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// Copyright 2021 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 nistec
import (
"crypto/elliptic/internal/fiat"
"crypto/subtle"
"errors"
)
var p384B, _ = new(fiat.P384Element).SetBytes([]byte{
0xb3, 0x31, 0x2f, 0xa7, 0xe2, 0x3e, 0xe7, 0xe4, 0x98, 0x8e, 0x05, 0x6b,
0xe3, 0xf8, 0x2d, 0x19, 0x18, 0x1d, 0x9c, 0x6e, 0xfe, 0x81, 0x41, 0x12,
0x03, 0x14, 0x08, 0x8f, 0x50, 0x13, 0x87, 0x5a, 0xc6, 0x56, 0x39, 0x8d,
0x8a, 0x2e, 0xd1, 0x9d, 0x2a, 0x85, 0xc8, 0xed, 0xd3, 0xec, 0x2a, 0xef})
var p384G, _ = NewP384Point().SetBytes([]byte{0x4,
0xaa, 0x87, 0xca, 0x22, 0xbe, 0x8b, 0x05, 0x37, 0x8e, 0xb1, 0xc7, 0x1e,
0xf3, 0x20, 0xad, 0x74, 0x6e, 0x1d, 0x3b, 0x62, 0x8b, 0xa7, 0x9b, 0x98,
0x59, 0xf7, 0x41, 0xe0, 0x82, 0x54, 0x2a, 0x38, 0x55, 0x02, 0xf2, 0x5d,
0xbf, 0x55, 0x29, 0x6c, 0x3a, 0x54, 0x5e, 0x38, 0x72, 0x76, 0x0a, 0xb7,
0x36, 0x17, 0xde, 0x4a, 0x96, 0x26, 0x2c, 0x6f, 0x5d, 0x9e, 0x98, 0xbf,
0x92, 0x92, 0xdc, 0x29, 0xf8, 0xf4, 0x1d, 0xbd, 0x28, 0x9a, 0x14, 0x7c,
0xe9, 0xda, 0x31, 0x13, 0xb5, 0xf0, 0xb8, 0xc0, 0x0a, 0x60, 0xb1, 0xce,
0x1d, 0x7e, 0x81, 0x9d, 0x7a, 0x43, 0x1d, 0x7c, 0x90, 0xea, 0x0e, 0x5f})
const p384ElementLength = 48
// P384Point is a P-384 point. The zero value is NOT valid.
type P384Point struct {
// The point is represented in projective coordinates (X:Y:Z),
// where x = X/Z and y = Y/Z.
x, y, z *fiat.P384Element
}
// NewP384Point returns a new P384Point representing the point at infinity point.
func NewP384Point() *P384Point {
return &P384Point{
x: new(fiat.P384Element),
y: new(fiat.P384Element).One(),
z: new(fiat.P384Element),
}
}
// NewP384Generator returns a new P384Point set to the canonical generator.
func NewP384Generator() *P384Point {
return (&P384Point{
x: new(fiat.P384Element),
y: new(fiat.P384Element),
z: new(fiat.P384Element),
}).Set(p384G)
}
// Set sets p = q and returns p.
func (p *P384Point) Set(q *P384Point) *P384Point {
p.x.Set(q.x)
p.y.Set(q.y)
p.z.Set(q.z)
return p
}
// SetBytes sets p to the compressed, uncompressed, or infinity value encoded in
// b, as specified in SEC 1, Version 2.0, Section 2.3.4. If the point is not on
// the curve, it returns nil and an error, and the receiver is unchanged.
// Otherwise, it returns p.
func (p *P384Point) SetBytes(b []byte) (*P384Point, error) {
switch {
// Point at infinity.
case len(b) == 1 && b[0] == 0:
return p.Set(NewP384Point()), nil
// Uncompressed form.
case len(b) == 1+2*p384ElementLength && b[0] == 4:
x, err := new(fiat.P384Element).SetBytes(b[1 : 1+p384ElementLength])
if err != nil {
return nil, err
}
y, err := new(fiat.P384Element).SetBytes(b[1+p384ElementLength:])
if err != nil {
return nil, err
}
if err := p384CheckOnCurve(x, y); err != nil {
return nil, err
}
p.x.Set(x)
p.y.Set(y)
p.z.One()
return p, nil
// Compressed form
case len(b) == 1+p384ElementLength && b[0] == 0:
return nil, errors.New("unimplemented") // TODO(filippo)
default:
return nil, errors.New("invalid P384 point encoding")
}
}
func p384CheckOnCurve(x, y *fiat.P384Element) error {
// x³ - 3x + b.
