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ecc.c
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ecc.c
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#include <assert.h>
#include "ssh.h"
#include "mpint.h"
#include "ecc.h"
/* ----------------------------------------------------------------------
* Weierstrass curves.
*/
struct WeierstrassPoint {
/*
* Internally, we represent a point using 'Jacobian coordinates',
* which are three values X,Y,Z whose relation to the affine
* coordinates x,y is that x = X/Z^2 and y = Y/Z^3.
*
* This allows us to do most of our calculations without having to
* take an inverse mod p: every time the obvious affine formulae
* would need you to divide by something, you instead multiply it
* into the 'denominator' coordinate Z. You only have to actually
* take the inverse of Z when you need to get the affine
* coordinates back out, which means you do it once after your
* entire computation instead of at every intermediate step.
*
* The point at infinity is represented by setting all three
* coordinates to zero.
*
* These values are also stored in the Montgomery-multiplication
* transformed representation.
*/
mp_int *X, *Y, *Z;
WeierstrassCurve *wc;
};
struct WeierstrassCurve {
/* Prime modulus of the finite field. */
mp_int *p;
/* Persistent Montgomery context for doing arithmetic mod p. */
MontyContext *mc;
/* Modsqrt context for point decompression. NULL if this curve was
* constructed without providing nonsquare_mod_p. */
ModsqrtContext *sc;
/* Parameters of the curve, in Montgomery-multiplication
* transformed form. */
mp_int *a, *b;
};
WeierstrassCurve *ecc_weierstrass_curve(
mp_int *p, mp_int *a, mp_int *b, mp_int *nonsquare_mod_p)
{
WeierstrassCurve *wc = snew(WeierstrassCurve);
wc->p = mp_copy(p);
wc->mc = monty_new(p);
wc->a = monty_import(wc->mc, a);
wc->b = monty_import(wc->mc, b);
if (nonsquare_mod_p)
wc->sc = modsqrt_new(p, nonsquare_mod_p);
else
wc->sc = NULL;
return wc;
}
void ecc_weierstrass_curve_free(WeierstrassCurve *wc)
{
mp_free(wc->p);
mp_free(wc->a);
mp_free(wc->b);
monty_free(wc->mc);
if (wc->sc)
modsqrt_free(wc->sc);
sfree(wc);
}
static WeierstrassPoint *ecc_weierstrass_point_new_empty(WeierstrassCurve *wc)
{
WeierstrassPoint *wp = snew(WeierstrassPoint);
wp->wc = wc;
wp->X = wp->Y = wp->Z = NULL;
return wp;
}
static WeierstrassPoint *ecc_weierstrass_point_new_imported(
WeierstrassCurve *wc, mp_int *monty_x, mp_int *monty_y)
{
WeierstrassPoint *wp = ecc_weierstrass_point_new_empty(wc);
wp->X = monty_x;
wp->Y = monty_y;
wp->Z = mp_copy(monty_identity(wc->mc));
return wp;
}
WeierstrassPoint *ecc_weierstrass_point_new(
WeierstrassCurve *wc, mp_int *x, mp_int *y)
{
return ecc_weierstrass_point_new_imported(
wc, monty_import(wc->mc, x), monty_import(wc->mc, y));
}
WeierstrassPoint *ecc_weierstrass_point_new_identity(WeierstrassCurve *wc)
{
WeierstrassPoint *wp = ecc_weierstrass_point_new_empty(wc);
size_t bits = mp_max_bits(wc->p);
wp->X = mp_new(bits);
wp->Y = mp_new(bits);
wp->Z = mp_new(bits);
return wp;
}
void ecc_weierstrass_point_copy_into(
WeierstrassPoint *dest, WeierstrassPoint *src)
{
mp_copy_into(dest->X, src->X);
mp_copy_into(dest->Y, src->Y);
mp_copy_into(dest->Z, src->Z);
}
WeierstrassPoint *ecc_weierstrass_point_copy(WeierstrassPoint *orig)
{
WeierstrassPoint *wp = ecc_weierstrass_point_new_empty(orig->wc);
wp->X = mp_copy(orig->X);
wp->Y = mp_copy(orig->Y);
wp->Z = mp_copy(orig->Z);
return wp;
}
void ecc_weierstrass_point_free(WeierstrassPoint *wp)
{
mp_free(wp->X);
mp_free(wp->Y);
mp_free(wp->Z);
smemclr(wp, sizeof(*wp));
sfree(wp);
}
WeierstrassPoint *ecc_weierstrass_point_new_from_x(
WeierstrassCurve *wc, mp_int *xorig, unsigned desired_y_parity)
{
assert(wc->sc);
/*
* The curve equation is y^2 = x^3 + ax + b, which is already
* conveniently in a form where we can compute the RHS and take
* the square root of it to get y.
