// Copyright (c) 2016 The Go Authors. All rights reserved. // Use of this source code is governed by a BSD-style // license that can be found in the LICENSE file. package edwards25519 import ( "crypto/subtle" "encoding/binary" "errors" ) // A Scalar is an integer modulo // // l = 2^252 + 27742317777372353535851937790883648493 // // which is the prime order of the edwards25519 group. // // This type works similarly to math/big.Int, and all arguments and // receivers are allowed to alias. // // The zero value is a valid zero element. type Scalar struct { // s is the Scalar value in little-endian. The value is always reduced // modulo l between operations. s [32]byte } var ( scZero = Scalar{[32]byte{0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0}} scOne = Scalar{[32]byte{1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0}} scMinusOne = Scalar{[32]byte{236, 211, 245, 92, 26, 99, 18, 88, 214, 156, 247, 162, 222, 249, 222, 20, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 16}} ) // NewScalar returns a new zero Scalar. func NewScalar() *Scalar { return &Scalar{} } // MultiplyAdd sets s = x * y + z mod l, and returns s. func (s *Scalar) MultiplyAdd(x, y, z *Scalar) *Scalar { scMulAdd(&s.s, &x.s, &y.s, &z.s) return s } // Add sets s = x + y mod l, and returns s. func (s *Scalar) Add(x, y *Scalar) *Scalar { // s = 1 * x + y mod l scMulAdd(&s.s, &scOne.s, &x.s, &y.s) return s } // Subtract sets s = x - y mod l, and returns s. func (s *Scalar) Subtract(x, y *Scalar) *Scalar { // s = -1 * y + x mod l scMulAdd(&s.s, &scMinusOne.s, &y.s, &x.s) return s } // Negate sets s = -x mod l, and returns s. func (s *Scalar) Negate(x *Scalar) *Scalar { // s = -1 * x + 0 mod l scMulAdd(&s.s, &scMinusOne.s, &x.s, &scZero.s) return s } // Multiply sets s = x * y mod l, and returns s. func (s *Scalar) Multiply(x, y *Scalar) *Scalar { // s = x * y + 0 mod l scMulAdd(&s.s, &x.s, &y.s, &scZero.s) return s } // Set sets s = x, and returns s. func (s *Scalar) Set(x *Scalar) *Scalar { *s = *x return s } // SetUniformBytes sets s = x mod l, where x is a 64-byte little-endian integer. // If x is not of the right length, SetUniformBytes returns nil and an error, // and the receiver is unchanged. // // SetUniformBytes can be used to set s to an uniformly distributed value given // 64 uniformly distributed random bytes. func (s *Scalar) SetUniformBytes(x []byte) (*Scalar, error) { if len(x) != 64 { return nil, errors.New("edwards25519: invalid SetUniformBytes input length") } var wideBytes [64]byte copy(wideBytes[:], x[:]) scReduce(&s.s, &wideBytes) return s, nil } // SetCanonicalBytes sets s = x, where x is a 32-byte little-endian encoding of // s, and returns s. If x is not a canonical encoding of s, SetCanonicalBytes // returns nil and an error, and the receiver is unchanged. func (s *Scalar) SetCanonicalBytes(x []byte) (*Scalar, error) { if len(x) != 32 { return nil, errors.New("invalid scalar length") } ss := &Scalar{} copy(ss.s[:], x) if !isReduced(ss) { return nil, errors.New("invalid scalar encoding") } s.s = ss.s return s, nil } // isReduced returns whether the given scalar is reduced modulo l. func isReduced(s *Scalar) bool { for i := len(s.s) - 1; i >= 0; i-- { switch { case s.s[i] > scMinusOne.s[i]: return false case s.s[i] < scMinusOne.s[i]: return true } } return true } // SetBytesWithClamping applies the buffer pruning described in RFC 8032, // Section 5.1.5 (also known as clamping) and sets s to the result. The input // must be 32 bytes, and it is not modified. If x is not of the right length, // SetBytesWithClamping returns nil and an error, and the receiver is unchanged. // // Note that since Scalar values are always reduced modulo the prime order of // the curve, the resulting value will not preserve any of the cofactor-clearing // properties that clamping is meant to provide. It will however work as // expected as long as it is applied to points on the prime order subgroup, like // in Ed25519. In fact, it is lost to history why RFC 8032 adopted the // irrelevant RFC 7748 clamping, but it is now required for compatibility. func (s *Scalar) SetBytesWithClamping(x []byte) (*Scalar, error) { // The description above omits the purpose of the high bits of the clamping // for brevity, but those are also lost to reductions, and are also // irrelevant to edwards25519 as they protect against a specific // implementation bug that was once observed in a generic Montgomery ladder. if len(x) != 32 { return nil, errors.New("edwards25519: invalid SetBytesWithClamping input length") } var wideBytes [64]byte copy(wideBytes[:], x[:]) wideBytes[0] &= 248 wideBytes[31] &= 63 wideBytes[31] |= 64 scReduce(&s.s, &wideBytes) return s, nil } // Bytes returns the canonical 32-byte little-endian encoding of s. func (s *Scalar) Bytes() []byte { buf := make([]byte, 32) copy(buf, s.s[:]) return buf } // Equal returns 1 if s and t are equal, and 0 otherwise. func (s *Scalar) Equal(t *Scalar) int { return subtle.ConstantTimeCompare(s.s[:], t.s[:]) } // scMulAdd and scReduce are ported from the public domain, “ref10” // implementation of ed25519 from SUPERCOP. func load3(in []byte) int64 { r := int64(in[0]) r |= int64(in[1]) << 8 r |= int64(in[2]) << 16 return r } func load4(in []byte) int64 { r := int64(in[0]) r |= int64(in[1]) << 8 r |= int64(in[2]) << 16 r |= int64(in[3]) << 24 return r } // Input: // a[0]+256*a[1]+...+256^31*a[31] = a // b[0]+256*b[1]+...+256^31*b[31] = b // c[0]+256*c[1]+...+256^31*c[31] = c // // Output: // s[0]+256*s[1]+...+256^31*s[31] = (ab+c) mod l // where l = 2^252 + 27742317777372353535851937790883648493. func scMulAdd(s, a, b, c *[32]byte) { a0 := 2097151 & load3(a[:]) a1 := 2097151 & (load4(a[2:]) >> 5) a2 := 2097151 & (load3(a[5:]) >> 2) a3 := 2097151 & (load4(a[7:]) >> 7) a4 := 2097151 & (load4(a[10:]) >> 4) a5 := 2097151 & (load3(a[13:]) >> 1) a6 := 2097151 & (load4(a[15:]) >> 6) a7 := 2097151 & (load3(a[18:]) >> 3) a8 := 2097151 & load3(a[21:]) a9 := 2097151 & (load4(a[23:]) >> 5) a10 := 2097151 & (load3(a[26:]) >> 2) a11 := (load4(a[28:]) >> 7) b0 := 2097151 & load3(b[:]) b1 := 2097151 & (load4(b[2:]) >> 5) b2 := 2097151 & (load3(b[5:]) >> 2) b3 := 2097151 & (load4(b[7:]) >> 7) b4 := 2097151 & (load4(b[10:]) >> 4) b5 := 2097151 & (load3(b[13:]) >> 1) b6 := 2097151 & (load4(b[15:]) >> 6) b7 := 2097151 & (load3(b[18:]) >> 3) b8 := 2097151 & load3(b[21:]) b9 := 2097151 & (load4(b[23:]) >> 5) b10 := 2097151 & (load3(b[26:]) >> 2) b11 := (load4(b[28:]) >> 7) c0 := 2097151 & load3(c[:]) c1 := 2097151 & (load4(c[2:]) >> 5) c2 := 2097151 & (load3(c[5:]) >> 2) c3 := 2097151 & (load4(c[7:]) >> 7) c4 := 2097151 & (load4(c[10:]) >> 4) c5 := 2097151 & (load3(c[13:]) >> 1) c6 := 2097151 & (load4(c[15:]) >> 6) c7 := 2097151 & (load3(c[18:]) >> 3) c8 := 2097151 & load3(c[21:]) c9 := 2097151 & (load4(c[23:]) >> 5) c10 := 2097151 & (load3(c[26:]) >> 2) c11 := (load4(c[28:]) >> 7) var carry [23]int64 s0 := c0 + a0*b0 s1 := c1 + a0*b1 + a1*b0 s2 := c2 + a0*b2 + a1*b1 + a2*b0 s3 := c3 + a0*b3 + a1*b2 + a2*b1 + a3*b0 s4 := c4 + a0*b4 + a1*b3 + a2*b2 + a3*b1 + a4*b0 s5 := c5 + a0*b5 + a1*b4 + a2*b3 + a3*b2 + a4*b1 + a5*b0 s6 := c6 + a0*b6 + a1*b5 + a2*b4 + a3*b3 + a4*b2 + a5*b1 + a6*b0 s7 := c7 + a0*b7 + a1*b6 + a2*b5 + a3*b4 + a4*b3 + a5*b2 + a6*b1 + a7*b0 s8 := c8 + a0*b8 + a1*b7 + a2*b6 + a3*b5 + a4*b4 + a5*b3 + a6*b2 + a7*b1 + a8*b0 s9 := c9 + a0*b9 + a1*b8 + a2*b7 + a3*b6 + a4*b5 + a5*b4 + a6*b3 + a7*b2 + a8*b1 + a9*b0 s10 := c10 + a0*b10 + a1*b9 + a2*b8 + a3*b7 + a4*b6 + a5*b5 + a6*b4 + a7*b3 + a8*b2 + a9*b1 + a10*b0 s11 := c11 + a0*b11 + a1*b10 + a2*b9 + a3*b8 + a4*b7 + a5*b6 + a6*b5 + a7*b4 + a8*b3 + a9*b2 + a10*b1 + a11*b0 s12 := a1*b11 + a2*b10 + a3*b9 + a4*b8 + a5*b7 + a6*b6 + a7*b5 + a8*b4 + a9*b3 + a10*b2 + a11*b1 s13 := a2*b11 + a3*b10 + a4*b9 + a5*b8 + a6*b7 + a7*b6 + a8*b5 + a9*b4 + a10*b3 + a11*b2 s14 := a3*b11 + a4*b10 + a5*b9 + a6*b8 + a7*b7 + a8*b6 + a9*b5 + a10*b4 + a11*b3 s15 := a4*b11 + a5*b10 + a6*b9 + a7*b8 + a8*b7 + a9*b6 + a10*b5 + a11*b4 s16 := a5*b11 + a6*b10 + a7*b9 + a8*b8 + a9*b7 + a10*b6 + a11*b5 s17 := a6*b11 + a7*b10 + a8*b9 + a9*b8 + a10*b7 + a11*b6 s18 := a7*b11 + a8*b10 + a9*b9 + a10*b8 + a11*b7 s19 := a8*b11 + a9*b10 + a10*b9 + a11*b8 s20 := a9*b11 + a10*b10 + a11*b9 s21 := a10*b11 + a11*b10 s22 := a11 * b11 s23 := int64(0) carry[0] = (s0 + (1 << 20)) >> 21 s1 += carry[0] s0 -= carry[0] << 21 carry[2] = (s2 + (1 << 20)) >> 21 s3 += carry[2] s2 -= carry[2] << 21 carry[4] = (s4 + (1 << 20)) >> 21 s5 += carry[4] s4 -= carry[4] << 21 carry[6] = (s6 + (1 << 20)) >> 21 s7 += carry[6] s6 -= carry[6] << 21 carry[8] = (s8 + (1 << 20)) >> 21 s9 += carry[8] s8 -= carry[8] << 21 carry[10] = (s10 + (1 << 20)) >> 21 s11 += carry[10] s10 -= carry[10] << 21 carry[12] = (s12 + (1 << 20)) >> 21 s13 += carry[12] s12 -= carry[12] << 21 carry[14] = (s14 + (1 << 20)) >> 21 s15 += carry[14] s14 -= carry[14] << 21 carry[16] = (s16 + (1 << 20)) >> 21 s17 += carry[16] s16 -= carry[16] << 21 carry[18] = (s18 + (1 << 20)) >> 21 s19 += carry[18] s18 -= carry[18] << 21 carry[20] = (s20 + (1 << 20)) >> 21 s21 += carry[20] s20 -= carry[20] << 21 carry[22] = (s22 + (1 << 