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https://github.com/trezor/trezor-firmware.git
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829 lines
23 KiB
C
829 lines
23 KiB
C
/**
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* Copyright (c) 2013-2014 Tomas Dzetkulic
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* Copyright (c) 2013-2014 Pavol Rusnak
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* Copyright (c) 2015 Jochen Hoenicke
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*
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* Permission is hereby granted, free of charge, to any person obtaining
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* a copy of this software and associated documentation files (the "Software"),
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* to deal in the Software without restriction, including without limitation
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* the rights to use, copy, modify, merge, publish, distribute, sublicense,
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* and/or sell copies of the Software, and to permit persons to whom the
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* Software is furnished to do so, subject to the following conditions:
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*
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* The above copyright notice and this permission notice shall be included
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* in all copies or substantial portions of the Software.
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*
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* THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS
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* OR IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY,
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* FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL
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* THE AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES
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* OR OTHER LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE,
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* ARISING FROM, OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR
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* OTHER DEALINGS IN THE SOFTWARE.
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*/
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#include <stdio.h>
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#include <string.h>
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#include <assert.h>
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#include "bignum.h"
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#include "macros.h"
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/* big number library */
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/* The structure bignum256 is an array of nine 32-bit values, which
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* are digits in base 2^30 representation. I.e. the number
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* bignum256 a;
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* represents the value
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* sum_{i=0}^8 a.val[i] * 2^{30 i}.
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*
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* The number is *normalized* iff every digit is < 2^30.
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*
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* As the name suggests, a bignum256 is intended to represent a 256
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* bit number, but it can represent 270 bits. Numbers are usually
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* reduced using a prime, either the group order or the field prime.
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* The reduction is often partly done by bn_fast_mod, and similarly
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* implicitly in bn_multiply. A *partly reduced number* is a
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* normalized number between 0 (inclusive) and 2*prime (exclusive).
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*
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* A partly reduced number can be fully reduced by calling bn_mod.
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* Only a fully reduced number is guaranteed to fit in 256 bit.
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*
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* All functions assume that the prime in question is slightly smaller
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* than 2^256. In particular it must be between 2^256-2^224 and
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* 2^256 and it must be a prime number.
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*/
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inline uint32_t read_be(const uint8_t *data)
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{
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return (((uint32_t)data[0]) << 24) |
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(((uint32_t)data[1]) << 16) |
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(((uint32_t)data[2]) << 8) |
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(((uint32_t)data[3]));
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}
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inline void write_be(uint8_t *data, uint32_t x)
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{
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data[0] = x >> 24;
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data[1] = x >> 16;
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data[2] = x >> 8;
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data[3] = x;
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}
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// convert a raw bigendian 256 bit value into a normalized bignum.
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// out_number is partly reduced (since it fits in 256 bit).
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void bn_read_be(const uint8_t *in_number, bignum256 *out_number)
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{
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int i;
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uint32_t temp = 0;
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for (i = 0; i < 8; i++) {
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// invariant: temp = (in_number % 2^(32i)) >> 30i
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// get next limb = (in_number % 2^(32(i+1))) >> 32i
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uint32_t limb = read_be(in_number + (7 - i) * 4);
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// temp = (in_number % 2^(32(i+1))) << 30i
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temp |= limb << (2*i);
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// store 30 bits into val[i]
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out_number->val[i]= temp & 0x3FFFFFFF;
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// prepare temp for next round
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temp = limb >> (30 - 2*i);
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}
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out_number->val[8] = temp;
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}
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// convert a normalized bignum to a raw bigendian 256 bit number.
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// in_number must be fully reduced.
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void bn_write_be(const bignum256 *in_number, uint8_t *out_number)
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{
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int i;
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uint32_t temp = in_number->val[8] << 16;
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for (i = 0; i < 8; i++) {
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// invariant: temp = (in_number >> 30*(8-i)) << (16 + 2i)
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uint32_t limb = in_number->val[7 - i];
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temp |= limb >> (14 - 2*i);
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write_be(out_number + i * 4, temp);
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temp = limb << (18 + 2*i);
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}
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}
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// sets a bignum to zero.
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void bn_zero(bignum256 *a)
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{
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int i;
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for (i = 0; i < 9; i++) {
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a->val[i] = 0;
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}
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}
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// checks that a bignum is zero.
