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e0d310b098
In the current implementation of FIT_SIGNATURE, five parameters for a RSA public key are required while only two of them are essential. (See rsa-mod-exp.h and uImage.FIT/signature.txt) This is a result of considering relatively limited computer power and resources on embedded systems, while such a assumption may not be quite practical for other use cases. In this patch, added is a function, rsa_gen_key_prop(), which will generate additional parameters for other uses, in particular UEFI secure boot, on the fly. Note: the current code uses some "big number" routines from BearSSL for the calculation. Signed-off-by: AKASHI Takahiro <takahiro.akashi@linaro.org>
725 lines
17 KiB
C
725 lines
17 KiB
C
// SPDX-License-Identifier: GPL-2.0+ and MIT
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/*
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* RSA library - generate parameters for a public key
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*
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* Copyright (c) 2019 Linaro Limited
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* Author: AKASHI Takahiro
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*
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* Big number routines in this file come from BearSSL:
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* Copyright (c) 2016 Thomas Pornin <pornin@bolet.org>
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*/
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#include <common.h>
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#include <image.h>
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#include <malloc.h>
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#include <asm/byteorder.h>
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#include <crypto/internal/rsa.h>
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#include <u-boot/rsa-mod-exp.h>
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/**
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* br_dec16be() - Convert 16-bit big-endian integer to native
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* @src: Pointer to data
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* Return: Native-endian integer
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*/
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static unsigned br_dec16be(const void *src)
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{
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return be16_to_cpup(src);
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}
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/**
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* br_dec32be() - Convert 32-bit big-endian integer to native
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* @src: Pointer to data
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* Return: Native-endian integer
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*/
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static uint32_t br_dec32be(const void *src)
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{
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return be32_to_cpup(src);
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}
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/**
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* br_enc32be() - Convert native 32-bit integer to big-endian
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* @dst: Pointer to buffer to store big-endian integer in
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* @x: Native 32-bit integer
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*/
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static void br_enc32be(void *dst, uint32_t x)
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{
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__be32 tmp;
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tmp = cpu_to_be32(x);
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memcpy(dst, &tmp, sizeof(tmp));
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}
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/* from BearSSL's src/inner.h */
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/*
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* Negate a boolean.
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*/
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static uint32_t NOT(uint32_t ctl)
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{
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return ctl ^ 1;
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}
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/*
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* Multiplexer: returns x if ctl == 1, y if ctl == 0.
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*/
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static uint32_t MUX(uint32_t ctl, uint32_t x, uint32_t y)
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{
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return y ^ (-ctl & (x ^ y));
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}
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/*
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* Equality check: returns 1 if x == y, 0 otherwise.
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*/
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static uint32_t EQ(uint32_t x, uint32_t y)
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{
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uint32_t q;
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q = x ^ y;
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return NOT((q | -q) >> 31);
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}
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/*
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* Inequality check: returns 1 if x != y, 0 otherwise.
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*/
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static uint32_t NEQ(uint32_t x, uint32_t y)
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{
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uint32_t q;
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q = x ^ y;
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return (q | -q) >> 31;
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}
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/*
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* Comparison: returns 1 if x > y, 0 otherwise.
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*/
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static uint32_t GT(uint32_t x, uint32_t y)
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{
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/*
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* If both x < 2^31 and y < 2^31, then y-x will have its high
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* bit set if x > y, cleared otherwise.
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*
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* If either x >= 2^31 or y >= 2^31 (but not both), then the
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* result is the high bit of x.
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*
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* If both x >= 2^31 and y >= 2^31, then we can virtually
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* subtract 2^31 from both, and we are back to the first case.
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* Since (y-2^31)-(x-2^31) = y-x, the subtraction is already
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* fine.
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*/
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uint32_t z;
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z = y - x;
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return (z ^ ((x ^ y) & (x ^ z))) >> 31;
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}
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/*
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* Compute the bit length of a 32-bit integer. Returned value is between 0
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* and 32 (inclusive).
