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174 lines
4.7 KiB
Go
174 lines
4.7 KiB
Go
// EME (ECB-Mix-ECB) is a length-preserving wide-block encryption mode. It was
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// presented in the 2003 paper "A Parallelizable Enciphering Mode" by Halevi
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// and Rogaway.
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package eme
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import (
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"crypto/cipher"
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"log"
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)
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type directionConst bool
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const (
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// Encrypt "inputData"
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DirectionEncrypt = directionConst(true)
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// Decrypt "inputData"
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DirectionDecrypt = directionConst(false)
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)
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// multByTwo - GF multiplication as specified in the EME-32 draft
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func multByTwo(out []byte, in []byte) {
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if len(in) != 16 {
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panic("len must be 16")
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}
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tmp := make([]byte, 16)
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tmp[0] = 2 * in[0]
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if in[15] >= 128 {
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tmp[0] = tmp[0] ^ 135
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}
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for j := 1; j < 16; j++ {
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tmp[j] = 2 * in[j]
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if in[j-1] >= 128 {
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tmp[j] += 1
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}
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}
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copy(out, tmp)
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}
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func xorBlocks(out []byte, in1 []byte, in2 []byte) {
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if len(in1) != len(in2) {
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log.Panicf("len(in1)=%d is not equal to len(in2)=%d", len(in1), len(in2))
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}
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for i := range in1 {
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out[i] = in1[i] ^ in2[i]
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}
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}
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// aesTransform - encrypt or decrypt (according to "direction") using block
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// cipher "bc" (typically AES)
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func aesTransform(dst []byte, src []byte, direction directionConst, bc cipher.Block) {
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if direction == DirectionEncrypt {
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bc.Encrypt(dst, src)
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return
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} else if direction == DirectionDecrypt {
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bc.Decrypt(dst, src)
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return
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}
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}
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// tabulateL - calculate L_i for messages up to a length of m cipher blocks
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func tabulateL(bc cipher.Block, m int) [][]byte {
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/* set L0 = 2*AESenc(K; 0) */
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eZero := make([]byte, 16)
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Li := make([]byte, 16)
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bc.Encrypt(Li, eZero)
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LTable := make([][]byte, m)
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// Allocate pool once and slice into m pieces in the loop
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pool := make([]byte, m*16)
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for i := 0; i < m; i++ {
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multByTwo(Li, Li)
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LTable[i] = pool[i*16 : (i+1)*16]
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copy(LTable[i], Li)
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}
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return LTable
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}
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// Transform - EME-encrypt or EME-decrypt, according to "direction"
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// (defined in the constants DirectionEncrypt and DirectionDecrypt).
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// The data in "inputData" is en- or decrypted with the block ciper "bc" under
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// "tweak" (also known as IV).
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//
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// The tweak is used to randomize the encryption in the same way as an
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// IV. A use of this encryption mode envisioned by the authors of the
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// algorithm was to encrypt each sector of a disk, with the tweak
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// being the sector number. If you encipher the same data with the
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// same tweak you will get the same ciphertext.
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//
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// The result is returned in a freshly allocated slice of the same
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// size as inputData.
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//
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// Limitations: This only works for ciphers with block size 16. The
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// size of the tweak slice must also be 16. The inputData must also be
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// a multiple of 16. If any of these pre-conditions are not met, the
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// function will panic.
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func Transform(bc cipher.Block, tweak []byte, inputData []byte, direction directionConst) []byte {
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// In the paper, the tweak is just called "T". Call it the same here to
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// make following the paper easy.
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T := tweak
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// In the paper, the plaintext data is called "P" and the ciphertext is
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// called "C". Because encryption and decryption are virtually indentical,
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// we share the code and always call the input data "P" and the output data
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// "C", regardless of the direction.
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P := inputData
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if bc.BlockSize() != 16 {
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log.Panicf("Using a block size other than 16 is not implemented")
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}
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if len(T) != 16 {
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log.Panicf("Tweak must be 16 bytes long, is %d", len(T))
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}
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if len(P)%16 != 0 {
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log.Panicf("Data P must be a multiple of 16 long, is %d", len(P))
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}
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m := len(P) / 16
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if m == 0 || m > 16*8 {
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log.Panicf("EME operates on 1 to %d block-cipher blocks, you passed %d", 16*8, m)
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}
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C := make([]byte, len(P))
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LTable := tabulateL(bc, m)
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PPj := make([]byte, 16)
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for j := 0; j < m; j++ {
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Pj := P[j*16 : (j+1)*16]
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/* PPj = 2**(j-1)*L xor Pj */
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xorBlocks(PPj, Pj, LTable[j])
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/* PPPj = AESenc(K; PPj) */
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aesTransform(C[j*16:(j+1)*16], PPj, direction, bc)
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}
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/* MP =(xorSum PPPj) xor T */
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MP := make([]byte, 16)
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xorBlocks(MP, C[0:16], T)
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for j := 1; j < m; j++ {
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xorBlocks(MP, MP, C[j*16:(j+1)*16])
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}
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/* MC = AESenc(K; MP) */
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MC := make([]byte, 16)
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aesTransform(MC, MP, direction, bc)
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/* M = MP xor MC */
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M := make([]byte, 16)
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xorBlocks(M, MP, MC)
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CCCj := make([]byte, 16)
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for j := 1; j < m; j++ {
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multByTwo(M, M)
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/* CCCj = 2**(j-1)*M xor PPPj */
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xorBlocks(CCCj, C[j*16:(j+1)*16], M)
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copy(C[j*16:(j+1)*16], CCCj)
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}
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/* CCC1 = (xorSum CCCj) xor T xor MC */
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CCC1 := make([]byte, 16)
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xorBlocks(CCC1, MC, T)
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for j := 1; j < m; j++ {
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xorBlocks(CCC1, CCC1, C[j*16:(j+1)*16])
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}
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copy(C[0:16], CCC1)
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for j := 0; j < m; j++ {
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/* CCj = AES-enc(K; CCCj) */
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aesTransform(C[j*16:(j+1)*16], C[j*16:(j+1)*16], direction, bc)
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/* Cj = 2**(j-1)*L xor CCj */
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xorBlocks(C[j*16:(j+1)*16], C[j*16:(j+1)*16], LTable[j])
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}
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return C
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}
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