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// a must be normalized
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// function is constant time (on some architectures, in particular ARM).
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int bn_is_zero(const bignum256 *a)
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{
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int i;
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uint32_t result = 0;
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for (i = 0; i < 9; i++) {
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result |= a->val[i];
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}
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return !result;
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}
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// Check whether a < b
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// a and b must be normalized
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// function is constant time (on some architectures, in particular ARM).
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int bn_is_less(const bignum256 *a, const bignum256 *b)
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{
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int i;
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uint32_t res1 = 0;
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uint32_t res2 = 0;
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for (i = 8; i >= 0; i--) {
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res1 = (res1 << 1) | (a->val[i] < b->val[i]);
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res2 = (res2 << 1) | (a->val[i] > b->val[i]);
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}
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return res1 > res2;
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}
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// Check whether a == b
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// a and b must be normalized
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// function is constant time (on some architectures, in particular ARM).
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int bn_is_equal(const bignum256 *a, const bignum256 *b) {
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int i;
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uint32_t result = 0;
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for (i = 0; i < 9; i++) {
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result |= (a->val[i] ^ b->val[i]);
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}
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return !result;
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}
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// Assigns res = cond ? truecase : falsecase
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// assumes that cond is either 0 or 1.
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// function is constant time.
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void bn_cmov(bignum256 *res, int cond, const bignum256 *truecase, const bignum256 *falsecase)
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{
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int i;
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uint32_t tmask = (uint32_t) -cond;
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uint32_t fmask = ~tmask;
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assert (cond == 1 || cond == 0);
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for (i = 0; i < 9; i++) {
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res->val[i] = (truecase->val[i] & tmask) |
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(falsecase->val[i] & fmask);
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}
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}
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// shift number to the left, i.e multiply it by 2.
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// a must be normalized. The result is normalized but not reduced.
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void bn_lshift(bignum256 *a)
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{
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int i;
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for (i = 8; i > 0; i--) {
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a->val[i] = ((a->val[i] << 1) & 0x3FFFFFFF) | ((a->val[i - 1] & 0x20000000) >> 29);
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}
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a->val[0] = (a->val[0] << 1) & 0x3FFFFFFF;
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}
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// shift number to the right, i.e divide by 2 while rounding down.
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// a must be normalized. The result is normalized.
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void bn_rshift(bignum256 *a)
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{
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int i;
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for (i = 0; i < 8; i++) {
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a->val[i] = (a->val[i] >> 1) | ((a->val[i + 1] & 1) << 29);
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}
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a->val[8] >>= 1;
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}
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// multiply x by 1/2 modulo prime.
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// it computes x = (x & 1) ? (x + prime) >> 1 : x >> 1.
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// assumes x is normalized.
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// if x was partly reduced, it is also partly reduced on exit.
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// function is constant time.
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void bn_mult_half(bignum256 * x, const bignum256 *prime)
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{
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int j;
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uint32_t xodd = -(x->val[0] & 1);
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// compute x = x/2 mod prime
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// if x is odd compute (x+prime)/2
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uint32_t tmp1 = (x->val[0] + (prime->val[0] & xodd)) >> 1;
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for (j = 0; j < 8; j++) {
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uint32_t tmp2 = (x->val[j+1] + (prime->val[j+1] & xodd));
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tmp1 += (tmp2 & 1) << 29;
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x->val[j] = tmp1 & 0x3fffffff;
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tmp1 >>= 30;
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tmp1 += tmp2 >> 1;
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}
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x->val[8] = tmp1;
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}
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// multiply x by k modulo prime.
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// assumes x is normalized, 0 <= k <= 4.
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// guarantees x is partly reduced.
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void bn_mult_k(bignum256 *x, uint8_t k, const bignum256 *prime)
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{
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int j;
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for (j = 0; j < 9; j++) {
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x->val[j] = k * x->val[j];
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}
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bn_fast_mod(x, prime);
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}
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// compute x = x mod prime by computing x >= prime ? x - prime : x.
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// assumes x partly reduced, guarantees x fully reduced.
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void bn_mod(bignum256 *x, const bignum256 *prime)
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{
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const int flag = bn_is_less(x, prime); // x < prime
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bignum256 temp;
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bn_subtract(x, prime, &temp); // temp = x - prime
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bn_cmov(x, flag, x, &temp);
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}
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// auxiliary function for multiplication.
