| /* |
| * Copyright (C) 2024 Michael Brown <mbrown@fensystems.co.uk>. |
| * |
| * This program is free software; you can redistribute it and/or |
| * modify it under the terms of the GNU General Public License as |
| * published by the Free Software Foundation; either version 2 of the |
| * License, or any later version. |
| * |
| * This program is distributed in the hope that it will be useful, but |
| * WITHOUT ANY WARRANTY; without even the implied warranty of |
| * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU |
| * General Public License for more details. |
| * |
| * You should have received a copy of the GNU General Public License |
| * along with this program; if not, write to the Free Software |
| * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA |
| * 02110-1301, USA. |
| * |
| * You can also choose to distribute this program under the terms of |
| * the Unmodified Binary Distribution Licence (as given in the file |
| * COPYING.UBDL), provided that you have satisfied its requirements. |
| */ |
| |
| FILE_LICENCE ( GPL2_OR_LATER_OR_UBDL ); |
| |
| /** @file |
| * |
| * X25519 key exchange |
| * |
| * This implementation is inspired by and partially based upon the |
| * paper "Implementing Curve25519/X25519: A Tutorial on Elliptic Curve |
| * Cryptography" by Martin Kleppmann, available for download from |
| * https://www.cl.cam.ac.uk/teaching/2122/Crypto/curve25519.pdf |
| * |
| * The underlying modular addition, subtraction, and multiplication |
| * operations are completely redesigned for substantially improved |
| * efficiency compared to the TweetNaCl implementation studied in that |
| * paper. |
| * |
| * TweetNaCl iPXE |
| * --------- ---- |
| * |
| * Storage size of each big integer 128 40 |
| * (in bytes) |
| * |
| * Stack usage for key exchange 1144 360 |
| * (in bytes, large objects only) |
| * |
| * Cost of big integer addition 16 5 |
| * (in number of 64-bit additions) |
| * |
| * Cost of big integer multiplication 273 31 |
| * (in number of 64-bit multiplications) |
| * |
| * The implementation is constant-time (provided that the underlying |
| * big integer operations are also constant-time). |
| */ |
| |
| #include <stdint.h> |
| #include <string.h> |
| #include <assert.h> |
| #include <ipxe/init.h> |
| #include <ipxe/x25519.h> |
| |
| /** X25519 reduction constant |
| * |
| * The X25519 field prime is p=2^255-19. This gives us: |
| * |
| * p = 2^255 - 19 |
| * 2^255 = p + 19 |
| * 2^255 = 19 (mod p) |
| * k * 2^255 = k * 19 (mod p) |
| * |
| * We can therefore reduce a value modulo p by taking the high-order |
| * bits of the value from bit 255 and above, multiplying by 19, and |
| * adding this to the low-order 255 bits of the value. |
| * |
| * This would be cumbersome to do in practice since it would require |
| * partitioning the value at a 255-bit boundary (and hence would |
| * require some shifting and masking operations). However, we can |
| * note that: |
| * |
| * k * 2^255 = k * 19 (mod p) |
| * k * 2 * 2^255 = k * 2 * 19 (mod p) |
| * k * 2^256 = k * 38 (mod p) |
| * |
| * We can therefore simplify the reduction to taking the high order |
| * bits of the value from bit 256 and above, multiplying by 38, and |
| * adding this to the low-order 256 bits of the value. |
| * |
| * Since 256 will inevitably be a multiple of the big integer element |
| * size (typically 32 or 64 bits), this avoids the need to perform any |
