < 2^63 */
static void felem_diff_128_64(widefelem out, const felem in) {
static const widelimb two64p8 = (((widelimb)1) << 64) + (((widelimb)1) << 8);
static const widelimb two64m8 = (((widelimb)1) << 64) - (((widelimb)1) << 8);
static const widelimb two64m48m8 =
(((widelimb)1) << 64) - (((widelimb)1) << 48) - (((widelimb)1) << 8);
/* Add 0 mod 2^224-2^96+1 to ensure out > in */
out[0] += two64p8;
out[1] += two64m48m8;
out[2] += two64m8;
out[3] += two64m8;
out[0] -= in[0];
out[1] -= in[1];
out[2] -= in[2];
out[3] -= in[3];
}
/* Multiply a field element by a scalar: out = out * scalar
* The scalars we actually use are small, so results fit without overflow */
static void felem_scalar(felem out, const limb scalar) {
out[0] *= scalar;
out[1] *= scalar;
out[2] *= scalar;
out[3] *= scalar;
}
/* Multiply an unreduced field element by a scalar: out = out * scalar
* The scalars we actually use are small, so results fit without overflow */
static void widefelem_scalar(widefelem out, const widelimb scalar) {
out[0] *= scalar;
out[1] *= scalar;
out[2] *= scalar;
out[3] *= scalar;
out[4] *= scalar;
out[5] *= scalar;
out[6] *= scalar;
}
/* Square a field element: out = in^2 */
static void felem_square(widefelem out, const felem in) {
limb tmp0, tmp1, tmp2;
tmp0 = 2 * in[0];
tmp1 = 2 * in[1];
tmp2 = 2 * in[2];
out[0] = ((widelimb)in[0]) * in[0];
out[1] = ((widelimb)in[0]) * tmp1;
out[2] = ((widelimb)in[0]) * tmp2 + ((widelimb)in[1]) * in[1];
out[3] = ((widelimb)in[3]) * tmp0 + ((widelimb)in[1]) * tmp2;
out[4] = ((widelimb)in[3]) * tmp1 + ((widelimb)in[2]) * in[2];
out[5] = ((widelimb)in[3]) * tmp2;
out[6] = ((widelimb)in[3]) * in[3];
}
/* Multiply two field elements: out = in1 * in2 */
static void felem_mul(widefelem out, const felem in1, const felem in2) {
out[0] = ((widelimb)in1[0]) * in2[0];
out[1] = ((widelimb)in1[0]) * in2[1] + ((widelimb)in1[1]) * in2[0];
out[2] = ((widelimb)in1[0]) * in2[2] + ((widelimb)in1[1]) * in2[1] +
((widelimb)in1[2]) * in2[0];
out[3] = ((widelimb)in1[0]) * in2[3] + ((widelimb)in1[1]) * in2[2] +
((widelimb)in1[2]) * in2[1] + ((widelimb)in1[3]) * in2[0];
out[4] = ((widelimb)in1[1]) * in2[3] + ((widelimb)in1[2]) * in2[2] +
((widelimb)in1[3]) * in2[1];
out[5] = ((widelimb)in1[2]) * in2[3] + ((widelimb)in1[3]) * in2[2];
out[6] = ((widelimb)in1[3]) * in2[3];
}
/* Reduce seven 128-bit coefficients to four 64-bit coefficients.
* Requires in[i] < 2^126,
* ensures out[0] < 2^56, out[1] < 2^56, out[2] < 2^56, out[3] <= 2^56 + 2^16 */
static void felem_reduce(felem out, const widefelem in) {
static const widelimb two127p15 =
(((widelimb)1) << 127) + (((widelimb)1) << 15);
static const widelimb two127m71 =
(((widelimb)1) << 127) - (((widelimb)1) << 71);
static const widelimb two127m71m55 =
(((widelimb)1) << 127) - (((widelimb)1) << 71) - (((widelimb)1) << 55);
widelimb output[5];
/* Add 0 mod 2^224-2^96+1 to ensure all differences are positive */
output[0] = in[0] + two127p15;
output[1] = in[1] + two127m71m55;
output[2] = in[2] + two127m71;
output[3] = in[3];
output[4] = in[4];
/* Eliminate in[4], in[5], in[6] */
output[4] += in[6] >> 16;
output[3] += (in[6] & 0xffff) << 40;
output[2] -= in[6];
output[3] += in[5] >> 16;
output[2] += (in[5] & 0xffff) << 40;
output[1] -= in[5];
output[2] += output[4] >> 16;
output[1] += (output[4] & 0xffff) << 40;
output[0] -= output[4];
/* Carry 2 -> 3 -> 4 */
output[3] += output[2] >> 56;
output[2] &= 0x00ffffffffffffff;
output[4] = output[3] >> 56;
output[3] &= 0x00ffffffffffffff;
/* Now output[2] < 2^56, output[3] < 2^56, output[4] < 2^72 */
/* Eliminate output[4] */
output[2] += output[4] >> 16;
/* output[2] < 2^56 + 2^56 = 2^57 */
output[1] += (output[4] & 0xffff) << 40;
output[0] -= output[4];
/* Carry 0 -> 1 -> 2 -> 3 */
output[1] += output[0] >> 56;
out[0] = output[0] & 0x00ffffffffffffff;
output[2] += output[1] >> 56;
/* output[2] < 2^57 + 2^72 */
out[1] = output[1] & 0x00ffffffffffffff;
output[3] += output[2] >> 56;
/* output[3] <= 2^56 + 2^16 */
out[2] = output[2] & 0x00ffffffffffffff;
/* out[0] < 2^56, out[1] < 2^56, out[2] < 2^56,
* out[3] <= 2^56 + 2^16 (due to final carry),
* so out < 2*p */
out[3] = output[3];
}
static void felem_square_reduce(felem out, const felem in) {
widefelem tmp;
felem_square(tmp, in);
felem_reduce(out, tmp);
}
static void felem_mul_reduce(felem out, const felem in1, const felem in2) {
widefelem tmp;
felem_mul(tmp, in1, in2);
felem_reduce(out, tmp);
}
/* Reduce to unique minimal representation.
