#include "gf2x_arith_mod_xPplusOne.h" #include "rng.h" #include #include // memcpy(...), memset(...) static void gf2x_mod(DIGIT out[], const DIGIT in[]) { int i, j, posTrailingBit, maskOffset, to_copy; DIGIT mask, aux[2 * NUM_DIGITS_GF2X_ELEMENT]; memcpy(aux, in, 2 * NUM_DIGITS_GF2X_ELEMENT * DIGIT_SIZE_B); memset(out, 0x00, NUM_DIGITS_GF2X_ELEMENT * DIGIT_SIZE_B); /* not true for parameter set if (2 * NUM_DIGITS_GF2X_ELEMENT < NUM_DIGITS_GF2X_MODULUS) { for (i = 0; i < 2 * NUM_DIGITS_GF2X_ELEMENT; i++) { out[NUM_DIGITS_GF2X_ELEMENT - 1 - i] = in[2 * NUM_DIGITS_GF2X_ELEMENT - 1 - i]; } return; } */ for (i = 0; i < (2 * NUM_DIGITS_GF2X_ELEMENT) - NUM_DIGITS_GF2X_MODULUS; i += 1) { for (j = DIGIT_SIZE_b - 1; j >= 0; j--) { mask = ((DIGIT)0x1) << j; if (aux[i] & mask) { aux[i] ^= mask; posTrailingBit = (DIGIT_SIZE_b - 1 - j) + i * DIGIT_SIZE_b + P; maskOffset = (DIGIT_SIZE_b - 1 - (posTrailingBit % DIGIT_SIZE_b)); mask = (DIGIT) 0x1 << maskOffset; aux[posTrailingBit / DIGIT_SIZE_b] ^= mask; } } } for (j = DIGIT_SIZE_b - 1; j >= MSb_POSITION_IN_MSB_DIGIT_OF_MODULUS; j--) { mask = ((DIGIT)0x1) << j; if (aux[i] & mask) { aux[i] ^= mask; posTrailingBit = (DIGIT_SIZE_b - 1 - j) + i * DIGIT_SIZE_b + P; maskOffset = (DIGIT_SIZE_b - 1 - (posTrailingBit % DIGIT_SIZE_b)); mask = (DIGIT) 0x1 << maskOffset; aux[posTrailingBit / DIGIT_SIZE_b] ^= mask; } } to_copy = (2 * NUM_DIGITS_GF2X_ELEMENT > NUM_DIGITS_GF2X_ELEMENT) ? NUM_DIGITS_GF2X_ELEMENT : 2 * NUM_DIGITS_GF2X_ELEMENT; for (i = 0; i < to_copy; i++) { out[NUM_DIGITS_GF2X_ELEMENT - 1 - i] = aux[2 * NUM_DIGITS_GF2X_ELEMENT - 1 - i]; } } static void left_bit_shift(const int length, DIGIT in[]) { int j; for (j = 0; j < length - 1; j++) { in[j] <<= 1; /* logical shift does not need clearing */ in[j] |= in[j + 1] >> (DIGIT_SIZE_b - 1); } in[j] <<= 1; } static void right_bit_shift(unsigned int length, DIGIT in[]) { unsigned int j; for (j = length - 1; j > 0 ; j--) { in[j] >>= 1; in[j] |= (in[j - 1] & (DIGIT)0x01) << (DIGIT_SIZE_b - 1); } in[j] >>= 1; } /* shifts by whole digits */ static inline void left_DIGIT_shift_n(unsigned int length, DIGIT in[], unsigned int amount) { unsigned int j; for (j = 0; (j + amount) < length; j++) { in[j] = in[j + amount]; } for (; j < length; j++) { in[j] = (DIGIT)0; } } /* may shift by an arbitrary amount*/ static void left_bit_shift_wide_n(const int length, DIGIT in[], unsigned int amount) { left_DIGIT_shift_n(length, in, amount / DIGIT_SIZE_b); PQCLEAN_LEDAKEMLT12_CLEAN_left_bit_shift_n(length, in, amount % DIGIT_SIZE_b); } /* Hackers delight, reverses a uint64_t */ static DIGIT reverse_digit(DIGIT x) { uint64_t t; x = (x << 31) | (x >> 33); t = (x ^ (x >> 20)) & 0x00000FFF800007FFLL; x = (t | (t << 20)) ^ x; t = (x ^ (x >> 8)) & 0x00F8000F80700807LL; x = (t | (t << 8)) ^ x; t = (x ^ (x >> 4)) & 0x0808708080807008LL; x = (t | (t << 4)) ^ x; t = (x ^ (x >> 2)) & 0x1111111111111111LL; x = (t | (t << 2)) ^ x; return x; } void PQCLEAN_LEDAKEMLT12_CLEAN_gf2x_transpose_in_place(DIGIT A[]) { /* it keeps the lsb in the same position and * inverts the sequence of the remaining bits */ DIGIT mask = (DIGIT)0x1; DIGIT rev1, rev2, a00; int i, slack_bits_amount = NUM_DIGITS_GF2X_ELEMENT * DIGIT_SIZE_b - P; a00 = A[NUM_DIGITS_GF2X_ELEMENT - 1] & mask; right_bit_shift(NUM_DIGITS_GF2X_ELEMENT, A); for (i = NUM_DIGITS_GF2X_ELEMENT - 1; i >= (NUM_DIGITS_GF2X_ELEMENT + 1) / 2; i--) { rev1 = reverse_digit(A[i]); rev2 = reverse_digit(A[NUM_DIGITS_GF2X_ELEMENT - 1 - i]); A[i] = rev2; A[NUM_DIGITS_GF2X_ELEMENT - 1 - i] = rev1; } A[NUM_DIGITS_GF2X_ELEMENT / 2] = reverse_digit(A[NUM_DIGITS_GF2X_ELEMENT / 2]); // reverse middle digit if (slack_bits_amount) { PQCLEAN_LEDAKEMLT12_CLEAN_right_bit_shift_n(NUM_DIGITS_GF2X_ELEMENT, A, slack_bits_amount); } A[NUM_DIGITS_GF2X_ELEMENT - 1] = (A[NUM_DIGITS_GF2X_ELEMENT - 1] & (~mask)) | a00; } static void rotate_bit_left(DIGIT in[]) { /* equivalent to x * in(x) mod x^P+1 */ DIGIT mask, rotated_bit; int msb_offset_in_digit = MSb_POSITION_IN_MSB_DIGIT_OF_MODULUS - 1; mask = ((DIGIT)0x1) << msb_offset_in_digit; rotated_bit = !!(in[0] & mask); in[0] &= ~mask; left_bit_shift(NUM_DIGITS_GF2X_ELEMENT, in); in[NUM_DIGITS_GF2X_ELEMENT - 1] |= rotated_bit; } static void rotate_bit_right(DIGIT in[]) { /* x^{-1} * in(x) mod x^P+1 */ DIGIT rotated_bit = in[NUM_DIGITS_GF2X_ELEMENT - 1] & ((DIGIT)0x1); right_bit_shift(NUM_DIGITS_GF2X_ELEMENT, in); int msb_offset_in_digit = MSb_POSITION_IN_MSB_DIGIT_OF_MODULUS - 1; rotated_bit = rotated_bit << msb_offset_in_digit; in[0] |= rotated_bit; } static void gf2x_swap(const int length, DIGIT f[], DIGIT s[]) { DIGIT t; for (int i = length - 1; i >= 0; i--) { t = f[i]; f[i] = s[i]; s[i] = t; } } /* * Optimized extended GCD algorithm to compute the multiplicative inverse of * a non-zero element in GF(2)[x] mod x^P+1, in polyn. representation. * * H. Brunner, A. Curiger, and M. Hofstetter. 1993. * On Computing Multiplicative Inverses in GF(2^m). * IEEE Trans. Comput. 42, 8 (August 1993), 1010-1015. * DOI=http://dx.doi.org/10.1109/12.238496 * * * Henri Cohen, Gerhard Frey, Roberto Avanzi, Christophe Doche, Tanja Lange, * Kim Nguyen, and Frederik Vercauteren. 