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*/
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static uint32_t BIT_LENGTH(uint32_t x)
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{
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uint32_t k, c;
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k = NEQ(x, 0);
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c = GT(x, 0xFFFF); x = MUX(c, x >> 16, x); k += c << 4;
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c = GT(x, 0x00FF); x = MUX(c, x >> 8, x); k += c << 3;
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c = GT(x, 0x000F); x = MUX(c, x >> 4, x); k += c << 2;
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c = GT(x, 0x0003); x = MUX(c, x >> 2, x); k += c << 1;
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k += GT(x, 0x0001);
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return k;
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}
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#define GE(x, y) NOT(GT(y, x))
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#define LT(x, y) GT(y, x)
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#define MUL(x, y) ((uint64_t)(x) * (uint64_t)(y))
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/*
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* Integers 'i32'
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* --------------
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*
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* The 'i32' functions implement computations on big integers using
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* an internal representation as an array of 32-bit integers. For
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* an array x[]:
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* -- x[0] contains the "announced bit length" of the integer
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* -- x[1], x[2]... contain the value in little-endian order (x[1]
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* contains the least significant 32 bits)
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*
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* Multiplications rely on the elementary 32x32->64 multiplication.
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*
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* The announced bit length specifies the number of bits that are
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* significant in the subsequent 32-bit words. Unused bits in the
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* last (most significant) word are set to 0; subsequent words are
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* uninitialized and need not exist at all.
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*
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* The execution time and memory access patterns of all computations
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* depend on the announced bit length, but not on the actual word
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* values. For modular integers, the announced bit length of any integer
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* modulo n is equal to the actual bit length of n; thus, computations
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* on modular integers are "constant-time" (only the modulus length may
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* leak).
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*/
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/*
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* Extract one word from an integer. The offset is counted in bits.
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* The word MUST entirely fit within the word elements corresponding
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* to the announced bit length of a[].
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*/
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static uint32_t br_i32_word(const uint32_t *a, uint32_t off)
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{
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size_t u;
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unsigned j;
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u = (size_t)(off >> 5) + 1;
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j = (unsigned)off & 31;
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if (j == 0) {
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return a[u];
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} else {
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return (a[u] >> j) | (a[u + 1] << (32 - j));
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}
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}
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/* from BearSSL's src/int/i32_bitlen.c */
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/*
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* Compute the actual bit length of an integer. The argument x should
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* point to the first (least significant) value word of the integer.
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* The len 'xlen' contains the number of 32-bit words to access.
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*
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* CT: value or length of x does not leak.
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*/
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static uint32_t br_i32_bit_length(uint32_t *x, size_t xlen)
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{
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uint32_t tw, twk;
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tw = 0;
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twk = 0;
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while (xlen -- > 0) {
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uint32_t w, c;
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c = EQ(tw, 0);
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w = x[xlen];
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tw = MUX(c, w, tw);
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twk = MUX(c, (uint32_t)xlen, twk);
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}
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return (twk << 5) + BIT_LENGTH(tw);
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}
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/* from BearSSL's src/int/i32_decode.c */
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/*
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* Decode an integer from its big-endian unsigned representation. The
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* "true" bit length of the integer is computed, but all words of x[]
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* corresponding to the full 'len' bytes of the source are set.
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*
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* CT: value or length of x does not leak.
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*/
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static void br_i32_decode(uint32_t *x, const void *src, size_t len)
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{
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const unsigned char *buf;
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size_t u, v;
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buf = src;
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u = len;
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v = 1;
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for (;;) {
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if (u < 4) {
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uint32_t w;
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if (u < 2) {
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if (u == 0) {
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break;
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} else {
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w = buf[0];
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}
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} else {
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if (u == 2) {
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w = br_dec16be(buf);
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} else {
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w = ((uint32_t)buf[0] << 16)
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| br_dec16be(buf + 1);
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}
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}
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x[v ++] = w;
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break;
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} else {
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u -= 4;
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x[v ++] = br_dec32be(buf + u);
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}
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}
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x[0] = br_i32_bit_length(x + 1, v - 1);
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}
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/* from BearSSL's src/int/i32_encode.c */
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/*
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* Encode an integer into its big-endian unsigned representation. The
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* output length in bytes is provided (parameter 'len'); if the length
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* is too short then the integer is appropriately truncated; if it is
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* too long then the extra bytes are set to 0.