| * shifting or masking operations. |
| */ |
| #define X25519_REDUCE_256 38 |
| |
| /** X25519 multiplication step 1 result |
| * |
| * Step 1 of X25519 multiplication is to compute the product of two |
| * X25519 unsigned 258-bit integers. |
| * |
| * Both multiplication inputs are limited to 258 bits, and so the |
| * product will have at most 516 bits. |
| */ |
| union x25519_multiply_step1 { |
| /** Raw product |
| * |
| * Big integer multiplication produces a result with a number |
| * of elements equal to the sum of the number of elements in |
| * each input. |
| */ |
| bigint_t ( X25519_SIZE + X25519_SIZE ) product; |
| /** Partition into low-order and high-order bits |
| * |
| * Reduction modulo p requires separating the low-order 256 |
| * bits from the remaining high-order bits. |
| * |
| * Since the value will never exceed 516 bits (see above), |
| * there will be at most 260 high-order bits. |
| */ |
| struct { |
| /** Low-order 256 bits */ |
| bigint_t ( bigint_required_size ( ( 256 /* bits */ + 7 ) / 8 ) ) |
| low_256bit; |
| /** High-order 260 bits */ |
| bigint_t ( bigint_required_size ( ( 260 /* bits */ + 7 ) / 8 ) ) |
| high_260bit; |
| } __attribute__ (( packed )) parts; |
| }; |
| |
| /** X25519 multiplication step 2 result |
| * |
| * Step 2 of X25519 multiplication is to multiply the high-order 260 |
| * bits from step 1 with the 6-bit reduction constant 38, and to add |
| * this to the low-order 256 bits from step 1. |
| * |
| * The multiplication inputs are limited to 260 and 6 bits |
| * respectively, and so the product will have at most 266 bits. After |
| * adding the low-order 256 bits from step 1, the result will have at |
| * most 267 bits. |
| */ |
| union x25519_multiply_step2 { |
| /** Raw product |
| * |
| * Big integer multiplication produces a result with a number |
| * of elements equal to the sum of the number of elements in |
| * each input. |
| */ |
| bigint_t ( bigint_required_size ( ( 260 /* bits */ + 7 ) / 8 ) + |
| bigint_required_size ( ( 6 /* bits */ + 7 ) / 8 ) ) product; |
| /** Big integer value |
| * |
| * The value will never exceed 267 bits (see above), and so |
| * may be consumed as a normal X25519 big integer. |
| */ |
| x25519_t value; |
| /** Partition into low-order and high-order bits |
| * |
| * Reduction modulo p requires separating the low-order 256 |
| * bits from the remaining high-order bits. |
| * |
| * Since the value will never exceed 267 bits (see above), |
| * there will be at most 11 high-order bits. |
| */ |
| struct { |
| /** Low-order 256 bits */ |
| bigint_t ( bigint_required_size ( ( 256 /* bits */ + 7 ) / 8 ) ) |
| low_256bit; |
| /** High-order 11 bits */ |
| bigint_t ( bigint_required_size ( ( 11 /* bits */ + 7 ) / 8 ) ) |
| high_11bit; |
| } __attribute__ (( packed )) parts; |
| }; |
| |
| /** X25519 multiplication step 3 result |
| * |
| * Step 3 of X25519 multiplication is to multiply the high-order 11 |
| * bits from step 2 with the 6-bit reduction constant 38, and to add |
| * this to the low-order 256 bits from step 2. |
| * |
| * The multiplication inputs are limited to 11 and 6 bits |
| * respectively, and so the product will have at most 17 bits. After |
| * adding the low-order 256 bits from step 2, the result will have at |
| * most 257 bits. |
| */ |
| union x25519_multiply_step3 { |
| /** Raw product |
| * |