* Requires 0 <= in < 2*p (always call felem_reduce first) */
static void felem_contract(felem out, const felem in) {
static const int64_t two56 = ((limb)1) << 56;
/* 0 <= in < 2*p, p = 2^224 - 2^96 + 1 */
/* if in > p , reduce in = in - 2^224 + 2^96 - 1 */
int64_t tmp[4], a;
tmp[0] = in[0];
tmp[1] = in[1];
tmp[2] = in[2];
tmp[3] = in[3];
/* Case 1: a = 1 iff in >= 2^224 */
a = (in[3] >> 56);
tmp[0] -= a;
tmp[1] += a << 40;
tmp[3] &= 0x00ffffffffffffff;
/* Case 2: a = 0 iff p <= in < 2^224, i.e., the high 128 bits are all 1 and
* the lower part is non-zero */
a = ((in[3] & in[2] & (in[1] | 0x000000ffffffffff)) + 1) |
(((int64_t)(in[0] + (in[1] & 0x000000ffffffffff)) - 1) >> 63);
a &= 0x00ffffffffffffff;
/* turn a into an all-one mask (if a = 0) or an all-zero mask */
a = (a - 1) >> 63;
/* subtract 2^224 - 2^96 + 1 if a is all-one */
tmp[3] &= a ^ 0xffffffffffffffff;
tmp[2] &= a ^ 0xffffffffffffffff;
tmp[1] &= (a ^ 0xffffffffffffffff) | 0x000000ffffffffff;
tmp[0] -= 1 & a;
/* eliminate negative coefficients: if tmp[0] is negative, tmp[1] must
* be non-zero, so we only need one step */
a = tmp[0] >> 63;
tmp[0] += two56 & a;
tmp[1] -= 1 & a;
/* carry 1 -> 2 -> 3 */
tmp[2] += tmp[1] >> 56;
tmp[1] &= 0x00ffffffffffffff;
tmp[3] += tmp[2] >> 56;
tmp[2] &= 0x00ffffffffffffff;
/* Now 0 <= out < p */
out[0] = tmp[0];
out[1] = tmp[1];
out[2] = tmp[2];
out[3] = tmp[3];
}
/* Zero-check: returns 1 if input is 0, and 0 otherwise. We know that field
* elements are reduced to in < 2^225, so we only need to check three cases: 0,
* 2^224 - 2^96 + 1, and 2^225 - 2^97 + 2 */
static limb felem_is_zero(const felem in) {
limb zero = in[0] | in[1] | in[2] | in[3];
zero = (((int64_t)(zero)-1) >> 63) & 1;
limb two224m96p1 = (in[0] ^ 1) | (in[1] ^ 0x00ffff0000000000) |
(in[2] ^ 0x00ffffffffffffff) |
(in[3] ^ 0x00ffffffffffffff);
two224m96p1 = (((int64_t)(two224m96p1)-1) >> 63) & 1;
limb two225m97p2 = (in[0] ^ 2) | (in[1] ^ 0x00fffe0000000000) |
(in[2] ^ 0x00ffffffffffffff) |
(in[3] ^ 0x01ffffffffffffff);
two225m97p2 = (((int64_t)(two225m97p2)-1) >> 63) & 1;
return (zero | two224m96p1 | two225m97p2);
}
static limb felem_is_zero_int(const felem in) {
return (int)(felem_is_zero(in) & ((limb)1));
}
/* Invert a field element */
/* Computation chain copied from djb's code */
static void felem_inv(felem out, const felem in) {
felem ftmp, ftmp2, ftmp3, ftmp4;
widefelem tmp;
unsigned i;
felem_square(tmp, in);
felem_reduce(ftmp, tmp); /* 2 */
felem_mul(tmp, in, ftmp);
felem_reduce(ftmp, tmp); /* 2^2 - 1 */
felem_square(tmp, ftmp);
felem_reduce(ftmp, tmp); /* 2^3 - 2 */
felem_mul(tmp, in, ftmp);
felem_reduce(ftmp, tmp); /* 2^3 - 1 */
felem_square(tmp, ftmp);
felem_reduce(ftmp2, tmp); /* 2^4 - 2 */
felem_square(tmp, ftmp2);
felem_reduce(ftmp2, tmp); /* 2^5 - 4 */
felem_square(tmp, ftmp2);
felem_reduce(ftmp2, tmp); /* 2^6 - 8 */
felem_mul(tmp, ftmp2, ftmp);
felem_reduce(ftmp, tmp); /* 2^6 - 1 */
felem_square(tmp, ftmp);
felem_reduce(ftmp2, tmp); /* 2^7 - 2 */
for (i = 0; i < 5; ++i) { /* 2^12 - 2^6 */
felem_square(tmp, ftmp2);
felem_reduce(ftmp2, tmp);
}
felem_mul(tmp, ftmp2, ftmp);
felem_reduce(ftmp2, tmp); /* 2^12 - 1 */
felem_square(tmp, ftmp2);
felem_reduce(ftmp3, tmp); /* 2^13 - 2 */
for (i = 0; i < 11; ++i) {/* 2^24 - 2^12 */
felem_square(tmp, ftmp3);
