mirror of
https://github.com/Luzifer/cloudkeys-go.git
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Knut Ahlers
a1df72edc5
commitf0db1ff1f8Author: Knut Ahlers <knut@ahlers.me> Date: Sun Dec 24 12:19:56 2017 +0100 Mark option as deprecated Signed-off-by: Knut Ahlers <knut@ahlers.me> commit9891df2a16Author: Knut Ahlers <knut@ahlers.me> Date: Sun Dec 24 12:11:56 2017 +0100 Fix: Typo Signed-off-by: Knut Ahlers <knut@ahlers.me> commit836006de64Author: Knut Ahlers <knut@ahlers.me> Date: Sun Dec 24 12:04:20 2017 +0100 Add new dependencies Signed-off-by: Knut Ahlers <knut@ahlers.me> commitd64fee60c8Author: Knut Ahlers <knut@ahlers.me> Date: Sun Dec 24 11:55:52 2017 +0100 Replace insecure password hashing Prior this commit passwords were hashed with a static salt and using the SHA1 hashing function. This could lead to passwords being attackable in case someone gets access to the raw data stored inside the database. This commit introduces password hashing using bcrypt hashing function which addresses this issue. Old passwords are not automatically re-hashed as they are unknown. Replacing the old password scheme is not that easy and needs #10 to be solved. Therefore the old hashing scheme is kept for compatibility reason. Signed-off-by: Knut Ahlers <knut@ahlers.me> Signed-off-by: Knut Ahlers <knut@ahlers.me> closes #14 closes #15
343 lines
12 KiB
Go
343 lines
12 KiB
Go
// Copyright 2011 The Go Authors. All rights reserved.
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// Use of this source code is governed by a BSD-style
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// license that can be found in the LICENSE file.
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// Package twofish implements Bruce Schneier's Twofish encryption algorithm.
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package twofish // import "golang.org/x/crypto/twofish"
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// Twofish is defined in https://www.schneier.com/paper-twofish-paper.pdf [TWOFISH]
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// This code is a port of the LibTom C implementation.
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// See http://libtom.org/?page=features&newsitems=5&whatfile=crypt.
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// LibTomCrypt is free for all purposes under the public domain.
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// It was heavily inspired by the go blowfish package.
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import "strconv"
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// BlockSize is the constant block size of Twofish.
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const BlockSize = 16
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const mdsPolynomial = 0x169 // x^8 + x^6 + x^5 + x^3 + 1, see [TWOFISH] 4.2
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const rsPolynomial = 0x14d // x^8 + x^6 + x^3 + x^2 + 1, see [TWOFISH] 4.3
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// A Cipher is an instance of Twofish encryption using a particular key.
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type Cipher struct {
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s [4][256]uint32
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k [40]uint32
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}
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type KeySizeError int
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func (k KeySizeError) Error() string {
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return "crypto/twofish: invalid key size " + strconv.Itoa(int(k))
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}
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// NewCipher creates and returns a Cipher.
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// The key argument should be the Twofish key, 16, 24 or 32 bytes.
