plugeth/crypto/bls12381/pairing.go

// Copyright 2020 The go-ethereum Authors
// This file is part of the go-ethereum library.
//
// The go-ethereum library is free software: you can redistribute it and/or modify
// it under the terms of the GNU Lesser General Public License as published by
// the Free Software Foundation, either version 3 of the License, or
// (at your option) any later version.
//
// The go-ethereum library is distributed in the hope that it will be useful,
// but WITHOUT ANY WARRANTY; without even the implied warranty of
// MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
// GNU Lesser General Public License for more details.
//
// You should have received a copy of the GNU Lesser General Public License
// along with the go-ethereum library. If not, see <http://www.gnu.org/licenses/>.

package bls12381

type pair struct {
	g1 *PointG1
	g2 *PointG2
}

func newPair(g1 *PointG1, g2 *PointG2) pair {
	return pair{g1, g2}
}

// Engine is BLS12-381 elliptic curve pairing engine
type Engine struct {
	G1   *G1
	G2   *G2
	fp12 *fp12
	fp2  *fp2
	pairingEngineTemp
	pairs []pair
}

// NewPairingEngine creates new pairing engine instance.
func NewPairingEngine() *Engine {
	fp2 := newFp2()
	fp6 := newFp6(fp2)
	fp12 := newFp12(fp6)
	g1 := NewG1()
	g2 := newG2(fp2)
	return &Engine{
		fp2:               fp2,
		fp12:              fp12,
		G1:                g1,
		G2:                g2,
		pairingEngineTemp: newEngineTemp(),
	}
}

type pairingEngineTemp struct {
	t2  [10]*fe2
	t12 [9]fe12
}

func newEngineTemp() pairingEngineTemp {
	t2 := [10]*fe2{}
	for i := 0; i < 10; i++ {
		t2[i] = &fe2{}
	}
	t12 := [9]fe12{}
	return pairingEngineTemp{t2, t12}
}

// AddPair adds a g1, g2 point pair to pairing engine
func (e *Engine) AddPair(g1 *PointG1, g2 *PointG2) *Engine {
	p := newPair(g1, g2)
	if !e.isZero(p) {
		e.affine(p)
		e.pairs = append(e.pairs, p)
	}
	return e
}

// AddPairInv adds a G1, G2 point pair to pairing engine. G1 point is negated.
func (e *Engine) AddPairInv(g1 *PointG1, g2 *PointG2) *Engine {
	e.G1.Neg(g1, g1)
	e.AddPair(g1, g2)
	return e
}

// Reset deletes added pairs.
func (e *Engine) Reset() *Engine {
	e.pairs = []pair{}
	return e
}

func (e *Engine) isZero(p pair) bool {
	return e.G1.IsZero(p.g1) || e.G2.IsZero(p.g2)
}

func (e *Engine) affine(p pair) {
	e.G1.Affine(p.g1)
	e.G2.Affine(p.g2)
}

func (e *Engine) doublingStep(coeff *[3]fe2, r *PointG2) {
	// Adaptation of Formula 3 in https://eprint.iacr.org/2010/526.pdf
	fp2 := e.fp2
	t := e.t2
	fp2.mul(t[0], &r[0], &r[1])
	fp2.mulByFq(t[0], t[0], twoInv)
	fp2.square(t[1], &r[1])
	fp2.square(t[2], &r[2])
	fp2.double(t[7], t[2])
	fp2.add(t[7], t[7], t[2])
	fp2.mulByB(t[3], t[7])
	fp2.double(t[4], t[3])
	fp2.add(t[4], t[4], t[3])
	fp2.add(t[5], t[1], t[4])
	fp2.mulByFq(t[5], t[5], twoInv)
	fp2.add(t[6], &r[1], &r[2])
	fp2.square(t[6], t[6])
	fp2.add(t[7], t[2], t[1])
	fp2.sub(t[6], t[6], t[7])
	fp2.sub(&coeff[0], t[3], t[1])
	fp2.square(t[7], &r[0])
	fp2.sub(t[4], t[1], t[4])
	fp2.mul(&r[0], t[4], t[0])
	fp2.square(t[2], t[3])
	fp2.double(t[3], t[2])
	fp2.add(t[3], t[3], t[2])
	fp2.square(t[5], t[5])
	fp2.sub(&r[1], t[5], t[3])
	fp2.mul(&r[2], t[1], t[6])
	fp2.double(t[0], t[7])
	fp2.add(&coeff[1], t[0], t[7])
	fp2.neg(&coeff[2], t[6])
}