| * Big integer multiplication produces a result with a number |
| * of elements equal to the sum of the number of elements in |
| * each input. |
| */ |
| bigint_t ( bigint_required_size ( ( 11 /* bits */ + 7 ) / 8 ) + |
| bigint_required_size ( ( 6 /* bits */ + 7 ) / 8 ) ) product; |
| /** Big integer value |
| * |
| * The value will never exceed 267 bits (see above), and so |
| * may be consumed as a normal X25519 big integer. |
| */ |
| x25519_t value; |
| }; |
| |
| /** X25519 multiplication temporary working space |
| * |
| * We overlap the buffers used by each step of the multiplication |
| * calculation to reduce the total stack space required: |
| * |
| * |--------------------------------------------------------| |
| * | <- pad -> | <------------ step 1 result -------------> | |
| * | | <- low 256 bits -> | <-- high 260 bits --> | |
| * | <------- step 2 result ------> | <-- step 3 result --> | |
| * |--------------------------------------------------------| |
| */ |
| union x25519_multiply_workspace { |
| /** Step 1 result */ |
| struct { |
| /** Padding to avoid collision between steps 1 and 2 |
| * |
| * The step 2 multiplication consumes the high 260 |
| * bits of step 1, and so the step 2 multiplication |
| * result must not overlap this portion of the step 1 |
| * result. |
| */ |
| uint8_t pad[ sizeof ( union x25519_multiply_step2 ) - |
| offsetof ( union x25519_multiply_step1, |
| parts.high_260bit ) ]; |
| /** Step 1 result */ |
| union x25519_multiply_step1 step1; |
| } __attribute__ (( packed )); |
| /** Steps 2 and 3 results */ |
| struct { |
| /** Step 2 result */ |
| union x25519_multiply_step2 step2; |
| /** Step 3 result */ |
| union x25519_multiply_step3 step3; |
| } __attribute__ (( packed )); |
| }; |
| |
| /** An X25519 elliptic curve point in projective coordinates |
| * |
| * A point (x,y) on the Montgomery curve used in X25519 is represented |
| * using projective coordinates (X/Z,Y/Z) so that intermediate |
| * calculations may be performed on both numerator and denominator |
| * separately, with the division step performed only once at the end |
| * of the calculation. |
| * |
| * The group operation calculation is performed using a Montgomery |
| * ladder as: |
| * |
| * X[2i] = ( X[i]^2 - Z[i]^2 )^2 |
| * X[2i+1] = ( X[i] * X[i+1] - Z[i] * Z[i+1] )^2 |
| * Z[2i] = 4 * X[i] * Z[i] * ( X[i]^2 + A * X[i] * Z[i] + Z[i]^2 ) |
| * Z[2i+1] = X[0] * ( X[i] * Z[i+1] - X[i+1] * Z[i] ) ^ 2 |
| * |
| * It is therefore not necessary to store (or use) the value of Y. |
| */ |
| struct x25519_projective { |
| /** X coordinate */ |
| union x25519_quad257 X; |
| /** Z coordinate */ |
| union x25519_quad257 Z; |
| }; |
| |
| /** An X25519 Montgomery ladder step */ |
| struct x25519_step { |
| /** X[n]/Z[n] */ |
| struct x25519_projective x_n; |
| /** X[n+1]/Z[n+1] */ |
| struct x25519_projective x_n1; |
| }; |
| |
| /** Constant p=2^255-19 (the finite field prime) */ |
| static const uint8_t x25519_p_raw[] = { |
| 0x7f, 0xff, 0xff, 0xff, 0xff, 0xff, 0xff, 0xff, |
| 0xff, 0xff, 0xff, 0xff, 0xff, 0xff, 0xff, 0xff, |
| 0xff, 0xff, 0xff, 0xff, 0xff, 0xff, 0xff, 0xff, |
| 0xff, 0xff, 0xff, 0xff, 0xff, 0xff, 0xff, 0xed |
| }; |
| |
| /** Constant p=2^255-19 (the finite field prime) */ |
| static x25519_t x25519_p; |
| |
| /** Constant 2p=2^256-38 */ |
| static x25519_t x25519_2p; |
| |
| /** Constant 4p=2^257-76 */ |
| static x25519_t x25519_4p; |