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func NewCipher(key []byte) (*Cipher, error) {
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keylen := len(key)
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if keylen != 16 && keylen != 24 && keylen != 32 {
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return nil, KeySizeError(keylen)
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}
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// k is the number of 64 bit words in key
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k := keylen / 8
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// Create the S[..] words
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var S [4 * 4]byte
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for i := 0; i < k; i++ {
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// Computes [y0 y1 y2 y3] = rs . [x0 x1 x2 x3 x4 x5 x6 x7]
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for j, rsRow := range rs {
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for k, rsVal := range rsRow {
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S[4*i+j] ^= gfMult(key[8*i+k], rsVal, rsPolynomial)
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}
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}
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}
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// Calculate subkeys
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c := new(Cipher)
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var tmp [4]byte
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for i := byte(0); i < 20; i++ {
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// A = h(p * 2x, Me)
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for j := range tmp {
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tmp[j] = 2 * i
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}
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A := h(tmp[:], key, 0)
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// B = rolc(h(p * (2x + 1), Mo), 8)
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for j := range tmp {
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tmp[j] = 2*i + 1
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}
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B := h(tmp[:], key, 1)
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B = rol(B, 8)
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c.k[2*i] = A + B
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// K[2i+1] = (A + 2B) <<< 9
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c.k[2*i+1] = rol(2*B+A, 9)
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}
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// Calculate sboxes
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switch k {
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case 2:
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for i := range c.s[0] {
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c.s[0][i] = mdsColumnMult(sbox[1][sbox[0][sbox[0][byte(i)]^S[0]]^S[4]], 0)
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c.s[1][i] = mdsColumnMult(sbox[0][sbox[0][sbox[1][byte(i)]^S[1]]^S[5]], 1)
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c.s[2][i] = mdsColumnMult(sbox[1][sbox[1][sbox[0][byte(i)]^S[2]]^S[6]], 2)
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c.s[3][i] = mdsColumnMult(sbox[0][sbox[1][sbox[1][byte(i)]^S[3]]^S[7]], 3)
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}
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case 3:
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for i := range c.s[0] {
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c.s[0][i] = mdsColumnMult(sbox[1][sbox[0][sbox[0][sbox[1][byte(i)]^S[0]]^S[4]]^S[8]], 0)
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c.s[1][i] = mdsColumnMult(sbox[0][sbox[0][sbox[1][sbox[1][byte(i)]^S[1]]^S[5]]^S[9]], 1)
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c.s[2][i] = mdsColumnMult(sbox[1][sbox[1][sbox[0][sbox[0][byte(i)]^S[2]]^S[6]]^S[10]], 2)
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c.s[3][i] = mdsColumnMult(sbox[0][sbox[1][sbox[1][sbox[0][byte(i)]^S[3]]^S[7]]^S[11]], 3)
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}
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default:
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for i := range c.s[0] {
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c.s[0][i] = mdsColumnMult(sbox[1][sbox[0][sbox[0][sbox[1][sbox[1][byte(i)]^S[0]]^S[4]]^S[8]]^S[12]], 0)
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c.s[1][i] = mdsColumnMult(sbox[0][sbox[0][sbox[1][sbox[1][sbox[0][byte(i)]^S[1]]^S[5]]^S[9]]^S[13]], 1)
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c.s[2][i] = mdsColumnMult(sbox[1][sbox[1][sbox[0][sbox[0][sbox[0][byte(i)]^S[2]]^S[6]]^S[10]]^S[14]], 2)
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c.s[3][i] = mdsColumnMult(sbox[0][sbox[1][sbox[1][sbox[0][sbox[1][byte(i)]^S[3]]^S[7]]^S[11]]^S[15]], 3)
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}
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}
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return c, nil
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}
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// BlockSize returns the Twofish block size, 16 bytes.
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func (c *Cipher) BlockSize() int { return BlockSize }
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// store32l stores src in dst in little-endian form.
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func store32l(dst []byte, src uint32) {
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dst[0] = byte(src)
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dst[1] = byte(src >> 8)
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dst[2] = byte(src >> 16)
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dst[3] = byte(src >> 24)
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return
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}
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// load32l reads a little-endian uint32 from src.
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func load32l(src []byte) uint32 {
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return uint32(src[0]) | uint32(src[1])<<8 | uint32(src[2])<<16 | uint32(src[3])<<24
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}
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// rol returns x after a left circular rotation of y bits.
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func rol(x, y uint32) uint32 {
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return (x << (y & 31)) | (x >> (32 - (y & 31)))
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}
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// ror returns x after a right circular rotation of y bits.
