Official Go implementation of the Ethereum protocol
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go-ethereum/crypto/bn256/cloudflare/bn256.go

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11 KiB

// Package bn256 implements a particular bilinear group at the 128-bit security
// level.
//
// Bilinear groups are the basis of many of the new cryptographic protocols that
// have been proposed over the past decade. They consist of a triplet of groups
// (G₁, G₂ and GT) such that there exists a function e(g₁ˣ,g₂ʸ)=gTˣʸ (where gₓ
// is a generator of the respective group). That function is called a pairing
// function.
//
// This package specifically implements the Optimal Ate pairing over a 256-bit
// Barreto-Naehrig curve as described in
// http://cryptojedi.org/papers/dclxvi-20100714.pdf. Its output is compatible
// with the implementation described in that paper.
package bn256
import (
"crypto/rand"
"errors"
"io"
"math/big"
)
func randomK(r io.Reader) (k *big.Int, err error) {
for {
k, err = rand.Int(r, Order)
if err != nil || k.Sign() > 0 {
return
}
}
}
// G1 is an abstract cyclic group. The zero value is suitable for use as the
// output of an operation, but cannot be used as an input.
type G1 struct {
p *curvePoint
}
// RandomG1 returns x and g₁ˣ where x is a random, non-zero number read from r.
func RandomG1(r io.Reader) (*big.Int, *G1, error) {
k, err := randomK(r)
if err != nil {
return nil, nil, err
}
return k, new(G1).ScalarBaseMult(k), nil
}
func (g *G1) String() string {
return "bn256.G1" + g.p.String()
}
// ScalarBaseMult sets e to g*k where g is the generator of the group and then
// returns e.
func (e *G1) ScalarBaseMult(k *big.Int) *G1 {
if e.p == nil {
e.p = &curvePoint{}
}
e.p.Mul(curveGen, k)
return e
}
// ScalarMult sets e to a*k and then returns e.
func (e *G1) ScalarMult(a *G1, k *big.Int) *G1 {
if e.p == nil {
e.p = &curvePoint{}
}
e.p.Mul(a.p, k)
return e
}
// Add sets e to a+b and then returns e.
func (e *G1) Add(a, b *G1) *G1 {
if e.p == nil {
e.p = &curvePoint{}
}
e.p.Add(a.p, b.p)
return e
}
// Neg sets e to -a and then returns e.
func (e *G1) Neg(a *G1) *G1 {
if e.p == nil {
e.p = &curvePoint{}
}
e.p.Neg(a.p)
return e
}
// Set sets e to a and then returns e.
func (e *G1) Set(a *G1) *G1 {
if e.p == nil {
e.p = &curvePoint{}
}
e.p.Set(a.p)
return e
}
// Marshal converts e to a byte slice.
func (e *G1) Marshal() []byte {
// Each value is a 256-bit number.
const numBytes = 256 / 8
if e.p == nil {
e.p = &curvePoint{}
}
e.p.MakeAffine()
ret := make([]byte, numBytes*2)
if e.p.IsInfinity() {
return ret
}
temp := &gfP{}
montDecode(temp, &e.p.x)
temp.Marshal(ret)
montDecode(temp, &e.p.y)
temp.Marshal(ret[numBytes:])
return ret
}
// Unmarshal sets e to the result of converting the output of Marshal back into
// a group element and then returns e.
func (e *G1) Unmarshal(m []byte) ([]byte, error) {
// Each value is a 256-bit number.
const numBytes = 256 / 8
if len(m) < 2*numBytes {
return nil, errors.New("bn256: not enough data")
}
// Unmarshal the points and check their caps
if e.p == nil {
e.p = &curvePoint{}
} else {
e.p.x, e.p.y = gfP{0}, gfP{0}
}
var err error
if err = e.p.x.Unmarshal(m); err != nil {
return nil, err
}
if err = e.p.y.Unmarshal(m[numBytes:]); err != nil {
return nil, err
}
// Encode into Montgomery form and ensure it's on the curve
montEncode(&e.p.x, &e.p.x)
montEncode(&e.p.y, &e.p.y)
zero := gfP{0}
if e.p.x == zero && e.p.y == zero {
// This is the point at infinity.
e.p.y = *newGFp(1)
e.p.z = gfP{0}
e.p.t = gfP{0}
} else {
e.p.z = *newGFp(1)
e.p.t = *newGFp(1)
if !e.p.IsOnCurve() {
return nil, errors.New("bn256: malformed point")
}
}
return m[2*numBytes:], nil
}
// G2 is an abstract cyclic group. The zero value is suitable for use as the
// output of an operation, but cannot be used as an input.
type G2 struct {
p *twistPoint
}
// RandomG2 returns x and g₂ˣ where x is a random, non-zero number read from r.