2012. * Handbook of Elliptic and Hyperelliptic Curve Cryptography, * Second Edition (2nd ed.). Chapman & Hall/CRC. * (Chapter 11 -- Algorithm 11.44 -- pag 223) * */ int PQCLEAN_LEDAKEMLT12_CLEAN_gf2x_mod_inverse(DIGIT out[], const DIGIT in[]) { /* in^{-1} mod x^P-1 */ int i; long int delta = 0; DIGIT u[NUM_DIGITS_GF2X_ELEMENT] = {0}; DIGIT v[NUM_DIGITS_GF2X_ELEMENT] = {0}; DIGIT s[NUM_DIGITS_GF2X_MODULUS] = {0}; DIGIT f[NUM_DIGITS_GF2X_MODULUS] = {0}; // alignas(32)? DIGIT mask; u[NUM_DIGITS_GF2X_ELEMENT - 1] = 0x1; v[NUM_DIGITS_GF2X_ELEMENT - 1] = 0x0; s[NUM_DIGITS_GF2X_MODULUS - 1] = 0x1; mask = (((DIGIT)0x1) << MSb_POSITION_IN_MSB_DIGIT_OF_MODULUS); s[0] |= mask; for (i = NUM_DIGITS_GF2X_ELEMENT - 1; i >= 0 && in[i] == 0; i--) { }; if (i < 0) { return 0; } for (i = NUM_DIGITS_GF2X_MODULUS - 1; i >= 0 ; i--) { f[i] = in[i]; } for (i = 1; i <= 2 * P; i++) { if ( (f[0] & mask) == 0 ) { left_bit_shift(NUM_DIGITS_GF2X_MODULUS, f); rotate_bit_left(u); delta += 1; } else { if ( (s[0] & mask) != 0) { gf2x_add(s, s, f, NUM_DIGITS_GF2X_MODULUS); gf2x_mod_add(v, v, u); } left_bit_shift(NUM_DIGITS_GF2X_MODULUS, s); if ( delta == 0 ) { gf2x_swap(NUM_DIGITS_GF2X_MODULUS, f, s); gf2x_swap(NUM_DIGITS_GF2X_ELEMENT, u, v); rotate_bit_left(u); delta = 1; } else { rotate_bit_right(u); delta = delta - 1; } } } for (i = NUM_DIGITS_GF2X_ELEMENT - 1; i >= 0 ; i--) { out[i] = u[i]; } return (delta == 0); } void PQCLEAN_LEDAKEMLT12_CLEAN_gf2x_mod_mul(DIGIT Res[], const DIGIT A[], const DIGIT B[]) { DIGIT aux[2 * NUM_DIGITS_GF2X_ELEMENT]; GF2X_MUL(2 * NUM_DIGITS_GF2X_ELEMENT, aux, NUM_DIGITS_GF2X_ELEMENT, A, NUM_DIGITS_GF2X_ELEMENT, B); gf2x_mod(Res, aux); } /*PRE: the representation of the sparse coefficients is sorted in increasing order of the coefficients themselves */ void PQCLEAN_LEDAKEMLT12_CLEAN_gf2x_mod_mul_dense_to_sparse( DIGIT Res[], const DIGIT dense[], POSITION_T sparse[], unsigned int nPos) { DIGIT aux[2 * NUM_DIGITS_GF2X_ELEMENT] = {0x00}; DIGIT resDouble[2 * NUM_DIGITS_GF2X_ELEMENT] = {0x00}; memcpy(aux + NUM_DIGITS_GF2X_ELEMENT, dense, NUM_DIGITS_GF2X_ELEMENT * DIGIT_SIZE_B); memcpy(resDouble + NUM_DIGITS_GF2X_ELEMENT, dense, NUM_DIGITS_GF2X_ELEMENT * DIGIT_SIZE_B); if (sparse[0] != INVALID_POS_VALUE) { left_bit_shift_wide_n(2 * NUM_DIGITS_GF2X_ELEMENT, resDouble, sparse[0]); left_bit_shift_wide_n(2 * NUM_DIGITS_GF2X_ELEMENT, aux, sparse[0]); for (unsigned int i = 1; i < nPos; i++) { if (sparse[i] != INVALID_POS_VALUE) { left_bit_shift_wide_n(2 * NUM_DIGITS_GF2X_ELEMENT, aux, (sparse[i] - sparse[i - 1]) ); gf2x_add(resDouble, aux, resDouble, 2 * NUM_DIGITS_GF2X_ELEMENT); } } } gf2x_mod(Res, resDouble); } void PQCLEAN_LEDAKEMLT12_CLEAN_gf2x_transpose_in_place_sparse(int sizeA, POSITION_T A[]) { POSITION_T t; int i = 0, j; if (A[i] == 0) { i = 1; } j = i; for (; i < sizeA && A[i] != INVALID_POS_VALUE; i++) { A[i] = P - A[i]; } for (i -= 1; j < i; j++, i--) { t = A[j]; A[j] = A[i]; A[i] = t; } } void PQCLEAN_LEDAKEMLT12_CLEAN_gf2x_mod_mul_sparse(size_t sizeR, POSITION_T Res[], size_t sizeA, const POSITION_T A[], size_t sizeB, const POSITION_T B[]) { /* compute all the coefficients, filling invalid positions with P*/ size_t lastFilledPos = 0; for (size_t i = 0 ; i < sizeA ; i++) { for (size_t j = 0 ; j < sizeB ; j++) { uint32_t prod = A[i] + B[j]; prod = ( (prod >= P) ? prod - P : prod); if ((A[i] != INVALID_POS_VALUE) && (B[j] != INVALID_POS_VALUE)) { Res[lastFilledPos] = prod; } else { Res[lastFilledPos] = INVALID_POS_VALUE; } lastFilledPos++; } } while (lastFilledPos < sizeR) { Res[lastFilledPos] = INVALID_POS_VALUE; lastFilledPos++; } quicksort_sparse(Res); /* eliminate duplicates */ POSITION_T lastReadPos = Res[0]; int duplicateCount; size_t write_idx = 0; size_t read_idx = 0; while (read_idx < sizeR && Res[read_idx] != INVALID_POS_VALUE) { lastReadPos = Res[read_idx]; read_idx++; duplicateCount = 1; while ( (Res[read_idx] == lastReadPos) && (Res[read_idx] != INVALID_POS_VALUE)) { read_idx++; duplicateCount++; } if (duplicateCount % 2) { Res[write_idx] = lastReadPos; write_idx++; } } /* fill remaining cells with INVALID_POS_VALUE */ for (; write_idx < sizeR; write_idx++) { Res[write_idx] = INVALID_POS_VALUE; } } /* the implementation is safe even in case A or B alias with the result */ /* PRE: A and B should be sorted and have INVALID_POS_VALUE at the end */ void PQCLEAN_LEDAKEMLT12_CLEAN_gf2x_mod_add_sparse( int sizeR, POSITION_T Res[], int sizeA, const POSITION_T A[], int sizeB, const POSITION_T B[]) { POSITION_T tmpRes[DV * M]; // TODO: now function only works for adding (disjunct) DV and M positions int idxA = 0, idxB = 0, idxR = 0; while ( idxA < sizeA && idxB < sizeB && A[idxA] != INVALID_POS_VALUE && B[idxB] != INVALID_POS_VALUE ) { if (A[idxA] == B[idxB]) { idxA++; idxB++; } else { if (A[idxA] < B[idxB]) { tmpRes[idxR] = A[idxA]; idxA++; } else { tmpRes[idxR] = B[idxB]; idxB++; } idxR++; } } while (idxA < sizeA && A[idxA] != INVALID_POS_VALUE) { tmpRes[idxR] = A[idxA]; idxA++; idxR++; } while (idxB < sizeB && B[idxB] != INVALID_POS_VALUE) { tmpRes[idxR] = B[idxB]; idxB++; idxR++; } while (idxR < sizeR) { tmpRes[idxR] = INVALID_POS_VALUE; idxR++; } memcpy(Res, tmpRes, sizeof(POSITION_T)*sizeR); } /* Return