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func ror(x, y uint32) uint32 {
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return (x >> (y & 31)) | (x << (32 - (y & 31)))
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}
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// The RS matrix. See [TWOFISH] 4.3
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var rs = [4][8]byte{
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{0x01, 0xA4, 0x55, 0x87, 0x5A, 0x58, 0xDB, 0x9E},
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{0xA4, 0x56, 0x82, 0xF3, 0x1E, 0xC6, 0x68, 0xE5},
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{0x02, 0xA1, 0xFC, 0xC1, 0x47, 0xAE, 0x3D, 0x19},
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{0xA4, 0x55, 0x87, 0x5A, 0x58, 0xDB, 0x9E, 0x03},
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}
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// sbox tables
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var sbox = [2][256]byte{
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{
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0xa9, 0x67, 0xb3, 0xe8, 0x04, 0xfd, 0xa3, 0x76, 0x9a, 0x92, 0x80, 0x78, 0xe4, 0xdd, 0xd1, 0x38,
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0x0d, 0xc6, 0x35, 0x98, 0x18, 0xf7, 0xec, 0x6c, 0x43, 0x75, 0x37, 0x26, 0xfa, 0x13, 0x94, 0x48,
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0xf2, 0xd0, 0x8b, 0x30, 0x84, 0x54, 0xdf, 0x23, 0x19, 0x5b, 0x3d, 0x59, 0xf3, 0xae, 0xa2, 0x82,
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0x63, 0x01, 0x83, 0x2e, 0xd9, 0x51, 0x9b, 0x7c, 0xa6, 0xeb, 0xa5, 0xbe, 0x16, 0x0c, 0xe3, 0x61,
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0xc0, 0x8c, 0x3a, 0xf5, 0x73, 0x2c, 0x25, 0x0b, 0xbb, 0x4e, 0x89, 0x6b, 0x53, 0x6a, 0xb4, 0xf1,
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0xe1, 0xe6, 0xbd, 0x45, 0xe2, 0xf4, 0xb6, 0x66, 0xcc, 0x95, 0x03, 0x56, 0xd4, 0x1c, 0x1e, 0xd7,
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0xfb, 0xc3, 0x8e, 0xb5, 0xe9, 0xcf, 0xbf, 0xba, 0xea, 0x77, 0x39, 0xaf, 0x33, 0xc9, 0x62, 0x71,
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0x81, 0x79, 0x09, 0xad, 0x24, 0xcd, 0xf9, 0xd8, 0xe5, 0xc5, 0xb9, 0x4d, 0x44, 0x08, 0x86, 0xe7,
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0xa1, 0x1d, 0xaa, 0xed, 0x06, 0x70, 0xb2, 0xd2, 0x41, 0x7b, 0xa0, 0x11, 0x31, 0xc2, 0x27, 0x90,
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0x20, 0xf6, 0x60, 0xff, 0x96, 0x5c, 0xb1, 0xab, 0x9e, 0x9c, 0x52, 0x1b, 0x5f, 0x93, 0x0a, 0xef,
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0x91, 0x85, 0x49, 0xee, 0x2d, 0x4f, 0x8f, 0x3b, 0x47, 0x87, 0x6d, 0x46, 0xd6, 0x3e, 0x69, 0x64,
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0x2a, 0xce, 0xcb, 0x2f, 0xfc, 0x97, 0x05, 0x7a, 0xac, 0x7f, 0xd5, 0x1a, 0x4b, 0x0e, 0xa7, 0x5a,
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0x28, 0x14, 0x3f, 0x29, 0x88, 0x3c, 0x4c, 0x02, 0xb8, 0xda, 0xb0, 0x17, 0x55, 0x1f, 0x8a, 0x7d,
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0x57, 0xc7, 0x8d, 0x74, 0xb7, 0xc4, 0x9f, 0x72, 0x7e, 0x15, 0x22, 0x12, 0x58, 0x07, 0x99, 0x34,
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0x6e, 0x50, 0xde, 0x68, 0x65, 0xbc, 0xdb, 0xf8, 0xc8, 0xa8, 0x2b, 0x40, 0xdc, 0xfe, 0x32, 0xa4,
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0xca, 0x10, 0x21, 0xf0, 0xd3, 0x5d, 0x0f, 0x00, 0x6f, 0x9d, 0x36, 0x42, 0x4a, 0x5e, 0xc1, 0xe0,
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},
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{
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0x75, 0xf3, 0xc6, 0xf4, 0xdb, 0x7b, 0xfb, 0xc8, 0x4a, 0xd3, 0xe6, 0x6b, 0x45, 0x7d, 0xe8, 0x4b,
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0xd6, 0x32, 0xd8, 0xfd, 0x37, 0x71, 0xf1, 0xe1, 0x30, 0x0f, 0xf8, 0x1b, 0x87, 0xfa, 0x06, 0x3f,