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*/
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static void br_i32_encode(void *dst, size_t len, const uint32_t *x)
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{
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unsigned char *buf;
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size_t k;
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buf = dst;
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/*
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* Compute the announced size of x in bytes; extra bytes are
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* filled with zeros.
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*/
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k = (x[0] + 7) >> 3;
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while (len > k) {
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*buf ++ = 0;
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len --;
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}
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/*
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* Now we use k as index within x[]. That index starts at 1;
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* we initialize it to the topmost complete word, and process
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* any remaining incomplete word.
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*/
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k = (len + 3) >> 2;
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switch (len & 3) {
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case 3:
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*buf ++ = x[k] >> 16;
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/* fall through */
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case 2:
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*buf ++ = x[k] >> 8;
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/* fall through */
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case 1:
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*buf ++ = x[k];
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k --;
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}
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/*
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* Encode all complete words.
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*/
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while (k > 0) {
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br_enc32be(buf, x[k]);
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k --;
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buf += 4;
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}
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}
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/* from BearSSL's src/int/i32_ninv32.c */
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/*
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* Compute -(1/x) mod 2^32. If x is even, then this function returns 0.
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*/
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static uint32_t br_i32_ninv32(uint32_t x)
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{
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uint32_t y;
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y = 2 - x;
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y *= 2 - y * x;
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y *= 2 - y * x;
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y *= 2 - y * x;
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y *= 2 - y * x;
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return MUX(x & 1, -y, 0);
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}
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/* from BearSSL's src/int/i32_add.c */
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/*
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* Add b[] to a[] and return the carry (0 or 1). If ctl is 0, then a[]
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* is unmodified, but the carry is still computed and returned. The
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* arrays a[] and b[] MUST have the same announced bit length.
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*
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* a[] and b[] MAY be the same array, but partial overlap is not allowed.
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*/
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static uint32_t br_i32_add(uint32_t *a, const uint32_t *b, uint32_t ctl)
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{
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uint32_t cc;
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size_t u, m;
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cc = 0;
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m = (a[0] + 63) >> 5;
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for (u = 1; u < m; u ++) {
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uint32_t aw, bw, naw;
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aw = a[u];
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bw = b[u];
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naw = aw + bw + cc;
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/*
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* Carry is 1 if naw < aw. Carry is also 1 if naw == aw
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* AND the carry was already 1.
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*/
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cc = (cc & EQ(naw, aw)) | LT(naw, aw);
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a[u] = MUX(ctl, naw, aw);
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}
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return cc;
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}
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/* from BearSSL's src/int/i32_sub.c */
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/*
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* Subtract b[] from a[] and return the carry (0 or 1). If ctl is 0,
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* then a[] is unmodified, but the carry is still computed and returned.
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* The arrays a[] and b[] MUST have the same announced bit length.
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*
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* a[] and b[] MAY be the same array, but partial overlap is not allowed.
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*/
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static uint32_t br_i32_sub(uint32_t *a, const uint32_t *b, uint32_t ctl)
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{
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uint32_t cc;
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size_t u, m;
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cc = 0;
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m = (a[0] + 63) >> 5;
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for (u = 1; u < m; u ++) {
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uint32_t aw, bw, naw;
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aw = a[u];
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bw = b[u];
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naw = aw - bw - cc;
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/*
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* Carry is 1 if naw > aw. Carry is 1 also if naw == aw
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* AND the carry was already 1.
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*/
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cc = (cc & EQ(naw, aw)) | GT(naw, aw);
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a[u] = MUX(ctl, naw, aw);
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}
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return cc;
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}
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/* from BearSSL's src/int/i32_div32.c */
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/*
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* Constant-time division. The dividend hi:lo is divided by the
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* divisor d; the quotient is returned and the remainder is written
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* in *r. If hi == d, then the quotient does not fit on 32 bits;
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* returned value is thus truncated. If hi > d, returned values are
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* indeterminate.