*/
unsigned success;
mp_int *x = monty_import(wc->mc, xorig);
/*
* Compute the RHS of the curve equation. We don't need to take
* account of z here, because we're constructing the point from
* scratch. So it really is just x^3 + ax + b.
*/
mp_int *x2 = monty_mul(wc->mc, x, x);
mp_int *x2_plus_a = monty_add(wc->mc, x2, wc->a);
mp_int *x3_plus_ax = monty_mul(wc->mc, x2_plus_a, x);
mp_int *rhs = monty_add(wc->mc, x3_plus_ax, wc->b);
mp_free(x2);
mp_free(x2_plus_a);
mp_free(x3_plus_ax);
mp_int *y = monty_modsqrt(wc->sc, rhs, &success);
mp_free(rhs);
if (!success) {
/* Failure! x^3+ax+b worked out to be a number that has no
* square root mod p. In this situation there's no point in
* trying to be time-constant, since the protocol sequence is
* going to diverge anyway when we complain to whoever gave us
* this bogus value. */
mp_free(x);
mp_free(y);
return NULL;
}
/*
* Choose whichever of y and p-y has the specified parity (of its
* lowest positive residue mod p).
*/
mp_int *tmp = monty_export(wc->mc, y);
unsigned flip = (mp_get_bit(tmp, 0) ^ desired_y_parity) & 1;
mp_sub_into(tmp, wc->p, y);
mp_select_into(y, y, tmp, flip);
mp_free(tmp);
return ecc_weierstrass_point_new_imported(wc, x, y);
}
static void ecc_weierstrass_cond_overwrite(
WeierstrassPoint *dest, WeierstrassPoint *src, unsigned overwrite)
{
mp_select_into(dest->X, dest->X, src->X, overwrite);
mp_select_into(dest->Y, dest->Y, src->Y, overwrite);
mp_select_into(dest->Z, dest->Z, src->Z, overwrite);
}
static void ecc_weierstrass_cond_swap(
WeierstrassPoint *P, WeierstrassPoint *Q, unsigned swap)
{
mp_cond_swap(P->X, Q->X, swap);
mp_cond_swap(P->Y, Q->Y, swap);
mp_cond_swap(P->Z, Q->Z, swap);
}
/*
* Shared code between all three of the basic arithmetic functions:
* once we've determined the slope of the line that we're intersecting
* the curve with, this takes care of finding the coordinates of the
* third intersection point (given the two input x-coordinates and one
* of the y-coords) and negating it to generate the output.
*/
static inline void ecc_weierstrass_epilogue(
mp_int *Px, mp_int *Qx, mp_int *Py, mp_int *common_Z,
mp_int *lambda_n, mp_int *lambda_d, WeierstrassPoint *out)
{
WeierstrassCurve *wc = out->wc;
/* Powers of the numerator and denominator of the slope lambda */
mp_int *lambda_n2 = monty_mul(wc->mc, lambda_n, lambda_n);
mp_int *lambda_d2 = monty_mul(wc->mc, lambda_d, lambda_d);
mp_int *lambda_d3 = monty_mul(wc->mc, lambda_d, lambda_d2);
/* Make the output x-coordinate */
mp_int *xsum = monty_add(wc->mc, Px, Qx);
mp_int *lambda_d2_xsum = monty_mul(wc->mc, lambda_d2, xsum);
out->X = monty_sub(wc->mc, lambda_n2, lambda_d2_xsum);
/* Make the output y-coordinate */
mp_int *lambda_d2_Px = monty_mul(wc->mc, lambda_d2, Px);
mp_int *xdiff = monty_sub(wc->mc, lambda_d2_Px, out->X);
mp_int *lambda_n_xdiff = monty_mul(wc->mc, lambda_n, xdiff);
mp_int *lambda_d3_Py = monty_mul(wc->mc, lambda_d3, Py);
out->Y = monty_sub(wc->mc, lambda_n_xdiff, lambda_d3_Py);
/* Make the output z-coordinate */
out->Z = monty_mul(wc->mc, common_Z, lambda_d);
mp_free(lambda_n2);
mp_free(lambda_d2);
mp_free(lambda_d3);
mp_free(xsum);
mp_free(xdiff);
mp_free(lambda_d2_xsum);
mp_free(lambda_n_xdiff);
mp_free(lambda_d2_Px);
mp_free(lambda_d3_Py);
}
/*
* Shared code between add and add_general: put the two input points
* over a common denominator, and determine the slope lambda of the
* line through both of them. If the points have the same
* x-coordinate, then the slope will be returned with a zero
* denominator.