felem_reduce(ftmp3, tmp);
}
felem_mul(tmp, ftmp3, ftmp2);
felem_reduce(ftmp2, tmp); /* 2^24 - 1 */
felem_square(tmp, ftmp2);
felem_reduce(ftmp3, tmp); /* 2^25 - 2 */
for (i = 0; i < 23; ++i) {/* 2^48 - 2^24 */
felem_square(tmp, ftmp3);
felem_reduce(ftmp3, tmp);
}
felem_mul(tmp, ftmp3, ftmp2);
felem_reduce(ftmp3, tmp); /* 2^48 - 1 */
felem_square(tmp, ftmp3);
felem_reduce(ftmp4, tmp); /* 2^49 - 2 */
for (i = 0; i < 47; ++i) {/* 2^96 - 2^48 */
felem_square(tmp, ftmp4);
felem_reduce(ftmp4, tmp);
}
felem_mul(tmp, ftmp3, ftmp4);
felem_reduce(ftmp3, tmp); /* 2^96 - 1 */
felem_square(tmp, ftmp3);
felem_reduce(ftmp4, tmp); /* 2^97 - 2 */
for (i = 0; i < 23; ++i) {/* 2^120 - 2^24 */
felem_square(tmp, ftmp4);
felem_reduce(ftmp4, tmp);
}
felem_mul(tmp, ftmp2, ftmp4);
felem_reduce(ftmp2, tmp); /* 2^120 - 1 */
for (i = 0; i < 6; ++i) { /* 2^126 - 2^6 */
felem_square(tmp, ftmp2);
felem_reduce(ftmp2, tmp);
}
felem_mul(tmp, ftmp2, ftmp);
felem_reduce(ftmp, tmp); /* 2^126 - 1 */
felem_square(tmp, ftmp);
felem_reduce(ftmp, tmp); /* 2^127 - 2 */
felem_mul(tmp, ftmp, in);
felem_reduce(ftmp, tmp); /* 2^127 - 1 */
for (i = 0; i < 97; ++i) {/* 2^224 - 2^97 */
felem_square(tmp, ftmp);
felem_reduce(ftmp, tmp);
}
felem_mul(tmp, ftmp, ftmp3);
felem_reduce(out, tmp); /* 2^224 - 2^96 - 1 */
}
/* Copy in constant time:
* if icopy == 1, copy in to out,
* if icopy == 0, copy out to itself. */
static void copy_conditional(felem out, const felem in, limb icopy) {
unsigned i;
/* icopy is a (64-bit) 0 or 1, so copy is either all-zero or all-one */
const limb copy = -icopy;
for (i = 0; i < 4; ++i) {
const limb tmp = copy & (in[i] ^ out[i]);
out[i] ^= tmp;
}
}
/* ELLIPTIC CURVE POINT OPERATIONS
*
* Points are represented in Jacobian projective coordinates:
* (X, Y, Z) corresponds to the affine point (X/Z^2, Y/Z^3),
* or to the point at infinity if Z == 0. */
/* Double an elliptic curve point:
* (X', Y', Z') = 2 * (X, Y, Z), where
* X' = (3 * (X - Z^2) * (X + Z^2))^2 - 8 * X * Y^2
* Y' = 3 * (X - Z^2) * (X + Z^2) * (4 * X * Y^2 - X') - 8 * Y^2
* Z' = (Y + Z)^2 - Y^2 - Z^2 = 2 * Y * Z
* Outputs can equal corresponding inputs, i.e., x_out == x_in is allowed,
* while x_out == y_in is not (maybe this works, but it's not tested). */
static void point_double(felem x_out, felem y_out, felem z_out,
const felem x_in, const felem y_in, const felem z_in) {
widefelem tmp, tmp2;
felem delta, gamma, beta, alpha, ftmp, ftmp2;
felem_assign(ftmp, x_in);
felem_assign(ftmp2, x_in);
/* delta = z^2 */
felem_square(tmp, z_in);
felem_reduce(delta, tmp);
/* gamma = y^2 */
felem_square(tmp, y_in);
felem_reduce(gamma, tmp);
/* beta = x*gamma */
felem_mul(tmp, x_in, gamma);
felem_reduce(beta, tmp);
/* alpha = 3*(x-delta)*(x+delta) */
felem_diff(ftmp, delta);
/* ftmp[i] < 2^57 + 2^58 + 2 < 2^59 */
felem_sum(ftmp2, delta);
/* ftmp2[i] < 2^57 + 2^57 = 2^58 */
felem_scalar(ftmp2, 3);
/* ftmp2[i] < 3 * 2^58 < 2^60 */
felem_mul(tmp, ftmp, ftmp2);
/* tmp[i] < 2^60 * 2^59 * 4 = 2^121 */
felem_reduce(alpha, tmp);
/* x' = alpha^2 - 8*beta */
felem_square(tmp, alpha);
/* tmp[i] < 4 * 2^57 * 2^57 = 2^116 */
felem_assign(ftmp, beta);
felem_scalar(ftmp, 8);
/* ftmp[i] < 8 * 2^57 = 2^60 */
felem_diff_128_64(tmp, ftmp);
/* tmp[i] < 2^116 + 2^64 + 8 < 2^117 */
felem_reduce(x_out, tmp);