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// compute k * x as a 540 bit number in base 2^30 (normalized).
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// assumes that k and x are normalized.
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void bn_multiply_long(const bignum256 *k, const bignum256 *x, uint32_t res[18])
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{
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int i, j;
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uint64_t temp = 0;
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// compute lower half of long multiplication
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for (i = 0; i < 9; i++)
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{
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for (j = 0; j <= i; j++) {
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// no overflow, since 9*2^60 < 2^64
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temp += k->val[j] * (uint64_t)x->val[i - j];
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}
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res[i] = temp & 0x3FFFFFFFu;
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temp >>= 30;
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}
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// compute upper half
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for (; i < 17; i++)
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{
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for (j = i - 8; j < 9 ; j++) {
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// no overflow, since 9*2^60 < 2^64
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temp += k->val[j] * (uint64_t)x->val[i - j];
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}
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res[i] = temp & 0x3FFFFFFFu;
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temp >>= 30;
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}
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res[17] = temp;
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}
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// auxiliary function for multiplication.
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// reduces res modulo prime.
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// assumes res normalized, res < 2^(30(i-7)) * 2 * prime
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// guarantees res normalized, res < 2^(30(i-8)) * 2 * prime
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void bn_multiply_reduce_step(uint32_t res[18], const bignum256 *prime, uint32_t i) {
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// let k = i-8.
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// on entry:
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// 0 <= res < 2^(30k + 31) * prime
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// estimate coef = (res / prime / 2^30k)
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// by coef = res / 2^(30k + 256) rounded down
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// 0 <= coef < 2^31
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// subtract (coef * 2^(30k) * prime) from res
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// note that we unrolled the first iteration
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uint32_t j;
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uint32_t coef = (res[i] >> 16) + (res[i + 1] << 14);
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uint64_t temp = 0x2000000000000000ull + res[i - 8] - prime->val[0] * (uint64_t)coef;
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assert (coef < 0x80000000u);
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res[i - 8] = temp & 0x3FFFFFFF;
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for (j = 1; j < 9; j++) {
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temp >>= 30;
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// Note: coeff * prime->val[j] <= (2^31-1) * (2^30-1)
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// Hence, this addition will not underflow.
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temp += 0x1FFFFFFF80000000ull + res[i - 8 + j] - prime->val[j] * (uint64_t)coef;
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res[i - 8 + j] = temp & 0x3FFFFFFF;
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// 0 <= temp < 2^61 + 2^30
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}
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temp >>= 30;
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temp += 0x1FFFFFFF80000000ull + res[i - 8 + j];
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res[i - 8 + j] = temp & 0x3FFFFFFF;
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// we rely on the fact that prime > 2^256 - 2^224
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// res = oldres - coef*2^(30k) * prime;
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// and
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// coef * 2^(30k + 256) <= oldres < (coef+1) * 2^(30k + 256)
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// Hence, 0 <= res < 2^30k (2^256 + coef * (2^256 - prime))
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// < 2^30k (2^256 + 2^31 * 2^224)
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// < 2^30k (2 * prime)
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}
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// auxiliary function for multiplication.
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// reduces x = res modulo prime.
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// assumes res normalized, res < 2^270 * 2 * prime
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// guarantees x partly reduced, i.e., x < 2 * prime
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void bn_multiply_reduce(bignum256 *x, uint32_t res[18], const bignum256 *prime)
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{
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int i;
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// res = k * x is a normalized number (every limb < 2^30)
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// 0 <= res < 2^270 * 2 * prime.
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for (i = 16; i >= 8; i--) {
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bn_multiply_reduce_step(res, prime, i);
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assert(res[i + 1] == 0);
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}
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// store the result
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for (i = 0; i < 9; i++) {
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x->val[i] = res[i];
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}
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}
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// Compute x := k * x (mod prime)
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// both inputs must be smaller than 180 * prime.
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// result is partly reduced (0 <= x < 2 * prime)
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// This only works for primes between 2^256-2^224 and 2^256.
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void bn_multiply(const bignum256 *k, bignum256 *x, const bignum256 *prime)
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{
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uint32_t res[18] = {0};
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bn_multiply_long(k, x, res);
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bn_multiply_reduce(x, res, prime);
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MEMSET_BZERO(res, sizeof(res));
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}
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// partly reduce x modulo prime
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// input x does not have to be normalized.
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// x can be any number that fits.
