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package bn128
import (
"math/big"
"github.com/mottla/go-snark/fields"
)
type G2 struct {
F fields.Fq2
G [3][2]*big.Int
}
func NewG2(f fields.Fq2, g [2][2]*big.Int) G2 {
var g2 G2
g2.F = f
g2.G = [3][2]*big.Int{
g[0],
g[1],
g2.F.One(),
}
return g2
}
func (g2 G2) Zero() [3][2]*big.Int {
return [3][2]*big.Int{g2.F.Zero(), g2.F.One(), g2.F.Zero()}
}
func (g2 G2) IsZero(p [3][2]*big.Int) bool {
return g2.F.IsZero(p[2])
}
func (g2 G2) Add(p1, p2 [3][2]*big.Int) [3][2]*big.Int {
// https://en.wikibooks.org/wiki/Cryptography/Prime_Curve/Jacobian_Coordinates
// https://github.com/zcash/zcash/blob/master/src/snark/libsnark/algebra/curves/alt_bn128/alt_bn128_g2.cpp#L208
// http://hyperelliptic.org/EFD/g2p/auto-code/shortw/jacobian-0/addition/add-2007-bl.op3
if g2.IsZero(p1) {
return p2
}
if g2.IsZero(p2) {
return p1
}
x1 := p1[0]
y1 := p1[1]
z1 := p1[2]
x2 := p2[0]
y2 := p2[1]
z2 := p2[2]
z1z1 := g2.F.Square(z1)
z2z2 := g2.F.Square(z2)
u1 := g2.F.Mul(x1, z2z2)
u2 := g2.F.Mul(x2, z1z1)
t0 := g2.F.Mul(z2, z2z2)
s1 := g2.F.Mul(y1, t0)
t1 := g2.F.Mul(z1, z1z1)
s2 := g2.F.Mul(y2, t1)
h := g2.F.Sub(u2, u1)
t2 := g2.F.Add(h, h)
i := g2.F.Square(t2)
j := g2.F.Mul(h, i)
t3 := g2.F.Sub(s2, s1)
r := g2.F.Add(t3, t3)
v := g2.F.Mul(u1, i)
t4 := g2.F.Square(r)
t5 := g2.F.Add(v, v)
t6 := g2.F.Sub(t4, j)
x3 := g2.F.Sub(t6, t5)
t7 := g2.F.Sub(v, x3)
t8 := g2.F.Mul(s1, j)
t9 := g2.F.Add(t8, t8)
t10 := g2.F.Mul(r, t7)
y3 := g2.F.Sub(t10, t9)
t11 := g2.F.Add(z1, z2)
t12 := g2.F.Square(t11)
t13 := g2.F.Sub(t12, z1z1)
t14 := g2.F.Sub(t13, z2z2)
z3 := g2.F.Mul(t14, h)
return [3][2]*big.Int{x3, y3, z3}
}
func (g2 G2) Neg(p [3][2]*big.Int) [3][2]*big.Int {
return [3][2]*big.Int{
p[0],
g2.F.Neg(p[1]),
p[2],
}
}
func (g2 G2) Sub(a, b [3][2]*big.Int) [3][2]*big.Int {
return g2.Add(a, g2.Neg(b))
}
func (g2 G2) Double(p [3][2]*big.Int) [3][2]*big.Int {
// https://en.wikibooks.org/wiki/Cryptography/Prime_Curve/Jacobian_Coordinates
// http://hyperelliptic.org/EFD/g2p/auto-code/shortw/jacobian-0/doubling/dbl-2009-l.op3
// https://github.com/zcash/zcash/blob/master/src/snark/libsnark/algebra/curves/alt_bn128/alt_bn128_g2.cpp#L325
if g2.IsZero(p) {
return p
}
a := g2.F.Square(p[0])
b := g2.F.Square(p[1])
c := g2.F.Square(b)
t0 := g2.F.Add(p[0], b)
t1 := g2.F.Square(t0)
t2 := g2.F.Sub(t1, a)
t3 := g2.F.Sub(t2, c)
d := g2.F.Double(t3)
e := g2.F.Add(g2.F.Add(a, a), a)
f := g2.F.Square(e)
t4 := g2.F.Double(d)
x3 := g2.F.Sub(f, t4)
t5 := g2.F.Sub(d, x3)
twoC := g2.F.Add(c, c)
fourC := g2.F.Add(twoC, twoC)
t6 := g2.F.Add(fourC, fourC)
t7 := g2.F.Mul(e, t5)
y3 := g2.F.Sub(t7, t6)
t8 := g2.F.Mul(p[1], p[2])
z3 := g2.F.Double(t8)
return [3][2]*big.Int{x3, y3, z3}
}
func (g2 G2) MulScalar(p [3][2]*big.Int, e *big.Int) [3][2]*big.Int {
// https://en.wikipedia.org/wiki/Elliptic_curve_point_multiplication#Double-and-add
q := [3][2]*big.Int{g2.F.Zero(), g2.F.Zero(), g2.F.Zero()}
d := g2.F.F.Copy(e) // d := e
r := p
/*
here are three possible implementations:
*/
/* index decreasing: */
for i := d.BitLen() - 1; i >= 0; i-- {
q = g2.Double(q)
if d.Bit(i) == 1 {
q = g2.Add(q, r)
}
}
/* index increasing: */
// for i := 0; i <= d.BitLen(); i++ {
// if d.Bit(i) == 1 {
// q = g2.Add(q, r)
// }
// r = g2.Double(r)
// }
// foundone := false
// for i := d.BitLen(); i >= 0; i-- {
// if foundone {
// q = g2.Double(q)
// }
// if d.Bit(i) == 1 {
// foundone = true
// q = g2.Add(q, r)
// }
// }
return q
}
func (g2 G2) Affine(p [3][2]*big.Int) [3][2]*big.Int {
if g2.IsZero(p) {
return g2.Zero()
}
zinv := g2.F.Inverse(p[2])
zinv2 := g2.F.Square(zinv)
x := g2.F.Mul(p[0], zinv2)
zinv3 := g2.F.Mul(zinv2, zinv)
y := g2.F.Mul(p[1], zinv3)
return [3][2]*big.Int{
g2.F.Affine(x),
g2.F.Affine(y),
g2.F.One(),
}
}
func (g2 G2) Equal(p1, p2 [3][2]*big.Int) bool {
if g2.IsZero(p1) {
return g2.IsZero(p2)
}
if g2.IsZero(p2) {
return g2.IsZero(p1)
}
z1z1 := g2.F.Square(p1[2])
z2z2 := g2.F.Square(p2[2])
u1 := g2.F.Mul(p1[0], z2z2)
u2 := g2.F.Mul(p2[0], z1z1)
z1cub := g2.F.Mul(p1[2], z1z1)
z2cub := g2.F.Mul(p2[2], z2z2)
s1 := g2.F.Mul(p1[1], z2cub)
s2 := g2.F.Mul(p2[1], z1cub)
return g2.F.Equal(u1, u2) && g2.F.Equal(s1, s2)
}