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Diffstat (limited to 'vendor/github.com/btcsuite/btcd/btcec/btcec.go')
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diff --git a/vendor/github.com/btcsuite/btcd/btcec/btcec.go b/vendor/github.com/btcsuite/btcd/btcec/btcec.go new file mode 100644 index 000000000..98d7b1432 --- /dev/null +++ b/vendor/github.com/btcsuite/btcd/btcec/btcec.go @@ -0,0 +1,956 @@ +// Copyright 2010 The Go Authors. All rights reserved. +// Copyright 2011 ThePiachu. All rights reserved. +// Copyright 2013-2014 The btcsuite developers +// Use of this source code is governed by an ISC +// license that can be found in the LICENSE file. + +package btcec + +// References: +// [SECG]: Recommended Elliptic Curve Domain Parameters +// http://www.secg.org/sec2-v2.pdf +// +// [GECC]: Guide to Elliptic Curve Cryptography (Hankerson, Menezes, Vanstone) + +// This package operates, internally, on Jacobian coordinates. For a given +// (x, y) position on the curve, the Jacobian coordinates are (x1, y1, z1) +// where x = x1/z1² and y = y1/z1³. The greatest speedups come when the whole +// calculation can be performed within the transform (as in ScalarMult and +// ScalarBaseMult). But even for Add and Double, it's faster to apply and +// reverse the transform than to operate in affine coordinates. + +import ( + "crypto/elliptic" + "math/big" + "sync" +) + +var ( + // fieldOne is simply the integer 1 in field representation. It is + // used to avoid needing to create it multiple times during the internal + // arithmetic. + fieldOne = new(fieldVal).SetInt(1) +) + +// KoblitzCurve supports a koblitz curve implementation that fits the ECC Curve +// interface from crypto/elliptic. +type KoblitzCurve struct { + *elliptic.CurveParams + q *big.Int + H int // cofactor of the curve. + + // byteSize is simply the bit size / 8 and is provided for convenience + // since it is calculated repeatedly. + byteSize int + + // bytePoints + bytePoints *[32][256][3]fieldVal + + // The next 6 values are used specifically for endomorphism + // optimizations in ScalarMult. + + // lambda must fulfill lambda^3 = 1 mod N where N is the order of G. + lambda *big.Int + + // beta must fulfill beta^3 = 1 mod P where P is the prime field of the + // curve. + beta *fieldVal + + // See the EndomorphismVectors in gensecp256k1.go to see how these are + // derived. + a1 *big.Int + b1 *big.Int + a2 *big.Int + b2 *big.Int +} + +// Params returns the parameters for the curve. +func (curve *KoblitzCurve) Params() *elliptic.CurveParams { + return curve.CurveParams +} + +// bigAffineToField takes an affine point (x, y) as big integers and converts +// it to an affine point as field values. +func (curve *KoblitzCurve) bigAffineToField(x, y *big.Int) (*fieldVal, *fieldVal) { + x3, y3 := new(fieldVal), new(fieldVal) + x3.SetByteSlice(x.Bytes()) + y3.SetByteSlice(y.Bytes()) + + return x3, y3 +} + +// fieldJacobianToBigAffine takes a Jacobian point (x, y, z) as field values and +// converts it to an affine point as big integers. +func (curve *KoblitzCurve) fieldJacobianToBigAffine(x, y, z *fieldVal) (*big.Int, *big.Int) { + // Inversions are expensive and both point addition and point doubling + // are faster when working with points that have a z value of one. So, + // if the point needs to be converted to affine, go ahead and normalize + // the point itself at the same time as the calculation is the same. + var zInv, tempZ fieldVal + zInv.Set(z).Inverse() // zInv = Z^-1 + tempZ.SquareVal(&zInv) // tempZ = Z^-2 + x.Mul(&tempZ) // X = X/Z^2 (mag: 1) + y.Mul(tempZ.Mul(&zInv)) // Y = Y/Z^3 (mag: 1) + z.SetInt(1) // Z = 1 (mag: 1) + + // Normalize the x and y values. + x.Normalize() + y.Normalize() + + // Convert the field values for the now affine point to big.Ints. + x3, y3 := new(big.Int), new(big.Int) + x3.SetBytes(x.Bytes()[:]) + y3.SetBytes(y.Bytes()[:]) + return x3, y3 +} + +// IsOnCurve returns boolean if the point (x,y) is on the curve. +// Part of the elliptic.Curve interface. This function differs from the +// crypto/elliptic algorithm since a = 0 not -3. +func (curve *KoblitzCurve) IsOnCurve(x, y *big.Int) bool { + // Convert big ints to field values for faster arithmetic. + fx, fy := curve.bigAffineToField(x, y) + + // Elliptic curve equation for secp256k1 is: y^2 = x^3 + 7 + y2 := new(fieldVal).SquareVal(fy).Normalize() + result := new(fieldVal).SquareVal(fx).Mul(fx).AddInt(7).Normalize() + return y2.Equals(result) +} + +// addZ1AndZ2EqualsOne adds two Jacobian points that are already known to have +// z values of 1 and stores the result in (x3, y3, z3). That is to say +// (x1, y1, 