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// prime must be between (2^256 - 2^224) and 2^256
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// result is partly reduced, smaller than 2*prime
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void bn_fast_mod(bignum256 *x, const bignum256 *prime)
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{
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int j;
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uint32_t coef;
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uint64_t temp;
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coef = x->val[8] >> 16;
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// substract (coef * prime) from x
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// note that we unrolled the first iteration
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temp = 0x2000000000000000ull + x->val[0] - prime->val[0] * (uint64_t)coef;
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x->val[0] = temp & 0x3FFFFFFF;
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for (j = 1; j < 9; j++) {
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temp >>= 30;
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temp += 0x1FFFFFFF80000000ull + x->val[j] - prime->val[j] * (uint64_t)coef;
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x->val[j] = temp & 0x3FFFFFFF;
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}
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}
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// square root of x = x^((p+1)/4)
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// http://en.wikipedia.org/wiki/Quadratic_residue#Prime_or_prime_power_modulus
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// assumes x is normalized but not necessarily reduced.
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// guarantees x is reduced
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void bn_sqrt(bignum256 *x, const bignum256 *prime)
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{
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// this method compute x^1/2 = x^(prime+1)/4
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uint32_t i, j, limb;
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bignum256 res, p;
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bn_zero(&res); res.val[0] = 1;
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// compute p = (prime+1)/4
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memcpy(&p, prime, sizeof(bignum256));
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p.val[0] += 1;
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bn_rshift(&p);
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bn_rshift(&p);
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for (i = 0; i < 9; i++) {
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// invariants:
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// x = old(x)^(2^(i*30))
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// res = old(x)^(p % 2^(i*30))
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// get the i-th limb of prime - 2
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limb = p.val[i];
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for (j = 0; j < 30; j++) {
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// invariants:
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// x = old(x)^(2^(i*30+j))
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// res = old(x)^(p % 2^(i*30+j))
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// limb = (p % 2^(i*30+30)) / 2^(i*30+j)
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if (i == 8 && limb == 0) break;
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if (limb & 1) {
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bn_multiply(x, &res, prime);
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}
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limb >>= 1;
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bn_multiply(x, x, prime);
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}
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}
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bn_mod(&res, prime);
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memcpy(x, &res, sizeof(bignum256));
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MEMSET_BZERO(&res, sizeof(res));
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MEMSET_BZERO(&p, sizeof(p));
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}
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#if ! USE_INVERSE_FAST
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// in field G_prime, small but slow
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void bn_inverse(bignum256 *x, const bignum256 *prime)
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{
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// this method compute x^-1 = x^(prime-2)
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uint32_t i, j, limb;
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bignum256 res;
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bn_zero(&res); res.val[0] = 1;
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for (i = 0; i < 9; i++) {
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// invariants:
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// x = old(x)^(2^(i*30))
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// res = old(x)^((prime-2) % 2^(i*30))
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// get the i-th limb of prime - 2
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limb = prime->val[i];
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// this is not enough in general but fine for secp256k1 & nist256p1 because prime->val[0] > 1
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if (i == 0) limb -= 2;
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for (j = 0; j < 30; j++) {
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// invariants:
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// x = old(x)^(2^(i*30+j))
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// res = old(x)^((prime-2) % 2^(i*30+j))
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// limb = ((prime-2) % 2^(i*30+30)) / 2^(i*30+j)
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// early abort when only zero bits follow
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if (i == 8 && limb == 0) break;
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if (limb & 1) {
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bn_multiply(x, &res, prime);
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}
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limb >>= 1;
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bn_multiply(x, x, prime);
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}
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}
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bn_mod(&res, prime);
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memcpy(x, &res, sizeof(bignum256));
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}
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#else
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// in field G_prime, big and complicated but fast
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// the input must not be 0 mod prime.