func (e *Engine) additionStep(coeff *[3]fe2, r, q *PointG2) {
	// Algorithm 12 in https://eprint.iacr.org/2010/526.pdf
	fp2 := e.fp2
	t := e.t2
	fp2.mul(t[0], &q[1], &r[2])
	fp2.neg(t[0], t[0])
	fp2.add(t[0], t[0], &r[1])
	fp2.mul(t[1], &q[0], &r[2])
	fp2.neg(t[1], t[1])
	fp2.add(t[1], t[1], &r[0])
	fp2.square(t[2], t[0])
	fp2.square(t[3], t[1])
	fp2.mul(t[4], t[1], t[3])
	fp2.mul(t[2], &r[2], t[2])
	fp2.mul(t[3], &r[0], t[3])
	fp2.double(t[5], t[3])
	fp2.sub(t[5], t[4], t[5])
	fp2.add(t[5], t[5], t[2])
	fp2.mul(&r[0], t[1], t[5])
	fp2.sub(t[2], t[3], t[5])
	fp2.mul(t[2], t[2], t[0])
	fp2.mul(t[3], &r[1], t[4])
	fp2.sub(&r[1], t[2], t[3])
	fp2.mul(&r[2], &r[2], t[4])
	fp2.mul(t[2], t[1], &q[1])
	fp2.mul(t[3], t[0], &q[0])
	fp2.sub(&coeff[0], t[3], t[2])
	fp2.neg(&coeff[1], t[0])
	coeff[2].set(t[1])
}

func (e *Engine) preCompute(ellCoeffs *[68][3]fe2, twistPoint *PointG2) {
	// Algorithm 5 in  https://eprint.iacr.org/2019/077.pdf
	if e.G2.IsZero(twistPoint) {
		return
	}
	r := new(PointG2).Set(twistPoint)
	j := 0
	for i := x.BitLen() - 2; i >= 0; i-- {
		e.doublingStep(&ellCoeffs[j], r)
		if x.Bit(i) != 0 {
			j++
			ellCoeffs[j] = fe6{}
			e.additionStep(&ellCoeffs[j], r, twistPoint)
		}
		j++
	}
}

func (e *Engine) millerLoop(f *fe12) {
	pairs := e.pairs
	ellCoeffs := make([][68][3]fe2, len(pairs))
	for i := 0; i < len(pairs); i++ {
		e.preCompute(&ellCoeffs[i], pairs[i].g2)
	}
	fp12, fp2 := e.fp12, e.fp2
	t := e.t2
	f.one()
	j := 0
	for i := 62; /* x.BitLen() - 2 */ i >= 0; i-- {
		if i != 62 {
			fp12.square(f, f)
		}
		for i := 0; i <= len(pairs)-1; i++ {
			fp2.mulByFq(t[0], &ellCoeffs[i][j][2], &pairs[i].g1[1])
			fp2.mulByFq(t[1], &ellCoeffs[i][j][1], &pairs[i].g1[0])
			fp12.mulBy014Assign(f, &ellCoeffs[i][j][0], t[1], t[0])
		}
		if x.Bit(i) != 0 {
			j++
			for i := 0; i <= len(pairs)-1; i++ {
				fp2.mulByFq(t[0], &ellCoeffs[i][j][2], &pairs[i].g1[1])
				fp2.mulByFq(t[1], &ellCoeffs[i][j][1], &pairs[i].g1[0])
				fp12.mulBy014Assign(f, &ellCoeffs[i][j][0], t[1], t[0])
			}
		}
		j++
	}
	fp12.conjugate(f, f)
}

func (e *Engine) exp(c, a *fe12) {
	fp12 := e.fp12
	fp12.cyclotomicExp(c, a, x)
	fp12.conjugate(c, c)
}