20)) >> 21 s23 += carry[22] s22 -= carry[22] << 21 carry[1] = (s1 + (1 << 20)) >> 21 s2 += carry[1] s1 -= carry[1] << 21 carry[3] = (s3 + (1 << 20)) >> 21 s4 += carry[3] s3 -= carry[3] << 21 carry[5] = (s5 + (1 << 20)) >> 21 s6 += carry[5] s5 -= carry[5] << 21 carry[7] = (s7 + (1 << 20)) >> 21 s8 += carry[7] s7 -= carry[7] << 21 carry[9] = (s9 + (1 << 20)) >> 21 s10 += carry[9] s9 -= carry[9] << 21 carry[11] = (s11 + (1 << 20)) >> 21 s12 += carry[11] s11 -= carry[11] << 21 carry[13] = (s13 + (1 << 20)) >> 21 s14 += carry[13] s13 -= carry[13] << 21 carry[15] = (s15 + (1 << 20)) >> 21 s16 += carry[15] s15 -= carry[15] << 21 carry[17] = (s17 + (1 << 20)) >> 21 s18 += carry[17] s17 -= carry[17] << 21 carry[19] = (s19 + (1 << 20)) >> 21 s20 += carry[19] s19 -= carry[19] << 21 carry[21] = (s21 + (1 << 20)) >> 21 s22 += carry[21] s21 -= carry[21] << 21 s11 += s23 * 666643 s12 += s23 * 470296 s13 += s23 * 654183 s14 -= s23 * 997805 s15 += s23 * 136657 s16 -= s23 * 683901 s23 = 0 s10 += s22 * 666643 s11 += s22 * 470296 s12 += s22 * 654183 s13 -= s22 * 997805 s14 += s22 * 136657 s15 -= s22 * 683901 s22 = 0 s9 += s21 * 666643 s10 += s21 * 470296 s11 += s21 * 654183 s12 -= s21 * 997805 s13 += s21 * 136657 s14 -= s21 * 683901 s21 = 0 s8 += s20 * 666643 s9 += s20 * 470296 s10 += s20 * 654183 s11 -= s20 * 997805 s12 += s20 * 136657 s13 -= s20 * 683901 s20 = 0 s7 += s19 * 666643 s8 += s19 * 470296 s9 += s19 * 654183 s10 -= s19 * 997805 s11 += s19 * 136657 s12 -= s19 * 683901 s19 = 0 s6 += s18 * 666643 s7 += s18 * 470296 s8 += s18 * 654183 s9 -= s18 * 997805 s10 += s18 * 136657 s11 -= s18 * 683901 s18 = 0 carry[6] = (s6 + (1 << 20)) >> 21 s7 += carry[6] s6 -= carry[6] << 21 carry[8] = (s8 + (1 << 20)) >> 21 s9 += carry[8] s8 -= carry[8] << 21 carry[10] = (s10 + (1 << 20)) >> 21 s11 += carry[10] s10 -= carry[10] << 21 carry[12] = (s12 + (1 << 20)) >> 21 s13 += carry[12] s12 -= carry[12] << 21 carry[14] = (s14 + (1 << 20)) >> 21 s15 += carry[14] s14 -= carry[14] << 21 carry[16] = (s16 + (1 << 20)) >> 21 s17 += carry[16] s16 -= carry[16] << 21 carry[7] = (s7 + (1 << 20)) >> 21 s8 += carry[7] s7 -= carry[7] << 21 carry[9] = (s9 + (1 << 20)) >> 21 s10 += carry[9] s9 -= carry[9] << 21 carry[11] = (s11 + (1 << 20)) >> 21 s12 += carry[11] s11 -= carry[11] << 21 carry[13] = (s13 + (1 << 20)) >> 21 s14 += carry[13] s13 -= carry[13] << 21 carry[15] = (s15 + (1 << 20)) >> 21 s16 += carry[15] s15 -= carry[15] << 21 s5 += s17 * 666643 s6 += s17 * 470296 s7 += s17 * 654183 s8 -= s17 * 997805 s9 += s17 * 136657 s10 -= s17 * 683901 s17 = 0 s4 += s16 * 666643 s5 += s16 * 470296 s6 += s16 * 654183 s7 -= s16 * 997805 s8 += s16 * 136657 s9 -= s16 * 683901 s16 = 0 s3 += s15 * 666643 s4 += s15 * 470296 s5 += s15 * 654183 s6 -= s15 * 997805 s7 += s15 * 136657 s8 -= s15 * 683901 s15 = 0 s2 += s14 * 666643 s3 += s14 * 470296 s4 += s14 * 654183 s5 -= s14 * 997805 s6 += s14 * 136657 s7 -= s14 * 683901 s14 = 0 s1 += s13 * 666643 s2 += s13 * 470296 s3 += s13 * 654183 s4 -= s13 * 997805 s5 += s13 * 136657 s6 -= s13 * 683901 s13 = 0 s0 += s12 * 666643 s1 += s12 * 470296 s2 += s12 * 654183 s3 -= s12 * 997805 s4 += s12 * 136657 s5 -= s12 * 683901 s12 = 0 carry[0] = (s0 + (1 << 20)) >> 21 s1 += carry[0] s0 -= carry[0] << 21 carry[2] = (s2 + (1 << 20)) >> 21 s3 += carry[2] s2 -= carry[2] << 21 carry[4] = (s4 + (1 << 20)) >> 21 s5 += carry[4] s4 -= carry[4] << 21 carry[6] = (s6 + (1 << 20)) >> 21 s7 += carry[6] s6 -= carry[6] << 21 carry[8] = (s8 + (1 << 20)) >> 21 s9 += carry[8] s8 -= carry[8] << 21 carry[10] = (s10 + (1 << 20)) >> 21 s11 += carry[10] s10 -= carry[10] << 21 carry[1] = (s1 + (1 << 20)) >> 21 s2 += carry[1] s1 -= carry[1] << 21 carry[3] = (s3 + (1 << 20)) >> 21 s4 += carry[3] s3 -= carry[3] << 21 carry[5] = (s5 + (1 << 20)) >> 21 s6 += carry[5] s5 -= carry[5] << 21 carry[7] = (s7 + (1 << 20)) >> 21 s8 += carry[7] s7 -= carry[7] << 21 carry[9] = (s9 + (1 << 20)) >> 21 s10 += carry[9] s9 -= carry[9] << 21 carry[11] = (s11 + (1 << 20)) >> 21 s12 += carry[11] s11 -= carry[11] << 21 s0 += s12 * 666643 s1 += s12 * 470296 s2 += s12 * 654183 s3 -= s12 * 997805 s4 += s12 * 136657 s5 -= s12 * 683901 s12 = 0 carry[0] = s0 >> 21 s1 += carry[0] s0 -= carry[0] << 21 carry[1] = s1 >> 21 s2 += carry[1] s1 -= carry[1] << 21 carry[2] = s2 >> 21 s3 += carry[2] s2 -= carry[2] << 21 carry[3] = s3 >> 21 s4 += carry[3] s3 -= carry[3] << 21 carry[4] = s4 >> 21 s5 += carry[4] s4 -= carry[4] << 21 carry[5] = s5 >> 21 s6 += carry[5] s5 -= carry[5] << 21 carry[6] = s6 >> 21 s7 += carry[6] s6 -= carry[6] << 21 carry[7] = s7 >> 21 s8 += carry[7] s7 -= carry[7] << 21 carry[8] = s8 >> 21 s9 += carry[8] s8 -= carry[8] << 21 carry[9] = s9 >> 21 s10 += carry[9] s9 -= carry[9] << 21 carry[10] = s10 >> 21 s11 += carry[10] s10 -= carry[10] << 21 carry[11] = s11 >> 21 s12 += carry[11] s11 -= carry[11] << 21 s0 += s12 * 666643 s1 += s12 * 470296 s2 += s12 * 654183 s3 -= s12 * 997805 s4 += s12 * 136657 s5 -= s12 * 683901 s12 = 0 carry[0] = s0 >> 21 s1 += carry[0] s0 -= carry[0] << 21 carry[1] = s1 >> 21 s2 += carry[1] s1 -= carry[1] << 21 carry[2] = s2 >> 21 s3 += carry[2] s2 -= carry[2] << 21 carry[3] = s3 >> 21 s4 += carry[3] s3 -= carry[3] << 21 carry[4] = s4 >> 21 s5 += carry[4] s4 -= carry[4] << 21 carry[5] = s5 >> 21 s6 += carry[5] s5 -= carry[5] << 21 carry[6] = s6 >> 21 s7 += carry[6] s6 -= carry[6] << 21 carry[7] = s7 >> 21 s8 += carry[7] s7 -= carry[7] << 21 carry[8] = s8 >> 21 s9 += carry[8] s8 -= carry[8] << 21 carry[9] = s9 >> 21 s10 += carry[9] s9 -= carry[9] << 21 carry[10] = s10 >> 21 s11 += carry[10] s10 -= carry[10] << 21 s[0] = byte(s0 >> 0) s[1] = byte(s0 >> 8) s[2] = byte((s0 >> 16) | (s1 << 5)) s[3] = byte(s1 >> 3) s[4] = byte(s1 >> 11) s[5] = byte((s1 >> 19) | (s2 << 2)) s[6] = byte(s2 >> 6) s[7] = byte((s2 >> 14) | (s3 << 7)) s[8] = byte(s3 >> 1) s[9] = byte(s3 >> 9) s[10] = byte((s3 >> 17) | (s4 << 4)) s[11] = byte(s4 >> 4) s[12] = byte(s4 >> 12) s[13] = byte((s4 >> 20) | (s5 << 1)) s[14] = byte(s5 >> 7) s[15] = byte((s5 >> 15) | (s6 << 6)) s[16] = byte(s6 >> 2) s[17] = byte(s6 >> 10) s[18] = byte((s6 >> 18) | (s7 << 3)) s[19] = byte(s7 >> 5) s[20] = byte(s7 >> 13) s[21] = byte(s8 >> 0) s[22] = byte(s8 >> 8) s[23] = byte((s8 >> 16) | (s9 << 5)) s[24] = byte(s9 >> 3) s[25] = byte(s9 >> 11) s[26] = byte((s9 >> 19) | (s10 << 2)) s[27] = byte(s10 >> 6) s[28] = byte((s10 >> 14) | (s11 << 7)) s[29] = byte(s11 >> 1) s[30] = byte(s11 >> 9) s[31] = byte(s11 >> 17) } // Input: // s[0]+256*s[1]+...