/* z' = (y + z)^2 - gamma - delta */
felem_sum(delta, gamma);
/* delta[i] < 2^57 + 2^57 = 2^58 */
felem_assign(ftmp, y_in);
felem_sum(ftmp, z_in);
/* ftmp[i] < 2^57 + 2^57 = 2^58 */
felem_square(tmp, ftmp);
/* tmp[i] < 4 * 2^58 * 2^58 = 2^118 */
felem_diff_128_64(tmp, delta);
/* tmp[i] < 2^118 + 2^64 + 8 < 2^119 */
felem_reduce(z_out, tmp);
/* y' = alpha*(4*beta - x') - 8*gamma^2 */
felem_scalar(beta, 4);
/* beta[i] < 4 * 2^57 = 2^59 */
felem_diff(beta, x_out);
/* beta[i] < 2^59 + 2^58 + 2 < 2^60 */
felem_mul(tmp, alpha, beta);
/* tmp[i] < 4 * 2^57 * 2^60 = 2^119 */
felem_square(tmp2, gamma);
/* tmp2[i] < 4 * 2^57 * 2^57 = 2^116 */
widefelem_scalar(tmp2, 8);
/* tmp2[i] < 8 * 2^116 = 2^119 */
widefelem_diff(tmp, tmp2);
/* tmp[i] < 2^119 + 2^120 < 2^121 */
felem_reduce(y_out, tmp);
}
/* Add two elliptic curve points:
* (X_1, Y_1, Z_1) + (X_2, Y_2, Z_2) = (X_3, Y_3, Z_3), where
* X_3 = (Z_1^3 * Y_2 - Z_2^3 * Y_1)^2 - (Z_1^2 * X_2 - Z_2^2 * X_1)^3 -
* 2 * Z_2^2 * X_1 * (Z_1^2 * X_2 - Z_2^2 * X_1)^2
* Y_3 = (Z_1^3 * Y_2 - Z_2^3 * Y_1) * (Z_2^2 * X_1 * (Z_1^2 * X_2 - Z_2^2 *
* X_1)^2 - X_3) -
* Z_2^3 * Y_1 * (Z_1^2 * X_2 - Z_2^2 * X_1)^3
* Z_3 = (Z_1^2 * X_2 - Z_2^2 * X_1) * (Z_1 * Z_2)
*
* This runs faster if 'mixed' is set, which requires Z_2 = 1 or Z_2 = 0. */
/* This function is not entirely constant-time: it includes a branch for
* checking whether the two input points are equal, (while not equal to the
* point at infinity). This case never happens during single point
* multiplication, so there is no timing leak for ECDH or ECDSA signing. */
static void point_add(felem x3, felem y3, felem z3, const felem x1,
const felem y1, const felem z1, const int mixed,
const felem x2, const felem y2, const felem z2) {
felem ftmp, ftmp2, ftmp3, ftmp4, ftmp5, x_out, y_out, z_out;
widefelem tmp, tmp2;
limb z1_is_zero, z2_is_zero, x_equal, y_equal;
if (!mixed) {
/* ftmp2 = z2^2 */
felem_square(tmp, z2);
felem_reduce(ftmp2, tmp);
/* ftmp4 = z2^3 */
felem_mul(tmp, ftmp2, z2);
felem_reduce(ftmp4, tmp);
/* ftmp4 = z2^3*y1 */
felem_mul(tmp2, ftmp4, y1);
felem_reduce(ftmp4, tmp2);
/* ftmp2 = z2^2*x1 */
felem_mul(tmp2, ftmp2, x1);
felem_reduce(ftmp2, tmp2);
} else {
/* We'll assume z2 = 1 (special case z2 = 0 is handled later) */
/* ftmp4 = z2^3*y1 */
felem_assign(ftmp4, y1);
/* ftmp2 = z2^2*x1 */
felem_assign(ftmp2, x1);
}
/* ftmp = z1^2 */
felem_square(tmp, z1);
felem_reduce(ftmp, tmp);
/* ftmp3 = z1^3 */
felem_mul(tmp, ftmp, z1);
felem_reduce(ftmp3, tmp);
/* tmp = z1^3*y2 */
felem_mul(tmp, ftmp3, y2);
/* tmp[i] < 4 * 2^57 * 2^57 = 2^116 */
/* ftmp3 = z1^3*y2 - z2^3*y1 */
felem_diff_128_64(tmp, ftmp4);
/* tmp[i] < 2^116 + 2^64 + 8 < 2^117 */
felem_reduce(ftmp3, tmp);
/* tmp = z1^2*x2 */
felem_mul(tmp, ftmp, x2);
/* tmp[i] < 4 * 2^57 * 2^57 = 2^116 */
/* ftmp = z1^2*x2 - z2^2*x1 */
felem_diff_128_64(tmp, ftmp2);
/* tmp[i] < 2^116 + 2^64 + 8 < 2^117 */
felem_reduce(ftmp, tmp);
/* the formulae are incorrect if the points are equal
* so we check for this and do doubling if this happens */
x_equal = felem_is_zero(ftmp);
y_equal = felem_is_zero(ftmp3);
z1_is_zero = felem_is_zero(z1);
z2_is_zero = felem_is_zero(z2);
/* In affine coordinates, (X_1, Y_1) == (X_2, Y_2) */
if (x_equal && y_equal && !z1_is_zero && !z2_is_zero) {