func (e *Engine) finalExp(f *fe12) {
	fp12 := e.fp12
	t := e.t12
	// easy part
	fp12.frobeniusMap(&t[0], f, 6)
	fp12.inverse(&t[1], f)
	fp12.mul(&t[2], &t[0], &t[1])
	t[1].set(&t[2])
	fp12.frobeniusMapAssign(&t[2], 2)
	fp12.mulAssign(&t[2], &t[1])
	fp12.cyclotomicSquare(&t[1], &t[2])
	fp12.conjugate(&t[1], &t[1])
	// hard part
	e.exp(&t[3], &t[2])
	fp12.cyclotomicSquare(&t[4], &t[3])
	fp12.mul(&t[5], &t[1], &t[3])
	e.exp(&t[1], &t[5])
	e.exp(&t[0], &t[1])
	e.exp(&t[6], &t[0])
	fp12.mulAssign(&t[6], &t[4])
	e.exp(&t[4], &t[6])
	fp12.conjugate(&t[5], &t[5])
	fp12.mulAssign(&t[4], &t[5])
	fp12.mulAssign(&t[4], &t[2])
	fp12.conjugate(&t[5], &t[2])
	fp12.mulAssign(&t[1], &t[2])
	fp12.frobeniusMapAssign(&t[1], 3)
	fp12.mulAssign(&t[6], &t[5])
	fp12.frobeniusMapAssign(&t[6], 1)
	fp12.mulAssign(&t[3], &t[0])
	fp12.frobeniusMapAssign(&t[3], 2)
	fp12.mulAssign(&t[3], &t[1])
	fp12.mulAssign(&t[3], &t[6])
	fp12.mul(f, &t[3], &t[4])
}

func (e *Engine) calculate() *fe12 {
	f := e.fp12.one()
	if len(e.pairs) == 0 {
		return f
	}
	e.millerLoop(f)
	e.finalExp(f)
	return f
}

// Check computes pairing and checks if result is equal to one
func (e *Engine) Check() bool {
	return e.calculate().isOne()
}

// Result computes pairing and returns target group element as result.
func (e *Engine) Result() *E {
	r := e.calculate()
	e.Reset()
	return r
}

// GT returns target group instance.
func (e *Engine) GT() *GT {
	return NewGT()
}
core/vm, crypto/bls12381, params: add bls12-381 elliptic curve precompiles (#21018) * crypto: add bls12-381 elliptic curve wrapper * params: add bls12-381 precompile gas parameters * core/vm: add bls12-381 precompiles * core/vm: add bls12-381 precompile tests * go.mod, go.sum: use latest bls12381 lib * core/vm: move point encode/decode functions to base library * crypto/bls12381: introduce bls12-381 library init function * crypto/bls12381: import bls12381 elliptic curve implementation * go.mod, go.sum: remove bls12-381 library * remove unsued frobenious coeffs supress warning for inp that used in asm * add mappings tests for zero inputs fix swu g2 minus z inverse constant * crypto/bls12381: fix typo * crypto/bls12381: better comments for bls12381 constants * crypto/bls12381: swu, use single conditional for e2 * crypto/bls12381: utils, delete empty line * crypto/bls12381: utils, use FromHex for string to big * crypto/bls12381: g1, g2, strict length check for FromBytes * crypto/bls12381: field_element, comparision changes * crypto/bls12381: change swu, isogeny constants with hex values * core/vm: fix point multiplication comments * core/vm: fix multiexp gas calculation and lookup for g1 and g2 * core/vm: simpler imput length check for multiexp and pairing precompiles * core/vm: rm empty multiexp result declarations * crypto/bls12381: remove modulus type definition * crypto/bls12381: use proper init function * crypto/bls12381: get rid of new lines at fatal desciprtions * crypto/bls12-381: fix no-adx assembly multiplication * crypto/bls12-381: remove old config function * crypto/bls12381: update multiplication backend this commit changes mul backend to 6limb eip1962 backend mul assign operations are dropped * core/vm/contracts_tests: externalize test vectors for precompiles * core/vm/contracts_test: externalize failure-cases for precompiles * core/vm: linting * go.mod: tiny up sum file * core/vm: fix goimports linter issues * crypto/bls12381: build tags for plain ASM or ADX implementation Co-authored-by: Martin Holst Swende <martin@swende.se> Co-authored-by: Péter Szilágyi <peterke@gmail.com> 2020-06-03 06:44:32 +00:00			`// Copyright 2020 The go-ethereum Authors`
			`// This file is part of the go-ethereum library.`
			`//`
			`// The go-ethereum library is free software: you can redistribute it and/or modify`
			`// it under the terms of the GNU Lesser General Public License as published by`
			`// the Free Software Foundation, either version 3 of the License, or`
			`// (at your option) any later version.`
			`//`
			`// The go-ethereum library is distributed in the hope that it will be useful,`
			`// but WITHOUT ANY WARRANTY; without even the implied warranty of`
			`// MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the`
			`// GNU Lesser General Public License for more details.`
			`//`
			`// You should have received a copy of the GNU Lesser General Public License`
			`// along with the go-ethereum library. If not, see <http://www.gnu.org/licenses/>.`