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// the result is smaller than prime
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void bn_inverse(bignum256 *x, const bignum256 *prime)
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{
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int i, j, k, cmp;
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struct combo {
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uint32_t a[9];
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int len1;
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} us, vr, *odd, *even;
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uint32_t pp[8];
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uint32_t temp32;
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uint64_t temp;
|
|
|
|
// The algorithm is based on Schroeppel et. al. "Almost Modular Inverse"
|
|
// algorithm. We keep four values u,v,r,s in the combo registers
|
|
// us and vr. us stores u in the first len1 limbs (little endian)
|
|
// and s in the last 9-len1 limbs (big endian). vr stores v and r.
|
|
// This is because both u*s and v*r are guaranteed to fit in 8 limbs, so
|
|
// their components are guaranteed to fit in 9. During the algorithm,
|
|
// the length of u and v shrinks while r and s grow.
|
|
// u,v,r,s correspond to F,G,B,C in Schroeppel's algorithm.
|
|
|
|
// reduce x modulo prime. This is necessary as it has to fit in 8 limbs.
|
|
bn_fast_mod(x, prime);
|
|
bn_mod(x, prime);
|
|
// convert x and prime to 8x32 bit limb form
|
|
temp32 = prime->val[0];
|
|
for (i = 0; i < 8; i++) {
|
|
temp32 |= prime->val[i + 1] << (30-2*i);
|
|
us.a[i] = pp[i] = temp32;
|
|
temp32 = prime->val[i + 1] >> (2+2*i);
|
|
}
|
|
temp32 = x->val[0];
|
|
for (i = 0; i < 8; i++) {
|
|
temp32 |= x->val[i + 1] << (30-2*i);
|
|
vr.a[i] = temp32;
|
|
temp32 = x->val[i + 1] >> (2+2*i);
|
|
}
|
|
us.len1 = 8;
|
|
vr.len1 = 8;
|
|
// set s = 1 and r = 0
|
|
us.a[8] = 1;
|
|
vr.a[8] = 0;
|
|
// set k = 0.
|
|
k = 0;
|
|
|
|
// only one of the numbers u,v can be even at any time. We
|
|
// let even point to that number and odd to the other.
|
|
// Initially the prime u is guaranteed to be odd.
|
|
odd = &us;
|
|
even = &vr;
|
|
|
|
// u = prime, v = x
|
|
// r = 0 , s = 1
|
|
// k = 0
|
|
for (;;) {
|
|
// invariants:
|
|
// let u = limbs us.a[0..u.len1-1] in little endian,
|
|
// let s = limbs us.a[u.len..8] in big endian,
|
|
// let v = limbs vr.a[0..u.len1-1] in little endian,
|
|
// let r = limbs vr.a[u.len..8] in big endian,
|
|
// r,s >= 0 ; u,v >= 1
|
|
// x*-r = u*2^k mod prime
|
|
// x*s = v*2^k mod prime
|
|
// u*s + v*r = prime
|
|
// floor(log2(u)) + floor(log2(v)) + k <= 510
|
|
// max(u,v) <= 2^k (*) see comment at end of loop
|
|
// gcd(u,v) = 1
|
|
// {odd,even} = {&us, &vr}
|
|
// odd->a[0] and odd->a[8] are odd
|
|
// even->a[0] or even->a[8] is even
|
|
//
|
|
// first u/v are large and r/s small
|
|
// later u/v are small and r/s large
|
|
assert(odd->a[0] & 1);
|
|
assert(odd->a[8] & 1);
|
|
|
|
// adjust length of even.
|
|
while (even->a[even->len1 - 1] == 0) {
|
|
even->len1--;
|
|
// if input was 0, return.
|
|
// This simple check prevents crashing with stack underflow
|
|
// or worse undesired behaviour for illegal input.
|
|
if (even->len1 < 0)
|
|
return;
|
|
}
|
|
|
|
// reduce even->a while it is even
|
|
while (even->a[0] == 0) {
|
|
// shift right first part of even by a limb
|
|
// and shift left second part of even by a limb.
|
|
for (i = 0; i < 8; i++) {
|
|
even->a[i] = even->a[i+1];
|
|
}
|
|
even->a[i] = 0;
|
|
even->len1--;
|
|
k += 32;
|
|
}
|
|
// count up to 32 zero bits of even->a.
|
|
j = 0;
|
|
while ((even->a[0] & (1 << j)) == 0) {
|
|
j++;
|
|
}
|
|
if (j > 0) {
|
|
// shift first part of even right by j bits.
|
|
for (i = 0; i + 1 < even->len1; i++) {
|
|
even->a[i] = (even->a[i] >> j) | (even->a[i + 1] << (32 - j));
|
|
}
|
|
even->a[i] = (even->a[i] >> j);
|
|
if (even->a[i] == 0) {
|
|
even->len1--;
|
|
} else {
|
|
i++;
|
|
}
|
|
|
|
// shift second part of even left by j bits.
