Elliptic Curve
S
use std::collections::HashSet;
use std::fmt;
use std::hash::{Hash, Hasher};
use std::ops::{Add, Neg, Sub};
use crate::math::field::{Field, PrimeField};
use crate::math::quadratic_residue::legendre_symbol;
/// Elliptic curve defined by `y^2 = x^3 + Ax + B` over a prime field `F` of
/// characteristic != 2, 3
///
/// The coefficients of the elliptic curve are the constant parameters `A` and `B`.
///
/// Points form an abelian group with the neutral element [`EllipticCurve::infinity`]. The points
/// are represented via affine coordinates ([`EllipticCurve::new`]) except for the points
/// at infinity ([`EllipticCurve::infinity`]).
///
/// # Example
///
/// ```
/// use the_algorithms_rust::math::{EllipticCurve, PrimeField};
/// type E = EllipticCurve<PrimeField<7>, 1, 0>;
/// let P = E::new(0, 0).expect("not on curve E");
/// assert_eq!(P + P, E::infinity());
/// ```
#[derive(Clone, Copy)]
pub struct EllipticCurve<F, const A: i64, const B: i64> {
infinity: bool,
x: F,
y: F,
}
impl<F: Field, const A: i64, const B: i64> EllipticCurve<F, A, B> {
/// Point at infinity also the neutral element of the group
pub fn infinity() -> Self {
Self::check_invariants();
Self {
infinity: true,
x: F::ZERO,
y: F::ZERO,
}
}
/// Affine point
///
///
/// Return `None` if the coordinates are not on the curve
pub fn new(x: impl Into<F>, y: impl Into<F>) -> Option<Self> {
Self::check_invariants();
let x = x.into();
let y = y.into();
if Self::contains(x, y) {
Some(Self {
infinity: false,
x,
y,
})
} else {
None
}
}
/// Return `true` if this is the point at infinity
pub fn is_infinity(&self) -> bool {
self.infinity
}
/// The affine x-coordinate of the point
pub fn x(&self) -> &F {
&self.x
}
/// The affine y-coordinate of the point
pub fn y(&self) -> &F {
&self.y
}
/// The discrimant of the elliptic curve
pub const fn discriminant() -> i64 {
// Note: we can't return an element of F here, because it is not
// possible to declare a trait function as const (cf.
// <https://doc.rust-lang.org/error_codes/E0379.html>)
(-16 * (4 * A * A * A + 27 * B * B)) % (F::CHARACTERISTIC as i64)
}
fn contains(x: F, y: F) -> bool {
y * y == x * x * x + x.integer_mul(A) + F::ONE.integer_mul(B)
}
const fn check_invariants() {
assert!(F::CHARACTERISTIC != 2);
assert!(F::CHARACTERISTIC != 3);
assert!(Self::discriminant() != 0);
}
}
/// Elliptic curve methods over a prime field
impl<const P: u64, const A: i64, const B: i64> EllipticCurve<PrimeField<P>, A, B> {
/// Naive calculation of points via enumeration
// TODO: Implement via generators
pub fn points() -> impl Iterator<Item = Self> {
std::iter::once(Self::infinity()).chain(
PrimeField::elements()
.flat_map(|x| PrimeField::elements().filter_map(move |y| Self::new(x, y))),
)
}
/// Number of points on the elliptic curve over `F`, that is, `#E(F)`
pub fn cardinality() -> usize {
// TODO: implement counting for big P
Self::cardinality_counted_legendre()
}
/// Number of points on the elliptic curve over `F`, that is, `#E(F)`
///
/// We simply count the number of points for each x coordinate and sum them up.
/// For that, we first precompute the table of all squares in `F`.