1) + (x2, y2, 1) = (x3, y3, z3). It performs faster addition than +// the generic add routine since less arithmetic is needed due to the ability to +// avoid the z value multiplications. +func (curve *KoblitzCurve) addZ1AndZ2EqualsOne(x1, y1, z1, x2, y2, x3, y3, z3 *fieldVal) { + // To compute the point addition efficiently, this implementation splits + // the equation into intermediate elements which are used to minimize + // the number of field multiplications using the method shown at: + // http://hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-0.html#addition-mmadd-2007-bl + // + // In particular it performs the calculations using the following: + // H = X2-X1, HH = H^2, I = 4*HH, J = H*I, r = 2*(Y2-Y1), V = X1*I + // X3 = r^2-J-2*V, Y3 = r*(V-X3)-2*Y1*J, Z3 = 2*H + // + // This results in a cost of 4 field multiplications, 2 field squarings, + // 6 field additions, and 5 integer multiplications. + + // When the x coordinates are the same for two points on the curve, the + // y coordinates either must be the same, in which case it is point + // doubling, or they are opposite and the result is the point at + // infinity per the group law for elliptic curve cryptography. + x1.Normalize() + y1.Normalize() + x2.Normalize() + y2.Normalize() + if x1.Equals(x2) { + if y1.Equals(y2) { + // Since x1 == x2 and y1 == y2, point doubling must be + // done, otherwise the addition would end up dividing + // by zero. + curve.doubleJacobian(x1, y1, z1, x3, y3, z3) + return + } + + // Since x1 == x2 and y1 == -y2, the sum is the point at + // infinity per the group law. + x3.SetInt(0) + y3.SetInt(0) + z3.SetInt(0) + return + } + + // Calculate X3, Y3, and Z3 according to the intermediate elements + // breakdown above. + var h, i, j, r, v fieldVal + var negJ, neg2V, negX3 fieldVal + h.Set(x1).Negate(1).Add(x2) // H = X2-X1 (mag: 3) + i.SquareVal(&h).MulInt(4) // I = 4*H^2 (mag: 4) + j.Mul2(&h, &i) // J = H*I (mag: 1) + r.Set(y1).Negate(1).Add(y2).MulInt(2) // r = 2*(Y2-Y1) (mag: 6) + v.Mul2(x1, &i) // V = X1*I (mag: 1) + negJ.Set(&j).Negate(1) // negJ = -J (mag: 2) + neg2V.Set(&v).MulInt(2).Negate(2) // neg2V = -(2*V) (mag: 3) + x3.Set(&r).Square().Add(&negJ).Add(&neg2V) // X3 = r^2-J-2*V (mag: 6) + negX3.Set(x3).Negate(6) // negX3 = -X3 (mag: 7) + j.Mul(y1).MulInt(2).Negate(2) // J = -(2*Y1*J) (mag: 3) + y3.Set(&v).Add(&negX3).Mul(&r).Add(&j) // Y3 = r*(V-X3)-2*Y1*J (mag: 4) + z3.Set(&h).MulInt(2) // Z3 = 2*H (mag: 6) + + // Normalize the resulting field values to a magnitude of 1 as needed. + x3.Normalize() + y3.Normalize() + z3.Normalize() +} + +// addZ1EqualsZ2 adds two Jacobian points that are already known to have the +// same z value and stores the result in (x3, y3, z3). That is to say +// (x1, y1, z1) + (x2, y2, z1) = (x3, y3, z3). It performs faster addition than +// the generic add routine since less arithmetic is needed due to the known +// equivalence. +func (curve *KoblitzCurve) addZ1EqualsZ2(x1, y1, z1, x2, y2, x3, y3, z3 *fieldVal) { + // To compute the point addition efficiently, this implementation splits + // the equation into intermediate elements which are used to minimize + // the number of field multiplications using a slightly modified version + // of the method shown at: + // http://hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-0.html#addition-mmadd-2007-bl + // + // In particular it performs the calculations using the following: + // A = X2-X1, B = A^2, C=Y2-Y1, D = C^2, E = X1*B, F = X2*B + // X3 = D-E-F, Y3 = C*(E-X3)-Y1*(F-E), Z3 = Z1*A + // + // This results in a cost of 5 field multiplications, 2 field squarings, + // 9 field additions, and 0 integer multiplications. + + // When the x coordinates are the same for two points on the curve, the + // y coordinates either must be the same, in which case it is point + // doubling, or they are opposite and the result is the point at + // infinity per the group law for elliptic curve cryptography. + x1.Normalize() + y1.Normalize() + x2.Normalize() + y2.Normalize() + if x1.Equals(x2) { + if y1.Equals(y2) { + // Since x1 == x2 and y1 == y2, point doubling must be + // done, otherwise the addition would end up dividing + // by zero. + curve.doubleJacobian(x1, y1, z1, x3, y3, z3) + return + } + + // Since x1 == x2 and y1 == -y2, the sum is the point at + // infinity per the group law. + x3.SetInt(0) + y3.SetInt(0) + z3.SetInt(0) + return + } + + // Calculate X3, Y3, and Z3 according to the intermediate elements + // breakdown above. + var a, b, c, d, e, f fieldVal + var negX1, negY1, negE, negX3 fieldVal + negX1.Set(x1).Negate(1) // negX1 = -X1 (mag: 2) + negY1.Set(y1).Negate(1) // negY1 = -Y1 (mag: 2) + a.Set(&negX1).Add(x2) // A = X2-X1 (mag: 3) + b.SquareVal(&a) // B = A^2 (mag: 1) + c.Set(&negY1).Add(y2) // C = Y2-Y1 (mag: 3) + d.SquareVal(&c) // D = C^2 (mag: 1) + e.Mul2(x1, &b) // E = X1*B (mag: 1) + negE.Set(&e).Negate(1) // negE = -E (mag: 2) + f.Mul2(x2, &b) // F = X2*B (mag: 1) + x3.Add2(&e, &f).Negate(3).Add(&d) // X3 = D-E-F (mag: 5) + negX3.Set(x3).Negate(5).Normalize() // negX3 = -X3 (mag: 1) + y3.Set(y1).Mul(f.Add(&negE)).Negate(3) // Y3 = -(Y1*(F-E)) (mag: 4) + y3.Add(e.Add(&negX3).Mul(&c)) // Y3 = C*(E-X3)+Y3 (mag: 5) + z3.Mul2(z1, &a) // Z3 = Z1*A (mag: 1) + + // Normalize the resulting field values to a magnitude of 1 as needed. + x3.Normalize() + y3.Normalize() +} + +// addZ2EqualsOne adds two Jacobian points when the second point is already +// known to have a z value of 1 (and the z value for the first point is not 1) +// and stores the result in (x3, y3, z3). That is to say (x1, y1, z1) + +// (x2, y2, 1) = (x3, y3, z3). It performs faster addition than the generic +// add routine since less arithmetic is needed due to the ability to avoid +// multiplications by the second point's z value. +func (curve *KoblitzCurve) addZ2EqualsOne(x1, y1, z1, x2, y2, x3, y3, z3 *fieldVal) { + // To compute the point addition efficiently, this implementation splits + // the equation into intermediate elements which are used to minimize + // the number of field multiplications using the method shown at: + // http://hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-0.html#addition-madd-2007-bl + // + // In particular it performs the calculations using the following: + // Z1Z1 = Z1^2, U2 = X2*Z1Z1, S2 = Y2*Z1*Z1Z1, H = U2-X1, HH = H^2, + // I = 4*HH, J = H*I, r = 2*(S2-Y1), V = X1*I + // X3 = r^2-J-2*V, Y3 = r*(V-X3)-2*Y1*J, Z3 = (Z1+H)^2-Z1Z1-HH + // + // This results in a cost of 7 field multiplications, 4 field squarings, + // 9 field additions, and 4 integer multiplications. + + // When the x coordinates are the same for two points on the curve, the + // y coordinates either must be the same, in which case it is point + // doubling, or they are opposite and the result is the point at + // infinity per the group law for elliptic curve cryptography. Since + // any number of Jacobian coordinates can represent the same affine + // point, the x and y values need to be converted to like terms. Due to + // the assumption made for this function that the second point has a z + // value of 1 (z2=1), the first point is already "converted". + var z1z1, u2, s2 fieldVal + x1.Normalize() + y1.Normalize() + z1z1.SquareVal(z1) // Z1Z1 = Z1^2 (mag: 1) + u2.Set(x2).Mul(&z1z1).Normalize() // U2 = X2*Z1Z1 (mag: 1) + s2.Set(y2).Mul(&z1z1).Mul(z1).Normalize() // S2 = Y2*Z1*Z1Z1 (mag: 1) + if x1.Equals(&u2) { + if y1.Equals(&s2) { + // Since x1 == x2 and y1 == y2, point doubling must be + // done, otherwise the addition would end up dividing + // by zero. + curve.doubleJacobian(x1, y1, z1, x3, y3, z3) + return + } + + // Since x1 == x2 and y1 == -y2, the sum is the point at + // infinity per the group law. + x3.SetInt(0) + y3.SetInt(0) + z3.SetInt(0) + return + } + + // Calculate X3, Y3, and Z3 according to the intermediate elements + // breakdown above. + var h, hh, i, j, r, rr, v fieldVal + var negX1, negY1, negX3 fieldVal + negX1.Set(x1).Negate(1) // negX1 = -X1 (mag: 2) + h.Add2(&u2, &negX1) // H = U2-X1 (mag: 3) + hh.SquareVal(&h) // HH = H^2 (mag: 1) + i.Set(&hh).MulInt(4) // I = 4 * HH (mag: 4) + j.Mul2(&h, &i) // J = H*I (mag: 1) + negY1.Set(y1).Negate(1) // negY1 = -Y1 (mag: 2) + r.Set(&s2).Add(&negY1).MulInt(2) // r = 2*(S2-Y1) (mag: 6) + rr.SquareVal(&r) // rr = r^2 (mag: 1) + v.Mul2(x1, &i) // V = X1*I (mag: 1) + x3.Set(&v).MulInt(2).Add(&j).Negate(3) // X3 = -(J+2*V) (mag: 4) + x3.Add(&rr) // X3 = r^2+X3 (mag: 5) + negX3.Set(x3).Negate(5) // negX3 = -X3 (mag: 6) + y3.Set(y1).Mul(&j).MulInt(2).Negate(2) // Y3 = -(2*Y1*J) (mag: 3) + y3.Add(v.Add(&negX3).Mul(&r)) // Y3 = r*(V-X3)+Y3 (mag: 4) + z3.Add2(z1, &h).Square() // Z3 = (Z1+H)^2 (mag: 1) + z3.Add(z1z1.Add(&hh).Negate(2)) // Z3 = Z3-(Z1Z1+HH) (mag: 4) + + // Normalize the resulting field values to a magnitude of 1 as needed. + x3.Normalize() + y3.Normalize() + z3.Normalize() +} + +// addGeneric adds two Jacobian points (x1, y1, z1) and (x2, y2, z2) without any +// assumptions about the z values of the two points and stores the result in +// (x3, y3, z3). That is to say (x1, y1, z1) + (x2, y2, z2) = (x3, y3, z3). It +// is the slowest of the add routines due to requiring the most arithmetic. +func (curve *KoblitzCurve) addGeneric(x1, y1, z1, x2, y2, z2, x3, y3, z3 *fieldVal) { + // To compute