mirror of
https://source.quilibrium.com/quilibrium/ceremonyclient.git
synced 2024-12-27 17:15:18 +00:00
169 lines
4.0 KiB
Go
169 lines
4.0 KiB
Go
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//
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// Copyright Coinbase, Inc. All Rights Reserved.
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//
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// SPDX-License-Identifier: Apache-2.0
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//
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package camshoup
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import (
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"fmt"
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"math/big"
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"git.sr.ht/~sircmpwn/go-bare"
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mod "source.quilibrium.com/quilibrium/monorepo/nekryptology/pkg/core"
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)
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type encryptionKeyMarshal struct {
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Y1 [][]byte `bare:"y1"`
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Y2 []byte `bare:"y2"`
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Y3 []byte `bare:"y3"`
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Group []byte `bare:"group"`
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}
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// EncryptionKey encrypts a message to a ciphertext from which
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// zero-knowledge proofs can be derived
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// as described in section 3.2 in <https://shoup.net/papers/verenc.pdf>.
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// n, g are stored in the `PaillierGroup` struct
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type EncryptionKey struct {
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y1 []*big.Int
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y2, y3 *big.Int
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group *PaillierGroup
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}
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func NewKeys(numMsgs uint, group *PaillierGroup) (*EncryptionKey, *DecryptionKey, error) {
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if numMsgs < 1 {
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return nil, nil, fmt.Errorf("number of messages should be greater than 0")
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}
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x1 := make([]*big.Int, numMsgs)
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y1 := make([]*big.Int, numMsgs)
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for i := range x1 {
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x, err := mod.Rand(group.n2d4)
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if err != nil {
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return nil, nil, err
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}
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x1[i] = x
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y1[i] = group.Gexp(x)
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}
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x2, err := mod.Rand(group.n2d4)
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if err != nil {
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return nil, nil, err
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}
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y2 := group.Gexp(x2)
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x3, err := mod.Rand(group.n2d4)
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if err != nil {
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return nil, nil, err
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}
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y3 := group.Gexp(x3)
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dk := &DecryptionKey{
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x1, x2, x3, group,
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}
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ek := &EncryptionKey{
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y1, y2, y3, group,
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}
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return ek, dk, nil
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}
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// MarshalBinary serializes a key to bytes
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func (ek EncryptionKey) MarshalBinary() ([]byte, error) {
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tv := new(encryptionKeyMarshal)
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var err error
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tv.Group, err = ek.group.MarshalBinary()
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if err != nil {
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return nil, err
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}
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tv.Y3 = ek.y3.Bytes()
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tv.Y2 = ek.y2.Bytes()
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tv.Y1 = make([][]byte, len(ek.y1))
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for i, y := range ek.y1 {
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tv.Y1[i] = y.Bytes()
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}
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return bare.Marshal(tv)
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}
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// UnmarshalBinary deserializes a key from bytes
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func (ek *EncryptionKey) UnmarshalBinary(data []byte) error {
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tv := new(encryptionKeyMarshal)
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err := bare.Unmarshal(data, tv)
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if err != nil {
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return err
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}
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ek.group = new(PaillierGroup)
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err = ek.group.UnmarshalBinary(tv.Group)
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if err != nil {
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return err
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}
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ek.y2 = new(big.Int).SetBytes(tv.Y2)
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ek.y3 = new(big.Int).SetBytes(tv.Y3)
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ek.y1 = make([]*big.Int, len(tv.Y1))
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for i, b := range tv.Y1 {
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ek.y1[i] = new(big.Int).SetBytes(b)
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}
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return nil
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}
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// Encrypt multiple messages as described in <https://shoup.net/papers/verenc.pdf>
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// `domain` represents a domain separation tag or nonce
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func (ek EncryptionKey) Encrypt(domain []byte, msgs []*big.Int) (*CipherText, error) {
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if len(msgs) > len(ek.y1) {
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return nil, fmt.Errorf("number of messages %d is more than supported by this key %d", len(msgs), len(ek.y1))
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}
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for i, m := range msgs {
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if m == nil || m.Cmp(ek.group.n) == 1 {
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return nil, fmt.Errorf("message %d is not valid", i)
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}
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}
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r, err := ek.group.RandForEncrypt()
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if err != nil {
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return nil, err
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}
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return ek.encryptWithR(domain, msgs, r)
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}
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func (ek EncryptionKey) encryptWithR(domain []byte, msgs []*big.Int, r *big.Int) (*CipherText, error) {
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u := ek.computeU(r)
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e := ek.computeE(msgs, r)
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hs, err := ek.group.Hash(u, e, domain)
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if err != nil {
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return nil, err
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}
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v := ek.computeV(r, hs, true)
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return &CipherText{u, v, e}, nil
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}
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func (ek EncryptionKey) computeE(msgs []*big.Int, r *big.Int) []*big.Int {
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e := make([]*big.Int, len(msgs))
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for i, m := range msgs {
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y := ek.group.Exp(ek.y1[i], r)
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hM := ek.group.Hexp(m)
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e[i] = ek.group.Mul(y, hM)
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}
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return e
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}
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func (ek EncryptionKey) computeU(r *big.Int) *big.Int {
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return ek.group.Gexp(r)
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}
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// computeV computes the `v` value during encryption
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// abs is present for code reuse as during the proof of encryption
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// in the commitment step absolute value is not taken.
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func (ek EncryptionKey) computeV(r, hash *big.Int, abs bool) *big.Int {
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// y3 ^ h(u, e, L)
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y3hs := ek.group.Exp(ek.y3, hash)
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// y2 * (y3^h(u, e, L))
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y2y3hs := ek.group.Mul(ek.y2, y3hs)
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// (y2y3^h(u, e, L))^r
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y2y3hsr := ek.group.Exp(y2y3hs, r)
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if abs {
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return ek.group.Abs(y2y3hsr)
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} else {
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return y2y3hsr
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}
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}
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