point_double(x3, y3, z3, x1, y1, z1);
return;
}
/* ftmp5 = z1*z2 */
if (!mixed) {
felem_mul(tmp, z1, z2);
felem_reduce(ftmp5, tmp);
} else {
/* special case z2 = 0 is handled later */
felem_assign(ftmp5, z1);
}
/* z_out = (z1^2*x2 - z2^2*x1)*(z1*z2) */
felem_mul(tmp, ftmp, ftmp5);
felem_reduce(z_out, tmp);
/* ftmp = (z1^2*x2 - z2^2*x1)^2 */
felem_assign(ftmp5, ftmp);
felem_square(tmp, ftmp);
felem_reduce(ftmp, tmp);
/* ftmp5 = (z1^2*x2 - z2^2*x1)^3 */
felem_mul(tmp, ftmp, ftmp5);
felem_reduce(ftmp5, tmp);
/* ftmp2 = z2^2*x1*(z1^2*x2 - z2^2*x1)^2 */
felem_mul(tmp, ftmp2, ftmp);
felem_reduce(ftmp2, tmp);
/* tmp = z2^3*y1*(z1^2*x2 - z2^2*x1)^3 */
felem_mul(tmp, ftmp4, ftmp5);
/* tmp[i] < 4 * 2^57 * 2^57 = 2^116 */
/* tmp2 = (z1^3*y2 - z2^3*y1)^2 */
felem_square(tmp2, ftmp3);
/* tmp2[i] < 4 * 2^57 * 2^57 < 2^116 */
/* tmp2 = (z1^3*y2 - z2^3*y1)^2 - (z1^2*x2 - z2^2*x1)^3 */
felem_diff_128_64(tmp2, ftmp5);
/* tmp2[i] < 2^116 + 2^64 + 8 < 2^117 */
/* ftmp5 = 2*z2^2*x1*(z1^2*x2 - z2^2*x1)^2 */
felem_assign(ftmp5, ftmp2);
felem_scalar(ftmp5, 2);
/* ftmp5[i] < 2 * 2^57 = 2^58 */
/* x_out = (z1^3*y2 - z2^3*y1)^2 - (z1^2*x2 - z2^2*x1)^3 -
2*z2^2*x1*(z1^2*x2 - z2^2*x1)^2 */
felem_diff_128_64(tmp2, ftmp5);
/* tmp2[i] < 2^117 + 2^64 + 8 < 2^118 */
felem_reduce(x_out, tmp2);
/* ftmp2 = z2^2*x1*(z1^2*x2 - z2^2*x1)^2 - x_out */
felem_diff(ftmp2, x_out);
/* ftmp2[i] < 2^57 + 2^58 + 2 < 2^59 */
/* tmp2 = (z1^3*y2 - z2^3*y1)*(z2^2*x1*(z1^2*x2 - z2^2*x1)^2 - x_out) */
felem_mul(tmp2, ftmp3, ftmp2);
/* tmp2[i] < 4 * 2^57 * 2^59 = 2^118 */
/* y_out = (z1^3*y2 - z2^3*y1)*(z2^2*x1*(z1^2*x2 - z2^2*x1)^2 - x_out) -
z2^3*y1*(z1^2*x2 - z2^2*x1)^3 */
widefelem_diff(tmp2, tmp);
/* tmp2[i] < 2^118 + 2^120 < 2^121 */
felem_reduce(y_out, tmp2);
/* the result (x_out, y_out, z_out) is incorrect if one of the inputs is
* the point at infinity, so we need to check for this separately */
/* if point 1 is at infinity, copy point 2 to output, and vice versa */
copy_conditional(x_out, x2, z1_is_zero);
copy_conditional(x_out, x1, z2_is_zero);
copy_conditional(y_out, y2, z1_is_zero);
copy_conditional(y_out, y1, z2_is_zero);
copy_conditional(z_out, z2, z1_is_zero);
copy_conditional(z_out, z1, z2_is_zero);
felem_assign(x3, x_out);
felem_assign(y3, y_out);
felem_assign(z3, z_out);
}
/* select_point selects the |idx|th point from a precomputation table and
* copies it to out. */
static void select_point(const u64 idx, unsigned int size,
const felem pre_comp[/*size*/][3], felem out[3]) {
unsigned i, j;
limb *outlimbs = &out[0][0];
memset(outlimbs, 0, 3 * sizeof(felem));
for (i = 0; i < size; i++) {
const limb *inlimbs = &pre_comp[i][0][0];
u64 mask = i ^ idx;
mask |= mask >> 4;
mask |= mask >> 2;
mask |= mask >> 1;
mask &= 1;
mask--;
for (j = 0; j < 4 * 3; j++) {
outlimbs[j] |= inlimbs[j] & mask;
}
}
}
/* get_bit returns the |i|th bit in |in| */
static char get_bit(const felem_bytearray in, unsigned i) {
if (i >= 224) {
return 0;
}
return (in[i >> 3] >> (i & 7)) & 1;
}
/* Interleaved point multiplication using precomputed point multiples:
* The small point multiples 0*P, 1*P, ..., 16*P are in pre_comp[],
* the scalars in scalars[]. If g_scalar is non-NULL, we also add this multiple
* of the generator, using certain (large) precomputed multiples in g_pre_comp.