the point addition efficiently, this implementation splits + // the equation into intermediate elements which are used to minimize + // the number of field multiplications using the method shown at: + // http://hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-0.html#addition-add-2007-bl + // + // In particular it performs the calculations using the following: + // Z1Z1 = Z1^2, Z2Z2 = Z2^2, U1 = X1*Z2Z2, U2 = X2*Z1Z1, S1 = Y1*Z2*Z2Z2 + // S2 = Y2*Z1*Z1Z1, H = U2-U1, I = (2*H)^2, J = H*I, r = 2*(S2-S1) + // V = U1*I + // X3 = r^2-J-2*V, Y3 = r*(V-X3)-2*S1*J, Z3 = ((Z1+Z2)^2-Z1Z1-Z2Z2)*H + // + // This results in a cost of 11 field multiplications, 5 field squarings, + // 9 field additions, and 4 integer multiplications. + + // When the x coordinates are the same for two points on the curve, the + // y coordinates either must be the same, in which case it is point + // doubling, or they are opposite and the result is the point at + // infinity. Since any number of Jacobian coordinates can represent the + // same affine point, the x and y values need to be converted to like + // terms. + var z1z1, z2z2, u1, u2, s1, s2 fieldVal + z1z1.SquareVal(z1) // Z1Z1 = Z1^2 (mag: 1) + z2z2.SquareVal(z2) // Z2Z2 = Z2^2 (mag: 1) + u1.Set(x1).Mul(&z2z2).Normalize() // U1 = X1*Z2Z2 (mag: 1) + u2.Set(x2).Mul(&z1z1).Normalize() // U2 = X2*Z1Z1 (mag: 1) + s1.Set(y1).Mul(&z2z2).Mul(z2).Normalize() // S1 = Y1*Z2*Z2Z2 (mag: 1) + s2.Set(y2).Mul(&z1z1).Mul(z1).Normalize() // S2 = Y2*Z1*Z1Z1 (mag: 1) + if u1.Equals(&u2) { + if s1.Equals(&s2) { + // Since x1 == x2 and y1 == y2, point doubling must be + // done, otherwise the addition would end up dividing + // by zero. + curve.doubleJacobian(x1, y1, z1, x3, y3, z3) + return + } + + // Since x1 == x2 and y1 == -y2, the sum is the point at + // infinity per the group law. + x3.SetInt(0) + y3.SetInt(0) + z3.SetInt(0) + return + } + + // Calculate X3, Y3, and Z3 according to the intermediate elements + // breakdown above. + var h, i, j, r, rr, v fieldVal + var negU1, negS1, negX3 fieldVal + negU1.Set(&u1).Negate(1) // negU1 = -U1 (mag: 2) + h.Add2(&u2, &negU1) // H = U2-U1 (mag: 3) + i.Set(&h).MulInt(2).Square() // I = (2*H)^2 (mag: 2) + j.Mul2(&h, &i) // J = H*I (mag: 1) + negS1.Set(&s1).Negate(1) // negS1 = -S1 (mag: 2) + r.Set(&s2).Add(&negS1).MulInt(2) // r = 2*(S2-S1) (mag: 6) + rr.SquareVal(&r) // rr = r^2 (mag: 1) + v.Mul2(&u1, &i) // V = U1*I (mag: 1) + x3.Set(&v).MulInt(2).Add(&j).Negate(3) // X3 = -(J+2*V) (mag: 4) + x3.Add(&rr) // X3 = r^2+X3 (mag: 5) + negX3.Set(x3).Negate(5) // negX3 = -X3 (mag: 6) + y3.Mul2(&s1, &j).MulInt(2).Negate(2) // Y3 = -(2*S1*J) (mag: 3) + y3.Add(v.Add(&negX3).Mul(&r)) // Y3 = r*(V-X3)+Y3 (mag: 4) + z3.Add2(z1, z2).Square() // Z3 = (Z1+Z2)^2 (mag: 1) + z3.Add(z1z1.Add(&z2z2).Negate(2)) // Z3 = Z3-(Z1Z1+Z2Z2) (mag: 4) + z3.Mul(&h) // Z3 = Z3*H (mag: 1) + + // Normalize the resulting field values to a magnitude of 1 as needed. + x3.Normalize() + y3.Normalize() +} + +// addJacobian adds the passed Jacobian points (x1, y1, z1) and (x2, y2, z2) +// together and stores the result in (x3, y3, z3). +func (curve *KoblitzCurve) addJacobian(x1, y1, z1, x2, y2, z2, x3, y3, z3 *fieldVal) { + // A point at infinity is the identity according to the group law for + // elliptic curve cryptography. Thus, ∞ + P = P and P + ∞ = P. + if (x1.IsZero() && y1.IsZero()) || z1.IsZero() { + x3.Set(x2) + y3.Set(y2) + z3.Set(z2) + return + } + if (x2.IsZero() && y2.IsZero()) || z2.IsZero() { + x3.Set(x1) + y3.Set(y1) + z3.Set(z1) + return + } + + // Faster point addition can be achieved when certain assumptions are + // met. For example, when both points have the same z value, arithmetic + // on the z values can be avoided. This section thus checks for these + // conditions and calls an appropriate add function which is accelerated + // by using those assumptions. + z1.Normalize() + z2.Normalize() + isZ1One := z1.Equals(fieldOne) + isZ2One := z2.Equals(fieldOne) + switch { + case isZ1One && isZ2One: + curve.addZ1AndZ2EqualsOne(x1, y1, z1, x2, y2, x3, y3, z3) + return + case z1.Equals(z2): + curve.addZ1EqualsZ2(x1, y1, z1, x2, y2, x3, y3, z3) + return + case isZ2One: + curve.addZ2EqualsOne(x1, y1, z1, x2, y2, x3, y3, z3) + return + } + + // None of the above assumptions are true, so fall back to generic + // point addition. + curve.addGeneric(x1, y1, z1, x2, y2, z2, x3, y3, z3) +} + +// Add returns the sum of (x1,y1) and (x2,y2). Part of the elliptic.Curve +// interface. +func (curve *KoblitzCurve) Add(x1, y1, x2, y2 *big.Int) (*big.Int, *big.Int) { + // A point at infinity is the identity according to the group law for + // elliptic