a uniform random value in the range 0..n-1 inclusive, * applying a rejection sampling strategy and exploiting as a random source * the NIST seedexpander seeded with the proper key. * Assumes that the maximum value for the range n is 2^32-1 */ static uint32_t rand_range(const unsigned int n, const int logn, AES_XOF_struct *seed_expander_ctx) { unsigned long required_rnd_bytes = (logn + 7) / 8; unsigned char rnd_char_buffer[4]; uint32_t rnd_value; uint32_t mask = ( (uint32_t)1 << logn) - 1; do { PQCLEAN_LEDAKEMLT12_CLEAN_seedexpander(seed_expander_ctx, rnd_char_buffer, required_rnd_bytes); /* obtain an endianness independent representation of the generated random bytes into an unsigned integer */ rnd_value = ((uint32_t)rnd_char_buffer[3] << 24) + ((uint32_t)rnd_char_buffer[2] << 16) + ((uint32_t)rnd_char_buffer[1] << 8) + ((uint32_t)rnd_char_buffer[0] << 0) ; rnd_value = mask & rnd_value; } while (rnd_value >= n); return rnd_value; } /* Obtains fresh randomness and seed-expands it until all the required positions * for the '1's in the circulant block are obtained */ void PQCLEAN_LEDAKEMLT12_CLEAN_rand_circulant_sparse_block(POSITION_T *pos_ones, int countOnes, AES_XOF_struct *seed_expander_ctx) { int duplicated, placedOnes = 0; uint32_t p; while (placedOnes < countOnes) { p = rand_range(NUM_BITS_GF2X_ELEMENT, P_BITS, seed_expander_ctx); duplicated = 0; for (int j = 0; j < placedOnes; j++) { if (pos_ones[j] == p) { duplicated = 1; } } if (duplicated == 0) { pos_ones[placedOnes] = p; placedOnes++; } } } /* Returns random weight-t circulant block */ void PQCLEAN_LEDAKEMLT12_CLEAN_rand_circulant_blocks_sequence( DIGIT sequence[N0 * NUM_DIGITS_GF2X_ELEMENT], AES_XOF_struct *seed_expander_ctx) { int rndPos[NUM_ERRORS_T], duplicated, counter = 0; memset(sequence, 0x00, N0 * NUM_DIGITS_GF2X_ELEMENT * DIGIT_SIZE_B); while (counter < NUM_ERRORS_T) { int p = rand_range(N0 * NUM_BITS_GF2X_ELEMENT, P_BITS, seed_expander_ctx); duplicated = 0; for (int j = 0; j < counter; j++) { if (rndPos[j] == p) { duplicated = 1; } } if (duplicated == 0) { rndPos[counter] = p; counter++; } } for (int j = 0; j < counter; j++) { int polyIndex = rndPos[j] / P; int exponent = rndPos[j] % P; gf2x_set_coeff( sequence + NUM_DIGITS_GF2X_ELEMENT * polyIndex, exponent, ( (DIGIT) 1)); } } void PQCLEAN_LEDAKEMLT12_CLEAN_gf2x_tobytes(uint8_t *bytes, const DIGIT *poly) { size_t i, j; for (i = 0; i < NUM_DIGITS_GF2X_ELEMENT; i++) { for (j = 0; j < DIGIT_SIZE_B; j++) { bytes[i * DIGIT_SIZE_B + j] = (uint8_t) ((poly[i] >> (8 * j)) & 0xFF); } } }