|
|
for (; i < 8; i++) {
|
|
even->a[i] = (even->a[i] << j) | (even->a[i + 1] >> (32 - j));
|
|
}
|
|
even->a[i] = (even->a[i] << j);
|
|
// add j bits to k.
|
|
k += j;
|
|
}
|
|
// invariant is reestablished.
|
|
// now both a[0] are odd.
|
|
assert(odd->a[0] & 1);
|
|
assert(odd->a[8] & 1);
|
|
assert(even->a[0] & 1);
|
|
assert((even->a[8] & 1) == 0);
|
|
|
|
// cmp > 0 if us.a[0..len1-1] > vr.a[0..len1-1],
|
|
// cmp = 0 if equal, < 0 if less.
|
|
cmp = us.len1 - vr.len1;
|
|
if (cmp == 0) {
|
|
i = us.len1 - 1;
|
|
while (i >= 0 && us.a[i] == vr.a[i]) i--;
|
|
// both are equal to 1 and we are done.
|
|
if (i == -1)
|
|
break;
|
|
cmp = us.a[i] > vr.a[i] ? 1 : -1;
|
|
}
|
|
if (cmp > 0) {
|
|
even = &us;
|
|
odd = &vr;
|
|
} else {
|
|
even = &vr;
|
|
odd = &us;
|
|
}
|
|
|
|
// now even > odd.
|
|
|
|
// even->a[0..len1-1] = (even->a[0..len1-1] - odd->a[0..len1-1]);
|
|
temp = 1;
|
|
for (i = 0; i < odd->len1; i++) {
|
|
temp += 0xFFFFFFFFull + even->a[i] - odd->a[i];
|
|
even->a[i] = temp & 0xFFFFFFFF;
|
|
temp >>= 32;
|
|
}
|
|
for (; i < even->len1; i++) {
|
|
temp += 0xFFFFFFFFull + even->a[i];
|
|
even->a[i] = temp & 0xFFFFFFFF;
|
|
temp >>= 32;
|
|
}
|
|
// odd->a[len1..8] = (odd->b[len1..8] + even->b[len1..8]);
|
|
temp = 0;
|
|
for (i = 8; i >= even->len1; i--) {
|
|
temp += (uint64_t) odd->a[i] + even->a[i];
|
|
odd->a[i] = temp & 0xFFFFFFFF;
|
|
temp >>= 32;
|
|
}
|
|
for (; i >= odd->len1; i--) {
|
|
temp += (uint64_t) odd->a[i];
|
|
odd->a[i] = temp & 0xFFFFFFFF;
|
|
temp >>= 32;
|
|
}
|
|
// note that
|
|
// if u > v:
|
|
// u'2^k = (u - v) 2^k = x(-r) - xs = x(-(r+s)) = x(-r') mod prime
|
|
// u's' + v'r' = (u-v)s + v(r+s) = us + vr
|
|
// if u < v:
|
|
// v'2^k = (v - u) 2^k = xs - x(-r) = x(s+r) = xs' mod prime
|
|
// u's' + v'r' = u(s+r) + (v-u)r = us + vr
|
|
|
|
// even->a[0] is difference between two odd numbers, hence even.
|
|
// odd->a[8] is sum of even and odd number, hence odd.
|
|
assert(odd->a[0] & 1);
|
|
assert(odd->a[8] & 1);
|
|
assert((even->a[0] & 1) == 0);
|
|
|
|
// The invariants are (almost) reestablished.
|
|
// The invariant max(u,v) <= 2^k can be invalidated at this point,
|
|
// because odd->a[len1..8] was changed. We only have
|
|
//
|
|
// odd->a[len1..8] <= 2^{k+1}
|
|
//
|
|
// Since even->a[0] is even, k will be incremented at the beginning
|
|
// of the next loop while odd->a[len1..8] remains unchanged.
|
|
// So after that, odd->a[len1..8] <= 2^k will hold again.
|
|
}
|
|
// In the last iteration we had u = v and gcd(u,v) = 1.
|
|
// Hence, u=1, v=1, s+r = prime, k <= 510, 2^k > max(s,r) >= prime/2
|
|
// This implies 0 <= s < prime and 255 <= k <= 510.
|
|
//
|
|
// The invariants also give us x*s = 2^k mod prime,
|
|
// hence s = 2^k * x^-1 mod prime.