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0x5e, 0xba, 0xae, 0x5b, 0x8a, 0x00, 0xbc, 0x9d, 0x6d, 0xc1, 0xb1, 0x0e, 0x80, 0x5d, 0xd2, 0xd5,
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0xa0, 0x84, 0x07, 0x14, 0xb5, 0x90, 0x2c, 0xa3, 0xb2, 0x73, 0x4c, 0x54, 0x92, 0x74, 0x36, 0x51,
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0x38, 0xb0, 0xbd, 0x5a, 0xfc, 0x60, 0x62, 0x96, 0x6c, 0x42, 0xf7, 0x10, 0x7c, 0x28, 0x27, 0x8c,
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0x13, 0x95, 0x9c, 0xc7, 0x24, 0x46, 0x3b, 0x70, 0xca, 0xe3, 0x85, 0xcb, 0x11, 0xd0, 0x93, 0xb8,
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0xa6, 0x83, 0x20, 0xff, 0x9f, 0x77, 0xc3, 0xcc, 0x03, 0x6f, 0x08, 0xbf, 0x40, 0xe7, 0x2b, 0xe2,
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0x79, 0x0c, 0xaa, 0x82, 0x41, 0x3a, 0xea, 0xb9, 0xe4, 0x9a, 0xa4, 0x97, 0x7e, 0xda, 0x7a, 0x17,
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0x66, 0x94, 0xa1, 0x1d, 0x3d, 0xf0, 0xde, 0xb3, 0x0b, 0x72, 0xa7, 0x1c, 0xef, 0xd1, 0x53, 0x3e,
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0x8f, 0x33, 0x26, 0x5f, 0xec, 0x76, 0x2a, 0x49, 0x81, 0x88, 0xee, 0x21, 0xc4, 0x1a, 0xeb, 0xd9,
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0xc5, 0x39, 0x99, 0xcd, 0xad, 0x31, 0x8b, 0x01, 0x18, 0x23, 0xdd, 0x1f, 0x4e, 0x2d, 0xf9, 0x48,
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0x4f, 0xf2, 0x65, 0x8e, 0x78, 0x5c, 0x58, 0x19, 0x8d, 0xe5, 0x98, 0x57, 0x67, 0x7f, 0x05, 0x64,
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0xaf, 0x63, 0xb6, 0xfe, 0xf5, 0xb7, 0x3c, 0xa5, 0xce, 0xe9, 0x68, 0x44, 0xe0, 0x4d, 0x43, 0x69,
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0x29, 0x2e, 0xac, 0x15, 0x59, 0xa8, 0x0a, 0x9e, 0x6e, 0x47, 0xdf, 0x34, 0x35, 0x6a, 0xcf, 0xdc,
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0x22, 0xc9, 0xc0, 0x9b, 0x89, 0xd4, 0xed, 0xab, 0x12, 0xa2, 0x0d, 0x52, 0xbb, 0x02, 0x2f, 0xa9,
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0xd7, 0x61, 0x1e, 0xb4, 0x50, 0x04, 0xf6, 0xc2, 0x16, 0x25, 0x86, 0x56, 0x55, 0x09, 0xbe, 0x91,
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},
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}
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// gfMult returns a·b in GF(2^8)/p
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func gfMult(a, b byte, p uint32) byte {
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B := [2]uint32{0, uint32(b)}
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P := [2]uint32{0, p}
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var result uint32
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// branchless GF multiplier
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for i := 0; i < 7; i++ {
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result ^= B[a&1]
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a >>= 1
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B[1] = P[B[1]>>7] ^ (B[1] << 1)
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}
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result ^= B[a&1]
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return byte(result)
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}
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// mdsColumnMult calculates y{col} where [y0 y1 y2 y3] = MDS · [x0]
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func mdsColumnMult(in byte, col int) uint32 {
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mul01 := in
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mul5B := gfMult(in, 0x5B, mdsPolynomial)
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mulEF := gfMult(in, 0xEF, mdsPolynomial)
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switch col {
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case 0:
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return uint32(mul01) | uint32(mul5B)<<8 | uint32(mulEF)<<16 | uint32(mulEF)<<24