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*/
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static uint32_t br_divrem(uint32_t hi, uint32_t lo, uint32_t d, uint32_t *r)
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{
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/* TODO: optimize this */
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uint32_t q;
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uint32_t ch, cf;
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int k;
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q = 0;
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ch = EQ(hi, d);
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hi = MUX(ch, 0, hi);
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for (k = 31; k > 0; k --) {
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int j;
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uint32_t w, ctl, hi2, lo2;
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j = 32 - k;
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w = (hi << j) | (lo >> k);
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ctl = GE(w, d) | (hi >> k);
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hi2 = (w - d) >> j;
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lo2 = lo - (d << k);
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hi = MUX(ctl, hi2, hi);
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lo = MUX(ctl, lo2, lo);
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q |= ctl << k;
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}
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cf = GE(lo, d) | hi;
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q |= cf;
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*r = MUX(cf, lo - d, lo);
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return q;
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}
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/*
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* Wrapper for br_divrem(); the remainder is returned, and the quotient
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* is discarded.
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*/
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static uint32_t br_rem(uint32_t hi, uint32_t lo, uint32_t d)
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{
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uint32_t r;
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br_divrem(hi, lo, d, &r);
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return r;
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}
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/*
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* Wrapper for br_divrem(); the quotient is returned, and the remainder
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* is discarded.
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*/
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static uint32_t br_div(uint32_t hi, uint32_t lo, uint32_t d)
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{
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uint32_t r;
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return br_divrem(hi, lo, d, &r);
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}
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/* from BearSSL's src/int/i32_muladd.c */
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/*
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* Multiply x[] by 2^32 and then add integer z, modulo m[]. This
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* function assumes that x[] and m[] have the same announced bit
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* length, and the announced bit length of m[] matches its true
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* bit length.
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*
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* x[] and m[] MUST be distinct arrays.
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*
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* CT: only the common announced bit length of x and m leaks, not
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* the values of x, z or m.
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*/
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static void br_i32_muladd_small(uint32_t *x, uint32_t z, const uint32_t *m)
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{
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uint32_t m_bitlen;
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size_t u, mlen;
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uint32_t a0, a1, b0, hi, g, q, tb;
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uint32_t chf, clow, under, over;
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uint64_t cc;
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/*
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* We can test on the modulus bit length since we accept to
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* leak that length.
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*/
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m_bitlen = m[0];
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if (m_bitlen == 0) {
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return;
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}
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if (m_bitlen <= 32) {
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x[1] = br_rem(x[1], z, m[1]);
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return;
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}
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mlen = (m_bitlen + 31) >> 5;
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/*
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* Principle: we estimate the quotient (x*2^32+z)/m by
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* doing a 64/32 division with the high words.
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*
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* Let:
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* w = 2^32
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* a = (w*a0 + a1) * w^N + a2
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* b = b0 * w^N + b2
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* such that:
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* 0 <= a0 < w
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* 0 <= a1 < w
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* 0 <= a2 < w^N
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* w/2 <= b0 < w
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* 0 <= b2 < w^N
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* a < w*b
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* I.e. the two top words of a are a0:a1, the top word of b is
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* b0, we ensured that b0 is "full" (high bit set), and a is
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* such that the quotient q = a/b fits on one word (0 <= q < w).
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*
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* If a = b*q + r (with 0 <= r < q), we can estimate q by
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* doing an Euclidean division on the top words:
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* a0*w+a1 = b0*u + v (with 0 <= v < w)
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* Then the following holds:
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* 0 <= u <= w
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* u-2 <= q <= u
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*/
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a0 = br_i32_word(x, m_bitlen - 32);
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hi = x[mlen];
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memmove(x + 2, x + 1, (mlen - 1) * sizeof *x);
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x[1] = z;
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a1 = br_i32_word(x, m_bitlen - 32);
|
|
b0 = br_i32_word(m, m_bitlen - 32);
|
|
|
|
/*
|
|
* We estimate a divisor q. If the quotient returned by br_div()
|
|
* is g:
|
|
* -- If a0 == b0 then g == 0; we want q = 0xFFFFFFFF.
|
|
* -- Otherwise:
|
|
* -- if g == 0 then we set q = 0;
|
|
* -- otherwise, we set q = g - 1.
|
|
* The properties described above then ensure that the true
|
|
* quotient is q-1, q or q+1.
|
|
*/
|
|
g = br_div(a0, a1, b0);
|
|
q = MUX(EQ(a0, b0), 0xFFFFFFFF, MUX(EQ(g, 0), 0, g - 1));
|
|
|
|
/*
|
|
* We subtract q*m from x (with the extra high word of value 'hi').