|
|
// We need to compute s/2^k mod prime.
|
|
|
|
// First we compute inverse = -prime^-1 mod 2^32, which we need later.
|
|
// We use the Explicit Quadratic Modular inverse algorithm.
|
|
// http://arxiv.org/pdf/1209.6626.pdf
|
|
// a^-1 = (2-a) * PROD_i (1 + (a - 1)^(2^i)) mod 2^32
|
|
// the product will converge quickly, because (a-1)^(2^i) will be
|
|
// zero mod 2^32 after at most five iterations.
|
|
// We want to compute -prime^-1 so we start with (pp[0]-2).
|
|
assert(pp[0] & 1);
|
|
uint32_t amone = pp[0]-1;
|
|
uint32_t inverse = pp[0] - 2;
|
|
while (amone) {
|
|
amone *= amone;
|
|
inverse *= (amone + 1);
|
|
}
|
|
|
|
while (k >= 32) {
|
|
// compute s / 2^32 modulo prime.
|
|
// Idea: compute factor, such that
|
|
// s + factor*prime mod 2^32 == 0
|
|
// i.e. factor = s * -1/prime mod 2^32.
|
|
// Then compute s + factor*prime and shift right by 32 bits.
|
|
uint32_t factor = (inverse * us.a[8]) & 0xffffffff;
|
|
temp = us.a[8] + (uint64_t) pp[0] * factor;
|
|
assert((temp & 0xffffffff) == 0);
|
|
temp >>= 32;
|
|
for (i = 0; i < 7; i++) {
|
|
temp += us.a[8-(i+1)] + (uint64_t) pp[i+1] * factor;
|
|
us.a[8-i] = temp & 0xffffffff;
|
|
temp >>= 32;
|
|
}
|
|
us.a[8-i] = temp & 0xffffffff;
|
|
k -= 32;
|
|
}
|
|
if (k > 0) {
|
|
// compute s / 2^k modulo prime.
|
|
// Same idea: compute factor, such that
|
|
// s + factor*prime mod 2^k == 0
|
|
// i.e. factor = s * -1/prime mod 2^k.
|
|
// Then compute s + factor*prime and shift right by k bits.
|
|
uint32_t mask = (1 << k) - 1;
|
|
uint32_t factor = (inverse * us.a[8]) & mask;
|
|
temp = (us.a[8] + (uint64_t) pp[0] * factor) >> k;
|
|
assert(((us.a[8] + pp[0] * factor) & mask) == 0);
|
|
for (i = 0; i < 7; i++) {
|
|
temp += (us.a[8-(i+1)] + (uint64_t) pp[i+1] * factor) << (32 - k);
|
|
us.a[8-i] = temp & 0xffffffff;
|
|
temp >>= 32;
|
|
}
|
|
us.a[8-i] = temp & 0xffffffff;
|
|
}
|
|
|
|
// convert s to bignum style
|
|
temp32 = 0;
|
|
for (i = 0; i < 8; i++) {
|
|
x->val[i] = ((us.a[8-i] << (2 * i)) & 0x3FFFFFFFu) | temp32;
|
|
temp32 = us.a[8-i] >> (30 - 2 * i);
|
|
}
|
|
x->val[i] = temp32;
|
|
|
|
// let's wipe all temp buffers
|
|
MEMSET_BZERO(pp, sizeof(pp));
|
|
MEMSET_BZERO(&us, sizeof(us));
|
|
MEMSET_BZERO(&vr, sizeof(vr));
|
|
}
|
|
#endif
|
|
|
|
void bn_normalize(bignum256 *a) {
|
|
bn_addi(a, 0);
|
|
}
|
|
|
|
// add two numbers a = a + b
|
|
// assumes that a, b are normalized
|
|
// guarantees that a is normalized
|
|
void bn_add(bignum256 *a, const bignum256 *b)
|
|
{
|
|
int i;
|
|
uint32_t tmp = 0;
|
|
for (i = 0; i < 9; i++) {
|
|
tmp += a->val[i] + b->val[i];
|
|
a->val[i] = tmp & 0x3FFFFFFF;
|
|
tmp >>= 30;
|
|
}
|
|
}
|
|
|
|
void bn_addmod(bignum256 *a, const bignum256 *b, const bignum256 *prime)
|
|
{
|
|
int i;
|
|
for (i = 0; i < 9; i++) {
|
|
a->val[i] += b->val[i];
|
|
}
|
|
bn_fast_mod(a, prime);
|
|
}
|
|
|
|
void bn_addi(bignum256 *a, uint32_t b) {
|
|
int i;
|
|
uint32_t tmp = b;
|
|
for (i = 0; i < 9; i++) {
|
|
tmp += a->val[i];
|
|
a->val[i] = tmp & 0x3FFFFFFF;
|
|
tmp >>= 30;
|
|
}
|
|
}
|
|
|
|
void bn_subi(bignum256 *a, uint32_t b, const bignum256 *prime) {
|
|
assert (b <= prime->val[0]);
|
|
// the possible underflow will be taken care of when adding the prime
|
|
a->val[0] -= b;
|
|
bn_add(a, prime);
|
|
}
|
|
|
|
// res = a - b mod prime. More exactly res = a + (2*prime - b).