func RandomG2(r io.Reader) (*big.Int, *G2, error) {
k, err := randomK(r)
if err != nil {
return nil, nil, err
}
return k, new(G2).ScalarBaseMult(k), nil
}
func (e *G2) String() string {
return "bn256.G2" + e.p.String()
}
// ScalarBaseMult sets e to g*k where g is the generator of the group and then
// returns out.
func (e *G2) ScalarBaseMult(k *big.Int) *G2 {
if e.p == nil {
e.p = &twistPoint{}
}
e.p.Mul(twistGen, k)
return e
}
// ScalarMult sets e to a*k and then returns e.
func (e *G2) ScalarMult(a *G2, k *big.Int) *G2 {
if e.p == nil {
e.p = &twistPoint{}
}
e.p.Mul(a.p, k)
return e
}
// Add sets e to a+b and then returns e.
func (e *G2) Add(a, b *G2) *G2 {
if e.p == nil {
e.p = &twistPoint{}
}
e.p.Add(a.p, b.p)
return e
}
// Neg sets e to -a and then returns e.
func (e *G2) Neg(a *G2) *G2 {
if e.p == nil {
e.p = &twistPoint{}
}
e.p.Neg(a.p)
return e
}
// Set sets e to a and then returns e.
func (e *G2) Set(a *G2) *G2 {
if e.p == nil {
e.p = &twistPoint{}
}
e.p.Set(a.p)
return e
}
// Marshal converts e into a byte slice.
func (e *G2) Marshal() []byte {
// Each value is a 256-bit number.
const numBytes = 256 / 8
if e.p == nil {
e.p = &twistPoint{}
}
e.p.MakeAffine()
ret := make([]byte, numBytes*4)
if e.p.IsInfinity() {
return ret
}
temp := &gfP{}
montDecode(temp, &e.p.x.x)
temp.Marshal(ret)
montDecode(temp, &e.p.x.y)
temp.Marshal(ret[numBytes:])
montDecode(temp, &e.p.y.x)
temp.Marshal(ret[2*numBytes:])
montDecode(temp, &e.p.y.y)
temp.Marshal(ret[3*numBytes:])
return ret
}
// Unmarshal sets e to the result of converting the output of Marshal back into
// a group element and then returns e.
func (e *G2) Unmarshal(m []byte) ([]byte, error) {
// Each value is a 256-bit number.
const numBytes = 256 / 8
if len(m) < 4*numBytes {
return nil, errors.New("bn256: not enough data")
}
// Unmarshal the points and check their caps
if e.p == nil {
e.p = &twistPoint{}
}
var err error
if err = e.p.x.x.Unmarshal(m); err != nil {
return nil, err
}
if err = e.p.x.y.Unmarshal(m[numBytes:]); err != nil {
return nil, err
}
if err = e.p.y.x.Unmarshal(m[2*numBytes:]); err != nil {
return nil, err
}
if err = e.p.y.y.Unmarshal(m[3*numBytes:]); err != nil {
return nil, err
}
// Encode into Montgomery form and ensure it's on the curve
montEncode(&e.p.x.x, &e.p.x.x)
montEncode(&e.p.x.y, &e.p.x.y)
montEncode(&e.p.y.x, &e.p.y.x)
montEncode(&e.p.y.y, &e.p.y.y)
if e.p.x.IsZero() && e.p.y.IsZero() {
// This is the point at infinity.
e.p.y.SetOne()
e.p.z.SetZero()
e.p.t.SetZero()
} else {
e.p.z.SetOne()
e.p.t.SetOne()
if !e.p.IsOnCurve() {
return nil, errors.New("bn256: malformed point")
}
}
return m[4*numBytes:], nil
}
// GT is an abstract cyclic group. The zero value is suitable for use as the
// output of an operation, but cannot be used as an input.
type GT struct {
p *gfP12
}
// Pair calculates an Optimal Ate pairing.
func Pair(g1 *G1, g2 *G2) *GT {
return &GT{optimalAte(g2.p, g1.p)}
}
// PairingCheck calculates the Optimal Ate pairing for a set of points.
func PairingCheck(a []*G1, b []*G2) bool {
acc := new(gfP12)
acc.SetOne()
for i := 0; i < len(a); i++ {
if a[i].p.IsInfinity() || b[i].p.IsInfinity() {
continue
}
acc.Mul(acc, miller(b[i].p, a[i].p))
}
return finalExponentiation(acc).IsOne()
}
// Miller applies Miller's algorithm, which is a bilinear function from the
// source groups to F_p^12. Miller(g1, g2).Finalize() is equivalent to Pair(g1,
// g2).
func Miller(g1 *G1, g2 *G2) *GT {
return &GT{miller(g2.p, g1.p)}
}
func (g *GT) String() string {
return "bn256.GT" + g.p.String()
}
// ScalarMult sets e to a*k and then returns e.
func (e *GT) ScalarMult(a *GT, k *big.Int) *GT {
if e.p == nil {
e.p = &gfP12{}
}
e.p.Exp(a.p, k)
return e
}
// Add sets e to a+b and then returns e.