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case 1:
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return uint32(mulEF) | uint32(mulEF)<<8 | uint32(mul5B)<<16 | uint32(mul01)<<24
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case 2:
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return uint32(mul5B) | uint32(mulEF)<<8 | uint32(mul01)<<16 | uint32(mulEF)<<24
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case 3:
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return uint32(mul5B) | uint32(mul01)<<8 | uint32(mulEF)<<16 | uint32(mul5B)<<24
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}
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panic("unreachable")
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}
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// h implements the S-box generation function. See [TWOFISH] 4.3.5
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func h(in, key []byte, offset int) uint32 {
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var y [4]byte
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for x := range y {
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y[x] = in[x]
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}
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switch len(key) / 8 {
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case 4:
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y[0] = sbox[1][y[0]] ^ key[4*(6+offset)+0]
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y[1] = sbox[0][y[1]] ^ key[4*(6+offset)+1]
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y[2] = sbox[0][y[2]] ^ key[4*(6+offset)+2]
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y[3] = sbox[1][y[3]] ^ key[4*(6+offset)+3]
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fallthrough
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case 3:
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y[0] = sbox[1][y[0]] ^ key[4*(4+offset)+0]
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y[1] = sbox[1][y[1]] ^ key[4*(4+offset)+1]
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y[2] = sbox[0][y[2]] ^ key[4*(4+offset)+2]
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y[3] = sbox[0][y[3]] ^ key[4*(4+offset)+3]
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fallthrough
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case 2:
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y[0] = sbox[1][sbox[0][sbox[0][y[0]]^key[4*(2+offset)+0]]^key[4*(0+offset)+0]]
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y[1] = sbox[0][sbox[0][sbox[1][y[1]]^key[4*(2+offset)+1]]^key[4*(0+offset)+1]]
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y[2] = sbox[1][sbox[1][sbox[0][y[2]]^key[4*(2+offset)+2]]^key[4*(0+offset)+2]]
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y[3] = sbox[0][sbox[1][sbox[1][y[3]]^key[4*(2+offset)+3]]^key[4*(0+offset)+3]]
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}
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// [y0 y1 y2 y3] = MDS . [x0 x1 x2 x3]
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var mdsMult uint32
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for i := range y {
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mdsMult ^= mdsColumnMult(y[i], i)
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}
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return mdsMult
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}
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// Encrypt encrypts a 16-byte block from src to dst, which may overlap.
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// Note that for amounts of data larger than a block,
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// it is not safe to just call Encrypt on successive blocks;
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// instead, use an encryption mode like CBC (see crypto/cipher/cbc.go).
