mirror of
https://github.com/go-gitea/gitea.git
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274149dd14
* Switch to keybase go-crypto (for some elliptic curve key) + test
* Use assert.NoError
and add a little more context to failing test description
* Use assert.(No)Error everywhere 🌈
and assert.Error in place of .Nil/.NotNil
283 lines
7.2 KiB
Go
283 lines
7.2 KiB
Go
package ecdh
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import (
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"bytes"
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"crypto"
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"crypto/aes"
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"crypto/elliptic"
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"encoding/binary"
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"errors"
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"github.com/keybase/go-crypto/curve25519"
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"io"
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"math/big"
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)
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type PublicKey struct {
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elliptic.Curve
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X, Y *big.Int
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}
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type PrivateKey struct {
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PublicKey
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X *big.Int
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}
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// KDF implements Key Derivation Function as described in
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// https://tools.ietf.org/html/rfc6637#section-7
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func (e *PublicKey) KDF(S []byte, kdfParams []byte, hash crypto.Hash) []byte {
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sLen := (e.Curve.Params().P.BitLen() + 7) / 8
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buf := new(bytes.Buffer)
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buf.Write([]byte{0, 0, 0, 1})
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if sLen > len(S) {
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// zero-pad the S. If we got invalid S (bigger than curve's
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// P), we are going to produce invalid key. Garbage in,
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// garbage out.
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buf.Write(make([]byte, sLen-len(S)))
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}
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buf.Write(S)
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buf.Write(kdfParams)
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hashw := hash.New()
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hashw.Write(buf.Bytes())
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key := hashw.Sum(nil)
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return key
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}
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// AESKeyUnwrap implements RFC 3394 Key Unwrapping. See
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// http://tools.ietf.org/html/rfc3394#section-2.2.1
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// Note: The second described algorithm ("index-based") is implemented
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// here.
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func AESKeyUnwrap(key, cipherText []byte) ([]byte, error) {
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if len(cipherText)%8 != 0 {
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return nil, errors.New("cipherText must by a multiple of 64 bits")
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}
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cipher, err := aes.NewCipher(key)
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if err != nil {
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return nil, err
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}
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nblocks := len(cipherText)/8 - 1
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// 1) Initialize variables.
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// - Set A = C[0]
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var A [aes.BlockSize]byte
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copy(A[:8], cipherText[:8])
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// For i = 1 to n
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// Set R[i] = C[i]
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R := make([]byte, len(cipherText)-8)
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copy(R, cipherText[8:])
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// 2) Compute intermediate values.
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for j := 5; j >= 0; j-- {
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for i := nblocks - 1; i >= 0; i-- {
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// B = AES-1(K, (A ^ t) | R[i]) where t = n*j+i
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// A = MSB(64, B)
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t := uint64(nblocks*j + i + 1)
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At := binary.BigEndian.Uint64(A[:8]) ^ t
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binary.BigEndian.PutUint64(A[:8], At)
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copy(A[8:], R[i*8:i*8+8])
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cipher.Decrypt(A[:], A[:])
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// R[i] = LSB(B, 64)
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copy(R[i*8:i*8+8], A[8:])
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}
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}
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// 3) Output results.
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// If A is an appropriate initial value (see 2.2.3),
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for i := 0; i < 8; i++ {
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if A[i] != 0xA6 {
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return nil, errors.New("Failed to unwrap key (A is not IV)")
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}
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}
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return R, nil
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}
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// AESKeyWrap implements RFC 3394 Key Wrapping. See
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// https://tools.ietf.org/html/rfc3394#section-2.2.2
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// Note: The second described algorithm ("index-based") is implemented
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// here.
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func AESKeyWrap(key, plainText []byte) ([]byte, error) {
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if len(plainText)%8 != 0 {
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return nil, errors.New("plainText must be a multiple of 64 bits")
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}
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cipher, err := aes.NewCipher(key) // NewCipher checks key size
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if err != nil {
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return nil, err
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}
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nblocks := len(plainText) / 8
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// 1) Initialize variables.
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var A [aes.BlockSize]byte
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// Section 2.2.3.1 -- Initial Value
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// http://tools.ietf.org/html/rfc3394#section-2.2.3.1
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for i := 0; i < 8; i++ {
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A[i] = 0xA6
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}
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// For i = 1 to n
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// Set R[i] = P[i]
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R := make([]byte, len(plainText))
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copy(R, plainText)
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// 2) Calculate intermediate values.
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for j := 0; j <= 5; j++ {
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for i := 0; i < nblocks; i++ {
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// B = AES(K, A | R[i])
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copy(A[8:], R[i*8:i*8+8])
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cipher.Encrypt(A[:], A[:])
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// (Assume B = A)
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// A = MSB(64, B) ^ t where t = (n*j)+1
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t := uint64(j*nblocks + i + 1)
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At := binary.BigEndian.Uint64(A[:8]) ^ t
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binary.BigEndian.PutUint64(A[:8], At)
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// R[i] = LSB(64, B)
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copy(R[i*8:i*8+8], A[8:])
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}
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}
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// 3) Output results.