			`package bls12381`

			`type pair struct {`
			`g1 *PointG1`
			`g2 *PointG2`
			`}`

			`func newPair(g1 PointG1, g2 PointG2) pair {`
			`return pair{g1, g2}`
			`}`

			`// Engine is BLS12-381 elliptic curve pairing engine`
			`type Engine struct {`
			`G1 *G1`
			`G2 *G2`
			`fp12 *fp12`
			`fp2 *fp2`
			`pairingEngineTemp`
			`pairs []pair`
			`}`

			`// NewPairingEngine creates new pairing engine instance.`
			`func NewPairingEngine() *Engine {`
			`fp2 := newFp2()`
			`fp6 := newFp6(fp2)`
			`fp12 := newFp12(fp6)`
			`g1 := NewG1()`
			`g2 := newG2(fp2)`
			`return &Engine{`
			`fp2: fp2,`
			`fp12: fp12,`
			`G1: g1,`
			`G2: g2,`
			`pairingEngineTemp: newEngineTemp(),`
			`}`
			`}`

			`type pairingEngineTemp struct {`
			`t2 [10]*fe2`
			`t12 [9]fe12`
			`}`

			`func newEngineTemp() pairingEngineTemp {`
			`t2 := [10]*fe2{}`
			`for i := 0; i < 10; i++ {`
			`t2[i] = &fe2{}`
			`}`
			`t12 := [9]fe12{}`
			`return pairingEngineTemp{t2, t12}`
			`}`

			`// AddPair adds a g1, g2 point pair to pairing engine`
			`func (e Engine) AddPair(g1 PointG1, g2 PointG2) Engine {`
			`p := newPair(g1, g2)`
			`if !e.isZero(p) {`
			`e.affine(p)`
			`e.pairs = append(e.pairs, p)`
			`}`
			`return e`
			`}`

			`// AddPairInv adds a G1, G2 point pair to pairing engine. G1 point is negated.`
			`func (e Engine) AddPairInv(g1 PointG1, g2 PointG2) Engine {`
			`e.G1.Neg(g1, g1)`
			`e.AddPair(g1, g2)`
			`return e`
			`}`

			`// Reset deletes added pairs.`
			`func (e Engine) Reset() Engine {`
			`e.pairs = []pair{}`
			`return e`
			`}`

			`func (e *Engine) isZero(p pair) bool {`
			`return e.G1.IsZero(p.g1) \|\| e.G2.IsZero(p.g2)`
			`}`

			`func (e *Engine) affine(p pair) {`
			`e.G1.Affine(p.g1)`
			`e.G2.Affine(p.g2)`
			`}`