curve cryptography. Thus, ∞ + P = P and P + ∞ = P. + if x1.Sign() == 0 && y1.Sign() == 0 { + return x2, y2 + } + if x2.Sign() == 0 && y2.Sign() == 0 { + return x1, y1 + } + + // Convert the affine coordinates from big integers to field values + // and do the point addition in Jacobian projective space. + fx1, fy1 := curve.bigAffineToField(x1, y1) + fx2, fy2 := curve.bigAffineToField(x2, y2) + fx3, fy3, fz3 := new(fieldVal), new(fieldVal), new(fieldVal) + fOne := new(fieldVal).SetInt(1) + curve.addJacobian(fx1, fy1, fOne, fx2, fy2, fOne, fx3, fy3, fz3) + + // Convert the Jacobian coordinate field values back to affine big + // integers. + return curve.fieldJacobianToBigAffine(fx3, fy3, fz3) +} + +// doubleZ1EqualsOne performs point doubling on the passed Jacobian point +// when the point is already known to have a z value of 1 and stores +// the result in (x3, y3, z3). That is to say (x3, y3, z3) = 2*(x1, y1, 1). It +// performs faster point doubling than the generic routine since less arithmetic +// is needed due to the ability to avoid multiplication by the z value. +func (curve *KoblitzCurve) doubleZ1EqualsOne(x1, y1, x3, y3, z3 *fieldVal) { + // This function uses the assumptions that z1 is 1, thus the point + // doubling formulas reduce to: + // + // X3 = (3*X1^2)^2 - 8*X1*Y1^2 + // Y3 = (3*X1^2)*(4*X1*Y1^2 - X3) - 8*Y1^4 + // Z3 = 2*Y1 + // + // To compute the above efficiently, this implementation splits the + // equation into intermediate elements which are used to minimize the + // number of field multiplications in favor of field squarings which + // are roughly 35% faster than field multiplications with the current + // implementation at the time this was written. + // + // This uses a slightly modified version of the method shown at: + // http://hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-0.html#doubling-mdbl-2007-bl + // + // In particular it performs the calculations using the following: + // A = X1^2, B = Y1^2, C = B^2, D = 2*((X1+B)^2-A-C) + // E = 3*A, F = E^2, X3 = F-2*D, Y3 = E*(D-X3)-8*C + // Z3 = 2*Y1 + // + // This results in a cost of 1 field multiplication, 5 field squarings, + // 6 field additions, and 5 integer multiplications. + var a, b, c, d, e, f fieldVal + z3.Set(y1).MulInt(2) // Z3 = 2*Y1 (mag: 2) + a.SquareVal(x1) // A = X1^2 (mag: 1) + b.SquareVal(y1) // B = Y1^2 (mag: 1) + c.SquareVal(&b) // C = B^2 (mag: 1) + b.Add(x1).Square() // B = (X1+B)^2 (mag: 1) + d.Set(&a).Add(&c).Negate(2) // D = -(A+C) (mag: 3) + d.Add(&b).MulInt(2) // D = 2*(B+D)(mag: 8) + e.Set(&a).MulInt(3) // E = 3*A (mag: 3) + f.SquareVal(&e) // F = E^2 (mag: 1) + x3.Set(&d).MulInt(2).Negate(16) // X3 = -(2*D) (mag: 17) + x3.Add(&f) // X3 = F+X3 (mag: 18) + f.Set(x3).Negate(18).Add(&d).Normalize() // F = D-X3 (mag: 1) + y3.Set(&c).MulInt(8).Negate(8) // Y3 = -(8*C) (mag: 9) + y3.Add(f.Mul(&e)) // Y3 = E*F+Y3 (mag: 10) + + // Normalize the field values back to a magnitude of 1. + x3.Normalize() + y3.Normalize() + z3.Normalize() +} + +// doubleGeneric performs point doubling on the passed Jacobian point without +// any assumptions about the z value and stores the result in (x3, y3, z3). +// That is to say (x3, y3, z3) = 2*(x1, y1, z1). It is the slowest of the point +// doubling routines due to requiring the most arithmetic. +func (curve *KoblitzCurve) doubleGeneric(x1, y1, z1, x3, y3, z3 *fieldVal) { + // Point doubling formula for Jacobian coordinates for the secp256k1 + // curve: + // X3 = (3*X1^2)^2 - 8*X1*Y1^2 + // Y3 = (3*X1^2)*(4*X1*Y1^2 - X3) - 8*Y1^4 + // Z3 = 2*Y1*Z1 + // + // To compute the above efficiently, this implementation splits the + // equation into intermediate elements which are used to minimize the + // number of field multiplications in favor of field squarings which + // are roughly 35% faster than field multiplications with the current + // implementation at the time this was written. + // + // This uses a slightly modified version of the method shown at: + // http://hyperelliptic.org/EFD/g1p/auto-shortw-jacobian-0.html#doubling-dbl-2009-l + // + // In particular it performs the calculations using the following: + // A = X1^2, B = Y1^2, C = B^2, D = 2*((X1+B)^2-A-C) + // E = 3*A, F = E^2, X3 = F-2*D, Y3 = E*(D-X3)-8*C + // Z3 = 2*Y1*Z1 + // + // This results in a cost of 1 field multiplication, 5 field squarings, + // 6 field additions, and 5 integer multiplications. + var a, b, c, d, e, f fieldVal + z3.Mul2(y1, z1).MulInt(2) // Z3 = 2*Y1*Z1 (mag: 2) + a.SquareVal(x1) // A = X1^2 (mag: 1) + b.SquareVal(y1) // B = Y1^2 (mag: 1) + c.SquareVal(&b) // C = B^2 (mag: 1) + b.Add(x1).Square() // B = (X1+B)^2 (mag: 