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/* Originally written by Bodo Moeller for the OpenSSL project.
* ====================================================================
* Copyright (c) 1998-2005 The OpenSSL Project. All rights reserved.
*
* Redistribution and use in source and binary forms, with or without
* modification, are permitted provided that the following conditions
* are met:
*
* 1. Redistributions of source code must retain the above copyright
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* notice, this list of conditions and the following disclaimer in
* the documentation and/or other materials provided with the
* distribution.
*
* 3. All advertising materials mentioning features or use of this
* software must display the following acknowledgment:
* "This product includes software developed by the OpenSSL Project
* for use in the OpenSSL Toolkit. (http://www.openssl.org/)"
*
* 4. The names "OpenSSL Toolkit" and "OpenSSL Project" must not be used to
* endorse or promote products derived from this software without
* prior written permission. For written permission, please contact
* openssl-core@openssl.org.
*
* 5. Products derived from this software may not be called "OpenSSL"
* nor may "OpenSSL" appear in their names without prior written
* permission of the OpenSSL Project.
*
* 6. Redistributions of any form whatsoever must retain the following
* acknowledgment:
* "This product includes software developed by the OpenSSL Project
* for use in the OpenSSL Toolkit (http://www.openssl.org/)"
*
* THIS SOFTWARE IS PROVIDED BY THE OpenSSL PROJECT ``AS IS'' AND ANY
* EXPRESSED OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE
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* STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE)
* ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED
* OF THE POSSIBILITY OF SUCH DAMAGE.
* ====================================================================
*
* This product includes cryptographic software written by Eric Young
* (eay@cryptsoft.com). This product includes software written by Tim
* Hudson (tjh@cryptsoft.com).
*
*/
/* ====================================================================
* Copyright 2002 Sun Microsystems, Inc. ALL RIGHTS RESERVED.
*
* Portions of the attached software ("Contribution") are developed by
* SUN MICROSYSTEMS, INC., and are contributed to the OpenSSL project.
*
* The Contribution is licensed pursuant to the OpenSSL open source
* license provided above.
*
* The elliptic curve binary polynomial software is originally written by
* Sheueling Chang Shantz and Douglas Stebila of Sun Microsystems
* Laboratories. */
#ifndef OPENSSL_HEADER_EC_INTERNAL_H
#define OPENSSL_HEADER_EC_INTERNAL_H
#include <openssl/base.h>
#include <openssl/bn.h>
#include <openssl/ec.h>
#include <openssl/ex_data.h>
#include <openssl/type_check.h>
#include "../bn/internal.h"
#if defined(__cplusplus)
extern "C" {
#endif
// EC internals.
// Cap the size of all field elements and scalars, including custom curves, to
// 66 bytes, large enough to fit secp521r1 and brainpoolP512r1, which appear to
// be the largest fields anyone plausibly uses.
#define EC_MAX_BYTES 66
#define EC_MAX_WORDS ((EC_MAX_BYTES + BN_BYTES - 1) / BN_BYTES)
OPENSSL_STATIC_ASSERT(EC_MAX_WORDS <= BN_SMALL_MAX_WORDS,
"bn_*_small functions not usable");
// Scalars.
// An EC_SCALAR is an integer fully reduced modulo the order. Only the first
// |order->width| words are used. An |EC_SCALAR| is specific to an |EC_GROUP|
// and must not be mixed between groups.
typedef union {
// bytes is the representation of the scalar in little-endian order.
uint8_t bytes[EC_MAX_BYTES];
BN_ULONG words[EC_MAX_WORDS];
} EC_SCALAR;
// ec_bignum_to_scalar converts |in| to an |EC_SCALAR| and writes it to
// |*out|. It returns one on success and zero if |in| is out of range.
OPENSSL_EXPORT int ec_bignum_to_scalar(const EC_GROUP *group, EC_SCALAR *out,
const BIGNUM *in);
// ec_scalar_to_bytes serializes |in| as a big-endian bytestring to |out| and
// sets |*out_len| to the number of bytes written. The number of bytes written
// is |BN_num_bytes(&group->order)|, which is at most |EC_MAX_BYTES|.
OPENSSL_EXPORT void ec_scalar_to_bytes(const EC_GROUP *group, uint8_t *out,
size_t *out_len, const EC_SCALAR *in);
// ec_scalar_from_bytes deserializes |in| and stores the resulting scalar over
// group |group| to |out|. It returns one on success and zero if |in| is
// invalid.
int ec_scalar_from_bytes(const EC_GROUP *group, EC_SCALAR *out,
const uint8_t *in, size_t len);
// ec_scalar_reduce sets |out| to |words|, reduced modulo the group order.