|
|
// b must be a partly reduced number
|
|
// result is normalized but not reduced.
|
|
void bn_subtractmod(const bignum256 *a, const bignum256 *b, bignum256 *res, const bignum256 *prime)
|
|
{
|
|
int i;
|
|
uint32_t temp = 1;
|
|
for (i = 0; i < 9; i++) {
|
|
temp += 0x3FFFFFFF + a->val[i] + 2u * prime->val[i] - b->val[i];
|
|
res->val[i] = temp & 0x3FFFFFFF;
|
|
temp >>= 30;
|
|
}
|
|
}
|
|
|
|
// res = a - b ; a > b
|
|
void bn_subtract(const bignum256 *a, const bignum256 *b, bignum256 *res)
|
|
{
|
|
int i;
|
|
uint32_t tmp = 1;
|
|
for (i = 0; i < 9; i++) {
|
|
tmp += 0x3FFFFFFF + a->val[i] - b->val[i];
|
|
res->val[i] = tmp & 0x3FFFFFFF;
|
|
tmp >>= 30;
|
|
}
|
|
}
|
|
|
|
// a / 58 = a (+r)
|
|
void bn_divmod58(bignum256 *a, uint32_t *r)
|
|
{
|
|
int i;
|
|
uint32_t rem, tmp;
|
|
rem = a->val[8] % 58;
|
|
a->val[8] /= 58;
|
|
for (i = 7; i >= 0; i--) {
|
|
// invariants:
|
|
// rem = old(a) >> 30(i+1) % 58
|
|
// a[i+1..8] = old(a[i+1..8])/58
|
|
// a[0..i] = old(a[0..i])
|
|
// 2^30 == 18512790*58 + 4
|
|
tmp = rem * 4 + a->val[i];
|
|
// set a[i] = (rem * 2^30 + a[i])/58
|
|
// = rem * 18512790 + (rem * 4 + a[i])/58
|
|
a->val[i] = rem * 18512790 + (tmp / 58);
|
|
// set rem = (rem * 2^30 + a[i]) mod 58
|
|
// = (rem * 4 + a[i]) mod 58
|
|
rem = tmp % 58;
|
|
}
|
|
*r = rem;
|
|
}
|
|
|
|
#if USE_BN_PRINT
|
|
void bn_print(const bignum256 *a)
|
|
{
|
|
printf("%04x", a->val[8] & 0x0000FFFF);
|
|
printf("%08x", (a->val[7] << 2) | ((a->val[6] & 0x30000000) >> 28));
|
|
printf("%07x", a->val[6] & 0x0FFFFFFF);
|
|
printf("%08x", (a->val[5] << 2) | ((a->val[4] & 0x30000000) >> 28));
|
|
printf("%07x", a->val[4] & 0x0FFFFFFF);
|
|
printf("%08x", (a->val[3] << 2) | ((a->val[2] & 0x30000000) >> 28));
|
|
printf("%07x", a->val[2] & 0x0FFFFFFF);
|
|
printf("%08x", (a->val[1] << 2) | ((a->val[0] & 0x30000000) >> 28));
|
|
printf("%07x", a->val[0] & 0x0FFFFFFF);
|
|
}
|
|
|
|
void bn_print_raw(const bignum256 *a)
|
|
{
|
|
int i;
|
|
for (i = 0; i <= 8; i++) {
|
|
printf("0x%08x, ", a->val[i]);
|
|
}
|
|
}
|
|
#endif
|