func edwardsToMontgomeryX(outX, y *edwards25519.FieldElement) { // We only need the x-coordinate of the curve25519 point, which I'll // call u. The isomorphism is u=(y+1)/(1-y), since y=Y/Z, this gives // u=(Y+Z)/(Z-Y). We know that Z=1, thus u=(Y+1)/(1-Y). var oneMinusY edwards25519.FieldElement edwards25519.FeOne(&oneMinusY) edwards25519.FeSub(&oneMinusY, &oneMinusY, y) edwards25519.FeInvert(&oneMinusY, &oneMinusY) edwards25519.FeOne(outX) edwards25519.FeAdd(outX, outX, y) edwards25519.FeMul(outX, outX, &oneMinusY) }
// ScalarBaseMult computes a curve25519 public key from a private key and also // a uniform representative for that public key. Note that this function will // fail and return false for about half of private keys. // See http://elligator.cr.yp.to/elligator-20130828.pdf. func ScalarBaseMult(publicKey, representative, privateKey *[32]byte) bool { var maskedPrivateKey [32]byte copy(maskedPrivateKey[:], privateKey[:]) maskedPrivateKey[0] &= 248 maskedPrivateKey[31] &= 127 maskedPrivateKey[31] |= 64 var A edwards25519.ExtendedGroupElement edwards25519.GeScalarMultBase(&A, &maskedPrivateKey) var inv1 edwards25519.FieldElement edwards25519.FeSub(&inv1, &A.Z, &A.Y) edwards25519.FeMul(&inv1, &inv1, &A.X) edwards25519.FeInvert(&inv1, &inv1) var t0, u edwards25519.FieldElement edwards25519.FeMul(&u, &inv1, &A.X) edwards25519.FeAdd(&t0, &A.Y, &A.Z) edwards25519.FeMul(&u, &u, &t0) var v edwards25519.FieldElement edwards25519.FeMul(&v, &t0, &inv1) edwards25519.FeMul(&v, &v, &A.Z) edwards25519.FeMul(&v, &v, &sqrtMinusA) var b edwards25519.FieldElement edwards25519.FeAdd(&b, &u, &edwards25519.A) var c, b3, b8 edwards25519.FieldElement edwards25519.FeSquare(&b3, &b) // 2 edwards25519.FeMul(&b3, &b3, &b) // 3 edwards25519.FeSquare(&c, &b3) // 6 edwards25519.FeMul(&c, &c, &b) // 7 edwards25519.FeMul(&b8, &c, &b) // 8 edwards25519.FeMul(&c, &c, &u) q58(&c, &c) var chi edwards25519.FieldElement edwards25519.FeSquare(&chi, &c) edwards25519.FeSquare(&chi, &chi) edwards25519.FeSquare(&t0, &u) edwards25519.FeMul(&chi, &chi, &t0) edwards25519.FeSquare(&t0, &b) // 2 edwards25519.FeMul(&t0, &t0, &b) // 3 edwards25519.FeSquare(&t0, &t0) // 6 edwards25519.FeMul(&t0, &t0, &b) // 7 edwards25519.FeSquare(&t0, &t0) // 14 edwards25519.FeMul(&chi, &chi, &t0) edwards25519.FeNeg(&chi, &chi) var chiBytes [32]byte edwards25519.FeToBytes(&chiBytes, &chi) // chi[1] is either 0 or 0xff if chiBytes[1] == 0xff { return false } // Calculate r1 = sqrt(-u/(2*(u+A))) var r1 edwards25519.FieldElement edwards25519.FeMul(&r1, &c, &u) edwards25519.FeMul(&r1, &r1, &b3) edwards25519.FeMul(&r1, &r1, &sqrtMinusHalf) var maybeSqrtM1 edwards25519.FieldElement edwards25519.FeSquare(&t0, &r1) edwards25519.FeMul(&t0, &t0, &b) edwards25519.FeAdd(&t0, &t0, &t0) edwards25519.FeAdd(&t0, &t0, &u) edwards25519.FeOne(&maybeSqrtM1) edwards25519.FeCMove(&maybeSqrtM1, &edwards25519.SqrtM1, edwards25519.FeIsNonZero(&t0)) edwards25519.FeMul(&r1, &r1, &maybeSqrtM1) // Calculate r = sqrt(-(u+A)/(2u)) var r edwards25519.FieldElement edwards25519.FeSquare(&t0, &c) // 2 edwards25519.FeMul(&t0, &t0, &c) // 3 edwards25519.FeSquare(&t0, &t0) // 6 edwards25519.FeMul(&r, &t0, &c) // 7 edwards25519.FeSquare(&t0, &u) // 2 edwards25519.FeMul(&t0, &t0, &u) // 3 edwards25519.FeMul(&r, &r, &t0) edwards25519.FeSquare(&t0, &b8) // 16 edwards25519.FeMul(&t0, &t0, &b8) // 24 edwards25519.FeMul(&t0, &t0, &b) // 25 edwards25519.FeMul(&r, &r, &t0) edwards25519.FeMul(&r, &r, &sqrtMinusHalf) edwards25519.FeSquare(&t0, &r) edwards25519.FeMul(&t0, &t0, &u) edwards25519.FeAdd(&t0, &t0, &t0) edwards25519.FeAdd(&t0, &t0, &b) edwards25519.FeOne(&maybeSqrtM1) edwards25519.FeCMove(&maybeSqrtM1, &edwards25519.SqrtM1, edwards25519.FeIsNonZero(&t0)) edwards25519.FeMul(&r, &r, &maybeSqrtM1) var vBytes [32]byte edwards25519.FeToBytes(&vBytes, &v) vInSquareRootImage := feBytesLE(&vBytes, &halfQMinus1Bytes) edwards25519.FeCMove(&r, &r1, vInSquareRootImage) edwards25519.FeToBytes(publicKey, &u) edwards25519.FeToBytes(representative, &r) return true }