func (e *GT) Add(a, b *GT) *GT {
if e.p == nil {
e.p = &gfP12{}
}
e.p.Mul(a.p, b.p)
return e
}
// Neg sets e to -a and then returns e.
func (e *GT) Neg(a *GT) *GT {
if e.p == nil {
e.p = &gfP12{}
}
e.p.Conjugate(a.p)
return e
}
// Set sets e to a and then returns e.
func (e *GT) Set(a *GT) *GT {
if e.p == nil {
e.p = &gfP12{}
}
e.p.Set(a.p)
return e
}
// Finalize is a linear function from F_p^12 to GT.
func (e *GT) Finalize() *GT {
ret := finalExponentiation(e.p)
e.p.Set(ret)
return e
}
// Marshal converts e into a byte slice.
func (e *GT) Marshal() []byte {
// Each value is a 256-bit number.
const numBytes = 256 / 8
if e.p == nil {
e.p = &gfP12{}
e.p.SetOne()
}
ret := make([]byte, numBytes*12)
temp := &gfP{}
montDecode(temp, &e.p.x.x.x)
temp.Marshal(ret)
montDecode(temp, &e.p.x.x.y)
temp.Marshal(ret[numBytes:])
montDecode(temp, &e.p.x.y.x)
temp.Marshal(ret[2*numBytes:])
montDecode(temp, &e.p.x.y.y)
temp.Marshal(ret[3*numBytes:])
montDecode(temp, &e.p.x.z.x)
temp.Marshal(ret[4*numBytes:])
montDecode(temp, &e.p.x.z.y)
temp.Marshal(ret[5*numBytes:])
montDecode(temp, &e.p.y.x.x)
temp.Marshal(ret[6*numBytes:])
montDecode(temp, &e.p.y.x.y)
temp.Marshal(ret[7*numBytes:])
montDecode(temp, &e.p.y.y.x)
temp.Marshal(ret[8*numBytes:])
montDecode(temp, &e.p.y.y.y)
temp.Marshal(ret[9*numBytes:])
montDecode(temp, &e.p.y.z.x)
temp.Marshal(ret[10*numBytes:])
montDecode(temp, &e.p.y.z.y)
temp.Marshal(ret[11*numBytes:])
return ret
}
// Unmarshal sets e to the result of converting the output of Marshal back into
// a group element and then returns e.
func (e *GT) Unmarshal(m []byte) ([]byte, error) {
// Each value is a 256-bit number.
const numBytes = 256 / 8
if len(m) < 12*numBytes {
return nil, errors.New("bn256: not enough data")
}
if e.p == nil {
e.p = &gfP12{}
}
var err error
if err = e.p.x.x.x.Unmarshal(m); err != nil {
return nil, err
}
if err = e.p.x.x.y.Unmarshal(m[numBytes:]); err != nil {
return nil, err
}
if err = e.p.x.y.x.Unmarshal(m[2*numBytes:]); err != nil {
return nil, err
}
if err = e.p.x.y.y.Unmarshal(m[3*numBytes:]); err != nil {
return nil, err
}
if err = e.p.x.z.x.Unmarshal(m[4*numBytes:]); err != nil {
return nil, err
}
if err = e.p.x.z.y.Unmarshal(m[5*numBytes:]); err != nil {
return nil, err
}
if err = e.p.y.x.x.Unmarshal(m[6*numBytes:]); err != nil {
return nil, err
}
if err = e.p.y.x.y.Unmarshal(m[7*numBytes:]); err != nil {
return nil, err
}
if err = e.p.y.y.x.Unmarshal(m[8*numBytes:]); err != nil {
return nil, err
}
if err = e.p.y.y.y.Unmarshal(m[9*numBytes:]); err != nil {
return nil, err
}
if err = e.p.y.z.x.Unmarshal(m[10*numBytes:]); err != nil {
return nil, err
}
if err = e.p.y.z.y.Unmarshal(m[11*numBytes:]); err != nil {
return nil, err
}
montEncode(&e.p.x.x.x, &e.p.x.x.x)
montEncode(&e.p.x.x.y, &e.p.x.x.y)
montEncode(&e.p.x.y.x, &e.p.x.y.x)
montEncode(&e.p.x.y.y, &e.p.x.y.y)
montEncode(&e.p.x.z.x, &e.p.x.z.x)
montEncode(&e.p.x.z.y, &e.p.x.z.y)
montEncode(&e.p.y.x.x, &e.p.y.x.x)
montEncode(&e.p.y.x.y, &e.p.y.x.y)
montEncode(&e.p.y.y.x, &e.p.y.y.x)
montEncode(&e.p.y.y.y, &e.p.y.y.y)
montEncode(&e.p.y.z.x, &e.p.y.z.x)
montEncode(&e.p.y.z.y, &e.p.y.z.y)
return m[12*numBytes:], nil
}