#ifndef PQCLEAN_FALCON512_CLEAN_INNER_H #define PQCLEAN_FALCON512_CLEAN_INNER_H /* * Internal functions for Falcon. This is not the API intended to be * used by applications; instead, this internal API provides all the * primitives on which wrappers build to provide external APIs. * * ==========================(LICENSE BEGIN)============================ * * Copyright (c) 2017-2019 Falcon Project * * Permission is hereby granted, free of charge, to any person obtaining * a copy of this software and associated documentation files (the * "Software"), to deal in the Software without restriction, including * without limitation the rights to use, copy, modify, merge, publish, * distribute, sublicense, and/or sell copies of the Software, and to * permit persons to whom the Software is furnished to do so, subject to * the following conditions: * * The above copyright notice and this permission notice shall be * included in all copies or substantial portions of the Software. * * THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, * EXPRESS OR IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF * MERCHANTABILITY, FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. * IN NO EVENT SHALL THE AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY * CLAIM, DAMAGES OR OTHER LIABILITY, WHETHER IN AN ACTION OF CONTRACT, * TORT OR OTHERWISE, ARISING FROM, OUT OF OR IN CONNECTION WITH THE * SOFTWARE OR THE USE OR OTHER DEALINGS IN THE SOFTWARE. * * ===========================(LICENSE END)============================= * * @author Thomas Pornin */ /* * IMPORTANT API RULES * ------------------- * * This API has some non-trivial usage rules: * * * - All public functions (i.e. the non-static ones) must be referenced * with the PQCLEAN_FALCON512_CLEAN_ macro (e.g. PQCLEAN_FALCON512_CLEAN_verify_raw for the verify_raw() * function). That macro adds a prefix to the name, which is * configurable with the FALCON_PREFIX macro. This allows compiling * the code into a specific "namespace" and potentially including * several versions of this code into a single application (e.g. to * have an AVX2 and a non-AVX2 variants and select the one to use at * runtime based on availability of AVX2 opcodes). * * - Functions that need temporary buffers expects them as a final * tmp[] array of type uint8_t*, with a size which is documented for * each function. However, most have some alignment requirements, * because they will use the array to store 16-bit, 32-bit or 64-bit * values (e.g. uint64_t or double). The caller must ensure proper * alignment. What happens on unaligned access depends on the * underlying architecture, ranging from a slight time penalty * to immediate termination of the process. * * - Some functions rely on specific rounding rules and precision for * floating-point numbers. On some systems (in particular 32-bit x86 * with the 387 FPU), this requires setting an hardware control * word. The caller MUST use set_fpu_cw() to ensure proper precision: * * oldcw = set_fpu_cw(2); * PQCLEAN_FALCON512_CLEAN_sign_dyn(...); * set_fpu_cw(oldcw); * * On systems where the native floating-point precision is already * proper, or integer-based emulation is used, the set_fpu_cw() * function does nothing, so it can be called systematically. */ #include "fips202.h" #include "fpr.h" #include #include #include /* * Some computations with floating-point elements, in particular * rounding to the nearest integer, rely on operations using _exactly_ * the precision of IEEE-754 binary64 type (i.e. 52 bits). On 32-bit * x86, the 387 FPU may be used (depending on the target OS) and, in * that case, may use more precision bits (i.e. 64 bits, for an 80-bit * total type length); to prevent miscomputations, we define an explicit * function that modifies the precision in the FPU control word. * * set_fpu_cw() sets the precision to the provided value, and returns * the previously set