1) + d.Set(&a).Add(&c).Negate(2) // D = -(A+C) (mag: 3) + d.Add(&b).MulInt(2) // D = 2*(B+D)(mag: 8) + e.Set(&a).MulInt(3) // E = 3*A (mag: 3) + f.SquareVal(&e) // F = E^2 (mag: 1) + x3.Set(&d).MulInt(2).Negate(16) // X3 = -(2*D) (mag: 17) + x3.Add(&f) // X3 = F+X3 (mag: 18) + f.Set(x3).Negate(18).Add(&d).Normalize() // F = D-X3 (mag: 1) + y3.Set(&c).MulInt(8).Negate(8) // Y3 = -(8*C) (mag: 9) + y3.Add(f.Mul(&e)) // Y3 = E*F+Y3 (mag: 10) + + // Normalize the field values back to a magnitude of 1. + x3.Normalize() + y3.Normalize() + z3.Normalize() +} + +// doubleJacobian doubles the passed Jacobian point (x1, y1, z1) and stores the +// result in (x3, y3, z3). +func (curve *KoblitzCurve) doubleJacobian(x1, y1, z1, x3, y3, z3 *fieldVal) { + // Doubling a point at infinity is still infinity. + if y1.IsZero() || z1.IsZero() { + x3.SetInt(0) + y3.SetInt(0) + z3.SetInt(0) + return + } + + // Slightly faster point doubling can be achieved when the z value is 1 + // by avoiding the multiplication on the z value. This section calls + // a point doubling function which is accelerated by using that + // assumption when possible. + if z1.Normalize().Equals(fieldOne) { + curve.doubleZ1EqualsOne(x1, y1, x3, y3, z3) + return + } + + // Fall back to generic point doubling which works with arbitrary z + // values. + curve.doubleGeneric(x1, y1, z1, x3, y3, z3) +} + +// Double returns 2*(x1,y1). Part of the elliptic.Curve interface. +func (curve *KoblitzCurve) Double(x1, y1 *big.Int) (*big.Int, *big.Int) { + if y1.Sign() == 0 { + return new(big.Int), new(big.Int) + } + + // Convert the affine coordinates from big integers to field values + // and do the point doubling in Jacobian projective space. + fx1, fy1 := curve.bigAffineToField(x1, y1) + fx3, fy3, fz3 := new(fieldVal), new(fieldVal), new(fieldVal) + fOne := new(fieldVal).SetInt(1) + curve.doubleJacobian(fx1, fy1, fOne, fx3, fy3, fz3) + + // Convert the Jacobian coordinate field values back to affine big + // integers. + return curve.fieldJacobianToBigAffine(fx3, fy3, fz3) +} + +// splitK returns a balanced length-two representation of k and their signs. +// This is algorithm 3.74 from [GECC]. +// +// One thing of note about this algorithm is that no matter what c1 and c2 are, +// the final equation of k = k1 + k2 * lambda (mod n) will hold. This is +// provable mathematically due to how a1/b1/a2/b2 are computed. +// +// c1 and c2 are chosen to minimize the max(k1,k2). +func (curve *KoblitzCurve) splitK(k []byte) ([]byte, []byte, int, int) { + // All math here is done with big.Int, which is slow. + // At some point, it might be useful to write something similar to + // fieldVal but for N instead of P as the prime field if this ends up + // being a bottleneck. + bigIntK := new(big.Int) + c1, c2 := new(big.Int), new(big.Int) + tmp1, tmp2 := new(big.Int), new(big.Int) + k1, k2 := new(big.Int), new(big.Int) + + bigIntK.SetBytes(k) + // c1 = round(b2 * k / n) from step 4. + // Rounding isn't really necessary and costs too much, hence skipped + c1.Mul(curve.b2, bigIntK) + c1.Div(c1, curve.N) + // c2 = round(b1 * k / n) from step 4 (sign reversed to optimize one step) + // Rounding isn't really necessary and costs too much, hence skipped + c2.Mul(curve.b1, bigIntK) + c2.Div(c2, curve.N) + // k1 = k - c1 * a1 - c2 * a2 from step 5 (note c2's sign is reversed) + tmp1.Mul(c1, curve.a1) + tmp2.Mul(c2, curve.a2) + k1.Sub(bigIntK, tmp1) + k1.Add(k1, tmp2) + // k2 = - c1 * b1 - c2 * b2 from step 5 (note c2's sign is reversed) + tmp1.Mul(c1, curve.b1) + tmp2.Mul(c2, curve.b2) + k2.Sub(tmp2, tmp1) + + // Note Bytes() throws out the sign of k1 and k2. This matters + // since k1 and/or k2 can be negative. Hence, we pass that + // back separately. + return k1.Bytes(), k2.Bytes(), k1.Sign(), k2.Sign() +} + +// moduloReduce reduces k from more than 32 bytes to 32 bytes and under. This +// is done by doing a simple modulo curve.N. We can do this since G^N = 1 and +// thus any other valid point on the elliptic curve has the same order. +func (curve *KoblitzCurve) moduloReduce(k []byte) []byte { + // Since the order of G is curve.N, we can use a much smaller number + // by doing modulo curve.N + if len(k) > curve.byteSize { + // Reduce k by performing modulo curve.N. + tmpK := new(big.Int).SetBytes(k) + tmpK.Mod(tmpK, curve.N) + return tmpK.Bytes() + } + + return k +} + +// NAF takes a positive integer k and returns the Non-Adjacent Form (NAF) as two +// byte slices. The first is where 1s will be. The second is where -1s will +// be. NAF is convenient in that on average, only 1/3rd of its values are +// non-zero. This is algorithm 3.30 from [GECC]. +// +// Essentially, this