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func (c *Cipher) Encrypt(dst, src []byte) {
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S1 := c.s[0]
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S2 := c.s[1]
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S3 := c.s[2]
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S4 := c.s[3]
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// Load input
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ia := load32l(src[0:4])
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ib := load32l(src[4:8])
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ic := load32l(src[8:12])
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id := load32l(src[12:16])
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// Pre-whitening
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ia ^= c.k[0]
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ib ^= c.k[1]
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ic ^= c.k[2]
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id ^= c.k[3]
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for i := 0; i < 8; i++ {
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k := c.k[8+i*4 : 12+i*4]
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t2 := S2[byte(ib)] ^ S3[byte(ib>>8)] ^ S4[byte(ib>>16)] ^ S1[byte(ib>>24)]
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t1 := S1[byte(ia)] ^ S2[byte(ia>>8)] ^ S3[byte(ia>>16)] ^ S4[byte(ia>>24)] + t2
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ic = ror(ic^(t1+k[0]), 1)
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id = rol(id, 1) ^ (t2 + t1 + k[1])
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t2 = S2[byte(id)] ^ S3[byte(id>>8)] ^ S4[byte(id>>16)] ^ S1[byte(id>>24)]
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t1 = S1[byte(ic)] ^ S2[byte(ic>>8)] ^ S3[byte(ic>>16)] ^ S4[byte(ic>>24)] + t2
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ia = ror(ia^(t1+k[2]), 1)
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ib = rol(ib, 1) ^ (t2 + t1 + k[3])
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}
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// Output with "undo last swap"
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ta := ic ^ c.k[4]
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tb := id ^ c.k[5]
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tc := ia ^ c.k[6]
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td := ib ^ c.k[7]
|
|
|
|
store32l(dst[0:4], ta)
|
|
store32l(dst[4:8], tb)
|
|
store32l(dst[8:12], tc)
|
|
store32l(dst[12:16], td)
|
|
}
|
|
|
|
// Decrypt decrypts a 16-byte block from src to dst, which may overlap.
|
|
func (c *Cipher) Decrypt(dst, src []byte) {
|
|
S1 := c.s[0]
|
|
S2 := c.s[1]
|
|
S3 := c.s[2]
|
|
S4 := c.s[3]
|
|
|
|
// Load input
|
|
ta := load32l(src[0:4])
|
|
tb := load32l(src[4:8])
|
|
tc := load32l(src[8:12])
|
|
td := load32l(src[12:16])
|
|
|
|
// Undo undo final swap
|
|
ia := tc ^ c.k[6]
|
|
ib := td ^ c.k[7]
|
|
ic := ta ^ c.k[4]
|
|
id := tb ^ c.k[5]
|
|
|
|
for i := 8; i > 0; i-- {
|
|
k := c.k[4+i*4 : 8+i*4]
|
|
t2 := S2[byte(id)] ^ S3[byte(id>>8)] ^ S4[byte(id>>16)] ^ S1[byte(id>>24)]
|
|
t1 := S1[byte(ic)] ^ S2[byte(ic>>8)] ^ S3[byte(ic>>16)] ^ S4[byte(ic>>24)] + t2
|
|
ia = rol(ia, 1) ^ (t1 + k[2])
|
|
ib = ror(ib^(t2+t1+k[3]), 1)
|
|
|
|
t2 = S2[byte(ib)] ^ S3[byte(ib>>8)] ^ S4[byte(ib>>16)] ^ S1[byte(ib>>24)]
|
|
t1 = S1[byte(ia)] ^ S2[byte(ia>>8)] ^ S3[byte(ia>>16)] ^ S4[byte(ia>>24)] + t2
|
|
ic = rol(ic, 1) ^ (t1 + k[0])
|
|
id = ror(id^(t2+t1+k[1]), 1)
|
|
}
|
|
|
|
// Undo pre-whitening
|
|
ia ^= c.k[0]
|
|
ib ^= c.k[1]
|
|
ic ^= c.k[2]
|
|
id ^= c.k[3]
|
|
|
|
store32l(dst[0:4], ia)
|
|
store32l(dst[4:8], ib)
|
|
store32l(dst[8:12], ic)
|
|
store32l(dst[12:16], id)
|
|
}
|