precision; callers are supposed to restore the * previous precision on exit. The correct (52-bit) precision is * configured with the value "2". On unsupported compilers, or on * targets other than 32-bit x86, or when the native 'double' type is * not used, the set_fpu_cw() function does nothing at all. */ #define set_fpu_cw PQCLEAN_FALCON512_CLEAN_set_fpu_cw unsigned set_fpu_cw(unsigned x); /* ==================================================================== */ /* * SHAKE256 implementation (shake.c). * * API is defined to be easily replaced with the fips202.h API defined * as part of PQClean. */ #define inner_shake256_context shake256incctx #define inner_shake256_init(sc) shake256_inc_init(sc) #define inner_shake256_inject(sc, in, len) shake256_inc_absorb(sc, in, len) #define inner_shake256_flip(sc) shake256_inc_finalize(sc) #define inner_shake256_extract(sc, out, len) shake256_inc_squeeze(out, len, sc) #define inner_shake256_ctx_release(sc) shake256_inc_ctx_release(sc) /* ==================================================================== */ /* * Encoding/decoding functions (codec.c). * * Encoding functions take as parameters an output buffer (out) with * a given maximum length (max_out_len); returned value is the actual * number of bytes which have been written. If the output buffer is * not large enough, then 0 is returned (some bytes may have been * written to the buffer). If 'out' is NULL, then 'max_out_len' is * ignored; instead, the function computes and returns the actual * required output length (in bytes). * * Decoding functions take as parameters an input buffer (in) with * its maximum length (max_in_len); returned value is the actual number * of bytes that have been read from the buffer. If the provided length * is too short, then 0 is returned. * * Values to encode or decode are vectors of integers, with N = 2^logn * elements. * * Three encoding formats are defined: * * - modq: sequence of values modulo 12289, each encoded over exactly * 14 bits. The encoder and decoder verify that integers are within * the valid range (0..12288). Values are arrays of uint16. * * - trim: sequence of signed integers, a specified number of bits * each. The number of bits is provided as parameter and includes * the sign bit. Each integer x must be such that |x| < 2^(bits-1) * (which means that the -2^(bits-1) value is forbidden); encode and * decode functions check that property. Values are arrays of * int16_t or int8_t, corresponding to names 'trim_i16' and * 'trim_i8', respectively. * * - comp: variable-length encoding for signed integers; each integer * uses a minimum of 9 bits, possibly more. This is normally used * only for signatures. * */ size_t PQCLEAN_FALCON512_CLEAN_modq_encode(void *out, size_t max_out_len, const uint16_t *x, unsigned logn); size_t PQCLEAN_FALCON512_CLEAN_trim_i16_encode(void *out, size_t max_out_len, const int16_t *x, unsigned logn, unsigned bits); size_t PQCLEAN_FALCON512_CLEAN_trim_i8_encode(void *out, size_t max_out_len, const int8_t *x, unsigned logn, unsigned bits); size_t PQCLEAN_FALCON512_CLEAN_comp_encode(void *out, size_t max_out_len, const int16_t *x, unsigned logn); size_t PQCLEAN_FALCON512_CLEAN_modq_decode(uint16_t *x, unsigned logn, const void *in, size_t max_in_len); size_t PQCLEAN_FALCON512_CLEAN_trim_i16_decode(int16_t *x, unsigned logn, unsigned bits, const void *in, size_t max_in_len); size_t PQCLEAN_FALCON512_CLEAN_trim_i8_decode(int8_t *x, unsigned logn, unsigned bits, const void *in, size_t max_in_len); size_t PQCLEAN_FALCON512_CLEAN_comp_decode(int16_t *x, unsigned logn, const void *in, size_t max_in_len); /* * Number of bits for key elements, indexed by logn (1 to 10). This * is at most 8 bits for all degrees, but some degrees may have shorter * elements. */ extern const uint8_t PQCLEAN_FALCON512_CLEAN_max_fg_bits[]; extern const uint8_t PQCLEAN_FALCON512_CLEAN_max_FG_bits[]; /* * Maximum