// |words| must be less than order^2. |num| must be at most twice the width of
// group order. This function treats |words| as secret.
void ec_scalar_reduce(const EC_GROUP *group, EC_SCALAR *out,
const BN_ULONG *words, size_t num);
// ec_random_nonzero_scalar sets |out| to a uniformly selected random value from
// 1 to |group->order| - 1. It returns one on success and zero on error.
int ec_random_nonzero_scalar(const EC_GROUP *group, EC_SCALAR *out,
const uint8_t additional_data[32]);
// ec_scalar_equal_vartime returns one if |a| and |b| are equal and zero
// otherwise. Both values are treated as public.
int ec_scalar_equal_vartime(const EC_GROUP *group, const EC_SCALAR *a,
const EC_SCALAR *b);
// ec_scalar_is_zero returns one if |a| is zero and zero otherwise.
int ec_scalar_is_zero(const EC_GROUP *group, const EC_SCALAR *a);
// ec_scalar_add sets |r| to |a| + |b|.
void ec_scalar_add(const EC_GROUP *group, EC_SCALAR *r, const EC_SCALAR *a,
const EC_SCALAR *b);
// ec_scalar_sub sets |r| to |a| - |b|.
void ec_scalar_sub(const EC_GROUP *group, EC_SCALAR *r, const EC_SCALAR *a,
const EC_SCALAR *b);
// ec_scalar_neg sets |r| to -|a|.
void ec_scalar_neg(const EC_GROUP *group, EC_SCALAR *r, const EC_SCALAR *a);
// ec_scalar_to_montgomery sets |r| to |a| in Montgomery form.
void ec_scalar_to_montgomery(const EC_GROUP *group, EC_SCALAR *r,
const EC_SCALAR *a);
// ec_scalar_to_montgomery sets |r| to |a| converted from Montgomery form.
void ec_scalar_from_montgomery(const EC_GROUP *group, EC_SCALAR *r,
const EC_SCALAR *a);
// ec_scalar_mul_montgomery sets |r| to |a| * |b| where inputs and outputs are
// in Montgomery form.
void ec_scalar_mul_montgomery(const EC_GROUP *group, EC_SCALAR *r,
const EC_SCALAR *a, const EC_SCALAR *b);
// ec_scalar_inv0_montgomery sets |r| to |a|^-1 where inputs and outputs are in
// Montgomery form. If |a| is zero, |r| is set to zero.
void ec_scalar_inv0_montgomery(const EC_GROUP *group, EC_SCALAR *r,
const EC_SCALAR *a);
// ec_scalar_to_montgomery_inv_vartime sets |r| to |a|^-1 R. That is, it takes
// in |a| not in Montgomery form and computes the inverse in Montgomery form. It
// returns one on success and zero if |a| has no inverse. This function assumes
// |a| is public and may leak information about it via timing.
//
// Note this is not the same operation as |ec_scalar_inv0_montgomery|.
int ec_scalar_to_montgomery_inv_vartime(const EC_GROUP *group, EC_SCALAR *r,
const EC_SCALAR *a);
// ec_scalar_select, in constant time, sets |out| to |a| if |mask| is all ones
// and |b| if |mask| is all zeros.
void ec_scalar_select(const EC_GROUP *group, EC_SCALAR *out, BN_ULONG mask,
const EC_SCALAR *a, const EC_SCALAR *b);
// Field elements.
// An EC_FELEM represents a field element. Only the first |field->width| words
// are used. An |EC_FELEM| is specific to an |EC_GROUP| and must not be mixed
// between groups. Additionally, the representation (whether or not elements are
// represented in Montgomery-form) may vary between |EC_METHOD|s.
typedef union {
// bytes is the representation of the field element in little-endian order.
uint8_t bytes[EC_MAX_BYTES];
BN_ULONG words[EC_MAX_WORDS];
} EC_FELEM;
// ec_bignum_to_felem converts |in| to an |EC_FELEM|. It returns one on success
// and zero if |in| is out of range.
int ec_bignum_to_felem(const EC_GROUP *group, EC_FELEM *out, const BIGNUM *in);
// ec_felem_to_bignum converts |in| to a |BIGNUM|. It returns one on success and
// zero on allocation failure.
int ec_felem_to_bignum(const EC_GROUP *group, BIGNUM *out, const EC_FELEM *in);
// ec_felem_to_bytes serializes |in| as a big-endian bytestring to |out| and
// sets |*out_len| to the number of bytes written. The number of bytes written
// is |BN_num_bytes(&group->order)|, which is at most |EC_MAX_BYTES|.