*/
static inline void ecc_weierstrass_add_prologue(
WeierstrassPoint *P, WeierstrassPoint *Q,
mp_int **Px, mp_int **Py, mp_int **Qx, mp_int **denom,
mp_int **lambda_n, mp_int **lambda_d)
{
WeierstrassCurve *wc = P->wc;
/* Powers of the points' denominators */
mp_int *Pz2 = monty_mul(wc->mc, P->Z, P->Z);
mp_int *Pz3 = monty_mul(wc->mc, Pz2, P->Z);
mp_int *Qz2 = monty_mul(wc->mc, Q->Z, Q->Z);
mp_int *Qz3 = monty_mul(wc->mc, Qz2, Q->Z);
/* Points' x,y coordinates scaled by the other one's denominator
* (raised to the appropriate power) */
*Px = monty_mul(wc->mc, P->X, Qz2);
*Py = monty_mul(wc->mc, P->Y, Qz3);
*Qx = monty_mul(wc->mc, Q->X, Pz2);
mp_int *Qy = monty_mul(wc->mc, Q->Y, Pz3);
/* Common denominator */
*denom = monty_mul(wc->mc, P->Z, Q->Z);
/* Slope of the line through the two points, if P != Q */
*lambda_n = monty_sub(wc->mc, Qy, *Py);
*lambda_d = monty_sub(wc->mc, *Qx, *Px);
mp_free(Pz2);
mp_free(Pz3);
mp_free(Qz2);
mp_free(Qz3);
mp_free(Qy);
}
WeierstrassPoint *ecc_weierstrass_add(WeierstrassPoint *P, WeierstrassPoint *Q)
{
WeierstrassCurve *wc = P->wc;
assert(Q->wc == wc);
WeierstrassPoint *S = ecc_weierstrass_point_new_empty(wc);
mp_int *Px, *Py, *Qx, *denom, *lambda_n, *lambda_d;
ecc_weierstrass_add_prologue(
P, Q, &Px, &Py, &Qx, &denom, &lambda_n, &lambda_d);
/* Never expect to have received two mutually inverse inputs, or
* two identical ones (which would make this a doubling). In other
* words, the two input x-coordinates (after putting over a common
* denominator) should never have been equal. */
assert(!mp_eq_integer(lambda_n, 0));
/* Now go to the common epilogue code. */
ecc_weierstrass_epilogue(Px, Qx, Py, denom, lambda_n, lambda_d, S);
mp_free(Px);
mp_free(Py);
mp_free(Qx);
mp_free(denom);
mp_free(lambda_n);
mp_free(lambda_d);
return S;
}
/*
* Code to determine the slope of the line you need to intersect with
* the curve in the case where you're adding a point to itself. In
* this situation you can't just say "the line through both input
* points" because that's under-determined; instead, you have to take
* the _tangent_ to the curve at the given point, by differentiating
* the curve equation y^2=x^3+ax+b to get 2y dy/dx = 3x^2+a.
*/
static inline void ecc_weierstrass_tangent_slope(
WeierstrassPoint *P, mp_int **lambda_n, mp_int **lambda_d)
{
WeierstrassCurve *wc = P->wc;
mp_int *X2 = monty_mul(wc->mc, P->X, P->X);
mp_int *twoX2 = monty_add(wc->mc, X2, X2);
mp_int *threeX2 = monty_add(wc->mc, twoX2, X2);
mp_int *Z2 = monty_mul(wc->mc, P->Z, P->Z);
mp_int *Z4 = monty_mul(wc->mc, Z2, Z2);
mp_int *aZ4 = monty_mul(wc->mc, wc->a, Z4);
*lambda_n = monty_add(wc->mc, threeX2, aZ4);
*lambda_d = monty_add(wc->mc, P->Y, P->Y);
mp_free(X2);
mp_free(twoX2);
mp_free(threeX2);
mp_free(Z2);
mp_free(Z4);
mp_free(aZ4);
}
WeierstrassPoint *ecc_weierstrass_double(WeierstrassPoint *P)
{
WeierstrassCurve *wc = P->wc;
WeierstrassPoint *D = ecc_weierstrass_point_new_empty(wc);
mp_int *lambda_n, *lambda_d;
ecc_weierstrass_tangent_slope(P, &lambda_n, &lambda_d);
ecc_weierstrass_epilogue(P->X, P->X, P->Y, P->Z, lambda_n, lambda_d, D);
mp_free(lambda_n);
mp_free(lambda_d);
return D;
}
static inline void ecc_weierstrass_select_into(
WeierstrassPoint *dest, WeierstrassPoint *P, WeierstrassPoint *Q,
unsigned choose_Q)
{
mp_select_into(dest->X, P->X, Q->X, choose_Q);