			`func (e Engine) doublingStep(coeff [3]fe2, r *PointG2) {`
			`// Adaptation of Formula 3 in https://eprint.iacr.org/2010/526.pdf`
			`fp2 := e.fp2`
			`t := e.t2`
			`fp2.mul(t[0], &r[0], &r[1])`
			`fp2.mulByFq(t[0], t[0], twoInv)`
			`fp2.square(t[1], &r[1])`
			`fp2.square(t[2], &r[2])`
			`fp2.double(t[7], t[2])`
			`fp2.add(t[7], t[7], t[2])`
			`fp2.mulByB(t[3], t[7])`
			`fp2.double(t[4], t[3])`
			`fp2.add(t[4], t[4], t[3])`
			`fp2.add(t[5], t[1], t[4])`
			`fp2.mulByFq(t[5], t[5], twoInv)`
			`fp2.add(t[6], &r[1], &r[2])`
			`fp2.square(t[6], t[6])`
			`fp2.add(t[7], t[2], t[1])`
			`fp2.sub(t[6], t[6], t[7])`
			`fp2.sub(&coeff[0], t[3], t[1])`
			`fp2.square(t[7], &r[0])`
			`fp2.sub(t[4], t[1], t[4])`
			`fp2.mul(&r[0], t[4], t[0])`
			`fp2.square(t[2], t[3])`
			`fp2.double(t[3], t[2])`
			`fp2.add(t[3], t[3], t[2])`
			`fp2.square(t[5], t[5])`
			`fp2.sub(&r[1], t[5], t[3])`
			`fp2.mul(&r[2], t[1], t[6])`
			`fp2.double(t[0], t[7])`
			`fp2.add(&coeff[1], t[0], t[7])`
			`fp2.neg(&coeff[2], t[6])`
			`}`

			`func (e Engine) additionStep(coeff [3]fe2, r, q *PointG2) {`
			`// Algorithm 12 in https://eprint.iacr.org/2010/526.pdf`
			`fp2 := e.fp2`
			`t := e.t2`
			`fp2.mul(t[0], &q[1], &r[2])`
			`fp2.neg(t[0], t[0])`
			`fp2.add(t[0], t[0], &r[1])`
			`fp2.mul(t[1], &q[0], &r[2])`
			`fp2.neg(t[1], t[1])`
			`fp2.add(t[1], t[1], &r[0])`
			`fp2.square(t[2], t[0])`
			`fp2.square(t[3], t[1])`
			`fp2.mul(t[4], t[1], t[3])`
			`fp2.mul(t[2], &r[2], t[2])`
			`fp2.mul(t[3], &r[0], t[3])`
			`fp2.double(t[5], t[3])`
			`fp2.sub(t[5], t[4], t[5])`
			`fp2.add(t[5], t[5], t[2])`
			`fp2.mul(&r[0], t[1], t[5])`
			`fp2.sub(t[2], t[3], t[5])`
			`fp2.mul(t[2], t[2], t[0])`
			`fp2.mul(t[3], &r[1], t[4])`
			`fp2.sub(&r[1], t[2], t[3])`
			`fp2.mul(&r[2], &r[2], t[4])`
			`fp2.mul(t[2], t[1], &q[1])`
			`fp2.mul(t[3], t[0], &q[0])`
			`fp2.sub(&coeff[0], t[3], t[2])`
			`fp2.neg(&coeff[1], t[0])`
			`coeff[2].set(t[1])`
			`}`

			`func (e Engine) preCompute(ellCoeffs [68][3]fe2, twistPoint *PointG2) {`
			`// Algorithm 5 in https://eprint.iacr.org/2019/077.pdf`
			`if e.G2.IsZero(twistPoint) {`
			`return`
			`}`
			`r := new(PointG2).Set(twistPoint)`
			`j := 0`
			`for i := x.BitLen() - 2; i >= 0; i-- {`
			`e.doublingStep(&ellCoeffs[j], r)`
			`if x.Bit(i) != 0 {`
			`j++`
			`ellCoeffs[j] = fe6{}`
			`e.additionStep(&ellCoeffs[j], r, twistPoint)`
			`}`
			`j++`
			`}`
			`}`