makes it possible to minimize the number of operations +// since the resulting ints returned will be at least 50% 0s. +func NAF(k []byte) ([]byte, []byte) { + // The essence of this algorithm is that whenever we have consecutive 1s + // in the binary, we want to put a -1 in the lowest bit and get a bunch + // of 0s up to the highest bit of consecutive 1s. This is due to this + // identity: + // 2^n + 2^(n-1) + 2^(n-2) + ... + 2^(n-k) = 2^(n+1) - 2^(n-k) + // + // The algorithm thus may need to go 1 more bit than the length of the + // bits we actually have, hence bits being 1 bit longer than was + // necessary. Since we need to know whether adding will cause a carry, + // we go from right-to-left in this addition. + var carry, curIsOne, nextIsOne bool + // these default to zero + retPos := make([]byte, len(k)+1) + retNeg := make([]byte, len(k)+1) + for i := len(k) - 1; i >= 0; i-- { + curByte := k[i] + for j := uint(0); j < 8; j++ { + curIsOne = curByte&1 == 1 + if j == 7 { + if i == 0 { + nextIsOne = false + } else { + nextIsOne = k[i-1]&1 == 1 + } + } else { + nextIsOne = curByte&2 == 2 + } + if carry { + if curIsOne { + // This bit is 1, so continue to carry + // and don't need to do anything. + } else { + // We've hit a 0 after some number of + // 1s. + if nextIsOne { + // Start carrying again since + // a new sequence of 1s is + // starting. + retNeg[i+1] += 1 << j + } else { + // Stop carrying since 1s have + // stopped. + carry = false + retPos[i+1] += 1 << j + } + } + } else if curIsOne { + if nextIsOne { + // If this is the start of at least 2 + // consecutive 1s, set the current one + // to -1 and start carrying. + retNeg[i+1] += 1 << j + carry = true + } else { + // This is a singleton, not consecutive + // 1s. + retPos[i+1] += 1 << j + } + } + curByte >>= 1 + } + } + if carry { + retPos[0] = 1 + } + + return retPos, retNeg +} + +// ScalarMult returns k*(Bx, By) where k is a big endian integer. +// Part of the elliptic.Curve interface. +func (curve *KoblitzCurve) ScalarMult(Bx, By *big.Int, k []byte) (*big.Int, *big.Int) { + // Point Q = ∞ (point at infinity). + qx, qy, qz := new(fieldVal), new(fieldVal), new(fieldVal) + + // Decompose K into k1 and k2 in order to halve the number of EC ops. + // See Algorithm 3.74 in [GECC]. + k1, k2, signK1, signK2 := curve.splitK(curve.moduloReduce(k)) + + // The main equation here to remember is: + // k * P = k1 * P + k2 * ϕ(P) + // + // P1 below is P in the equation, P2 below is ϕ(P) in the equation + p1x, p1y := curve.bigAffineToField(Bx, By) + p1yNeg := new(fieldVal).NegateVal(p1y, 1) + p1z := new(fieldVal).SetInt(1) + + // NOTE: ϕ(x,y) = (βx,y). The Jacobian z coordinate is 1, so this math + // goes through. + p2x := new(fieldVal).Mul2(p1x, curve.beta) + p2y := new(fieldVal).Set(p1y) + p2yNeg := new(fieldVal).NegateVal(p2y, 1) + p2z := new(fieldVal).SetInt(1) + + // Flip the positive and negative values of the points as needed + // depending on the signs of k1 and k2. As mentioned in the equation + // above, each of k1 and k2 are multiplied by the respective point. + // Since -k * P is the same thing as k * -P, and the group law for + // elliptic curves states that P(x, y) = -P(x, -y), it's faster and + // simplifies the code to just make the point negative. + if signK1 == -1 { + p1y, p1yNeg = p1yNeg, p1y + } + if signK2 == -1 { + p2y, p2yNeg = p2yNeg, p2y + } + + // NAF versions of k1 and k2 should have a lot more zeros. + // + // The Pos version of the bytes contain the +1s and the Neg versions + // contain the -1s. + k1PosNAF, k1NegNAF := NAF(k1) + k2PosNAF, k2NegNAF := NAF(k2) + k1Len := len(k1PosNAF) + k2Len := len(k2PosNAF) + + m := k1Len + if m < k2Len { + m = k2Len + } + + // Add left-to-right using the NAF optimization. See algorithm 3.77 + // from [GECC]. This should be faster overall since there will be a lot + // more instances of 0, hence reducing the number of Jacobian additions + // at the cost of 1 possible extra doubling. + var k1BytePos, k1ByteNeg, k2BytePos, k2ByteNeg byte + for i := 0; i < m; i++ { + // Since we're going left-to-right, pad the front with 0s. + if i < m-k1Len { + k1BytePos = 0 + k1ByteNeg = 0 + } else { + k1BytePos = k1PosNAF[i-(m-k1Len)] + k1ByteNeg = k1NegNAF[i-(m-k1Len)] + } + if i < m-k2Len { + k2BytePos = 0 + k2ByteNeg = 0 + } else { + k2BytePos = k2PosNAF[i-(m-k2Len)] + k2ByteNeg = k2NegNAF[i-(m-k2Len)] + } + + for j := 7; j >= 0; j-- { + // Q = 2 * Q + curve.doubleJacobian(qx, qy, qz, qx, qy, qz) + + if k1BytePos&0x80 == 0x80 { + curve.addJacobian(qx, qy, qz, p1x, p1y, p1z, + qx, qy, qz) + } else if k1ByteNeg&0x80 == 0x80 { + curve.addJacobian(qx, qy, qz, p1x, p1yNeg, p1z, + qx, qy, qz) + } + + if k2BytePos&0x80 == 0x80 { + curve.addJacobian(qx, qy, qz, p2x, p2y, p2z, + qx, qy, qz) + } else if k2ByteNeg&0x80 == 0x80 { + curve.addJacobian(qx, qy, qz, p2x, p2yNeg, p2z, + qx, qy, qz) + } + k1BytePos <<= 1 + k1ByteNeg <<= 1 + k2BytePos <<= 1 + k2ByteNeg <<= 1 + } + } + + // Convert the Jacobian coordinate field values back to affine big.Ints. + return curve.fieldJacobianToBigAffine(qx, qy, qz) +} + +// ScalarBaseMult returns k*G where G is the base point of the group and k is a +// big endian integer. +// Part of the elliptic.Curve interface. +func (curve *KoblitzCurve) ScalarBaseMult(k []byte) (*big.Int, *big.Int) { + newK := curve.moduloReduce(k) + diff := len(curve.bytePoints) - len(newK) + + // Point Q = ∞ (point at infinity). + qx, qy, qz := new(fieldVal), new(fieldVal), new(fieldVal) + + // curve.bytePoints has all 256 byte points for each 8-bit window. The + // strategy is to add up the byte points. This is best understood by + // expressing k in base-256 which it already sort of is. + // Each "digit" in the 8-bit window can be looked up using bytePoints + // and added together. + for i, byteVal := range newK { + p := curve.bytePoints[diff+i][byteVal] + curve.addJacobian(qx, qy, qz, &p[0], &p[1], &p[2], qx, qy, qz) + } + return curve.fieldJacobianToBigAffine(qx, qy, qz) +} + +// QPlus1Div4 returns the Q+1/4 constant for the curve for use in calculating +// square roots via exponention. +func (curve *KoblitzCurve) QPlus1Div4() *big.Int { + return curve.q +} + +var initonce sync.Once +var secp256k1 KoblitzCurve + +func initAll() { + initS256() +} + +// fromHex converts the passed hex string into a big integer pointer and will +// panic is there is an error. This is only provided for the hard-coded +// constants so errors in the source code can bet detected. It will only (and +// must only) be called for initialization purposes. +func fromHex(s string) *big.Int { + r, ok := new(big.Int).SetString(s, 16) + if !ok { + panic("invalid hex in source file: " + s) + } + return r +} + +func initS256() { + // Curve parameters taken from [SECG] section 2.4.1. + secp256k1.CurveParams = new(elliptic.CurveParams) + secp256k1.P = fromHex("FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFEFFFFFC2F") + secp256k1.N = fromHex("FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFEBAAEDCE6AF48A03BBFD25E8CD0364141") + secp256k1.B = fromHex("0000000000000000000000000000000000000000000000000000000000000007") + secp256k1.Gx = fromHex("79BE667EF9DCBBAC55A06295CE870B07029BFCDB2DCE28D959F2815B16F81798") + secp256k1.Gy = fromHex("483ADA7726A3C4655DA4FBFC0E1108A8FD17B448A68554199C47D08FFB10D4B8") + secp256k1.BitSize = 256 + secp256k1.H = 1 + secp256k1.q = new(big.Int).Div(new(big.Int).Add(secp256k1.P, + big.NewInt(1)), big.NewInt(4)) + + // Provided for convenience since this gets computed repeatedly. + secp256k1.byteSize = secp256k1.BitSize / 8 + + // Deserialize and set the pre-computed table used to accelerate scalar + // base multiplication. This is hard-coded data, so any errors are + // panics because it means something is wrong in the source code. + if err := loadS256BytePoints(); err != nil { + panic(err) + } + + // Next 6 constants are from Hal Finney's bitcointalk.org post: + // https://bitcointalk.org/index.php?topic=3238.msg45565#msg45565 + // May he rest in peace. + // + // They have also been independently derived from the code in the + // EndomorphismVectors function in gensecp256k1.go. + secp256k1.lambda = fromHex("5363AD4CC05C30E0A5261C028812645A122E22EA20816678DF02967C1B23BD72") + secp256k1.beta = new(fieldVal).SetHex("7AE96A2B657C07106E64479EAC3434E99CF0497512F58995C1396C28719501EE") + secp256k1.a1 = fromHex("3086D221A7D46BCDE86C90E49284EB15") + secp256k1.b1 = fromHex("-E4437ED6010E88286F547FA90ABFE4C3") + secp256k1.a2 = fromHex("114CA50F7A8E2F3F657C1108D9D44CFD8") + secp256k1.b2 = fromHex("3086D221A7D46BCDE86C90E49284EB15") + + // Alternatively, we can use the parameters below, however, they seem + // to be about 8% slower. + // secp256k1.lambda = fromHex("AC9C52B33FA3CF1F5AD9E3FD77ED9BA4A880B9FC8EC739C2E0CFC810B51283CE") + // secp256k1.beta = new(fieldVal).SetHex("851695D49A83F8EF919BB86153CBCB16630FB68AED0A766A3EC693D68E6AFA40") + // secp256k1.a1 = fromHex("E4437ED6010E88286F547FA90ABFE4C3") + // secp256k1.b1 = fromHex("-3086D221A7D46BCDE86C90E49284EB15") + // secp256k1.a2 = fromHex("3086D221A7D46BCDE86C90E49284EB15") + // secp256k1.b2 = fromHex("114CA50F7A8E2F3F657C1108D9D44CFD8") +} + +// S256 returns a Curve which implements secp256k1. +func S256() *KoblitzCurve { + initonce.Do(initAll) + return &secp256k1 +} |