size, in bits, of elements in a signature, indexed by logn * (1 to 10). The size includes the sign bit. */ extern const uint8_t PQCLEAN_FALCON512_CLEAN_max_sig_bits[]; /* ==================================================================== */ /* * Support functions used for both signature generation and signature * verification (common.c). */ /* * From a SHAKE256 context (must be already flipped), produce a new * point. This is the non-constant-time version, which may leak enough * information to serve as a stop condition on a brute force attack on * the hashed message (provided that the nonce value is known). */ void PQCLEAN_FALCON512_CLEAN_hash_to_point_vartime(inner_shake256_context *sc, uint16_t *x, unsigned logn); /* * From a SHAKE256 context (must be already flipped), produce a new * point. The temporary buffer (tmp) must have room for 2*2^logn bytes. * This function is constant-time but is typically more expensive than * PQCLEAN_FALCON512_CLEAN_hash_to_point_vartime(). * * tmp[] must have 16-bit alignment. */ void PQCLEAN_FALCON512_CLEAN_hash_to_point_ct(inner_shake256_context *sc, uint16_t *x, unsigned logn, uint8_t *tmp); /* * Tell whether a given vector (2N coordinates, in two halves) is * acceptable as a signature. This compares the appropriate norm of the * vector with the acceptance bound. Returned value is 1 on success * (vector is short enough to be acceptable), 0 otherwise. */ int PQCLEAN_FALCON512_CLEAN_is_short(const int16_t *s1, const int16_t *s2, unsigned logn); /* * Tell whether a given vector (2N coordinates, in two halves) is * acceptable as a signature. Instead of the first half s1, this * function receives the "saturated squared norm" of s1, i.e. the * sum of the squares of the coordinates of s1 (saturated at 2^32-1 * if the sum exceeds 2^31-1). * * Returned value is 1 on success (vector is short enough to be * acceptable), 0 otherwise. */ int PQCLEAN_FALCON512_CLEAN_is_short_half(uint32_t sqn, const int16_t *s2, unsigned logn); /* ==================================================================== */ /* * Signature verification functions (vrfy.c). */ /* * Convert a public key to NTT + Montgomery format. Conversion is done * in place. */ void PQCLEAN_FALCON512_CLEAN_to_ntt_monty(uint16_t *h, unsigned logn); /* * Internal signature verification code: * c0[] contains the hashed nonce+message * s2[] is the decoded signature * h[] contains the public key, in NTT + Montgomery format * logn is the degree log * tmp[] temporary, must have at least 2*2^logn bytes * Returned value is 1 on success, 0 on error. * * tmp[] must have 16-bit alignment. */ int PQCLEAN_FALCON512_CLEAN_verify_raw(const uint16_t *c0, const int16_t *s2, const uint16_t *h, unsigned logn, uint8_t *tmp); /* * Compute the public key h[], given the private key elements f[] and * g[]. This computes h = g/f mod phi mod q, where phi is the polynomial * modulus. This function returns 1 on success, 0 on error (an error is * reported if f is not invertible mod phi mod q). * * The tmp[] array must have room for at least 2*2^logn elements. * tmp[] must have 16-bit alignment. */ int PQCLEAN_FALCON512_CLEAN_compute_public(uint16_t *h, const int8_t *f, const int8_t *g, unsigned logn, uint8_t *tmp); /* * Recompute the fourth private key element. Private key consists in * four polynomials with small coefficients f, g, F and G, which are * such that fG - gF = q mod phi; furthermore, f is invertible modulo * phi and modulo q. This function recomputes G from f, g and F. * * The tmp[] array must have room for at least 4*2^logn bytes. * * Returned value is 1 in success, 0 on error (f not invertible). * tmp[] must have 16-bit alignment. */ int PQCLEAN_FALCON512_CLEAN_complete_private(int8_t *G, const int8_t *f, const int8_t *g, const int8_t *F, unsigned logn, uint8_t *tmp); /* * Test whether a given polynomial is invertible modulo phi and q. * Polynomial coefficients are small