mp_select_into(dest->Y, P->Y, Q->Y, choose_Q);
mp_select_into(dest->Z, P->Z, Q->Z, choose_Q);
}
WeierstrassPoint *ecc_weierstrass_add_general(
WeierstrassPoint *P, WeierstrassPoint *Q)
{
WeierstrassCurve *wc = P->wc;
assert(Q->wc == wc);
WeierstrassPoint *S = ecc_weierstrass_point_new_empty(wc);
/* Parameters for the epilogue, and slope of the line if P != Q */
mp_int *Px, *Py, *Qx, *denom, *lambda_n, *lambda_d;
ecc_weierstrass_add_prologue(
P, Q, &Px, &Py, &Qx, &denom, &lambda_n, &lambda_d);
/* Slope if P == Q */
mp_int *lambda_n_tangent, *lambda_d_tangent;
ecc_weierstrass_tangent_slope(P, &lambda_n_tangent, &lambda_d_tangent);
/* Select between those slopes depending on whether P == Q */
unsigned same_x_coord = mp_eq_integer(lambda_d, 0);
unsigned same_y_coord = mp_eq_integer(lambda_n, 0);
unsigned equality = same_x_coord & same_y_coord;
mp_select_into(lambda_n, lambda_n, lambda_n_tangent, equality);
mp_select_into(lambda_d, lambda_d, lambda_d_tangent, equality);
/* Now go to the common code between addition and doubling */
ecc_weierstrass_epilogue(Px, Qx, Py, denom, lambda_n, lambda_d, S);
/* Check for the input identity cases, and overwrite the output if
* necessary. */
ecc_weierstrass_select_into(S, S, Q, mp_eq_integer(P->Z, 0));
ecc_weierstrass_select_into(S, S, P, mp_eq_integer(Q->Z, 0));
/*
* In the case where P == -Q and so the output is the identity,
* we'll have calculated lambda_d = 0 and so the output will have
* z==0 already. Detect that and use it to normalise the other two
* coordinates to zero.
*/
unsigned output_id = mp_eq_integer(S->Z, 0);
mp_cond_clear(S->X, output_id);
mp_cond_clear(S->Y, output_id);
mp_free(Px);
mp_free(Py);
mp_free(Qx);
mp_free(denom);
mp_free(lambda_n);
mp_free(lambda_d);
mp_free(lambda_n_tangent);
mp_free(lambda_d_tangent);
return S;
}
WeierstrassPoint *ecc_weierstrass_multiply(WeierstrassPoint *B, mp_int *n)
{
WeierstrassPoint *two_B = ecc_weierstrass_double(B);
WeierstrassPoint *k_B = ecc_weierstrass_point_copy(B);
WeierstrassPoint *kplus1_B = ecc_weierstrass_point_copy(two_B);
/*
* This multiply routine more or less follows the shape of the
* 'Montgomery ladder' technique that you have to use under the
* extra constraint on addition in Montgomery curves, because it
* was fresh in my mind and easier to just do it the same way. See
* the comment in ecc_montgomery_multiply.
*/
unsigned not_started_yet = 1;
for (size_t bitindex = mp_max_bits(n); bitindex-- > 0 ;) {
unsigned nbit = mp_get_bit(n, bitindex);
WeierstrassPoint *sum = ecc_weierstrass_add(k_B, kplus1_B);
ecc_weierstrass_cond_swap(k_B, kplus1_B, nbit);
WeierstrassPoint *other = ecc_weierstrass_double(k_B);
ecc_weierstrass_point_free(k_B);
ecc_weierstrass_point_free(kplus1_B);
k_B = other;
kplus1_B = sum;
ecc_weierstrass_cond_swap(k_B, kplus1_B, nbit);
ecc_weierstrass_cond_overwrite(k_B, B, not_started_yet);
ecc_weierstrass_cond_overwrite(kplus1_B, two_B, not_started_yet);
not_started_yet &= ~nbit;
}
ecc_weierstrass_point_free(two_B);
ecc_weierstrass_point_free(kplus1_B);
return k_B;
}
unsigned ecc_weierstrass_is_identity(WeierstrassPoint *wp)
{
return mp_eq_integer(wp->Z, 0);
}
/*
* Normalise a point by scaling its Jacobian coordinates so that Z=1.
* This doesn't change what point is represented by the triple, but it
* means the affine x,y can now be easily recovered from X and Y.