| |
| /** Reduction constant (used during multiplication) */ |
| static const uint8_t x25519_reduce_256_raw[] = { X25519_REDUCE_256 }; |
| |
| /** Reduction constant (used during multiplication) */ |
| static bigint_t ( bigint_required_size ( sizeof ( x25519_reduce_256_raw ) ) ) |
| x25519_reduce_256; |
| |
| /** Constant 121665 (used in the Montgomery ladder) */ |
| static const uint8_t x25519_121665_raw[] = { 0x01, 0xdb, 0x41 }; |
| |
| /** Constant 121665 (used in the Montgomery ladder) */ |
| static union x25519_oct258 x25519_121665; |
| |
| /** |
| * Initialise constants |
| * |
| */ |
| static void x25519_init_constants ( void ) { |
| |
| /* Construct constant p */ |
| bigint_init ( &x25519_p, x25519_p_raw, sizeof ( x25519_p_raw ) ); |
| |
| /* Construct constant 2p */ |
| bigint_copy ( &x25519_p, &x25519_2p ); |
| bigint_add ( &x25519_p, &x25519_2p ); |
| |
| /* Construct constant 4p */ |
| bigint_copy ( &x25519_2p, &x25519_4p ); |
| bigint_add ( &x25519_2p, &x25519_4p ); |
| |
| /* Construct reduction constant */ |
| bigint_init ( &x25519_reduce_256, x25519_reduce_256_raw, |
| sizeof ( x25519_reduce_256_raw ) ); |
| |
| /* Construct constant 121665 */ |
| bigint_init ( &x25519_121665.value, x25519_121665_raw, |
| sizeof ( x25519_121665_raw ) ); |
| } |
| |
| /** Initialisation function */ |
| struct init_fn x25519_init_fn __init_fn ( INIT_NORMAL ) = { |
| .initialise = x25519_init_constants, |
| }; |
| |
| /** |
| * Add big integers modulo field prime |
| * |
| * @v augend Big integer to add |
| * @v addend Big integer to add |
| * @v result Big integer to hold result (may overlap augend) |
| */ |
| static inline __attribute__ (( always_inline )) void |
| x25519_add ( const union x25519_quad257 *augend, |
| const union x25519_quad257 *addend, |
| union x25519_oct258 *result ) { |
| int copy; |
| |
| /* Copy augend if necessary */ |
| copy = ( result != &augend->oct258 ); |
| build_assert ( __builtin_constant_p ( copy ) ); |
| if ( copy ) { |
| build_assert ( result != &addend->oct258 ); |
| bigint_copy ( &augend->oct258.value, &result->value ); |
| } |
| |
| /* Perform addition |
| * |
| * Both inputs are in the range [0,4p-1] and the resulting |
| * sum is therefore in the range [0,8p-2]. |
| * |
| * This range lies within the range [0,8p-1] and the result is |
| * therefore a valid X25519 unsigned 258-bit integer, as |
| * required. |
| */ |
| bigint_add ( &addend->value, &result->value ); |
| } |
| |
| /** |
| * Subtract big integers modulo field prime |
| * |
| * @v minuend Big integer from which to subtract |
| * @v subtrahend Big integer to subtract |
| * @v result Big integer to hold result (may overlap minuend) |
| */ |
| static inline __attribute__ (( always_inline )) void |
| x25519_subtract ( const union x25519_quad257 *minuend, |
| const union x25519_quad257 *subtrahend, |
| union x25519_oct258 *result ) { |
| int copy; |
| |
| /* Copy minuend if necessary */ |
| copy = ( result != &minuend->oct258 ); |
| build_assert ( __builtin_constant_p ( copy ) ); |
| if ( copy ) { |
| build_assert ( result != &subtrahend->oct258 ); |
| bigint_copy ( &minuend->oct258.value, &result->value ); |
| } |
| |
| /* Perform subtraction |
| * |
| * Both inputs are in the range [0,4p-1] and the resulting |
| * difference is therefore in the range [1-4p,4p-1]. |
| * |
| * This range lies partially outside the range [0,8p-1] and |
