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228 lines
5.3 KiB
228 lines
5.3 KiB
var assert = require('assert')
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var createHmac = require('create-hmac')
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var typeForce = require('typeforce')
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var BigInteger = require('bigi')
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var ECSignature = require('./ecsignature')
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var ZERO = new Buffer([0])
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var ONE = new Buffer([1])
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// https://tools.ietf.org/html/rfc6979#section-3.2
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function deterministicGenerateK (curve, hash, d, checkSig) {
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typeForce('Buffer', hash)
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typeForce('BigInteger', d)
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typeForce('Function', checkSig)
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// sanity check
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assert.equal(hash.length, 32, 'Hash must be 256 bit')
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var x = d.toBuffer(32)
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var k = new Buffer(32)
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var v = new Buffer(32)
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// Step A, ignored as hash already provided
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// Step B
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v.fill(1)
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// Step C
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k.fill(0)
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// Step D
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k = createHmac('sha256', k)
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.update(v)
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.update(ZERO)
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.update(x)
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.update(hash)
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.digest()
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// Step E
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v = createHmac('sha256', k).update(v).digest()
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// Step F
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k = createHmac('sha256', k)
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.update(v)
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.update(ONE)
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.update(x)
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.update(hash)
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.digest()
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// Step G
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v = createHmac('sha256', k).update(v).digest()
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// Step H1/H2a, ignored as tlen === qlen (256 bit)
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// Step H2b
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v = createHmac('sha256', k).update(v).digest()
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var T = BigInteger.fromBuffer(v)
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// Step H3, repeat until T is within the interval [1, n - 1] and is suitable for ECDSA
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while ((T.signum() <= 0) || (T.compareTo(curve.n) >= 0) || !checkSig(T)) {
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k = createHmac('sha256', k)
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.update(v)
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.update(ZERO)
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.digest()
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v = createHmac('sha256', k).update(v).digest()
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// Step H1/H2a, again, ignored as tlen === qlen (256 bit)
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// Step H2b again
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v = createHmac('sha256', k).update(v).digest()
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T = BigInteger.fromBuffer(v)
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}
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return T
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}
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function sign (curve, hash, d) {
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var r, s
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var e = BigInteger.fromBuffer(hash)
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var n = curve.n
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var G = curve.G
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deterministicGenerateK(curve, hash, d, function (k) {
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var Q = G.multiply(k)
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if (curve.isInfinity(Q))
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return false
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r = Q.affineX.mod(n)
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if (r.signum() === 0)
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return false
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s = k.modInverse(n).multiply(e.add(d.multiply(r))).mod(n)
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if (s.signum() === 0)
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return false
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return true
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})
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var N_OVER_TWO = n.shiftRight(1)
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// enforce low S values, see bip62: 'low s values in signatures'
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if (s.compareTo(N_OVER_TWO) > 0) {
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s = n.subtract(s)
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}
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return new ECSignature(r, s)
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}
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function verifyRaw (curve, e, signature, Q) {
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var n = curve.n
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var G = curve.G
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var r = signature.r
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var s = signature.s
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// 1.4.1 Enforce r and s are both integers in the interval [1, n − 1]
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if (r.signum() <= 0 || r.compareTo(n) >= 0) return false
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if (s.signum() <= 0 || s.compareTo(n) >= 0) return false
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// c = s^-1 mod n
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var c = s.modInverse(n)
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// 1.4.4 Compute u1 = es^−1 mod n
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// u2 = rs^−1 mod n
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var u1 = e.multiply(c).mod(n)
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var u2 = r.multiply(c).mod(n)
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// 1.4.5 Compute R = (xR, yR) = u1G + u2Q
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var R = G.multiplyTwo(u1, Q, u2)
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var v = R.affineX.mod(n)
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// 1.4.5 (cont.) Enforce R is not at infinity
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if (curve.isInfinity(R)) return false
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// 1.4.8 If v = r, output "valid", and if v != r, output "invalid"
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return v.equals(r)
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}
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function verify (curve, hash, signature, Q) {
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// 1.4.2 H = Hash(M), already done by the user
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// 1.4.3 e = H
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var e = BigInteger.fromBuffer(hash)
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return verifyRaw(curve, e, signature, Q)
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}
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/**
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* Recover a public key from a signature.
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*
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* See SEC 1: Elliptic Curve Cryptography, section 4.1.6, "Public
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* Key Recovery Operation".
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*
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* http://www.secg.org/download/aid-780/sec1-v2.pdf
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*/
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function recoverPubKey (curve, e, signature, i) {
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assert.strictEqual(i & 3, i, 'Recovery param is more than two bits')
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var n = curve.n
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var G = curve.G
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var r = signature.r
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var s = signature.s
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assert(r.signum() > 0 && r.compareTo(n) < 0, 'Invalid r value')
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assert(s.signum() > 0 && s.compareTo(n) < 0, 'Invalid s value')
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// A set LSB signifies that the y-coordinate is odd
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var isYOdd = i & 1
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// The more significant bit specifies whether we should use the
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// first or second candidate key.
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var isSecondKey = i >> 1
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// 1.1 Let x = r + jn
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var x = isSecondKey ? r.add(n) : r
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var R = curve.pointFromX(isYOdd, x)
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// 1.4 Check that nR is at infinity
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var nR = R.multiply(n)
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assert(curve.isInfinity(nR), 'nR is not a valid curve point')
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// Compute -e from e
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var eNeg = e.negate().mod(n)
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// 1.6.1 Compute Q = r^-1 (sR - eG)
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// Q = r^-1 (sR + -eG)
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var rInv = r.modInverse(n)
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var Q = R.multiplyTwo(s, G, eNeg).multiply(rInv)
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curve.validate(Q)
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return Q
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}
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/**
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* Calculate pubkey extraction parameter.
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*
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* When extracting a pubkey from a signature, we have to
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* distinguish four different cases. Rather than putting this
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* burden on the verifier, Bitcoin includes a 2-bit value with the
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* signature.
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*
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* This function simply tries all four cases and returns the value
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* that resulted in a successful pubkey recovery.
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*/
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function calcPubKeyRecoveryParam (curve, e, signature, Q) {
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for (var i = 0; i < 4; i++) {
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var Qprime = recoverPubKey(curve, e, signature, i)
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// 1.6.2 Verify Q
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if (Qprime.equals(Q)) {
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return i
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}
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}
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throw new Error('Unable to find valid recovery factor')
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}
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module.exports = {
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calcPubKeyRecoveryParam: calcPubKeyRecoveryParam,
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deterministicGenerateK: deterministicGenerateK,
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recoverPubKey: recoverPubKey,
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sign: sign,
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verify: verify,
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verifyRaw: verifyRaw
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}
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