void ec_felem_to_bytes(const EC_GROUP *group, uint8_t *out, size_t *out_len,
const EC_FELEM *in);
// ec_felem_from_bytes deserializes |in| and stores the resulting field element
// to |out|. It returns one on success and zero if |in| is invalid.
int ec_felem_from_bytes(const EC_GROUP *group, EC_FELEM *out, const uint8_t *in,
size_t len);
// ec_felem_neg sets |out| to -|a|.
void ec_felem_neg(const EC_GROUP *group, EC_FELEM *out, const EC_FELEM *a);
// ec_felem_add sets |out| to |a| + |b|.
void ec_felem_add(const EC_GROUP *group, EC_FELEM *out, const EC_FELEM *a,
const EC_FELEM *b);
// ec_felem_add sets |out| to |a| - |b|.
void ec_felem_sub(const EC_GROUP *group, EC_FELEM *out, const EC_FELEM *a,
const EC_FELEM *b);
// ec_felem_non_zero_mask returns all ones if |a| is non-zero and all zeros
// otherwise.
BN_ULONG ec_felem_non_zero_mask(const EC_GROUP *group, const EC_FELEM *a);
// ec_felem_select, in constant time, sets |out| to |a| if |mask| is all ones
// and |b| if |mask| is all zeros.
void ec_felem_select(const EC_GROUP *group, EC_FELEM *out, BN_ULONG mask,
const EC_FELEM *a, const EC_FELEM *b);
// ec_felem_equal returns one if |a| and |b| are equal and zero otherwise.
int ec_felem_equal(const EC_GROUP *group, const EC_FELEM *a, const EC_FELEM *b);
// Points.
//
// Points may represented in affine coordinates as |EC_AFFINE| or Jacobian
// coordinates as |EC_RAW_POINT|. Affine coordinates directly represent a
// point on the curve, but point addition over affine coordinates requires
// costly field inversions, so arithmetic is done in Jacobian coordinates.
// Converting from affine to Jacobian is cheap, while converting from Jacobian
// to affine costs a field inversion. (Jacobian coordinates amortize the field
// inversions needed in a sequence of point operations.)
//
// TODO(davidben): Rename |EC_RAW_POINT| to |EC_JACOBIAN|.
// An EC_RAW_POINT represents an elliptic curve point in Jacobian coordinates.
// Unlike |EC_POINT|, it is a plain struct which can be stack-allocated and
// needs no cleanup. It is specific to an |EC_GROUP| and must not be mixed
// between groups.
typedef struct {
// X, Y, and Z are Jacobian projective coordinates. They represent
// (X/Z^2, Y/Z^3) if Z != 0 and the point at infinity otherwise.
EC_FELEM X, Y, Z;
} EC_RAW_POINT;
// An EC_AFFINE represents an elliptic curve point in affine coordinates.
// coordinates. Note the point at infinity cannot be represented in affine
// coordinates.
typedef struct {
EC_FELEM X, Y;
} EC_AFFINE;
// ec_affine_to_jacobian converts |p| to Jacobian form and writes the result to
// |*out|. This operation is very cheap and only costs a few copies.
void ec_affine_to_jacobian(const EC_GROUP *group, EC_RAW_POINT *out,
const EC_AFFINE *p);
// ec_jacobian_to_affine converts |p| to affine form and writes the result to
// |*out|. It returns one on success and zero if |p| was the point at infinity.
// This operation performs a field inversion and should only be done once per
// point.
//
// If only extracting the x-coordinate, use |ec_get_x_coordinate_*| which is
// slightly faster.
int ec_jacobian_to_affine(const EC_GROUP *group, EC_AFFINE *out,
const EC_RAW_POINT *p);
// ec_jacobian_to_affine_batch converts |num| points in |in| from Jacobian
// coordinates to affine coordinates and writes the results to |out|. It returns
// one on success and zero if any of the input points were infinity.