|
|
* Since q may be off by 1 (in either direction), we may have to
|
|
* add or subtract m afterwards.
|
|
*
|
|
* The 'tb' flag will be true (1) at the end of the loop if the
|
|
* result is greater than or equal to the modulus (not counting
|
|
* 'hi' or the carry).
|
|
*/
|
|
cc = 0;
|
|
tb = 1;
|
|
for (u = 1; u <= mlen; u ++) {
|
|
uint32_t mw, zw, xw, nxw;
|
|
uint64_t zl;
|
|
|
|
mw = m[u];
|
|
zl = MUL(mw, q) + cc;
|
|
cc = (uint32_t)(zl >> 32);
|
|
zw = (uint32_t)zl;
|
|
xw = x[u];
|
|
nxw = xw - zw;
|
|
cc += (uint64_t)GT(nxw, xw);
|
|
x[u] = nxw;
|
|
tb = MUX(EQ(nxw, mw), tb, GT(nxw, mw));
|
|
}
|
|
|
|
/*
|
|
* If we underestimated q, then either cc < hi (one extra bit
|
|
* beyond the top array word), or cc == hi and tb is true (no
|
|
* extra bit, but the result is not lower than the modulus). In
|
|
* these cases we must subtract m once.
|
|
*
|
|
* Otherwise, we may have overestimated, which will show as
|
|
* cc > hi (thus a negative result). Correction is adding m once.
|
|
*/
|
|
chf = (uint32_t)(cc >> 32);
|
|
clow = (uint32_t)cc;
|
|
over = chf | GT(clow, hi);
|
|
under = ~over & (tb | (~chf & LT(clow, hi)));
|
|
br_i32_add(x, m, over);
|
|
br_i32_sub(x, m, under);
|
|
}
|
|
|
|
/* from BearSSL's src/int/i32_reduce.c */
|
|
|
|
/*
|
|
* Reduce an integer (a[]) modulo another (m[]). The result is written
|
|
* in x[] and its announced bit length is set to be equal to that of m[].
|
|
*
|
|
* x[] MUST be distinct from a[] and m[].
|
|
*
|
|
* CT: only announced bit lengths leak, not values of x, a or m.
|
|
*/
|
|
static void br_i32_reduce(uint32_t *x, const uint32_t *a, const uint32_t *m)
|
|
{
|
|
uint32_t m_bitlen, a_bitlen;
|
|
size_t mlen, alen, u;
|
|
|
|
m_bitlen = m[0];
|
|
mlen = (m_bitlen + 31) >> 5;
|
|
|
|
x[0] = m_bitlen;
|
|
if (m_bitlen == 0) {
|
|
return;
|
|
}
|
|
|
|
/*
|
|
* If the source is shorter, then simply copy all words from a[]
|
|
* and zero out the upper words.
|
|
*/
|
|
a_bitlen = a[0];
|
|
alen = (a_bitlen + 31) >> 5;
|
|
if (a_bitlen < m_bitlen) {
|
|
memcpy(x + 1, a + 1, alen * sizeof *a);
|
|
for (u = alen; u < mlen; u ++) {
|
|
x[u + 1] = 0;
|
|
}
|
|
return;
|
|
}
|
|
|
|
/*
|
|
* The source length is at least equal to that of the modulus.
|
|
* We must thus copy N-1 words, and input the remaining words
|
|
* one by one.
|
|
*/
|
|
memcpy(x + 1, a + 2 + (alen - mlen), (mlen - 1) * sizeof *a);
|
|
x[mlen] = 0;
|
|
for (u = 1 + alen - mlen; u > 0; u --) {
|
|
br_i32_muladd_small(x, a[u], m);
|
|
}
|
|
}
|
|
|
|
/**
|
|
* rsa_free_key_prop() - Free key properties
|
|
* @prop: Pointer to struct key_prop
|
|
*
|
|
* This function frees all the memories allocated by rsa_gen_key_prop().