* Output point (X, Y, Z) is stored in x_out, y_out, z_out */
static void batch_mul(felem x_out, felem y_out, felem z_out,
const felem_bytearray scalars[],
const unsigned num_points, const u8 *g_scalar,
const int mixed, const felem pre_comp[][17][3]) {
int i, skip;
unsigned num;
unsigned gen_mul = (g_scalar != NULL);
felem nq[3], tmp[4];
u64 bits;
u8 sign, digit;
/* set nq to the point at infinity */
memset(nq, 0, 3 * sizeof(felem));
/* Loop over all scalars msb-to-lsb, interleaving additions
* of multiples of the generator (two in each of the last 28 rounds)
* and additions of other points multiples (every 5th round). */
skip = 1; /* save two point operations in the first round */
for (i = (num_points ? 220 : 27); i >= 0; --i) {
/* double */
if (!skip) {
point_double(nq[0], nq[1], nq[2], nq[0], nq[1], nq[2]);
}
/* add multiples of the generator */
if (gen_mul && (i <= 27)) {
/* first, look 28 bits upwards */
bits = get_bit(g_scalar, i + 196) << 3;
bits |= get_bit(g_scalar, i + 140) << 2;
bits |= get_bit(g_scalar, i + 84) << 1;
bits |= get_bit(g_scalar, i + 28);
/* select the point to add, in constant time */
select_point(bits, 16, g_pre_comp[1], tmp);
if (!skip) {
point_add(nq[0], nq[1], nq[2], nq[0], nq[1], nq[2], 1 /* mixed */,
tmp[0], tmp[1], tmp[2]);
} else {
memcpy(nq, tmp, 3 * sizeof(felem));
skip = 0;
}
/* second, look at the current position */
bits = get_bit(g_scalar, i + 168) << 3;
bits |= get_bit(g_scalar, i + 112) << 2;
bits |= get_bit(g_scalar, i + 56) << 1;
bits |= get_bit(g_scalar, i);
/* select the point to add, in constant time */
select_point(bits, 16, g_pre_comp[0], tmp);
point_add(nq[0], nq[1], nq[2], nq[0], nq[1], nq[2], 1 /* mixed */, tmp[0],
tmp[1], tmp[2]);
}
/* do other additions every 5 doublings */
if (num_points && (i % 5 == 0)) {
/* loop over all scalars */
for (num = 0; num < num_points; ++num) {
bits = get_bit(scalars[num], i + 4) << 5;
bits |= get_bit(scalars[num], i + 3) << 4;
bits |= get_bit(scalars[num], i + 2) << 3;
bits |= get_bit(scalars[num], i + 1) << 2;
bits |= get_bit(scalars[num], i) << 1;
bits |= get_bit(scalars[num], i - 1);
ec_GFp_nistp_recode_scalar_bits(&sign, &digit, bits);
/* select the point to add or subtract */
select_point(digit, 17, pre_comp[num], tmp);
felem_neg(tmp[3], tmp[1]); /* (X, -Y, Z) is the negative point */
copy_conditional(tmp[1], tmp[3], sign);
if (!skip) {
point_add(nq[0], nq[1], nq[2], nq[0], nq[1], nq[2], mixed, tmp[0],
tmp[1], tmp[2]);
} else {
memcpy(nq, tmp, 3 * sizeof(felem));
skip = 0;
}
}
}
}
felem_assign(x_out, nq[0]);
felem_assign(y_out, nq[1]);
felem_assign(z_out, nq[2]);
}
int ec_GFp_nistp224_group_init(EC_GROUP *group) {
int ret;
ret = ec_GFp_simple_group_init(group);
group->a_is_minus3 = 1;
return ret;
}
int ec_GFp_nistp224_group_set_curve(EC_GROUP *group, const BIGNUM *p,
const BIGNUM *a, const BIGNUM *b,
BN_CTX *ctx) {
int ret = 0;
BN_CTX *new_ctx = NULL;
BIGNUM *curve_p, *curve_a, *curve_b;
if (ctx == NULL) {
ctx = BN_CTX_new();
new_ctx = ctx;
if (ctx == NULL) {
return 0;
}
}
BN_CTX_start(ctx);
if (((curve_p = BN_CTX_get(ctx)) == NULL) ||
((curve_a = BN_CTX_get(ctx)) == NULL) ||
((curve_b = BN_CTX_get(ctx)) == NULL)) {
goto err;
}
BN_bin2bn(nistp224_curve_params[0], sizeof(felem_bytearray), curve_p);
BN_bin2bn(nistp224_curve_params[1], sizeof(felem_bytearray), curve_a);
BN_bin2bn(nistp224_curve_params[2], sizeof(felem_bytearray), curve_b);