x3 := new(fiat.P384Element).Square(x)
x3.Mul(x3, x)
threeX := new(fiat.P384Element).Add(x, x)
threeX.Add(threeX, x)
x3.Sub(x3, threeX)
x3.Add(x3, p384B)
// y² = x³ - 3x + b
y2 := new(fiat.P384Element).Square(y)
if x3.Equal(y2) != 1 {
return errors.New("P384 point not on curve")
}
return nil
}
// Bytes returns the uncompressed or infinity encoding of p, as specified in
// SEC 1, Version 2.0, Section 2.3.3. Note that the encoding of the point at
// infinity is shorter than all other encodings.
func (p *P384Point) Bytes() []byte {
// This function is outlined to make the allocations inline in the caller
// rather than happen on the heap.
var out [133]byte
return p.bytes(&out)
}
func (p *P384Point) bytes(out *[133]byte) []byte {
if p.z.IsZero() == 1 {
return append(out[:0], 0)
}
zinv := new(fiat.P384Element).Invert(p.z)
xx := new(fiat.P384Element).Mul(p.x, zinv)
yy := new(fiat.P384Element).Mul(p.y, zinv)
buf := append(out[:0], 4)
buf = append(buf, xx.Bytes()...)
buf = append(buf, yy.Bytes()...)
return buf
}
// Add sets q = p1 + p2, and returns q. The points may overlap.
func (q *P384Point) Add(p1, p2 *P384Point) *P384Point {
// Complete addition formula for a = -3 from "Complete addition formulas for
// prime order elliptic curves" (https://eprint.iacr.org/2015/1060), §A.2.
t0 := new(fiat.P384Element).Mul(p1.x, p2.x) // t0 := X1 * X2
t1 := new(fiat.P384Element).Mul(p1.y, p2.y) // t1 := Y1 * Y2
t2 := new(fiat.P384Element).Mul(p1.z, p2.z) // t2 := Z1 * Z2
t3 := new(fiat.P384Element).Add(p1.x, p1.y) // t3 := X1 + Y1
t4 := new(fiat.P384Element).Add(p2.x, p2.y) // t4 := X2 + Y2
t3.Mul(t3, t4) // t3 := t3 * t4
t4.Add(t0, t1) // t4 := t0 + t1
t3.Sub(t3, t4) // t3 := t3 - t4
t4.Add(p1.y, p1.z) // t4 := Y1 + Z1
x3 := new(fiat.P384Element).Add(p2.y, p2.z) // X3 := Y2 + Z2
t4.Mul(t4, x3) // t4 := t4 * X3
x3.Add(t1, t2) // X3 := t1 + t2
t4.Sub(t4, x3) // t4 := t4 - X3
x3.Add(p1.x, p1.z) // X3 := X1 + Z1
y3 := new(fiat.P384Element).Add(p2.x, p2.z) // Y3 := X2 + Z2
x3.Mul(x3, y3) // X3 := X3 * Y3
y3.Add(t0, t2) // Y3 := t0 + t2
y3.Sub(x3, y3) // Y3 := X3 - Y3
z3 := new(fiat.P384Element).Mul(p384B, t2) // Z3 := b * t2
x3.Sub(y3, z3) // X3 := Y3 - Z3
z3.Add(x3, x3) // Z3 := X3 + X3
x3.Add(x3, z3) // X3 := X3 + Z3
z3.Sub(t1, x3) // Z3 := t1 - X3
x3.Add(t1, x3) // X3 := t1 + X3
y3.Mul(p384B, y3) // Y3 := b * Y3
t1.Add(t2, t2) // t1 := t2 + t2
t2.Add(t1, t2) // t2 := t1 + t2
y3.Sub(y3, t2) // Y3 := Y3 - t2
y3.Sub(y3, t0) // Y3 := Y3 - t0
t1.Add(y3, y3) // t1 := Y3 + Y3
y3.Add(t1, y3) // Y3 := t1 + Y3
t1.Add(t0, t0) // t1 := t0 + t0
t0.Add(t1, t0) // t0 := t1 + t0
t0.Sub(t0, t2) // t0 := t0 - t2
t1.Mul(t4, y3) // t1 := t4 * Y3
t2.Mul(t0, y3) // t2 := t0 * Y3
y3.Mul(x3, z3) // Y3 := X3 * Z3
y3.Add(y3, t2) // Y3 := Y3 + t2
x3.Mul(t3, x3) // X3 := t3 * X3
x3.Sub(x3, t1) // X3 := X3 - t1
z3.Mul(t4, z3) // Z3 := t4 * Z3
t1.Mul(t3, t0) // t1 := t3 * t0
z3.Add(z3, t1) // Z3 := Z3 + t1
q.x.Set(x3)
q.y.Set(y3)
q.z.Set(z3)
return q
}
// Double sets q = p + p, and returns q. The points may overlap.