+256^63*s[63] = s // // Output: // s[0]+256*s[1]+...+256^31*s[31] = s mod l // where l = 2^252 + 27742317777372353535851937790883648493. func scReduce(out *[32]byte, s *[64]byte) { s0 := 2097151 & load3(s[:]) s1 := 2097151 & (load4(s[2:]) >> 5) s2 := 2097151 & (load3(s[5:]) >> 2) s3 := 2097151 & (load4(s[7:]) >> 7) s4 := 2097151 & (load4(s[10:]) >> 4) s5 := 2097151 & (load3(s[13:]) >> 1) s6 := 2097151 & (load4(s[15:]) >> 6) s7 := 2097151 & (load3(s[18:]) >> 3) s8 := 2097151 & load3(s[21:]) s9 := 2097151 & (load4(s[23:]) >> 5) s10 := 2097151 & (load3(s[26:]) >> 2) s11 := 2097151 & (load4(s[28:]) >> 7) s12 := 2097151 & (load4(s[31:]) >> 4) s13 := 2097151 & (load3(s[34:]) >> 1) s14 := 2097151 & (load4(s[36:]) >> 6) s15 := 2097151 & (load3(s[39:]) >> 3) s16 := 2097151 & load3(s[42:]) s17 := 2097151 & (load4(s[44:]) >> 5) s18 := 2097151 & (load3(s[47:]) >> 2) s19 := 2097151 & (load4(s[49:]) >> 7) s20 := 2097151 & (load4(s[52:]) >> 4) s21 := 2097151 & (load3(s[55:]) >> 1) s22 := 2097151 & (load4(s[57:]) >> 6) s23 := (load4(s[60:]) >> 3) s11 += s23 * 666643 s12 += s23 * 470296 s13 += s23 * 654183 s14 -= s23 * 997805 s15 += s23 * 136657 s16 -= s23 * 683901 s23 = 0 s10 += s22 * 666643 s11 += s22 * 470296 s12 += s22 * 654183 s13 -= s22 * 997805 s14 += s22 * 136657 s15 -= s22 * 683901 s22 = 0 s9 += s21 * 666643 s10 += s21 * 470296 s11 += s21 * 654183 s12 -= s21 * 997805 s13 += s21 * 136657 s14 -= s21 * 683901 s21 = 0 s8 += s20 * 666643 s9 += s20 * 470296 s10 += s20 * 654183 s11 -= s20 * 997805 s12 += s20 * 136657 s13 -= s20 * 683901 s20 = 0 s7 += s19 * 666643 s8 += s19 * 470296 s9 += s19 * 654183 s10 -= s19 * 997805 s11 += s19 * 136657 s12 -= s19 * 683901 s19 = 0 s6 += s18 * 666643 s7 += s18 * 470296 s8 += s18 * 654183 s9 -= s18 * 997805 s10 += s18 * 136657 s11 -= s18 * 683901 s18 = 0 var carry [17]int64 carry[6] = (s6 + (1 << 20)) >> 21 s7 += carry[6] s6 -= carry[6] << 21 carry[8] = (s8 + (1 << 20)) >> 21 s9 += carry[8] s8 -= carry[8] << 21 carry[10] = (s10 + (1 << 20)) >> 21 s11 += carry[10] s10 -= carry[10] << 21 carry[12] = (s12 + (1 << 20)) >> 21 s13 += carry[12] s12 -= carry[12] << 21 carry[14] = (s14 + (1 << 20)) >> 21 s15 += carry[14] s14 -= carry[14] << 21 carry[16] = (s16 + (1 << 20)) >> 21 s17 += carry[16] s16 -= carry[16] << 21 carry[7] = (s7 + (1 << 20)) >> 21 s8 += carry[7] s7 -= carry[7] << 21 carry[9] = (s9 + (1 << 20)) >> 21 s10 += carry[9] s9 -= carry[9] << 21 carry[11] = (s11 + (1 << 20)) >> 21 s12 += carry[11] s11 -= carry[11] << 21 carry[13] = (s13 + (1 << 20)) >> 21 s14 += carry[13] s13 -= carry[13] << 21 carry[15] = (s15 + (1 << 20)) >> 21 s16 += carry[15] s15 -= carry[15] << 21 s5 += s17 * 666643 s6 += s17 * 470296 s7 += s17 * 654183 s8 -= s17 * 997805 s9 += s17 * 136657 s10 -= s17 * 683901 s17 = 0 s4 += s16 * 666643 s5 += s16 * 470296 s6 += s16 * 654183 s7 -= s16 * 997805 s8 += s16 * 136657 s9 -= s16 * 683901 s16 = 0 s3 += s15 * 666643 s4 += s15 * 470296 s5 += s15 * 654183 s6 -= s15 * 997805 s7 += s15 * 136657 s8 -= s15 * 683901 s15 = 0 s2 += s14 * 666643 s3 += s14 * 470296 s4 += s14 * 654183 s5 -= s14 * 997805 s6 += s14 * 136657 s7 -= s14 * 683901 s14 = 0 s1 += s13 * 666643 s2 += s13 * 470296 s3 += s13 * 654183 s4 -= s13 * 997805 s5 += s13 * 136657 s6 -= s13 * 683901 s13 = 0 s0 += s12 * 666643 s1 += s12 * 470296 s2 += s12 * 654183 s3 -= s12 * 997805 s4 += s12 * 136657 s5 -= s12 * 683901 s12 = 0 carry[0] = (s0 + (1 << 20)) >> 21 s1 += carry[0] s0 -= carry[0] << 21 carry[2] = (s2 + (1 << 20)) >> 21 s3 += carry[2] s2 -= carry[2] << 21 carry[4] = (s4 + (1 << 20)) >> 21 s5 += carry[4] s4 -= carry[4] << 21 carry[6] = (s6 + (1 << 20)) >> 21 s7 += carry[6] s6 -= carry[6] << 21 carry[8] = (s8 + (1 << 20)) >> 21 s9 += carry[8] s8 -= carry[8] << 21 carry[10] = (s10 + (1 << 20)) >> 21 s11 += carry[10] s10 -= carry[10] << 21 carry[1] = (s1 + (1 << 20)) >> 21 s2 += carry[1] s1 -= carry[1] << 21 carry[3] = (s3 + (1 << 20)) >> 21 s4 += carry[3] s3 -= carry[3] << 21 carry[5] = (s5 + (1 << 20)) >> 21 s6 += carry[5] s5 -= carry[5] << 21 carry[7] = (s7 + (1 << 20)) >> 21 s8 += carry[7] s7 -= carry[7] << 21 carry[9] = (s9 + (1 << 20)) >> 21 s10 += carry[9] s9 -= carry[9] << 21 carry[11] = (s11 + (1 << 20)) >> 21 s12 += carry[11] s11 -= carry[11] << 21 s0 += s12 * 666643 s1 += s12 * 470296 s2 += s12 * 654183 s3 -= s12 * 997805 s4 += s12 * 136657 s5 -= s12 * 683901 s12 = 0 carry[0] = s0 >> 21 s1 += carry[0] s0 -= carry[0] << 21 carry[1] = s1 >> 21 s2 += carry[1] s1 -= carry[1] << 21 carry[2] = s2 >> 21 s3 += carry[2] s2 -= carry[2] << 21 carry[3] = s3 >> 21 s4 += carry[3] s3 -= carry[3] << 21 carry[4] = s4 >> 21 s5 += carry[4] s4 -= carry[4] << 21 carry[5] = s5 >> 21 s6 += carry[5] s5 -= carry[5] << 21 carry[6] = s6 >> 21 s7 += carry[6] s6 -= carry[6] << 21 carry[7] = s7 >> 21 s8 += carry[7] s7 -= carry[7] << 21 carry[8] = s8 >> 21 s9 += carry[8] s8 -= carry[8] << 21 carry[9] = s9 >> 21 s10 += carry[9] s9 -= carry[9] << 21 carry[10] = s10 >> 21 s11 += carry[10] s10 -= carry[10] << 21 carry[11] = s11 >> 21 s12 += carry[11] s11 -= carry[11] << 21 s0 += s12 * 666643 s1 += s12 * 470296 s2 += s12 * 654183 s3 -= s12 * 997805 s4 += s12 * 136657 s5 -= s12 * 683901 s12 = 0 carry[0] = s0 >> 21 s1 += carry[0] s0 -= carry[0] << 21 carry[1] = s1 >> 21 s2 += carry[1] s1 -= carry[1] << 21 carry[2] = s2 >> 21 s3 += carry[2] s2 -= carry[2] << 21 carry[3] = s3 >> 21 s4 += carry[3] s3 -= carry[3] << 21 carry[4] = s4 >> 21 s5 += carry[4] s4 -= carry[4] << 21 carry[5] = s5 >> 21 s6 += carry[5] s5 -= carry[5] << 21 carry[6] = s6 >> 21 s7 += carry[6] s6 -= carry[6] << 21 carry[7] = s7 >> 21 s8 += carry[7] s7 -= carry[7] << 21 carry[8] = s8 >> 21 s9 += carry[8] s8 -= carry[8] << 21 carry[9] = s9 >> 21 s10 += carry[9] s9 -= carry[9] << 21 carry[10] = s10 >> 21 s11 += carry[10] s10 -= carry[10] << 21 out[0] = byte(s0 >> 0) out[1] = byte(s0 >> 8) out[2] = byte((s0 >> 16) | (s1 << 5)) out[3] = byte(s1 >> 3) out[4] = byte(s1 >> 11) out[5] = byte((s1 >> 19) | (s2 << 2)) out[6] = byte(s2 >> 6) out[7] = byte((s2 >> 14) | (s3 << 7)) out[8] = byte(s3 >> 1) out[9] = byte(s3 >> 9) out[10] = byte((s3 >> 17) | (s4 << 4)) out[11] = byte(s4 >> 4) out[12] = byte(s4 >> 12) out[13] = byte((s4 >> 20) | (s5 << 1)) out[14] = byte(s5 >> 7) out[15] = byte((s5 >> 15) | (s6 << 6)) out[16] = byte(s6 >> 2) out[17] = byte(s6 >> 10) out[18] = byte((s6 >> 18) | (s7 << 3)) out[19] = byte(s7 >> 5) out[20] = byte(s7 >> 13) out[21] = byte(s8 >> 0) out[22] = byte(s8 >> 8) out[23] = byte((s8 >> 16) | (s9 << 5)) out[24] = byte(s9 >> 3) out[25] = byte(s9 >> 11) out[26] = byte((s9 >> 19) | (s10 << 2)) out[27] = byte(s10 >> 6) out[28] = byte((s10 >> 14) | (s11 << 7)) out[29] = byte(s11 >> 1) out[30] = byte(s11 >> 9) out[31] = byte(s11 >> 17) } // nonAdjacentForm computes a width-w non-adjacent form for this scalar. // // w must be between 2 and 8, or nonAdjacentForm will panic. func (s *Scalar) nonAdjacentForm(w uint) [256]int8 { // This implementation is adapted from the one // in curve25519-dalek and is documented there: // https://github.com/dalek-cryptography/curve25519-dalek/blob/f630041af28e9a405255f98a8a93adca18e4315b/src/scalar.rs#L800-L871 if s.s[31] > 127 { panic("scalar has high bit set illegally") } if w < 2 { panic("w must be at least 2 by the definition of NAF") } else if w > 8 { panic("NAF digits must fit in int8") } var naf [256]int8 var digits [5]uint64 for i := 0; i < 4; i++ { digits[i] = binary.LittleEndian.Uint64(s.s[i*8:]) } width := uint64(1 << w) windowMask := uint64(width - 1) pos := uint(0) carry := uint64(0) for pos < 256 { indexU64 := pos / 64 indexBit := pos % 64 var bitBuf uint64 if indexBit < 64-w { // This window's bits are contained in a single u64 bitBuf = digits[indexU64] >> indexBit } else { // Combine the current 64 bits with bits from the next 64 bitBuf = (digits[indexU64] >> indexBit) | (digits[1+indexU64] << (64 - indexBit)) } // Add carry into the current window window := carry + (bitBuf & windowMask) if window&1 == 0 { // If the window value is even, preserve the carry and continue. // Why is the carry preserved? // If carry == 0 and window & 1 == 0, // then the next carry should be 0 // If carry == 1 and window & 1 == 0, // then bit_buf & 1 == 1 so the next carry should be 1 pos += 1 continue } if window < width/2 { carry = 0 naf[pos] = int8(window) } else { carry = 1 naf[pos] = int8(window) - int8(width) } pos += w } return naf } func (s *Scalar) signedRadix16() [64]int8 { if s.s[31] > 127 { panic("scalar has high bit set illegally") } var digits [64]int8 // Compute unsigned radix-16 digits: for i := 0; i < 32; i++ { digits[2*i] = int8(s.s[i] & 15) digits[2*i+1] = int8((s.s[i] >> 4) & 15) } // Recenter coefficients: for i := 0; i < 63; i++ { carry := (digits[i] + 8) >> 4 digits[i] -= carry << 4 digits[i+1] += carry } return digits }