*/
static void ecc_weierstrass_normalise(WeierstrassPoint *wp)
{
WeierstrassCurve *wc = wp->wc;
mp_int *zinv = monty_invert(wc->mc, wp->Z);
mp_int *zinv2 = monty_mul(wc->mc, zinv, zinv);
mp_int *zinv3 = monty_mul(wc->mc, zinv2, zinv);
monty_mul_into(wc->mc, wp->X, wp->X, zinv2);
monty_mul_into(wc->mc, wp->Y, wp->Y, zinv3);
monty_mul_into(wc->mc, wp->Z, wp->Z, zinv);
mp_free(zinv);
mp_free(zinv2);
mp_free(zinv3);
}
void ecc_weierstrass_get_affine(
WeierstrassPoint *wp, mp_int **x, mp_int **y)
{
WeierstrassCurve *wc = wp->wc;
ecc_weierstrass_normalise(wp);
if (x)
*x = monty_export(wc->mc, wp->X);
if (y)
*y = monty_export(wc->mc, wp->Y);
}
unsigned ecc_weierstrass_point_valid(WeierstrassPoint *P)
{
WeierstrassCurve *wc = P->wc;
/*
* The projective version of the curve equation is
* Y^2 = X^3 + a X Z^4 + b Z^6
*/
mp_int *lhs = monty_mul(P->wc->mc, P->Y, P->Y);
mp_int *x2 = monty_mul(wc->mc, P->X, P->X);
mp_int *x3 = monty_mul(wc->mc, x2, P->X);
mp_int *z2 = monty_mul(wc->mc, P->Z, P->Z);
mp_int *z4 = monty_mul(wc->mc, z2, z2);
mp_int *az4 = monty_mul(wc->mc, wc->a, z4);
mp_int *axz4 = monty_mul(wc->mc, az4, P->X);
mp_int *x3_plus_axz4 = monty_add(wc->mc, x3, axz4);
mp_int *z6 = monty_mul(wc->mc, z2, z4);
mp_int *bz6 = monty_mul(wc->mc, wc->b, z6);
mp_int *rhs = monty_add(wc->mc, x3_plus_axz4, bz6);
unsigned valid = mp_cmp_eq(lhs, rhs);
mp_free(lhs);
mp_free(x2);
mp_free(x3);
mp_free(z2);
mp_free(z4);
mp_free(az4);
mp_free(axz4);
mp_free(x3_plus_axz4);
mp_free(z6);
mp_free(bz6);
mp_free(rhs);
return valid;
}
/* ----------------------------------------------------------------------
* Montgomery curves.
*/
struct MontgomeryPoint {
/* XZ coordinates. These represent the affine x coordinate by the
* relationship x = X/Z. */
mp_int *X, *Z;
MontgomeryCurve *mc;
};
struct MontgomeryCurve {
/* Prime modulus of the finite field. */
mp_int *p;
/* Montgomery context for arithmetic mod p. */
MontyContext *mc;
/* Parameters of the curve, in Montgomery-multiplication
* transformed form. */
mp_int *a, *b;
/* (a+2)/4, also in Montgomery-multiplication form. */
mp_int *aplus2over4;
};
MontgomeryCurve *ecc_montgomery_curve(
mp_int *p, mp_int *a, mp_int *b)
{
MontgomeryCurve *mc = snew(MontgomeryCurve);
mc->p = mp_copy(p);
mc->mc = monty_new(p);
mc->a = monty_import(mc->mc, a);
mc->b = monty_import(mc->mc, b);
mp_int *four = mp_from_integer(4);
mp_int *fourinverse = mp_invert(four, mc->p);
mp_int *aplus2 = mp_copy(a);
mp_add_integer_into(aplus2, aplus2, 2);
mp_int *aplus2over4 = mp_modmul(aplus2, fourinverse, mc->p);
mc->aplus2over4 = monty_import(mc->mc, aplus2over4);
mp_free(four);
mp_free(fourinverse);
mp_free(aplus2);
mp_free(aplus2over4);
return mc;
}
void ecc_montgomery_curve_free(MontgomeryCurve *mc)
{
mp_free(mc->p);
mp_free(mc->a);
mp_free(mc->b);
mp_free(mc->aplus2over4);
monty_free(mc->mc);
sfree(mc);
}
static MontgomeryPoint *ecc_montgomery_point_new_empty(MontgomeryCurve *mc)
{
MontgomeryPoint *mp = snew(MontgomeryPoint);
mp->mc = mc;
mp->X = mp->Z = NULL;
return mp;
}
MontgomeryPoint *ecc_montgomery_point_new(MontgomeryCurve *mc, mp_int *x)
{
MontgomeryPoint *mp = ecc_montgomery_point_new_empty(mc);
mp->X = monty_import(mc->mc, x);
mp->Z = mp_copy(monty_identity(mc->mc));
return mp;
}