integers. * * tmp[] must have 16-bit alignment. */ int PQCLEAN_FALCON512_CLEAN_is_invertible( const int16_t *s2, unsigned logn, uint8_t *tmp); /* * Count the number of elements of value zero in the NTT representation * of the given polynomial: this is the number of primitive 2n-th roots * of unity (modulo q = 12289) that are roots of the provided polynomial * (taken modulo q). * * tmp[] must have 16-bit alignment. */ int PQCLEAN_FALCON512_CLEAN_count_nttzero(const int16_t *sig, unsigned logn, uint8_t *tmp); /* * Internal signature verification with public key recovery: * h[] receives the public key (NOT in NTT/Montgomery format) * c0[] contains the hashed nonce+message * s1[] is the first signature half * s2[] is the second signature half * logn is the degree log * tmp[] temporary, must have at least 2*2^logn bytes * Returned value is 1 on success, 0 on error. Success is returned if * the signature is a short enough vector; in that case, the public * key has been written to h[]. However, the caller must still * verify that h[] is the correct value (e.g. with regards to a known * hash of the public key). * * h[] may not overlap with any of the other arrays. * * tmp[] must have 16-bit alignment. */ int PQCLEAN_FALCON512_CLEAN_verify_recover(uint16_t *h, const uint16_t *c0, const int16_t *s1, const int16_t *s2, unsigned logn, uint8_t *tmp); /* ==================================================================== */ /* * Implementation of floating-point real numbers (fpr.h, fpr.c). */ /* * Real numbers are implemented by an extra header file, included below. * This is meant to support pluggable implementations. The default * implementation relies on the C type 'double'. * * The included file must define the following types, functions and * constants: * * fpr * type for a real number * * fpr fpr_of(int64_t i) * cast an integer into a real number; source must be in the * -(2^63-1)..+(2^63-1) range * * fpr fpr_scaled(int64_t i, int sc) * compute i*2^sc as a real number; source 'i' must be in the * -(2^63-1)..+(2^63-1) range * * fpr fpr_ldexp(fpr x, int e) * compute x*2^e * * int64_t fpr_rint(fpr x) * round x to the nearest integer; x must be in the -(2^63-1) * to +(2^63-1) range * * int64_t fpr_trunc(fpr x) * round to an integer; this rounds towards zero; value must * be in the -(2^63-1) to +(2^63-1) range * * fpr fpr_add(fpr x, fpr y) * compute x + y * * fpr fpr_sub(fpr x, fpr y) * compute x - y * * fpr fpr_neg(fpr x) * compute -x * * fpr fpr_half(fpr x) * compute x/2 * * fpr fpr_double(fpr x) * compute x*2 * * fpr fpr_mul(fpr x, fpr y) * compute x * y * * fpr fpr_sqr(fpr x) * compute x * x * * fpr fpr_inv(fpr x) * compute 1/x * * fpr fpr_div(fpr x, fpr y) * compute x/y * * fpr fpr_sqrt(fpr x) * compute the square root of x * * int fpr_lt(fpr x, fpr y) * return 1 if x < y, 0 otherwise * * uint64_t fpr_expm_p63(fpr x) * return exp(x), assuming that 0 <= x < log(2). Returned value * is scaled to 63 bits (i.e. it really returns 2^63*exp(-x), * rounded to the nearest integer). Computation should have a * precision of at least 45 bits. * * const fpr fpr_gm_tab[] * array of constants for FFT / iFFT * * const fpr fpr_p2_tab[] * precomputed powers of 2 (by index, 0 to 10) * * Constants of type 'fpr': * * fpr fpr_q 12289 * fpr fpr_inverse_of_q 1/12289 * fpr fpr_inv_2sqrsigma0 1/(2*(1.8205^2)) * fpr fpr_inv_sigma 1/(1.55*sqrt(12289)) * fpr fpr_sigma_min_9 1.291500756233514568549480827642 * fpr fpr_sigma_min_10 1.311734375905083682667395805765 * fpr fpr_log2 log(2) * fpr fpr_inv_log2 1/log(2) * fpr fpr_bnorm_max 16822.4121 * fpr fpr_zero 0 * fpr fpr_one 1 * fpr fpr_two 2 * fpr fpr_onehalf 0.5 * fpr fpr_ptwo31 2^31 * fpr fpr_ptwo31m1 2^31-1 * fpr fpr_mtwo31m1 -(2^31-1) * fpr fpr_ptwo63m1 2^63-1 * fpr fpr_mtwo63m1 -(2^63-1) * fpr fpr_ptwo63 2^63 */ /* ==================================================================== */ /* * RNG (rng.c). * * A PRNG based on