if (BN_cmp(curve_p, p) ||
BN_cmp(curve_a, a) ||
BN_cmp(curve_b, b)) {
OPENSSL_PUT_ERROR(EC, EC_R_WRONG_CURVE_PARAMETERS);
goto err;
}
ret = ec_GFp_simple_group_set_curve(group, p, a, b, ctx);
err:
BN_CTX_end(ctx);
BN_CTX_free(new_ctx);
return ret;
}
/* Takes the Jacobian coordinates (X, Y, Z) of a point and returns
* (X', Y') = (X/Z^2, Y/Z^3) */
int ec_GFp_nistp224_point_get_affine_coordinates(const EC_GROUP *group,
const EC_POINT *point,
BIGNUM *x, BIGNUM *y,
BN_CTX *ctx) {
felem z1, z2, x_in, y_in, x_out, y_out;
widefelem tmp;
if (EC_POINT_is_at_infinity(group, point)) {
OPENSSL_PUT_ERROR(EC, EC_R_POINT_AT_INFINITY);
return 0;
}
if (!BN_to_felem(x_in, &point->X) ||
!BN_to_felem(y_in, &point->Y) ||
!BN_to_felem(z1, &point->Z)) {
return 0;
}
felem_inv(z2, z1);
felem_square(tmp, z2);
felem_reduce(z1, tmp);
felem_mul(tmp, x_in, z1);
felem_reduce(x_in, tmp);
felem_contract(x_out, x_in);
if (x != NULL && !felem_to_BN(x, x_out)) {
OPENSSL_PUT_ERROR(EC, ERR_R_BN_LIB);
return 0;
}
felem_mul(tmp, z1, z2);
felem_reduce(z1, tmp);
felem_mul(tmp, y_in, z1);
felem_reduce(y_in, tmp);
felem_contract(y_out, y_in);
if (y != NULL && !felem_to_BN(y, y_out)) {
OPENSSL_PUT_ERROR(EC, ERR_R_BN_LIB);
return 0;
}
return 1;
}
static void make_points_affine(size_t num, felem points[/*num*/][3],
felem tmp_felems[/*num+1*/]) {
/* Runs in constant time, unless an input is the point at infinity
* (which normally shouldn't happen). */
ec_GFp_nistp_points_make_affine_internal(
num, points, sizeof(felem), tmp_felems, (void (*)(void *))felem_one,
(int (*)(const void *))felem_is_zero_int,
(void (*)(void *, const void *))felem_assign,
(void (*)(void *, const void *))felem_square_reduce,
(void (*)(void *, const void *, const void *))felem_mul_reduce,
(void (*)(void *, const void *))felem_inv,
(void (*)(void *, const void *))felem_contract);
}
int ec_GFp_nistp224_points_mul(const EC_GROUP *group, EC_POINT *r,
const BIGNUM *g_scalar, const EC_POINT *p_,
const BIGNUM *p_scalar_, BN_CTX *ctx) {
/* TODO: This function used to take |points| and |scalars| as arrays of
* |num| elements. The code below should be simplified to work in terms of
* |p_| and |p_scalar_|. */
size_t num = p_ != NULL ? 1 : 0;
const EC_POINT **points = p_ != NULL ? &p_ : NULL;
BIGNUM const *const *scalars = p_ != NULL ? &p_scalar_ : NULL;
int ret = 0;
int j;
unsigned i;
int mixed = 0;
BN_CTX *new_ctx = NULL;
BIGNUM *x, *y, *z, *tmp_scalar;
felem_bytearray g_secret;
felem_bytearray *secrets = NULL;
felem(*pre_comp)[17][3] = NULL;
felem *tmp_felems = NULL;
felem_bytearray tmp;
unsigned num_bytes;
size_t num_points = num;
felem x_in, y_in, z_in, x_out, y_out, z_out;
const EC_POINT *p = NULL;
const BIGNUM *p_scalar = NULL;
if (ctx == NULL) {
ctx = BN_CTX_new();
new_ctx = ctx;
if (ctx == NULL) {
return 0;
}
}
BN_CTX_start(ctx);
if ((x = BN_CTX_get(ctx)) == NULL ||
(y = BN_CTX_get(ctx)) == NULL ||
(z = BN_CTX_get(ctx)) == NULL ||
(tmp_scalar = BN_CTX_get(ctx)) == NULL) {
goto err;
}
if (num_points > 0) {
if (num_points >= 3) {
/* unless we precompute multiples for just one or two points,
* converting those into affine form is time well spent */
mixed = 1;
}
secrets = OPENSSL_malloc(num_points * sizeof(felem_bytearray));
pre_comp = OPENSSL_malloc(num_points * 17 * 3 * sizeof(felem));
if (mixed) {
tmp_felems = OPENSSL_malloc((num_points * 17 + 1) * sizeof(felem));
}
if (secrets == NULL ||