| * the result is therefore not yet a valid X25519 unsigned |
| * 258-bit integer. |
| */ |
| bigint_subtract ( &subtrahend->value, &result->value ); |
| |
| /* Add constant multiple of field prime p |
| * |
| * Add the constant 4p to the result. This brings the result |
| * within the range [1,8p-1] (without changing the value |
| * modulo p). |
| * |
| * This range lies within the range [0,8p-1] and the result is |
| * therefore now a valid X25519 unsigned 258-bit integer, as |
| * required. |
| */ |
| bigint_add ( &x25519_4p, &result->value ); |
| } |
| |
| /** |
| * Multiply big integers modulo field prime |
| * |
| * @v multiplicand Big integer to be multiplied |
| * @v multiplier Big integer to be multiplied |
| * @v result Big integer to hold result (may overlap either input) |
| */ |
| void x25519_multiply ( const union x25519_oct258 *multiplicand, |
| const union x25519_oct258 *multiplier, |
| union x25519_quad257 *result ) { |
| union x25519_multiply_workspace tmp; |
| union x25519_multiply_step1 *step1 = &tmp.step1; |
| union x25519_multiply_step2 *step2 = &tmp.step2; |
| union x25519_multiply_step3 *step3 = &tmp.step3; |
| |
| /* Step 1: perform raw multiplication |
| * |
| * step1 = multiplicand * multiplier |
| * |
| * Both inputs are 258-bit numbers and the step 1 result is |
| * therefore 258+258=516 bits. |
| */ |
| static_assert ( sizeof ( step1->product ) >= sizeof ( step1->parts ) ); |
| bigint_multiply ( &multiplicand->value, &multiplier->value, |
| &step1->product ); |
| |
| /* Step 2: reduce high-order 516-256=260 bits of step 1 result |
| * |
| * Use the identity 2^256=38 (mod p) to reduce the high-order |
| * bits of the step 1 result. We split the 516-bit result |
| * from step 1 into its low-order 256 bits and high-order 260 |
| * bits: |
| * |
| * step1 = step1(low 256 bits) + step1(high 260 bits) * 2^256 |
| * |
| * and then perform the calculation: |
| * |
| * step2 = step1 (mod p) |
| * = step1(low 256 bits) + step1(high 260 bits) * 2^256 (mod p) |
| * = step1(low 256 bits) + step1(high 260 bits) * 38 (mod p) |
| * |
| * There are 6 bits in the constant value 38. The step 2 |
| * multiplication product will therefore have 260+6=266 bits, |
| * and the step 2 result (after the addition) will therefore |
| * have 267 bits. |
| */ |
| static_assert ( sizeof ( step2->product ) >= sizeof ( step2->value ) ); |
| static_assert ( sizeof ( step2->product ) >= sizeof ( step2->parts ) ); |
| bigint_grow ( &step1->parts.low_256bit, &result->value ); |
| bigint_multiply ( &step1->parts.high_260bit, &x25519_reduce_256, |
| &step2->product ); |
| bigint_add ( &result->value, &step2->value ); |
| |
| /* Step 3: reduce high-order 267-256=11 bits of step 2 result |
| * |
| * Use the identity 2^256=38 (mod p) again to reduce the |
| * high-order bits of the step 2 result. As before, we split |
| * the 267-bit result from step 2 into its low-order 256 bits |
| * and high-order 11 bits: |
| * |
| * step2 = step2(low 256 bits) + step2(high 11 bits) * 2^256 |
| * |
| * and then perform the calculation: |
| * |
| * step3 = step2 (mod p) |
| * = step2(low 256 bits) + step2(high 11 bits) * 2^256 (mod p) |
| * = step2(low 256 bits) + step2(high 11 bits) * 38 (mod p) |
| * |
| * There are 6 bits in the constant value 38. The step 3 |
| * multiplication product will therefore have 11+6=19 bits, |
| * and the step 3 result (after the addition) will therefore |