///
/// Time complexity: O(P) <br>
/// Space complexity: O(P)
///
/// Only fast for small fields.
pub fn cardinality_counted_table() -> usize {
let squares: HashSet<_> = PrimeField::<P>::elements().map(|x| x * x).collect();
1 + PrimeField::elements()
.map(|x| {
let y_square = x * x * x + x.integer_mul(A) + PrimeField::from_integer(B);
if y_square == PrimeField::ZERO {
1
} else if squares.contains(&y_square) {
2
} else {
0
}
})
.sum::<usize>()
}
/// Number of points on the elliptic curve over `F`, that is, `#E(F)`
///
/// We count the number of points for each x coordinate by using the [Legendre symbol] _(X |
/// P)_:
///
/// _1 + (x^3 + Ax + B | P),_
///
/// The total number of points is then:
///
/// _#E(F) = 1 + P + Σ_x (x^3 + Ax + B | P)_ for _x_ in _F_.
///
/// Time complexity: O(P) <br>
/// Space complexity: O(1)
///
/// Only fast for small fields.
///
/// [Legendre symbol]: https://en.wikipedia.org/wiki/Legendre_symbol
pub fn cardinality_counted_legendre() -> usize {
let cardinality: i64 = 1
+ P as i64
+ PrimeField::<P>::elements()
.map(|x| {
let y_square = x * x * x + x.integer_mul(A) + PrimeField::from_integer(B);
let y_square_int = y_square.to_integer();
legendre_symbol(y_square_int, P)
})
.sum::<i64>();
cardinality
.try_into()
.expect("invalid legendre cardinality")
}
}
/// Group law
impl<F: Field, const A: i64, const B: i64> Add for EllipticCurve<F, A, B> {
type Output = Self;
fn add(self, p: Self) -> Self::Output {
if self.infinity {
p
} else if p.infinity {
self
} else if self.x == p.x && self.y == -p.y {
// mirrored
Self::infinity()
} else {
let slope = if self.x != p.x {
(self.y - p.y) / (self.x - p.x)
} else {
((self.x * self.x).integer_mul(3) + F::from_integer(A)) / self.y.integer_mul(2)
};
let x = slope * slope - self.x - p.x;
let y = -self.y + slope * (self.x - x);
Self::new(x, y).expect("elliptic curve group law failed")
}
}
}
/// Inverse
impl<F: Field, const A: i64, const B: i64> Neg for EllipticCurve<F, A, B> {
type Output = Self;
fn neg(self) -> Self::Output {
if self.infinity {
self
} else {
Self::new(self.x, -self.y).expect("elliptic curves are x-axis symmetric")
}
}
}
/// Difference
impl<F: Field, const A: i64, const B: i64> Sub for EllipticCurve<F, A, B> {
type Output = Self;
fn sub(self, p: Self) -> Self::Output {
self + (-p)
}
}
/// Debug representation via projective coordinates
impl<F: fmt::Debug, const A: i64, const B: i64> fmt::Debug for EllipticCurve<F, A, B> {
fn fmt(&self, f: &mut fmt::Formatter<'_>) -> fmt::Result {
if self.infinity {
f.write_str("(0:0:1)")
} else {
write!(f, "({:?}:{:?}:1)", self.x, self.y)
}
}
}
/// Equality of the elliptic curve points (short-circuit at infinity)
impl<F: Field, const A: i64, const B: i64> PartialEq for EllipticCurve<F, A, B> {
fn eq(&self, other: &Self) -> bool {
(self.infinity && other.infinity)
|| (self.infinity == other.infinity && self.x == other.x && self.y == other.y)
}
}
impl<F: Field, const A: i64, const B: i64> Eq for EllipticCurve<F, A, B> {}
impl<F: Field + Hash, const A: i64, const B: i64> Hash for EllipticCurve<F, A, B> {
fn hash<H: Hasher>(&self, state: &mut H) {
if self.infinity {
state.write_u8(1);
F::ZERO.hash(state);
F::ZERO.hash(state);
} else {
state.write_u8(0);
self.x.hash(state);