|
|
*/
|
|
void rsa_free_key_prop(struct key_prop *prop)
|
|
{
|
|
if (!prop)
|
|
return;
|
|
|
|
free((void *)prop->modulus);
|
|
free((void *)prop->public_exponent);
|
|
free((void *)prop->rr);
|
|
|
|
free(prop);
|
|
}
|
|
|
|
/**
|
|
* rsa_gen_key_prop() - Generate key properties of RSA public key
|
|
* @key: Specifies key data in DER format
|
|
* @keylen: Length of @key
|
|
* @prop: Generated key property
|
|
*
|
|
* This function takes a blob of encoded RSA public key data in DER
|
|
* format, parse it and generate all the relevant properties
|
|
* in key_prop structure.
|
|
* Return a pointer to struct key_prop in @prop on success.
|
|
*
|
|
* Return: 0 on success, negative on error
|
|
*/
|
|
int rsa_gen_key_prop(const void *key, uint32_t keylen, struct key_prop **prop)
|
|
{
|
|
struct rsa_key rsa_key;
|
|
uint32_t *n = NULL, *rr = NULL, *rrtmp = NULL;
|
|
const int max_rsa_size = 4096;
|
|
int rlen, i, ret;
|
|
|
|
*prop = calloc(sizeof(**prop), 1);
|
|
n = calloc(sizeof(uint32_t), 1 + (max_rsa_size >> 5));
|
|
rr = calloc(sizeof(uint32_t), 1 + (max_rsa_size >> 5));
|
|
rrtmp = calloc(sizeof(uint32_t), 1 + (max_rsa_size >> 5));
|
|
if (!(*prop) || !n || !rr || !rrtmp) {
|
|
ret = -ENOMEM;
|
|
goto err;
|
|
}
|
|
|
|
ret = rsa_parse_pub_key(&rsa_key, key, keylen);
|
|
if (ret)
|
|
goto err;
|
|
|
|
/* modulus */
|
|
/* removing leading 0's */
|
|
for (i = 0; i < rsa_key.n_sz && !rsa_key.n[i]; i++)
|
|
;
|
|
(*prop)->num_bits = (rsa_key.n_sz - i) * 8;
|
|
(*prop)->modulus = malloc(rsa_key.n_sz - i);
|
|
if (!(*prop)->modulus) {
|
|
ret = -ENOMEM;
|
|
goto err;
|
|
}
|
|
memcpy((void *)(*prop)->modulus, &rsa_key.n[i], rsa_key.n_sz - i);
|
|
|
|
/* exponent */
|
|
(*prop)->public_exponent = calloc(1, sizeof(uint64_t));
|
|
if (!(*prop)->public_exponent) {
|
|
ret = -ENOMEM;
|
|
goto err;
|
|
}
|
|
memcpy((void *)(*prop)->public_exponent + sizeof(uint64_t)
|
|
- rsa_key.e_sz,
|
|
rsa_key.e, rsa_key.e_sz);
|
|
(*prop)->exp_len = rsa_key.e_sz;
|
|
|
|
/* n0 inverse */
|
|
br_i32_decode(n, &rsa_key.n[i], rsa_key.n_sz - i);
|
|
(*prop)->n0inv = br_i32_ninv32(n[1]);
|
|
|
|
/* R^2 mod n; R = 2^(num_bits) */
|
|
rlen = (*prop)->num_bits * 2; /* #bits of R^2 = (2^num_bits)^2 */
|
|
rr[0] = 0;
|
|
*(uint8_t *)&rr[0] = (1 << (rlen % 8));
|
|
for (i = 1; i < (((rlen + 31) >> 5) + 1); i++)
|
|
rr[i] = 0;
|
|
br_i32_decode(rrtmp, rr, ((rlen + 7) >> 3) + 1);
|
|
br_i32_reduce(rr, rrtmp, n);
|
|
|
|
rlen = ((*prop)->num_bits + 7) >> 3; /* #bytes of R^2 mod n */
|
|
(*prop)->rr = malloc(rlen);
|
|
if (!(*prop)->rr) {
|
|
ret = -ENOMEM;
|
|
goto err;
|
|
}
|
|
br_i32_encode((void *)(*prop)->rr, rlen, rr);
|
|
|
|
return 0;
|
|
|
|
err:
|
|
free(n);
|
|
free(rr);
|
|
free(rrtmp);
|
|
rsa_free_key_prop(*prop);
|
|
return ret;
|
|
}
|