//
// This function is not implemented for all curves. Add implementations as
// needed.
int ec_jacobian_to_affine_batch(const EC_GROUP *group, EC_AFFINE *out,
const EC_RAW_POINT *in, size_t num);
// ec_point_set_affine_coordinates sets |out|'s to a point with affine
// coordinates |x| and |y|. It returns one if the point is on the curve and
// zero otherwise. If the point is not on the curve, the value of |out| is
// undefined.
int ec_point_set_affine_coordinates(const EC_GROUP *group, EC_AFFINE *out,
const EC_FELEM *x, const EC_FELEM *y);
// ec_point_mul_scalar sets |r| to |p| * |scalar|. Both inputs are considered
// secret.
int ec_point_mul_scalar(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_RAW_POINT *p, const EC_SCALAR *scalar);
// ec_point_mul_scalar_base sets |r| to generator * |scalar|. |scalar| is
// treated as secret.
int ec_point_mul_scalar_base(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_SCALAR *scalar);
// ec_point_mul_scalar_batch sets |r| to |p0| * |scalar0| + |p1| * |scalar1| +
// |p2| * |scalar2|. |p2| may be NULL to skip that term.
//
// The inputs are treated as secret, however, this function leaks information
// about whether intermediate computations add a point to itself. Callers must
// ensure that discrete logs between |p0|, |p1|, and |p2| are uniformly
// distributed and independent of the scalars, which should be uniformly
// selected and not under the attackers control. This ensures the doubling case
// will occur with negligible probability.
//
// This function is not implemented for all curves. Add implementations as
// needed.
//
// TODO(davidben): This function does not use base point tables. For now, it is
// only used with the generic |EC_GFp_mont_method| implementation which has
// none. If generalizing to tuned curves, this may be useful. However, we still
// must double up to the least efficient input, so precomputed tables can only
// save table setup and allow a wider window size.
int ec_point_mul_scalar_batch(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_RAW_POINT *p0, const EC_SCALAR *scalar0,
const EC_RAW_POINT *p1, const EC_SCALAR *scalar1,
const EC_RAW_POINT *p2, const EC_SCALAR *scalar2);
#define EC_MONT_PRECOMP_COMB_SIZE 5
// An |EC_PRECOMP| stores precomputed information about a point, to optimize
// repeated multiplications involving it. It is a union so different
// |EC_METHOD|s can store different information in it.
typedef union {
EC_AFFINE comb[(1 << EC_MONT_PRECOMP_COMB_SIZE) - 1];
} EC_PRECOMP;
// ec_init_precomp precomputes multiples of |p| and writes the result to |out|.
// It returns one on success and zero on error. The resulting table may be used
// with |ec_point_mul_scalar_precomp|. This function will fail if |p| is the
// point at infinity.
//
// This function is not implemented for all curves. Add implementations as
// needed.
int ec_init_precomp(const EC_GROUP *group, EC_PRECOMP *out,
const EC_RAW_POINT *p);
// ec_point_mul_scalar_precomp sets |r| to |p0| * |scalar0| + |p1| * |scalar1| +
// |p2| * |scalar2|. |p1| or |p2| may be NULL to skip the corresponding term.
// The points are represented as |EC_PRECOMP| and must be initialized with
// |ec_init_precomp|. This function runs faster than |ec_point_mul_scalar_batch|
// but requires setup work per input point, so it is only appropriate for points
// which are used frequently.
//
// The inputs are treated as secret, however, this function leaks information
// about whether intermediate computations add a point to itself. Callers must
// ensure that discrete logs between |p0|, |p1|, and |p2| are uniformly
// distributed and independent of the scalars, which should be uniformly
// selected and not under the attackers control. This ensures the doubling case
// will occur with negligible probability.
//
// This function is not implemented for all curves. Add implementations as
// needed.
//
// TODO(davidben): This function does not use base point tables. For now, it is
// only used with the generic |EC_GFp_mont_method| implementation which has
// none. If generalizing to tuned curves, we should add a parameter for the base
// point and arrange for the generic implementation to have base point tables
// available.
int ec_point_mul_scalar_precomp(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_PRECOMP *p0, const EC_SCALAR *scalar0,
const EC_PRECOMP *p1, const EC_SCALAR *scalar1,
const EC_PRECOMP *p2, const EC_SCALAR *scalar2);
// ec_point_mul_scalar_public sets |r| to
// generator * |g_scalar| + |p| * |p_scalar|. It assumes that the inputs are
// public so there is no concern about leaking their values through timing.
OPENSSL_EXPORT int ec_point_mul_scalar_public(const EC_GROUP *group,
EC_RAW_POINT *r,
const EC_SCALAR *g_scalar,
const EC_RAW_POINT *p,
const EC_SCALAR *p_scalar);
// ec_point_mul_scalar_public_batch sets |r| to the sum of generator *
// |g_scalar| and |points[i]| * |scalars[i]| where |points| and |scalars| have
// |num| elements. It assumes that the inputs are public so there is no concern
// about leaking their values through timing. |g_scalar| may be NULL to skip
// that term.