| * have 257 bits. |
| * |
| * A loose upper bound for the step 3 result (after the |
| * addition) is given by: |
| * |
| * step3 < ( 2^256 - 1 ) + ( 2^19 - 1 ) |
| * < ( 2^257 - 2^256 - 1 ) + ( 2^19 - 1 ) |
| * < ( 2^257 - 76 ) - 2^256 + 2^19 + 74 |
| * < 4 * ( 2^255 - 19 ) - 2^256 + 2^19 + 74 |
| * < 4p - 2^256 + 2^19 + 74 |
| * |
| * and so the step 3 result is strictly less than 4p, and |
| * therefore lies within the range [0,4p-1]. |
| */ |
| memset ( &step3->value, 0, sizeof ( step3->value ) ); |
| bigint_grow ( &step2->parts.low_256bit, &result->value ); |
| bigint_multiply ( &step2->parts.high_11bit, &x25519_reduce_256, |
| &step3->product ); |
| bigint_add ( &step3->value, &result->value ); |
| |
| /* Step 1 calculates the product of the input operands, and |
| * each subsequent step reduces the number of bits in the |
| * result while preserving this value (modulo p). The final |
| * result is therefore equal to the product of the input |
| * operands (modulo p), as required. |
| * |
| * The step 3 result lies within the range [0,4p-1] and the |
| * final result is therefore a valid X25519 unsigned 257-bit |
| * integer, as required. |
| */ |
| } |
| |
| /** |
| * Compute multiplicative inverse |
| * |
| * @v invertend Big integer to be inverted |
| * @v result Big integer to hold result (may not overlap input) |
| */ |
| void x25519_invert ( const union x25519_oct258 *invertend, |
| union x25519_quad257 *result ) { |
| int i; |
| |
| /* Sanity check */ |
| assert ( invertend != &result->oct258 ); |
| |
| /* Calculate inverse as x^(-1)=x^(p-2) where p is the field prime |
| * |
| * The field prime is p=2^255-19 and so: |
| * |
| * p - 2 = 2^255 - 21 |
| * = (2^255 - 1) - 2^4 - 2^2 |
| * |
| * i.e. p-2 is a 254-bit number in which all bits are set |
| * apart from bit 2 and bit 4. |
| * |
| * We use the square-and-multiply method to compute x^(p-2). |
| */ |
| bigint_copy ( &invertend->value, &result->value ); |
| for ( i = 253 ; i >= 0 ; i-- ) { |
| |
| /* Square running total */ |
| x25519_multiply ( &result->oct258, &result->oct258, result ); |
| |
| /* For each set bit in the exponent, multiply by invertend */ |
| if ( ( i != 2 ) && ( i != 4 ) ) { |
| x25519_multiply ( invertend, &result->oct258, result ); |
| } |
| } |
| } |
| |
| /** |
| * Reduce big integer via conditional subtraction |
| * |
| * @v subtrahend Big integer to subtract |
| * @v value Big integer to be subtracted from, if possible |
| */ |
| static void x25519_reduce_by ( const x25519_t *subtrahend, x25519_t *value ) { |
| unsigned int max_bit = ( ( 8 * sizeof ( *value ) ) - 1 ); |
| x25519_t tmp; |
| |
| /* Conditionally subtract subtrahend |
| * |
| * Subtract the subtrahend, discarding the result (in constant |
| * time) if the subtraction underflows. |
| */ |
| bigint_copy ( value, &tmp ); |
| bigint_subtract ( subtrahend, value ); |
| bigint_swap ( value, &tmp, bigint_bit_is_set ( value, max_bit ) ); |
| } |
| |
| /** |
| * Reduce big integer to canonical range |
| * |
| * @v value Big integer to be reduced |
| */ |
| void x25519_reduce ( union x25519_quad257 *value ) { |
| |
| /* Conditionally subtract 2p |
| * |
| * Subtract twice the field prime, discarding the result (in |
| * constant time) if the subtraction underflows. |
| * |
| * The input value is in the range [0,4p-1]. After this |
| * conditional subtraction, the value is in the range |