void ecc_montgomery_point_copy_into(
MontgomeryPoint *dest, MontgomeryPoint *src)
{
mp_copy_into(dest->X, src->X);
mp_copy_into(dest->Z, src->Z);
}
MontgomeryPoint *ecc_montgomery_point_copy(MontgomeryPoint *orig)
{
MontgomeryPoint *mp = ecc_montgomery_point_new_empty(orig->mc);
mp->X = mp_copy(orig->X);
mp->Z = mp_copy(orig->Z);
return mp;
}
void ecc_montgomery_point_free(MontgomeryPoint *mp)
{
mp_free(mp->X);
mp_free(mp->Z);
smemclr(mp, sizeof(*mp));
sfree(mp);
}
static void ecc_montgomery_cond_overwrite(
MontgomeryPoint *dest, MontgomeryPoint *src, unsigned overwrite)
{
mp_select_into(dest->X, dest->X, src->X, overwrite);
mp_select_into(dest->Z, dest->Z, src->Z, overwrite);
}
static void ecc_montgomery_cond_swap(
MontgomeryPoint *P, MontgomeryPoint *Q, unsigned swap)
{
mp_cond_swap(P->X, Q->X, swap);
mp_cond_swap(P->Z, Q->Z, swap);
}
MontgomeryPoint *ecc_montgomery_diff_add(
MontgomeryPoint *P, MontgomeryPoint *Q, MontgomeryPoint *PminusQ)
{
MontgomeryCurve *mc = P->mc;
assert(Q->mc == mc);
assert(PminusQ->mc == mc);
/*
* Differential addition is achieved using the following formula
* that relates the affine x-coordinates of P, Q, P+Q and P-Q:
*
* x(P+Q) x(P-Q) (x(Q)-x(P))^2 = (x(P)x(Q) - 1)^2
*
* As with the Weierstrass coordinates, the code below transforms
* that affine relation into a projective one to avoid having to
* do a division during the main arithmetic.
*/
MontgomeryPoint *S = ecc_montgomery_point_new_empty(mc);
mp_int *Px_m_Pz = monty_sub(mc->mc, P->X, P->Z);
mp_int *Px_p_Pz = monty_add(mc->mc, P->X, P->Z);
mp_int *Qx_m_Qz = monty_sub(mc->mc, Q->X, Q->Z);
mp_int *Qx_p_Qz = monty_add(mc->mc, Q->X, Q->Z);
mp_int *PmQp = monty_mul(mc->mc, Px_m_Pz, Qx_p_Qz);
mp_int *PpQm = monty_mul(mc->mc, Px_p_Pz, Qx_m_Qz);
mp_int *Xpre = monty_add(mc->mc, PmQp, PpQm);
mp_int *Zpre = monty_sub(mc->mc, PmQp, PpQm);
mp_int *Xpre2 = monty_mul(mc->mc, Xpre, Xpre);
mp_int *Zpre2 = monty_mul(mc->mc, Zpre, Zpre);
S->X = monty_mul(mc->mc, Xpre2, PminusQ->Z);
S->Z = monty_mul(mc->mc, Zpre2, PminusQ->X);
mp_free(Px_m_Pz);
mp_free(Px_p_Pz);
mp_free(Qx_m_Qz);
mp_free(Qx_p_Qz);
mp_free(PmQp);
mp_free(PpQm);
mp_free(Xpre);
mp_free(Zpre);
mp_free(Xpre2);
mp_free(Zpre2);
return S;
}
MontgomeryPoint *ecc_montgomery_double(MontgomeryPoint *P)
{
MontgomeryCurve *mc = P->mc;
MontgomeryPoint *D = ecc_montgomery_point_new_empty(mc);
/*
* To double a point in affine coordinates, in principle you can
* use the same technique as for Weierstrass: differentiate the
* curve equation to get the tangent line at the input point, use
* that to get an expression for y which you substitute back into
* the curve equation, and subtract the known two roots (in this
* case both the same) from the x^2 coefficient of the resulting
* cubic.
*
* In this case, we don't have an input y-coordinate, so you have
* to do a bit of extra transformation to find a formula that can
* work without it. The tangent formula is (3x^2 + 2ax + 1)/(2y),
* and when that appears in the final formula it will be squared -
* so we can substitute the y^2 in the denominator for the RHS of
* the curve equation. Put together, that gives
*
* x_out = (x+1)^2 (x-1)^2 / 4(x^3+ax^2+x)
*
* and, as usual, the code below transforms that into projective
* form to avoid the division.