//
// This function is not implemented for all curves. Add implementations as
// needed.
int ec_point_mul_scalar_public_batch(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_SCALAR *g_scalar,
const EC_RAW_POINT *points,
const EC_SCALAR *scalars, size_t num);
// ec_point_select, in constant time, sets |out| to |a| if |mask| is all ones
// and |b| if |mask| is all zeros.
void ec_point_select(const EC_GROUP *group, EC_RAW_POINT *out, BN_ULONG mask,
const EC_RAW_POINT *a, const EC_RAW_POINT *b);
// ec_affine_select behaves like |ec_point_select| but acts on affine points.
void ec_affine_select(const EC_GROUP *group, EC_AFFINE *out, BN_ULONG mask,
const EC_AFFINE *a, const EC_AFFINE *b);
// ec_precomp_select behaves like |ec_point_select| but acts on |EC_PRECOMP|.
void ec_precomp_select(const EC_GROUP *group, EC_PRECOMP *out, BN_ULONG mask,
const EC_PRECOMP *a, const EC_PRECOMP *b);
// ec_cmp_x_coordinate compares the x (affine) coordinate of |p|, mod the group
// order, with |r|. It returns one if the values match and zero if |p| is the
// point at infinity of the values do not match.
int ec_cmp_x_coordinate(const EC_GROUP *group, const EC_RAW_POINT *p,
const EC_SCALAR *r);
// ec_get_x_coordinate_as_scalar sets |*out| to |p|'s x-coordinate, modulo
// |group->order|. It returns one on success and zero if |p| is the point at
// infinity.
int ec_get_x_coordinate_as_scalar(const EC_GROUP *group, EC_SCALAR *out,
const EC_RAW_POINT *p);
// ec_get_x_coordinate_as_bytes writes |p|'s affine x-coordinate to |out|, which
// must have at must |max_out| bytes. It sets |*out_len| to the number of bytes
// written. The value is written big-endian and zero-padded to the size of the
// field. This function returns one on success and zero on failure.
int ec_get_x_coordinate_as_bytes(const EC_GROUP *group, uint8_t *out,
size_t *out_len, size_t max_out,
const EC_RAW_POINT *p);
// ec_point_to_bytes behaves like |EC_POINT_point2oct| but takes an
// |EC_AFFINE|.
size_t ec_point_to_bytes(const EC_GROUP *group, const EC_AFFINE *point,
point_conversion_form_t form, uint8_t *buf,
size_t len);
// ec_point_from_uncompressed parses |in| as a point in uncompressed form and
// sets the result to |out|. It returns one on success and zero if the input was
// invalid.
int ec_point_from_uncompressed(const EC_GROUP *group, EC_AFFINE *out,
const uint8_t *in, size_t len);
// ec_set_to_safe_point sets |out| to an arbitrary point on |group|, either the
// generator or the point at infinity. This is used to guard against callers of
// external APIs not checking the return value.
void ec_set_to_safe_point(const EC_GROUP *group, EC_RAW_POINT *out);
// ec_affine_jacobian_equal returns one if |a| and |b| represent the same point
// and zero otherwise. It treats both inputs as secret.
int ec_affine_jacobian_equal(const EC_GROUP *group, const EC_AFFINE *a,
const EC_RAW_POINT *b);
// Implementation details.
struct ec_method_st {
int (*group_init)(EC_GROUP *);
void (*group_finish)(EC_GROUP *);
int (*group_set_curve)(EC_GROUP *, const BIGNUM *p, const BIGNUM *a,
const BIGNUM *b, BN_CTX *);
// point_get_affine_coordinates sets |*x| and |*y| to the affine coordinates
// of |p|. Either |x| or |y| may be NULL to omit it. It returns one on success
// and zero if |p| is the point at infinity.
int (*point_get_affine_coordinates)(const EC_GROUP *, const EC_RAW_POINT *p,
EC_FELEM *x, EC_FELEM *y);
// jacobian_to_affine_batch implements |ec_jacobian_to_affine_batch|.
int (*jacobian_to_affine_batch)(const EC_GROUP *group, EC_AFFINE *out,
const EC_RAW_POINT *in, size_t num);
// add sets |r| to |a| + |b|.
void (*add)(const EC_GROUP *group, EC_RAW_POINT *r, const EC_RAW_POINT *a,
const EC_RAW_POINT *b);
// dbl sets |r| to |a| + |a|.
void (*dbl)(const EC_GROUP *group, EC_RAW_POINT *r, const EC_RAW_POINT *a);
// mul sets |r| to |scalar|*|p|.