ChaCha20 is implemented; it is seeded from a SHAKE256 * context (flipped) and is used for bulk pseudorandom generation. * A system-dependent seed generator is also provided. */ /* * Obtain a random seed from the system RNG. * * Returned value is 1 on success, 0 on error. */ int PQCLEAN_FALCON512_CLEAN_get_seed(void *seed, size_t seed_len); /* * Structure for a PRNG. This includes a large buffer so that values * get generated in advance. The 'state' is used to keep the current * PRNG algorithm state (contents depend on the selected algorithm). * * The unions with 'dummy_u64' are there to ensure proper alignment for * 64-bit direct access. */ typedef struct { union { uint8_t d[512]; /* MUST be 512, exactly */ uint64_t dummy_u64; } buf; size_t ptr; union { uint8_t d[256]; uint64_t dummy_u64; } state; int type; } prng; /* * Instantiate a PRNG. That PRNG will feed over the provided SHAKE256 * context (in "flipped" state) to obtain its initial state. */ void PQCLEAN_FALCON512_CLEAN_prng_init(prng *p, inner_shake256_context *src); /* * Refill the PRNG buffer. This is normally invoked automatically, and * is declared here only so that prng_get_u64() may be inlined. */ void PQCLEAN_FALCON512_CLEAN_prng_refill(prng *p); /* * Get some bytes from a PRNG. */ void PQCLEAN_FALCON512_CLEAN_prng_get_bytes(prng *p, void *dst, size_t len); /* * Get a 64-bit random value from a PRNG. */ #define prng_get_u64 PQCLEAN_FALCON512_CLEAN_prng_get_u64 uint64_t prng_get_u64(prng *p); /* * Get an 8-bit random value from a PRNG. */ #define prng_get_u8 PQCLEAN_FALCON512_CLEAN_prng_get_u8 unsigned prng_get_u8(prng *p); /* ==================================================================== */ /* * FFT (falcon-fft.c). * * A real polynomial is represented as an array of N 'fpr' elements. * The FFT representation of a real polynomial contains N/2 complex * elements; each is stored as two real numbers, for the real and * imaginary parts, respectively. See falcon-fft.c for details on the * internal representation. */ /* * Compute FFT in-place: the source array should contain a real * polynomial (N coefficients); its storage area is reused to store * the FFT representation of that polynomial (N/2 complex numbers). * * 'logn' MUST lie between 1 and 10 (inclusive). */ void PQCLEAN_FALCON512_CLEAN_FFT(fpr *f, unsigned logn); /* * Compute the inverse FFT in-place: the source array should contain the * FFT representation of a real polynomial (N/2 elements); the resulting * real polynomial (N coefficients of type 'fpr') is written over the * array. * * 'logn' MUST lie between 1 and 10 (inclusive). */ void PQCLEAN_FALCON512_CLEAN_iFFT(fpr *f, unsigned logn); /* * Add polynomial b to polynomial a. a and b MUST NOT overlap. This * function works in both normal and FFT representations. */ void PQCLEAN_FALCON512_CLEAN_poly_add(fpr *a, const fpr *b, unsigned logn); /* * Subtract polynomial b from polynomial a. a and b MUST NOT overlap. This * function works in both normal and FFT representations. */ void PQCLEAN_FALCON512_CLEAN_poly_sub(fpr *a, const fpr *b, unsigned logn); /* * Negate polynomial a. This function works in both normal and FFT * representations. */ void PQCLEAN_FALCON512_CLEAN_poly_neg(fpr *a, unsigned logn); /* * Compute adjoint of polynomial a. This function works only in FFT * representation. */ void PQCLEAN_FALCON512_CLEAN_poly_adj_fft(fpr *a, unsigned logn); /* * Multiply polynomial a with polynomial b. a and b MUST NOT overlap. * This function works only in FFT representation. */ void PQCLEAN_FALCON512_CLEAN_poly_mul_fft(fpr *a, const fpr *b, unsigned logn); /* * Multiply polynomial a with the adjoint of polynomial b. a and b MUST NOT * overlap. This function works only in FFT representation. */ void PQCLEAN_FALCON512_CLEAN_poly_muladj_fft(fpr *a, const fpr *b, unsigned logn); /* * Multiply polynomial with its own adjoint. This function works only in FFT * representation. */ void PQCLEAN_FALCON512_CLEAN_poly_mulselfadj_fft(fpr *a, unsigned logn); /* * Multiply polynomial with a real constant. This function works in both * normal and FFT representations. */ void PQCLEAN_FALCON512_CLEAN_poly_mulconst(fpr *a, fpr x, unsigned logn); /* * Divide polynomial a by polynomial b, modulo X^N+1 (FFT representation). * a and b MUST NOT overlap. */ void PQCLEAN_FALCON512_CLEAN_poly_div_fft(fpr *a, const fpr *b, unsigned logn); /* * Given f and g (in FFT representation), compute 1/(f*adj(f)+g*adj(g)) * (also in FFT representation). Since the result is auto-adjoint, all its * coordinates in FFT representation are real; as such, only the first N/2 * values of d[] are filled (the imaginary parts are skipped). * * Array d MUST NOT overlap with either a or b. */ void PQCLEAN_FALCON512_CLEAN_poly_invnorm2_fft(fpr *d, const fpr *a, const fpr *b, unsigned logn); /* * Given F, G, f and g (in FFT representation), compute F*adj(f)+G*adj(g) * (also in FFT representation). Destination d MUST NOT overlap with * any of the source arrays. */ void PQCLEAN_FALCON512_CLEAN_poly_add_muladj_fft(fpr *d, const fpr *F, const fpr *G, const fpr *f, const fpr *g, unsigned logn); /* * Multiply polynomial a by polynomial b, where b is autoadjoint. Both * a and b are in FFT representation. Since b is autoadjoint, all its * FFT coefficients are real, and the array b contains only N/2 elements. * a and b MUST NOT overlap. */ void PQCLEAN_FALCON512_CLEAN_poly_mul_autoadj_fft(fpr *a, const fpr *b, unsigned logn); /* * Divide polynomial a by polynomial b, where b is autoadjoint. Both * a and b are in FFT representation. Since b is autoadjoint, all its * FFT coefficients are real, and the array b contains only N/2 elements. * a and b MUST NOT overlap. */ void PQCLEAN_FALCON512_CLEAN_poly_div_autoadj_fft(fpr *a, const fpr *b, unsigned logn); /* * Perform an LDL decomposition of an auto-adjoint matrix G, in FFT * representation. On input, g00, g01 and g11 are provided (where the * matrix G = [[g00, g01], [adj(g01), g11]]). On output, the d00, l10 * and d11 values are written in g00, g01 and g11, respectively * (with D = [[d00, 0], [0, d11]] and L = [[1, 0], [l10, 1]]). * (In fact, d00 = g00, so the g00 operand is left unmodified.) */ void PQCLEAN_FALCON512_CLEAN_poly_LDL_fft(const fpr *g00, fpr *g01, fpr *g11, unsigned logn); /* * Perform an LDL decomposition of an auto-adjoint matrix G, in FFT * representation. This is identical to poly_LDL_fft() except that * g00, g01 and g11 are unmodified; the outputs d11 and l10 are written * in two other separate buffers provided as extra parameters. */ void PQCLEAN_FALCON512_CLEAN_poly_LDLmv_fft(fpr *d11, fpr *l10, const fpr *g00, const fpr *g01, const fpr *g11, unsigned logn); /* * Apply "split" operation on a polynomial in FFT representation: * f = f0(x^2) + x*f1(x^2), for half-size polynomials f0 and f1 * (polynomials modulo X^(N/2)+1). f0, f1 and f MUST NOT overlap. */ void PQCLEAN_FALCON512_CLEAN_poly_split_fft(fpr *f0, fpr *f1, const fpr *f, unsigned logn); /* * Apply "merge" operation on two polynomials in FFT representation: * given f0 and f1, polynomials moduo X^(N/2)+1, this function computes * f = f0(x^2) + x*f1(x^2), in FFT representation modulo X^N+1. * f MUST NOT overlap with either f0 or f1. */ void PQCLEAN_FALCON512_CLEAN_poly_merge_fft(fpr *f, const fpr *f0, const fpr *f1, unsigned logn); /* ==================================================================== */ /* * Key pair generation. */ /* * Required sizes of the temporary buffer (in bytes). * * This size is 28*2^logn bytes, except for degrees 2 and 4 (logn = 1 * or 2) where it is slightly greater. */ #define FALCON_KEYGEN_TEMP_1 136 #define FALCON_KEYGEN_TEMP_2 272 #define FALCON_KEYGEN_TEMP_3 224 #define FALCON_KEYGEN_TEMP_4 448 #define FALCON_KEYGEN_TEMP_5 896 #define FALCON_KEYGEN_TEMP_6 1792 #define FALCON_KEYGEN_TEMP_7 3584 #define