*/
mp_int *Px_m_Pz = monty_sub(mc->mc, P->X, P->Z);
mp_int *Px_p_Pz = monty_add(mc->mc, P->X, P->Z);
mp_int *Px_m_Pz_2 = monty_mul(mc->mc, Px_m_Pz, Px_m_Pz);
mp_int *Px_p_Pz_2 = monty_mul(mc->mc, Px_p_Pz, Px_p_Pz);
D->X = monty_mul(mc->mc, Px_m_Pz_2, Px_p_Pz_2);
mp_int *XZ = monty_mul(mc->mc, P->X, P->Z);
mp_int *twoXZ = monty_add(mc->mc, XZ, XZ);
mp_int *fourXZ = monty_add(mc->mc, twoXZ, twoXZ);
mp_int *fourXZ_scaled = monty_mul(mc->mc, fourXZ, mc->aplus2over4);
mp_int *Zpre = monty_add(mc->mc, Px_m_Pz_2, fourXZ_scaled);
D->Z = monty_mul(mc->mc, fourXZ, Zpre);
mp_free(Px_m_Pz);
mp_free(Px_p_Pz);
mp_free(Px_m_Pz_2);
mp_free(Px_p_Pz_2);
mp_free(XZ);
mp_free(twoXZ);
mp_free(fourXZ);
mp_free(fourXZ_scaled);
mp_free(Zpre);
return D;
}
static void ecc_montgomery_normalise(MontgomeryPoint *mp)
{
MontgomeryCurve *mc = mp->mc;
mp_int *zinv = monty_invert(mc->mc, mp->Z);
monty_mul_into(mc->mc, mp->X, mp->X, zinv);
monty_mul_into(mc->mc, mp->Z, mp->Z, zinv);
mp_free(zinv);
}
MontgomeryPoint *ecc_montgomery_multiply(MontgomeryPoint *B, mp_int *n)
{
/*
* 'Montgomery ladder' technique, to compute an arbitrary integer
* multiple of B under the constraint that you can only add two
* unequal points if you also know their difference.
*
* The setup is that you maintain two curve points one of which is
* always the other one plus B. Call them kB and (k+1)B, where k
* is some integer that evolves as we go along. We begin by
* doubling the input B, to initialise those points to B and 2B,
* so that k=1.
*
* At each stage, we add kB and (k+1)B together - which we can do
* under the differential-addition constraint because we know
* their difference is always just B - to give us (2k+1)B. Then we
* double one of kB or (k+1)B, and depending on which one we
* choose, we end up with (2k)B or (2k+2)B. Either way, that
* differs by B from the other value we've just computed. So in
* each iteration, we do one diff-add and one doubling, plus a
* couple of conditional swaps to choose which value we double and
* which way round we put the output points, and the effect is to
* replace k with either 2k or 2k+1, which we choose based on the
* appropriate bit of the desired exponent.
*
* This routine doesn't assume we know the exact location of the
* topmost set bit of the exponent. So to maintain constant time
* it does an iteration for every _potential_ bit, starting from
* the top downwards; after each iteration in which we haven't
* seen a set exponent bit yet, we just overwrite the two points
* with B and 2B again,
*/
MontgomeryPoint *two_B = ecc_montgomery_double(B);
MontgomeryPoint *k_B = ecc_montgomery_point_copy(B);
MontgomeryPoint *kplus1_B = ecc_montgomery_point_copy(two_B);
unsigned not_started_yet = 1;
for (size_t bitindex = mp_max_bits(n); bitindex-- > 0 ;) {
unsigned nbit = mp_get_bit(n, bitindex);
MontgomeryPoint *sum = ecc_montgomery_diff_add(k_B, kplus1_B, B);
ecc_montgomery_cond_swap(k_B, kplus1_B, nbit);
MontgomeryPoint *other = ecc_montgomery_double(k_B);
ecc_montgomery_point_free(k_B);
ecc_montgomery_point_free(kplus1_B);
k_B = other;
kplus1_B = sum;
ecc_montgomery_cond_swap(k_B, kplus1_B, nbit);
ecc_montgomery_cond_overwrite(k_B, B, not_started_yet);
ecc_montgomery_cond_overwrite(kplus1_B, two_B, not_started_yet);
not_started_yet &= ~nbit;
}
ecc_montgomery_point_free(two_B);
ecc_montgomery_point_free(kplus1_B);
return k_B;
}
void ecc_montgomery_get_affine(MontgomeryPoint *mp, mp_int **x)
{
MontgomeryCurve *mc = mp->mc;
ecc_montgomery_normalise(mp);
if (x)
*x = monty_export(mc->mc, mp->X);
}
unsigned ecc_montgomery_is_identity(MontgomeryPoint *mp)
{
return mp_eq_integer(mp->Z, 0);
}
/* ----------------------------------------------------------------------
* Twisted Edwards curves.
*/
struct EdwardsPoint {
/*
* We represent an Edwards curve point in 'extended coordinates'.
* There's more than one coordinate system going by that name,
* unfortunately. These ones have the semantics that X,Y,Z are
* ordinary projective coordinates (so x=X/Z and y=Y/Z), but also,
* we store the extra value T = xyZ = XY/Z.