void (*mul)(const EC_GROUP *group, EC_RAW_POINT *r, const EC_RAW_POINT *p,
const EC_SCALAR *scalar);
// mul_base sets |r| to |scalar|*generator.
void (*mul_base)(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_SCALAR *scalar);
// mul_batch implements |ec_mul_scalar_batch|.
void (*mul_batch)(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_RAW_POINT *p0, const EC_SCALAR *scalar0,
const EC_RAW_POINT *p1, const EC_SCALAR *scalar1,
const EC_RAW_POINT *p2, const EC_SCALAR *scalar2);
// mul_public sets |r| to |g_scalar|*generator + |p_scalar|*|p|. It assumes
// that the inputs are public so there is no concern about leaking their
// values through timing.
//
// This function may be omitted if |mul_public_batch| is provided.
void (*mul_public)(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_SCALAR *g_scalar, const EC_RAW_POINT *p,
const EC_SCALAR *p_scalar);
// mul_public_batch implements |ec_point_mul_scalar_public_batch|.
int (*mul_public_batch)(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_SCALAR *g_scalar, const EC_RAW_POINT *points,
const EC_SCALAR *scalars, size_t num);
// init_precomp implements |ec_init_precomp|.
int (*init_precomp)(const EC_GROUP *group, EC_PRECOMP *out,
const EC_RAW_POINT *p);
// mul_precomp implements |ec_point_mul_scalar_precomp|.
void (*mul_precomp)(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_PRECOMP *p0, const EC_SCALAR *scalar0,
const EC_PRECOMP *p1, const EC_SCALAR *scalar1,
const EC_PRECOMP *p2, const EC_SCALAR *scalar2);
// felem_mul and felem_sqr implement multiplication and squaring,
// respectively, so that the generic |EC_POINT_add| and |EC_POINT_dbl|
// implementations can work both with |EC_GFp_mont_method| and the tuned
// operations.
//
// TODO(davidben): This constrains |EC_FELEM|'s internal representation, adds
// many indirect calls in the middle of the generic code, and a bunch of
// conversions. If p224-64.c were easily convertable to Montgomery form, we
// could say |EC_FELEM| is always in Montgomery form. If we routed the rest of
// simple.c to |EC_METHOD|, we could give |EC_POINT| an |EC_METHOD|-specific
// representation and say |EC_FELEM| is purely a |EC_GFp_mont_method| type.
void (*felem_mul)(const EC_GROUP *, EC_FELEM *r, const EC_FELEM *a,
const EC_FELEM *b);
void (*felem_sqr)(const EC_GROUP *, EC_FELEM *r, const EC_FELEM *a);
void (*felem_to_bytes)(const EC_GROUP *group, uint8_t *out, size_t *out_len,
const EC_FELEM *in);
int (*felem_from_bytes)(const EC_GROUP *group, EC_FELEM *out,
const uint8_t *in, size_t len);
// felem_reduce sets |out| to |words|, reduced modulo the field size, p.
// |words| must be less than p^2. |num| must be at most twice the width of p.
// This function treats |words| as secret.
//
// This function is only used in hash-to-curve and may be omitted in curves
// that do not support it.
void (*felem_reduce)(const EC_GROUP *group, EC_FELEM *out,
const BN_ULONG *words, size_t num);
// felem_exp sets |out| to |a|^|exp|. It treats |a| is secret but |exp| as
// public.
//
// This function is used in hash-to-curve and may be NULL in curves not used
// with hash-to-curve.
void (*felem_exp)(const EC_GROUP *group, EC_FELEM *out, const EC_FELEM *a,
const BN_ULONG *exp, size_t num_exp);
// scalar_inv0_montgomery implements |ec_scalar_inv0_montgomery|.
void (*scalar_inv0_montgomery)(const EC_GROUP *group, EC_SCALAR *out,
const EC_SCALAR *in);
// scalar_to_montgomery_inv_vartime implements
// |ec_scalar_to_montgomery_inv_vartime|.
int (*scalar_to_montgomery_inv_vartime)(const EC_GROUP *group, EC_SCALAR *out,
const EC_SCALAR *in);
// cmp_x_coordinate compares the x (affine) coordinate of |p|, mod the group
// order, with |r|. It returns one if the values match and zero if |p| is the
// point at infinity of the values do not match.
int (*cmp_x_coordinate)(const EC_GROUP *group, const EC_RAW_POINT *p,
const EC_SCALAR *r);
} /* EC_METHOD */;
const EC_METHOD *EC_GFp_mont_method(void);
struct ec_group_st {
const EC_METHOD *meth;
// Unlike all other |EC_POINT|s, |generator| does not own |generator->group|
// to avoid a reference cycle. Additionally, Z is guaranteed to be one, so X
// and Y are suitable for use as an |EC_AFFINE|.