FALCON_KEYGEN_TEMP_8 7168 #define FALCON_KEYGEN_TEMP_9 14336 #define FALCON_KEYGEN_TEMP_10 28672 /* * Generate a new key pair. Randomness is extracted from the provided * SHAKE256 context, which must have already been seeded and flipped. * The tmp[] array must have suitable size (see FALCON_KEYGEN_TEMP_* * macros) and be aligned for the uint32_t, uint64_t and fpr types. * * The private key elements are written in f, g, F and G, and the * public key is written in h. Either or both of G and h may be NULL, * in which case the corresponding element is not returned (they can * be recomputed from f, g and F). * * tmp[] must have 64-bit alignment. * This function uses floating-point rounding (see set_fpu_cw()). */ void PQCLEAN_FALCON512_CLEAN_keygen(inner_shake256_context *rng, int8_t *f, int8_t *g, int8_t *F, int8_t *G, uint16_t *h, unsigned logn, uint8_t *tmp); /* ==================================================================== */ /* * Signature generation. */ /* * Expand a private key into the B0 matrix in FFT representation and * the LDL tree. All the values are written in 'expanded_key', for * a total of (8*logn+40)*2^logn bytes. * * The tmp[] array must have room for at least 48*2^logn bytes. * * tmp[] must have 64-bit alignment. * This function uses floating-point rounding (see set_fpu_cw()). */ void PQCLEAN_FALCON512_CLEAN_expand_privkey(fpr *expanded_key, const int8_t *f, const int8_t *g, const int8_t *F, const int8_t *G, unsigned logn, uint8_t *tmp); /* * Compute a signature over the provided hashed message (hm); the * signature value is one short vector. This function uses an * expanded key (as generated by PQCLEAN_FALCON512_CLEAN_expand_privkey()). * * The sig[] and hm[] buffers may overlap. * * On successful output, the start of the tmp[] buffer contains the s1 * vector (as int16_t elements). * * The minimal size (in bytes) of tmp[] is 48*2^logn bytes. * * tmp[] must have 64-bit alignment. * This function uses floating-point rounding (see set_fpu_cw()). */ void PQCLEAN_FALCON512_CLEAN_sign_tree(int16_t *sig, inner_shake256_context *rng, const fpr *expanded_key, const uint16_t *hm, unsigned logn, uint8_t *tmp); /* * Compute a signature over the provided hashed message (hm); the * signature value is one short vector. This function uses a raw * key and dynamically recompute the B0 matrix and LDL tree; this * saves RAM since there is no needed for an expanded key, but * increases the signature cost. * * The sig[] and hm[] buffers may overlap. * * On successful output, the start of the tmp[] buffer contains the s1 * vector (as int16_t elements). * * The minimal size (in bytes) of tmp[] is 72*2^logn bytes. * * tmp[] must have 64-bit alignment. * This function uses floating-point rounding (see set_fpu_cw()). */ void PQCLEAN_FALCON512_CLEAN_sign_dyn(int16_t *sig, inner_shake256_context *rng, const int8_t *f, const int8_t *g, const int8_t *F, const int8_t *G, const uint16_t *hm, unsigned logn, uint8_t *tmp); /* * Internal sampler engine. Exported for tests. * * sampler_context wraps around a source of random numbers (PRNG) and * the sigma_min value (nominally dependent on the degree). * * sampler() takes as parameters: * ctx pointer to the sampler_context structure * mu center for the distribution * isigma inverse of the distribution standard deviation * It returns an integer sampled along the Gaussian distribution centered * on mu and of standard deviation sigma = 1/isigma. * * gaussian0_sampler() takes as parameter a pointer to a PRNG, and * returns an integer sampled along a half-Gaussian with standard * deviation sigma0 = 1.8205 (center is 0, returned value is * nonnegative). */ typedef struct { prng p; fpr sigma_min; } sampler_context; int PQCLEAN_FALCON512_CLEAN_sampler(void *ctx, fpr mu, fpr isigma); int PQCLEAN_FALCON512_CLEAN_gaussian0_sampler(prng *p); /* ==================================================================== */ #endif