*/
mp_int *X, *Y, *Z, *T;
EdwardsCurve *ec;
};
struct EdwardsCurve {
/* Prime modulus of the finite field. */
mp_int *p;
/* Montgomery context for arithmetic mod p. */
MontyContext *mc;
/* Modsqrt context for point decompression. */
ModsqrtContext *sc;
/* Parameters of the curve, in Montgomery-multiplication
* transformed form. */
mp_int *d, *a;
};
EdwardsCurve *ecc_edwards_curve(mp_int *p, mp_int *d, mp_int *a,
mp_int *nonsquare_mod_p)
{
EdwardsCurve *ec = snew(EdwardsCurve);
ec->p = mp_copy(p);
ec->mc = monty_new(p);
ec->d = monty_import(ec->mc, d);
ec->a = monty_import(ec->mc, a);
if (nonsquare_mod_p)
ec->sc = modsqrt_new(p, nonsquare_mod_p);
else
ec->sc = NULL;
return ec;
}
void ecc_edwards_curve_free(EdwardsCurve *ec)
{
mp_free(ec->p);
mp_free(ec->d);
mp_free(ec->a);
monty_free(ec->mc);
if (ec->sc)
modsqrt_free(ec->sc);
sfree(ec);
}
static EdwardsPoint *ecc_edwards_point_new_empty(EdwardsCurve *ec)
{
EdwardsPoint *ep = snew(EdwardsPoint);
ep->ec = ec;
ep->X = ep->Y = ep->Z = ep->T = NULL;
return ep;
}
static EdwardsPoint *ecc_edwards_point_new_imported(
EdwardsCurve *ec, mp_int *monty_x, mp_int *monty_y)
{
EdwardsPoint *ep = ecc_edwards_point_new_empty(ec);
ep->X = monty_x;
ep->Y = monty_y;
ep->T = monty_mul(ec->mc, ep->X, ep->Y);
ep->Z = mp_copy(monty_identity(ec->mc));
return ep;
}
EdwardsPoint *ecc_edwards_point_new(
EdwardsCurve *ec, mp_int *x, mp_int *y)
{
return ecc_edwards_point_new_imported(
ec, monty_import(ec->mc, x), monty_import(ec->mc, y));
}
void ecc_edwards_point_copy_into(EdwardsPoint *dest, EdwardsPoint *src)
{
mp_copy_into(dest->X, src->X);
mp_copy_into(dest->Y, src->Y);
mp_copy_into(dest->Z, src->Z);
mp_copy_into(dest->T, src->T);
}
EdwardsPoint *ecc_edwards_point_copy(EdwardsPoint *orig)
{
EdwardsPoint *ep = ecc_edwards_point_new_empty(orig->ec);
ep->X = mp_copy(orig->X);
ep->Y = mp_copy(orig->Y);
ep->Z = mp_copy(orig->Z);
ep->T = mp_copy(orig->T);
return ep;
}
void ecc_edwards_point_free(EdwardsPoint *ep)
{
mp_free(ep->X);
mp_free(ep->Y);
mp_free(ep->Z);
mp_free(ep->T);
smemclr(ep, sizeof(*ep));
sfree(ep);
}
EdwardsPoint *ecc_edwards_point_new_from_y(
EdwardsCurve *ec, mp_int *yorig, unsigned desired_x_parity)
{
assert(ec->sc);
/*
* The curve equation is ax^2 + y^2 = 1 + dx^2y^2, which
* rearranges to x^2(dy^2-a) = y^2-1. So we compute
* (y^2-1)/(dy^2-a) and take its square root.
*/
unsigned success;
mp_int *y = monty_import(ec->mc, yorig);
mp_int *y2 = monty_mul(ec->mc, y, y);
mp_int *dy2 = monty_mul(ec->mc, ec->d, y2);
mp_int *dy2ma = monty_sub(ec->mc, dy2, ec->a);
mp_int *y2m1 = monty_sub(ec->mc, y2, monty_identity(ec->mc));
mp_int *recip_denominator = monty_invert(ec->mc, dy2ma);
mp_int *radicand = monty_mul(ec->mc, y2m1, recip_denominator);
mp_int *x = monty_modsqrt(ec->sc, radicand, &success);
mp_free(y2);
mp_free(dy2);
mp_free(dy2ma);
mp_free(y2m1);
mp_free(recip_denominator);
mp_free(radicand);
if (!success) {
/* Failure! x^2 worked out to be a number that has no square
* root mod p. In this situation there's no point in trying to
* be time-constant, since the protocol sequence is going to
* diverge anyway when we complain to whoever gave us this
* bogus value. */
mp_free(x);
mp_free(y);
return NULL;
}
/*
* Choose whichever of x and p-x has the specified parity (of its
* lowest positive residue mod p).
*/
mp_int *tmp = monty_export(ec->mc, x);
unsigned flip = (mp_get_bit(tmp, 0) ^ desired_x_parity) & 1;
mp_sub_into(tmp, ec->p, x);
mp_select_into(x, x, tmp, flip);