EC_POINT *generator;
BIGNUM order;
int curve_name; // optional NID for named curve
BN_MONT_CTX *order_mont; // data for ECDSA inverse
// The following members are handled by the method functions,
// even if they appear generic
BIGNUM field; // For curves over GF(p), this is the modulus.
EC_FELEM a, b; // Curve coefficients.
// a_is_minus3 is one if |a| is -3 mod |field| and zero otherwise. Point
// arithmetic is optimized for -3.
int a_is_minus3;
// field_greater_than_order is one if |field| is greate than |order| and zero
// otherwise.
int field_greater_than_order;
// field_minus_order, if |field_greater_than_order| is true, is |field| minus
// |order| represented as an |EC_FELEM|. Otherwise, it is zero.
//
// Note: unlike |EC_FELEM|s used as intermediate values internal to the
// |EC_METHOD|, this value is not encoded in Montgomery form.
EC_FELEM field_minus_order;
CRYPTO_refcount_t references;
BN_MONT_CTX *mont; // Montgomery structure.
EC_FELEM one; // The value one.
} /* EC_GROUP */;
struct ec_point_st {
// group is an owning reference to |group|, unless this is
// |group->generator|.
EC_GROUP *group;
// raw is the group-specific point data. Functions that take |EC_POINT|
// typically check consistency with |EC_GROUP| while functions that take
// |EC_RAW_POINT| do not. Thus accesses to this field should be externally
// checked for consistency.
EC_RAW_POINT raw;
} /* EC_POINT */;
EC_GROUP *ec_group_new(const EC_METHOD *meth);
void ec_GFp_mont_mul(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_RAW_POINT *p, const EC_SCALAR *scalar);
void ec_GFp_mont_mul_base(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_SCALAR *scalar);
void ec_GFp_mont_mul_batch(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_RAW_POINT *p0, const EC_SCALAR *scalar0,
const EC_RAW_POINT *p1, const EC_SCALAR *scalar1,
const EC_RAW_POINT *p2, const EC_SCALAR *scalar2);
int ec_GFp_mont_init_precomp(const EC_GROUP *group, EC_PRECOMP *out,
const EC_RAW_POINT *p);
void ec_GFp_mont_mul_precomp(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_PRECOMP *p0, const EC_SCALAR *scalar0,
const EC_PRECOMP *p1, const EC_SCALAR *scalar1,
const EC_PRECOMP *p2, const EC_SCALAR *scalar2);
// ec_compute_wNAF writes the modified width-(w+1) Non-Adjacent Form (wNAF) of
// |scalar| to |out|. |out| must have room for |bits| + 1 elements, each of
// which will be either zero or odd with an absolute value less than 2^w
// satisfying
// scalar = \sum_j out[j]*2^j
// where at most one of any w+1 consecutive digits is non-zero
// with the exception that the most significant digit may be only
// w-1 zeros away from that next non-zero digit.