func (q *P384Point) Double(p *P384Point) *P384Point {
// Complete addition formula for a = -3 from "Complete addition formulas for
// prime order elliptic curves" (https://eprint.iacr.org/2015/1060), §A.2.
t0 := new(fiat.P384Element).Square(p.x) // t0 := X ^ 2
t1 := new(fiat.P384Element).Square(p.y) // t1 := Y ^ 2
t2 := new(fiat.P384Element).Square(p.z) // t2 := Z ^ 2
t3 := new(fiat.P384Element).Mul(p.x, p.y) // t3 := X * Y
t3.Add(t3, t3) // t3 := t3 + t3
z3 := new(fiat.P384Element).Mul(p.x, p.z) // Z3 := X * Z
z3.Add(z3, z3) // Z3 := Z3 + Z3
y3 := new(fiat.P384Element).Mul(p384B, t2) // Y3 := b * t2
y3.Sub(y3, z3) // Y3 := Y3 - Z3
x3 := new(fiat.P384Element).Add(y3, y3) // X3 := Y3 + Y3
y3.Add(x3, y3) // Y3 := X3 + Y3
x3.Sub(t1, y3) // X3 := t1 - Y3
y3.Add(t1, y3) // Y3 := t1 + Y3
y3.Mul(x3, y3) // Y3 := X3 * Y3
x3.Mul(x3, t3) // X3 := X3 * t3
t3.Add(t2, t2) // t3 := t2 + t2
t2.Add(t2, t3) // t2 := t2 + t3
z3.Mul(p384B, z3) // Z3 := b * Z3
z3.Sub(z3, t2) // Z3 := Z3 - t2
z3.Sub(z3, t0) // Z3 := Z3 - t0
t3.Add(z3, z3) // t3 := Z3 + Z3
z3.Add(z3, t3) // Z3 := Z3 + t3
t3.Add(t0, t0) // t3 := t0 + t0
t0.Add(t3, t0) // t0 := t3 + t0
t0.Sub(t0, t2) // t0 := t0 - t2
t0.Mul(t0, z3) // t0 := t0 * Z3
y3.Add(y3, t0) // Y3 := Y3 + t0
t0.Mul(p.y, p.z) // t0 := Y * Z
t0.Add(t0, t0) // t0 := t0 + t0
z3.Mul(t0, z3) // Z3 := t0 * Z3
x3.Sub(x3, z3) // X3 := X3 - Z3
z3.Mul(t0, t1) // Z3 := t0 * t1
z3.Add(z3, z3) // Z3 := Z3 + Z3
z3.Add(z3, z3) // Z3 := Z3 + Z3
q.x.Set(x3)
q.y.Set(y3)
q.z.Set(z3)
return q
}
// Select sets q to p1 if cond == 1, and to p2 if cond == 0.
func (q *P384Point) Select(p1, p2 *P384Point, cond int) *P384Point {
q.x.Select(p1.x, p2.x, cond)
q.y.Select(p1.y, p2.y, cond)
q.z.Select(p1.z, p2.z, cond)
return q
}
// ScalarMult sets p = scalar * q, and returns p.
func (p *P384Point) ScalarMult(q *P384Point, scalar []byte) *P384Point {
// table holds the first 16 multiples of q. The explicit newP384Point calls
// get inlined, letting the allocations live on the stack.
var table = [16]*P384Point{
NewP384Point(), NewP384Point(), NewP384Point(), NewP384Point(),
NewP384Point(), NewP384Point(), NewP384Point(), NewP384Point(),
NewP384Point(), NewP384Point(), NewP384Point(), NewP384Point(),
NewP384Point(), NewP384Point(), NewP384Point(), NewP384Point(),
}
for i := 1; i < 16; i++ {
table[i].Add(table[i-1], q)
}
// Instead of doing the classic double-and-add chain, we do it with a
// four-bit window: we double four times, and then add [0-15]P.
t := NewP384Point()
p.Set(NewP384Point())
for _, byte := range scalar {
p.Double(p)
p.Double(p)
p.Double(p)
p.Double(p)
for i := uint8(0); i < 16; i++ {
cond := subtle.ConstantTimeByteEq(byte>>4, i)
t.Select(table[i], t, cond)
}
p.Add(p, t)
p.Double(p)
p.Double(p)
p.Double(p)
p.Double(p)
for i := uint8(0); i < 16; i++ {
cond := subtle.ConstantTimeByteEq(byte&0b1111, i)
t.Select(table[i], t, cond)
}
p.Add(p, t)
}
return p
}