| * [0,2p-1]. |
| */ |
| x25519_reduce_by ( &x25519_2p, &value->value ); |
| |
| /* Conditionally subtract p |
| * |
| * Subtract the field prime, discarding the result (in |
| * constant time) if the subtraction underflows. |
| * |
| * The value is already in the range [0,2p-1]. After this |
| * conditional subtraction, the value is in the range [0,p-1] |
| * and is therefore the canonical representation. |
| */ |
| x25519_reduce_by ( &x25519_p, &value->value ); |
| } |
| |
| /** |
| * Compute next step of the Montgomery ladder |
| * |
| * @v base Base point |
| * @v bit Bit value |
| * @v step Ladder step |
| */ |
| static void x25519_step ( const union x25519_quad257 *base, int bit, |
| struct x25519_step *step ) { |
| union x25519_quad257 *a = &step->x_n.X; |
| union x25519_quad257 *b = &step->x_n1.X; |
| union x25519_quad257 *c = &step->x_n.Z; |
| union x25519_quad257 *d = &step->x_n1.Z; |
| union x25519_oct258 e; |
| union x25519_quad257 f; |
| union x25519_oct258 *v1_e; |
| union x25519_oct258 *v2_a; |
| union x25519_oct258 *v3_c; |
| union x25519_oct258 *v4_b; |
| union x25519_quad257 *v5_d; |
| union x25519_quad257 *v6_f; |
| union x25519_quad257 *v7_a; |
| union x25519_quad257 *v8_c; |
| union x25519_oct258 *v9_e; |
| union x25519_oct258 *v10_a; |
| union x25519_quad257 *v11_b; |
| union x25519_oct258 *v12_c; |
| union x25519_quad257 *v13_a; |
| union x25519_oct258 *v14_a; |
| union x25519_quad257 *v15_c; |
| union x25519_quad257 *v16_a; |
| union x25519_quad257 *v17_d; |
| union x25519_quad257 *v18_b; |
| |
| /* See the referenced paper "Implementing Curve25519/X25519: A |
| * Tutorial on Elliptic Curve Cryptography" for the reasoning |
| * behind this calculation. |
| */ |
| |
| /* Reuse storage locations for intermediate results where possible */ |
| v1_e = &e; |
| v2_a = container_of ( &a->value, union x25519_oct258, value ); |
| v3_c = container_of ( &c->value, union x25519_oct258, value ); |
| v4_b = container_of ( &b->value, union x25519_oct258, value ); |
| v5_d = d; |
| v6_f = &f; |
| v7_a = a; |
| v8_c = c; |
| v9_e = &e; |
| v10_a = container_of ( &a->value, union x25519_oct258, value ); |
| v11_b = b; |
| v12_c = container_of ( &c->value, union x25519_oct258, value ); |
| v13_a = a; |
| v14_a = container_of ( &a->value, union x25519_oct258, value ); |
| v15_c = c; |
| v16_a = a; |
| v17_d = d; |
| v18_b = b; |
| |
| /* Select inputs */ |
| bigint_swap ( &a->value, &b->value, bit ); |
| bigint_swap ( &c->value, &d->value, bit ); |
| |
| /* v1 = a + c */ |
| x25519_add ( a, c, v1_e ); |
| |
| /* v2 = a - c */ |
| x25519_subtract ( a, c, v2_a ); |
| |
| /* v3 = b + d */ |
| x25519_add ( b, d, v3_c ); |
| |
| /* v4 = b - d */ |
| x25519_subtract ( b, d, v4_b ); |
| |
| /* v5 = v1^2 = (a + c)^2 = a^2 + 2ac + c^2 */ |
| x25519_multiply ( v1_e, v1_e, v5_d ); |
| |
| /* v6 = v2^2 = (a - c)^2 = a^2 - 2ac + c^2 */ |
| x25519_multiply ( v2_a, v2_a, v6_f ); |
| |
| /* v7 = v3 * v2 = (b + d) * (a - c) = ab - bc + ad - cd */ |
| x25519_multiply ( v3_c, v2_a, v7_a ); |
| |
| /* v8 = v4 * v1 = (b - d) * (a + c) = ab + bc - ad - cd */ |
| x25519_multiply ( v4_b, v1_e, v8_c ); |
| |
| /* v9 = v7 + v8 = 2 * (ab - cd) */ |
| x25519_add ( v7_a, v8_c, v9_e ); |
| |
| /* v10 = v7 - v8 = 2 * (ad - bc) */ |
| x25519_subtract ( v7_a, v8_c, v10_a ); |
| |
| /* v11 = v10^2 = 4 * (ad - bc)^2 */ |
| x25519_multiply ( v10_a, v10_a, v11_b ); |
| |