void ec_compute_wNAF(const EC_GROUP *group, int8_t *out,
const EC_SCALAR *scalar, size_t bits, int w);
int ec_GFp_mont_mul_public_batch(const EC_GROUP *group, EC_RAW_POINT *r,
const EC_SCALAR *g_scalar,
const EC_RAW_POINT *points,
const EC_SCALAR *scalars, size_t num);
// method functions in simple.c
int ec_GFp_simple_group_init(EC_GROUP *);
void ec_GFp_simple_group_finish(EC_GROUP *);
int ec_GFp_simple_group_set_curve(EC_GROUP *, const BIGNUM *p, const BIGNUM *a,
const BIGNUM *b, BN_CTX *);
int ec_GFp_simple_group_get_curve(const EC_GROUP *, BIGNUM *p, BIGNUM *a,
BIGNUM *b);
void ec_GFp_simple_point_init(EC_RAW_POINT *);
void ec_GFp_simple_point_copy(EC_RAW_POINT *, const EC_RAW_POINT *);
void ec_GFp_simple_point_set_to_infinity(const EC_GROUP *, EC_RAW_POINT *);
void ec_GFp_mont_add(const EC_GROUP *, EC_RAW_POINT *r, const EC_RAW_POINT *a,
const EC_RAW_POINT *b);
void ec_GFp_mont_dbl(const EC_GROUP *, EC_RAW_POINT *r, const EC_RAW_POINT *a);
void ec_GFp_simple_invert(const EC_GROUP *, EC_RAW_POINT *);
int ec_GFp_simple_is_at_infinity(const EC_GROUP *, const EC_RAW_POINT *);
int ec_GFp_simple_is_on_curve(const EC_GROUP *, const EC_RAW_POINT *);
int ec_GFp_simple_points_equal(const EC_GROUP *, const EC_RAW_POINT *a,
const EC_RAW_POINT *b);
void ec_simple_scalar_inv0_montgomery(const EC_GROUP *group, EC_SCALAR *r,
const EC_SCALAR *a);
int ec_simple_scalar_to_montgomery_inv_vartime(const EC_GROUP *group,
EC_SCALAR *r,
const EC_SCALAR *a);
int ec_GFp_simple_cmp_x_coordinate(const EC_GROUP *group, const EC_RAW_POINT *p,
const EC_SCALAR *r);
void ec_GFp_simple_felem_to_bytes(const EC_GROUP *group, uint8_t *out,
size_t *out_len, const EC_FELEM *in);
int ec_GFp_simple_felem_from_bytes(const EC_GROUP *group, EC_FELEM *out,
const uint8_t *in, size_t len);
// method functions in montgomery.c
int ec_GFp_mont_group_init(EC_GROUP *);
int ec_GFp_mont_group_set_curve(EC_GROUP *, const BIGNUM *p, const BIGNUM *a,
const BIGNUM *b, BN_CTX *);
void ec_GFp_mont_group_finish(EC_GROUP *);
void ec_GFp_mont_felem_mul(const EC_GROUP *, EC_FELEM *r, const EC_FELEM *a,
const EC_FELEM *b);
void ec_GFp_mont_felem_sqr(const EC_GROUP *, EC_FELEM *r, const EC_FELEM *a);
void ec_GFp_mont_felem_to_bytes(const EC_GROUP *group, uint8_t *out,
size_t *out_len, const EC_FELEM *in);
int ec_GFp_mont_felem_from_bytes(const EC_GROUP *group, EC_FELEM *out,
const uint8_t *in, size_t len);
void ec_GFp_nistp_recode_scalar_bits(crypto_word_t *sign, crypto_word_t *digit,
crypto_word_t in);
const EC_METHOD *EC_GFp_nistp224_method(void);
const EC_METHOD *EC_GFp_nistp256_method(void);
// EC_GFp_nistz256_method is a GFp method using montgomery multiplication, with
// x86-64 optimized P256. See http://eprint.iacr.org/2013/816.
const EC_METHOD *EC_GFp_nistz256_method(void);
// An EC_WRAPPED_SCALAR is an |EC_SCALAR| with a parallel |BIGNUM|
// representation. It exists to support the |EC_KEY_get0_private_key| API.
typedef struct {
BIGNUM bignum;
EC_SCALAR scalar;
} EC_WRAPPED_SCALAR;
struct ec_key_st {
EC_GROUP *group;
// Ideally |pub_key| would be an |EC_AFFINE| so serializing it does not pay an
// inversion each time, but the |EC_KEY_get0_public_key| API implies public
// keys are stored in an |EC_POINT|-compatible form.
EC_POINT *pub_key;
EC_WRAPPED_SCALAR *priv_key;
unsigned int enc_flag;
point_conversion_form_t conv_form;
CRYPTO_refcount_t references;
ECDSA_METHOD *ecdsa_meth;
CRYPTO_EX_DATA ex_data;
} /* EC_KEY */;
struct built_in_curve {
int nid;
const uint8_t *oid;
uint8_t oid_len;
// comment is a human-readable string describing the curve.
const char *comment;
// param_len is the number of bytes needed to store a field element.
uint8_t param_len;
// params points to an array of 6*|param_len| bytes which hold the field
// elements of the following (in big-endian order): prime, a, b, generator x,
// generator y, order.
const uint8_t *params;
const EC_METHOD *method;
};
#define OPENSSL_NUM_BUILT_IN_CURVES 4
struct built_in_curves {
struct built_in_curve curves[OPENSSL_NUM_BUILT_IN_CURVES];
};
// OPENSSL_built_in_curves returns a pointer to static information about
// standard curves. The array is terminated with an entry where |nid| is
// |NID_undef|.
const struct built_in_curves *OPENSSL_built_in_curves(void);
#if defined(__cplusplus)
} // extern C
#endif
#endif // OPENSSL_HEADER_EC_INTERNAL_H