pre_comp == NULL ||
(mixed && tmp_felems == NULL)) {
OPENSSL_PUT_ERROR(EC, ERR_R_MALLOC_FAILURE);
goto err;
}
/* we treat NULL scalars as 0, and NULL points as points at infinity,
* i.e., they contribute nothing to the linear combination */
memset(secrets, 0, num_points * sizeof(felem_bytearray));
memset(pre_comp, 0, num_points * 17 * 3 * sizeof(felem));
for (i = 0; i < num_points; ++i) {
if (i == num) {
/* the generator */
p = EC_GROUP_get0_generator(group);
p_scalar = g_scalar;
} else {
/* the i^th point */
p = points[i];
p_scalar = scalars[i];
}
if (p_scalar != NULL && p != NULL) {
/* reduce g_scalar to 0 <= g_scalar < 2^224 */
if (BN_num_bits(p_scalar) > 224 || BN_is_negative(p_scalar)) {
/* this is an unusual input, and we don't guarantee
* constant-timeness */
if (!BN_nnmod(tmp_scalar, p_scalar, &group->order, ctx)) {
OPENSSL_PUT_ERROR(EC, ERR_R_BN_LIB);
goto err;
}
num_bytes = BN_bn2bin(tmp_scalar, tmp);
} else {
num_bytes = BN_bn2bin(p_scalar, tmp);
}
flip_endian(secrets[i], tmp, num_bytes);
/* precompute multiples */
if (!BN_to_felem(x_out, &p->X) ||
!BN_to_felem(y_out, &p->Y) ||
!BN_to_felem(z_out, &p->Z)) {
goto err;
}
felem_assign(pre_comp[i][1][0], x_out);
felem_assign(pre_comp[i][1][1], y_out);
felem_assign(pre_comp[i][1][2], z_out);
for (j = 2; j <= 16; ++j) {
if (j & 1) {
point_add(pre_comp[i][j][0], pre_comp[i][j][1], pre_comp[i][j][2],
pre_comp[i][1][0], pre_comp[i][1][1], pre_comp[i][1][2],
0, pre_comp[i][j - 1][0], pre_comp[i][j - 1][1],
pre_comp[i][j - 1][2]);
} else {
point_double(pre_comp[i][j][0], pre_comp[i][j][1],
pre_comp[i][j][2], pre_comp[i][j / 2][0],
pre_comp[i][j / 2][1], pre_comp[i][j / 2][2]);
}
}
}
}
if (mixed) {
make_points_affine(num_points * 17, pre_comp[0], tmp_felems);
}
}
if (g_scalar != NULL) {
memset(g_secret, 0, sizeof(g_secret));
/* reduce g_scalar to 0 <= g_scalar < 2^224 */
if (BN_num_bits(g_scalar) > 224 || BN_is_negative(g_scalar)) {
/* this is an unusual input, and we don't guarantee constant-timeness */
if (!BN_nnmod(tmp_scalar, g_scalar, &group->order, ctx)) {
OPENSSL_PUT_ERROR(EC, ERR_R_BN_LIB);
goto err;
}
num_bytes = BN_bn2bin(tmp_scalar, tmp);
} else {
num_bytes = BN_bn2bin(g_scalar, tmp);
}
flip_endian(g_secret, tmp, num_bytes);
}
batch_mul(x_out, y_out, z_out, (const felem_bytearray(*))secrets,
num_points, g_scalar != NULL ? g_secret : NULL, mixed,
(const felem(*)[17][3])pre_comp);
/* reduce the output to its unique minimal representation */
felem_contract(x_in, x_out);
felem_contract(y_in, y_out);
felem_contract(z_in, z_out);
if (!felem_to_BN(x, x_in) ||
!felem_to_BN(y, y_in) ||
!felem_to_BN(z, z_in)) {
OPENSSL_PUT_ERROR(EC, ERR_R_BN_LIB);
goto err;
}
ret = ec_point_set_Jprojective_coordinates_GFp(group, r, x, y, z, ctx);
err:
BN_CTX_end(ctx);
BN_CTX_free(new_ctx);
OPENSSL_free(secrets);
OPENSSL_free(pre_comp);
OPENSSL_free(tmp_felems);
return ret;
}
const EC_METHOD *EC_GFp_nistp224_method(void) {
static const EC_METHOD ret = {ec_GFp_nistp224_group_init,
ec_GFp_simple_group_finish,
ec_GFp_simple_group_clear_finish,
ec_GFp_simple_group_copy,
ec_GFp_nistp224_group_set_curve,
ec_GFp_nistp224_point_get_affine_coordinates,
ec_GFp_nistp224_points_mul,
0 /* check_pub_key_order */,
ec_GFp_simple_field_mul,
ec_GFp_simple_field_sqr,
0 /* field_encode */,
0 /* field_decode */,
0 /* field_set_to_one */};
return &ret;
}
#endif /* 64_BIT && !WINDOWS && !SMALL */