| /* v12 = v5 - v6 = (a + c)^2 - (a - c)^2 = 4ac */ |
| x25519_subtract ( v5_d, v6_f, v12_c ); |
| |
| /* v13 = v12 * 121665 = 486660ac = (A-2) * ac */ |
| x25519_multiply ( v12_c, &x25519_121665, v13_a ); |
| |
| /* v14 = v13 + v5 = (A-2) * ac + a^2 + 2ac + c^2 = a^2 + A * ac + c^2 */ |
| x25519_add ( v13_a, v5_d, v14_a ); |
| |
| /* v15 = v12 * v14 = 4ac * (a^2 + A * ac + c^2) */ |
| x25519_multiply ( v12_c, v14_a, v15_c ); |
| |
| /* v16 = v5 * v6 = (a + c)^2 * (a - c)^2 = (a^2 - c^2)^2 */ |
| x25519_multiply ( &v5_d->oct258, &v6_f->oct258, v16_a ); |
| |
| /* v17 = v11 * base = 4 * base * (ad - bc)^2 */ |
| x25519_multiply ( &v11_b->oct258, &base->oct258, v17_d ); |
| |
| /* v18 = v9^2 = 4 * (ab - cd)^2 */ |
| x25519_multiply ( v9_e, v9_e, v18_b ); |
| |
| /* Select outputs */ |
| bigint_swap ( &a->value, &b->value, bit ); |
| bigint_swap ( &c->value, &d->value, bit ); |
| } |
| |
| /** |
| * Multiply X25519 elliptic curve point |
| * |
| * @v base Base point |
| * @v scalar Scalar multiple |
| * @v result Point to hold result (may overlap base point) |
| */ |
| static void x25519_ladder ( const union x25519_quad257 *base, |
| struct x25519_value *scalar, |
| union x25519_quad257 *result ) { |
| static const uint8_t zero[] = { 0 }; |
| static const uint8_t one[] = { 1 }; |
| struct x25519_step step; |
| union x25519_quad257 *tmp; |
| int bit; |
| int i; |
| |
| /* Initialise ladder */ |
| bigint_init ( &step.x_n.X.value, one, sizeof ( one ) ); |
| bigint_init ( &step.x_n.Z.value, zero, sizeof ( zero ) ); |
| bigint_copy ( &base->value, &step.x_n1.X.value ); |
| bigint_init ( &step.x_n1.Z.value, one, sizeof ( one ) ); |
| |
| /* Use ladder */ |
| for ( i = 254 ; i >= 0 ; i-- ) { |
| bit = ( ( scalar->raw[ i / 8 ] >> ( i % 8 ) ) & 1 ); |
| x25519_step ( base, bit, &step ); |
| } |
| |
| /* Convert back to affine coordinate */ |
| tmp = &step.x_n1.X; |
| x25519_invert ( &step.x_n.Z.oct258, tmp ); |
| x25519_multiply ( &step.x_n.X.oct258, &tmp->oct258, result ); |
| x25519_reduce ( result ); |
| } |
| |
| /** |
| * Reverse X25519 value endianness |
| * |
| * @v value Value to reverse |
| */ |
| static void x25519_reverse ( struct x25519_value *value ) { |
| uint8_t *low = value->raw; |
| uint8_t *high = &value->raw[ sizeof ( value->raw ) - 1 ]; |
| uint8_t tmp; |
| |
| /* Reverse bytes */ |
| do { |
| tmp = *low; |
| *low = *high; |
| *high = tmp; |
| } while ( ++low < --high ); |
| } |
| |
| /** |
| * Calculate X25519 key |
| * |
| * @v base Base point |
| * @v scalar Scalar multiple |
| * @v result Point to hold result (may overlap base point) |
| */ |
| void x25519_key ( const struct x25519_value *base, |
| const struct x25519_value *scalar, |
| struct x25519_value *result ) { |
| struct x25519_value *tmp = result; |
| union x25519_quad257 point; |
| |
| /* Reverse base point and clear high bit as required by RFC7748 */ |
| memcpy ( tmp, base, sizeof ( *tmp ) ); |
| x25519_reverse ( tmp ); |
| tmp->raw[0] &= 0x7f; |
| bigint_init ( &point.value, tmp->raw, sizeof ( tmp->raw ) ); |
| |
| /* Clamp scalar as required by RFC7748 */ |
| memcpy ( tmp, scalar, sizeof ( *tmp ) ); |
| tmp->raw[0] &= 0xf8; |
| tmp->raw[31] |= 0x40; |
| |
| /* Multiply elliptic curve point */ |
| x25519_ladder ( &point, tmp, &point ); |
| |
| /* Reverse result */ |
| bigint_done ( &point.value, result->raw, sizeof ( result->raw ) ); |
| x25519_reverse ( result ); |
| } |