			`func (e Engine) millerLoop(f fe12) {`
			`pairs := e.pairs`
			`ellCoeffs := make([][68][3]fe2, len(pairs))`
			`for i := 0; i < len(pairs); i++ {`
			`e.preCompute(&ellCoeffs[i], pairs[i].g2)`
			`}`
			`fp12, fp2 := e.fp12, e.fp2`
			`t := e.t2`
			`f.one()`
			`j := 0`
			`for i := 62; /* x.BitLen() - 2 */ i >= 0; i-- {`
			`if i != 62 {`
			`fp12.square(f, f)`
			`}`
			`for i := 0; i <= len(pairs)-1; i++ {`
			`fp2.mulByFq(t[0], &ellCoeffs[i][j][2], &pairs[i].g1[1])`
			`fp2.mulByFq(t[1], &ellCoeffs[i][j][1], &pairs[i].g1[0])`
			`fp12.mulBy014Assign(f, &ellCoeffs[i][j][0], t[1], t[0])`
			`}`
			`if x.Bit(i) != 0 {`
			`j++`
			`for i := 0; i <= len(pairs)-1; i++ {`
			`fp2.mulByFq(t[0], &ellCoeffs[i][j][2], &pairs[i].g1[1])`
			`fp2.mulByFq(t[1], &ellCoeffs[i][j][1], &pairs[i].g1[0])`
			`fp12.mulBy014Assign(f, &ellCoeffs[i][j][0], t[1], t[0])`
			`}`
			`}`
			`j++`
			`}`
			`fp12.conjugate(f, f)`
			`}`

			`func (e Engine) exp(c, a fe12) {`
			`fp12 := e.fp12`
			`fp12.cyclotomicExp(c, a, x)`
			`fp12.conjugate(c, c)`
			`}`

			`func (e Engine) finalExp(f fe12) {`
			`fp12 := e.fp12`
			`t := e.t12`
			`// easy part`
			`fp12.frobeniusMap(&t[0], f, 6)`
			`fp12.inverse(&t[1], f)`
			`fp12.mul(&t[2], &t[0], &t[1])`
			`t[1].set(&t[2])`
			`fp12.frobeniusMapAssign(&t[2], 2)`
			`fp12.mulAssign(&t[2], &t[1])`
			`fp12.cyclotomicSquare(&t[1], &t[2])`
			`fp12.conjugate(&t[1], &t[1])`
			`// hard part`
			`e.exp(&t[3], &t[2])`
			`fp12.cyclotomicSquare(&t[4], &t[3])`
			`fp12.mul(&t[5], &t[1], &t[3])`
			`e.exp(&t[1], &t[5])`
			`e.exp(&t[0], &t[1])`
			`e.exp(&t[6], &t[0])`
			`fp12.mulAssign(&t[6], &t[4])`
			`e.exp(&t[4], &t[6])`
			`fp12.conjugate(&t[5], &t[5])`
			`fp12.mulAssign(&t[4], &t[5])`
			`fp12.mulAssign(&t[4], &t[2])`
			`fp12.conjugate(&t[5], &t[2])`
			`fp12.mulAssign(&t[1], &t[2])`
			`fp12.frobeniusMapAssign(&t[1], 3)`
			`fp12.mulAssign(&t[6], &t[5])`
			`fp12.frobeniusMapAssign(&t[6], 1)`
			`fp12.mulAssign(&t[3], &t[0])`
			`fp12.frobeniusMapAssign(&t[3], 2)`
			`fp12.mulAssign(&t[3], &t[1])`
			`fp12.mulAssign(&t[3], &t[6])`
			`fp12.mul(f, &t[3], &t[4])`
			`}`

			`func (e Engine) calculate() fe12 {`
			`f := e.fp12.one()`
			`if len(e.pairs) == 0 {`
			`return f`
			`}`
			`e.millerLoop(f)`
			`e.finalExp(f)`
			`return f`
			`}`

			`// Check computes pairing and checks if result is equal to one`
			`func (e *Engine) Check() bool {`
			`return e.calculate().isOne()`
			`}`

			`// Result computes pairing and returns target group element as result.`
			`func (e Engine) Result() E {`
			`r := e.calculate()`
			`e.Reset()`
			`return r`
			`}`

			`// GT returns target group instance.`
			`func (e Engine) GT() GT {`
			`return NewGT()`
			`}`