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// Set C[0] = A
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// For i = 1 to n
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// C[i] = R[i]
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return append(A[:8], R...), nil
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}
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// PadBuffer pads byte buffer buf to a length being multiple of
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// blockLen. Additional bytes appended to the buffer have value of the
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// number padded bytes. E.g. if the buffer is 3 bytes short of being
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// 40 bytes total, the appended bytes will be [03, 03, 03].
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func PadBuffer(buf []byte, blockLen int) []byte {
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padding := blockLen - (len(buf) % blockLen)
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if padding == 0 {
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return buf
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}
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padBuf := make([]byte, padding)
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for i := 0; i < padding; i++ {
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padBuf[i] = byte(padding)
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}
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return append(buf, padBuf...)
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}
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// UnpadBuffer verifies that buffer contains proper padding and
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// returns buffer without the padding, or nil if the padding was
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// invalid.
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func UnpadBuffer(buf []byte, dataLen int) []byte {
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padding := len(buf) - dataLen
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outBuf := buf[:dataLen]
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for i := dataLen; i < len(buf); i++ {
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if buf[i] != byte(padding) {
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// Invalid padding - bail out
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return nil
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}
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}
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return outBuf
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}
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func (e *PublicKey) Encrypt(random io.Reader, kdfParams []byte, plain []byte, hash crypto.Hash, kdfKeySize int) (Vx *big.Int, Vy *big.Int, C []byte, err error) {
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// Vx, Vy - encryption key
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// Note for Curve 25519 - curve25519 library already does key
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// clamping in scalarMult, so we can use generic random scalar
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// generation from elliptic.
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priv, Vx, Vy, err := elliptic.GenerateKey(e.Curve, random)
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if err != nil {
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return nil, nil, nil, err
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}
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// Sx, Sy - shared secret
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Sx, _ := e.Curve.ScalarMult(e.X, e.Y, priv)
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// Encrypt the payload with KDF-ed S as the encryption key. Pass
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// the ciphertext along with V to the recipient. Recipient can
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// generate S using V and their priv key, and then KDF(S), on
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// their own, to get encryption key and decrypt the ciphertext,
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// revealing encryption key for symmetric encryption later.
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plain = PadBuffer(plain, 8)
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key := e.KDF(Sx.Bytes(), kdfParams, hash)
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// Take only as many bytes from key as the key length (the hash
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// result might be bigger)
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encrypted, err := AESKeyWrap(key[:kdfKeySize], plain)
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return Vx, Vy, encrypted, nil
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}
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func (e *PrivateKey) DecryptShared(X, Y *big.Int) []byte {
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Sx, _ := e.Curve.ScalarMult(X, Y, e.X.Bytes())
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return Sx.Bytes()
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}
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func countBits(buffer []byte) int {
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var headerLen int
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switch buffer[0] {
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case 0x4:
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headerLen = 3
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case 0x40:
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headerLen = 7
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default:
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// Unexpected header - but we can still count the bits.
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val := buffer[0]
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headerLen = 0
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for val > 0 {
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val = val / 2
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headerLen++
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}
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}
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return headerLen + (len(buffer)-1)*8
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}
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// elliptic.Marshal and elliptic.Unmarshal only marshals uncompressed
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// 0x4 MPI types. These functions will check if the curve is cv25519,
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// and if so, use 0x40 compressed type to (un)marshal. Otherwise,
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// elliptic.(Un)marshal will be called.
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// Marshal encodes point into either 0x4 uncompressed point form, or
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// 0x40 compressed point for Curve 25519.
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func Marshal(curve elliptic.Curve, x, y *big.Int) (buf []byte, bitSize int) {
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// NOTE: Read more about MPI encoding in the RFC:
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// https://tools.ietf.org/html/rfc4880#section-3.2
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// We are required to encode size in bits, counting from the most-
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// significant non-zero bit. So assuming that the buffer never
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// starts with 0x00, we only need to count bits in the first byte
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// - and in current implentation it will always be 0x4 or 0x40.
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cv, ok := curve25519.ToCurve25519(curve)
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if ok {
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buf = cv.MarshalType40(x, y)
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} else {
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buf = elliptic.Marshal(curve, x, y)
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}
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return buf, countBits(buf)
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}
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// Unmarshal converts point, serialized by Marshal, into x, y pair.
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// For 0x40 compressed points (for Curve 25519), y will always be 0.
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// It is an error if point is not on the curve, On error, x = nil.
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func Unmarshal(curve elliptic.Curve, data []byte) (x, y *big.Int) {
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cv, ok := curve25519.ToCurve25519(curve)
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if ok {
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return cv.UnmarshalType40(data)
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}
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return elliptic.Unmarshal(curve, data)
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}
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