self.y.hash(state);
}
}
}
#[cfg(test)]
mod tests {
use std::collections::HashSet;
use std::time::Instant;
use super::*;
#[test]
#[should_panic]
fn test_char_2_panic() {
EllipticCurve::<PrimeField<2>, -1, 1>::infinity();
}
#[test]
#[should_panic]
fn test_char_3_panic() {
EllipticCurve::<PrimeField<2>, -1, 1>::infinity();
}
#[test]
#[should_panic]
fn test_singular_panic() {
EllipticCurve::<PrimeField<5>, 0, 0>::infinity();
}
#[test]
fn e_5_1_0_group_table() {
type F = PrimeField<5>;
type E = EllipticCurve<F, 1, 0>;
assert_eq!(E::points().count(), 4);
let [a, b, c, d] = [
E::new(0, 0).unwrap(),
E::infinity(),
E::new(2, 0).unwrap(),
E::new(3, 0).unwrap(),
];
assert_eq!(a + a, b);
assert_eq!(a + b, a);
assert_eq!(a + c, d);
assert_eq!(a + d, c);
assert_eq!(b + a, a);
assert_eq!(b + b, b);
assert_eq!(b + c, c);
assert_eq!(b + d, d);
assert_eq!(c + a, d);
assert_eq!(c + b, c);
assert_eq!(c + c, b);
assert_eq!(c + d, a);
assert_eq!(d + a, c);
assert_eq!(d + b, d);
assert_eq!(d + c, a);
assert_eq!(d + d, b);
}
#[test]
fn group_law() {
fn test<const P: u64>() {
type E<const P: u64> = EllipticCurve<PrimeField<P>, 1, 0>;
let o = E::<P>::infinity();
assert_eq!(-o, o);
let points: Vec<_> = E::points().collect();
for &p in &points {
assert_eq!(p + (-p), o); // inverse
assert_eq!((-p) + p, o); // inverse
assert_eq!(p - p, o); //inverse
assert_eq!(p + o, p); // neutral
assert_eq!(o + p, p); //neutral
for &q in &points {
assert_eq!(p + q, q + p); // commutativity
// associativity
for &s in &points {
assert_eq!((p + q) + s, p + (q + s));
}
}
}
}
test::<5>();
test::<7>();
test::<11>();
test::<13>();
test::<17>();
test::<19>();
test::<23>();
}
#[test]
fn cardinality() {
fn test<const P: u64>(expected: usize) {
type E<const P: u64> = EllipticCurve<PrimeField<P>, 1, 0>;
assert_eq!(E::<P>::cardinality(), expected);
assert_eq!(E::<P>::cardinality_counted_table(), expected);
assert_eq!(E::<P>::cardinality_counted_legendre(), expected);
}
test::<5>(4);
test::<7>(8);
test::<11>(12);
test::<13>(20);
test::<17>(16);
test::<19>(20);
test::<23>(24);
}
#[test]
#[ignore = "slow test for measuring time"]
fn cardinality_perf() {
const P: u64 = 1000003;
type E = EllipticCurve<PrimeField<P>, 1, 0>;
const EXPECTED: usize = 1000004;
let now = Instant::now();
assert_eq!(E::cardinality_counted_table(), EXPECTED);
println!("cardinality_counted_table : {:?}", now.elapsed());
let now = Instant::now();
assert_eq!(E::cardinality_counted_legendre(), EXPECTED);
println!("cardinality_counted_legendre : {:?}", now.elapsed());
}
#[test]
#[ignore = "slow test showing that cadinality is not yet feasible to compute for a large prime"]
fn cardinality_large_prime() {
const P: u64 = 2_u64.pow(63) - 25; // largest prime fitting into i64
type E = EllipticCurve<PrimeField<P>, 1, 0>;
const EXPECTED: usize = 9223372041295506260;
let now = Instant::now();
assert_eq!(E::cardinality(), EXPECTED);
println!("cardinality: {:?}", now.elapsed());
}
#[test]
fn test_points() {
type F = PrimeField<5>;
type E = EllipticCurve<F, 1, 0>;
let points: HashSet<_> = E::points().collect();
let expected: HashSet<_> = [
E::infinity(),
E::new(0, 0).unwrap(),
E::new(2, 0).unwrap(),
E::new(3, 0).unwrap(),
]
.into_iter()
.collect();
assert_eq!(points, expected);
}
}
