packer-cn/builder/azure/pkcs12/pbkdf.go

187 lines
5.7 KiB
Go

package pkcs12
import (
"crypto/sha1"
"math/big"
)
var (
deriveKeyByAlg = map[string]func(salt, password []byte, iterations int) []byte{
pbeWithSHAAnd3KeyTripleDESCBC: func(salt, password []byte, iterations int) []byte {
return pbkdf(sha1Sum, 20, 64, salt, password, iterations, 1, 24)
},
pbewithSHAAnd40BitRC2CBC: func(salt, password []byte, iterations int) []byte {
return pbkdf(sha1Sum, 20, 64, salt, password, iterations, 1, 5)
},
}
deriveIVByAlg = map[string]func(salt, password []byte, iterations int) []byte{
pbeWithSHAAnd3KeyTripleDESCBC: func(salt, password []byte, iterations int) []byte {
return pbkdf(sha1Sum, 20, 64, salt, password, iterations, 2, 8)
},
pbewithSHAAnd40BitRC2CBC: func(salt, password []byte, iterations int) []byte {
return pbkdf(sha1Sum, 20, 64, salt, password, iterations, 2, 8)
},
}
)
func sha1Sum(in []byte) []byte {
sum := sha1.Sum(in)
return sum[:]
}
func pbkdf(hash func([]byte) []byte, u, v int, salt, password []byte, r int, ID byte, size int) (key []byte) {
// implementation of https://tools.ietf.org/html/rfc7292#appendix-B.2 , RFC text verbatim in comments
// Let H be a hash function built around a compression function f:
// Z_2^u x Z_2^v -> Z_2^u
// (that is, H has a chaining variable and output of length u bits, and
// the message input to the compression function of H is v bits). The
// values for u and v are as follows:
// HASH FUNCTION VALUE u VALUE v
// MD2, MD5 128 512
// SHA-1 160 512
// SHA-224 224 512
// SHA-256 256 512
// SHA-384 384 1024
// SHA-512 512 1024
// SHA-512/224 224 1024
// SHA-512/256 256 1024
// Furthermore, let r be the iteration count.
// We assume here that u and v are both multiples of 8, as are the
// lengths of the password and salt strings (which we denote by p and s,
// respectively) and the number n of pseudorandom bits required. In
// addition, u and v are of course non-zero.
// For information on security considerations for MD5 [19], see [25] and
// [1], and on those for MD2, see [18].
// The following procedure can be used to produce pseudorandom bits for
// a particular "purpose" that is identified by a byte called "ID".
// This standard specifies 3 different values for the ID byte:
// 1. If ID=1, then the pseudorandom bits being produced are to be used
// as key material for performing encryption or decryption.
// 2. If ID=2, then the pseudorandom bits being produced are to be used
// as an IV (Initial Value) for encryption or decryption.
// 3. If ID=3, then the pseudorandom bits being produced are to be used
// as an integrity key for MACing.
// 1. Construct a string, D (the "diversifier"), by concatenating v/8
// copies of ID.
D := []byte{}
for i := 0; i < v; i++ {
D = append(D, ID)
}
// 2. Concatenate copies of the salt together to create a string S of
// length v(ceiling(s/v)) bits (the final copy of the salt may be
// truncated to create S). Note that if the salt is the empty
// string, then so is S.
S := []byte{}
{
s := len(salt)
times := s / v
if s%v > 0 {
times++
}
for len(S) < times*v {
S = append(S, salt...)
}
S = S[:times*v]
}
// 3. Concatenate copies of the password together to create a string P
// of length v(ceiling(p/v)) bits (the final copy of the password
// may be truncated to create P). Note that if the password is the
// empty string, then so is P.
P := []byte{}
{
s := len(password)
times := s / v
if s%v > 0 {
times++
}
for len(P) < times*v {
P = append(P, password...)
}
P = P[:times*v]
}
// 4. Set I=S||P to be the concatenation of S and P.
I := append(S, P...)
// 5. Set c=ceiling(n/u).
c := size / u
if size%u > 0 {
c++
}
// 6. For i=1, 2, ..., c, do the following:
A := make([]byte, c*20)
for i := 0; i < c; i++ {
// A. Set A2=H^r(D||I). (i.e., the r-th hash of D||1,
// H(H(H(... H(D||I))))
Ai := hash(append(D, I...))
for j := 1; j < r; j++ {
Ai = hash(Ai[:])
}
copy(A[i*20:], Ai[:])
if i < c-1 { // skip on last iteration
// B. Concatenate copies of Ai to create a string B of length v
// bits (the final copy of Ai may be truncated to create B).
B := []byte{}
for len(B) < v {
B = append(B, Ai[:]...)
}
B = B[:v]
// C. Treating I as a concatenation I_0, I_1, ..., I_(k-1) of v-bit
// blocks, where k=ceiling(s/v)+ceiling(p/v), modify I by
// setting I_j=(I_j+B+1) mod 2^v for each j.
{
Bbi := new(big.Int)
Bbi.SetBytes(B)
one := big.NewInt(1)
for j := 0; j < len(I)/v; j++ {
Ij := new(big.Int)
Ij.SetBytes(I[j*v : (j+1)*v])
Ij.Add(Ij, Bbi)
Ij.Add(Ij, one)
Ijb := Ij.Bytes()
if len(Ijb) > v {
Ijb = Ijb[len(Ijb)-v:]
}
copy(I[j*v:(j+1)*v], Ijb)
}
}
}
}
// 7. Concatenate A_1, A_2, ..., A_c together to form a pseudorandom
// bit string, A.
// 8. Use the first n bits of A as the output of this entire process.
A = A[:size]
return A
// If the above process is being used to generate a DES key, the process
// should be used to create 64 random bits, and the key's parity bits
// should be set after the 64 bits have been produced. Similar concerns
// hold for 2-key and 3-key triple-DES keys, for CDMF keys, and for any
// similar keys with parity bits "built into them".
}