arnaucube
/
babyjubjub-rs
mirror of https://github.com/arnaucube/babyjubjub-rs.git


								// BabyJubJub elliptic curve implementation in Rust.

								// For LICENSE check https://github.com/arnaucube/babyjubjub-rs


								use num_bigint::{BigInt, ToBigInt};

								use num_traits::{One, Zero};


								pub fn modulus(a: &BigInt, m: &BigInt) -> BigInt {

								    ((a % m) + m) % m

								}


								pub fn modinv(a: &BigInt, q: &BigInt) -> Result<BigInt, String> {

								    let big_zero: BigInt = Zero::zero();

								    if a == &big_zero {

								        return Err("no mod inv of Zero".to_string());

								    }


								    let mut mn = (q.clone(), a.clone());

								    let mut xy: (BigInt, BigInt) = (Zero::zero(), One::one());


								    while mn.1 != big_zero {

								        xy = (xy.1.clone(), xy.0 - (mn.0.clone() / mn.1.clone()) * xy.1);

								        mn = (mn.1.clone(), modulus(&mn.0, &mn.1));

								    }


								    while xy.0 < Zero::zero() {

								        xy.0 = modulus(&xy.0, q);

								    }

								    Ok(xy.0)

								}


								/*

								pub fn modinv_v2(a0: &BigInt, m0: &BigInt) -> BigInt {

								    if m0 == &One::one() {

								        return One::one();

								    }


								    let (mut a, mut m, mut x0, mut inv): (BigInt, BigInt, BigInt, BigInt) =

								        (a0.clone(), m0.clone(), Zero::zero(), One::one());


								    while a > One::one() {

								        inv = inv - (&a / m.clone()) * x0.clone();

								        a = a % m.clone();

								        std::mem::swap(&mut a, &mut m);

								        std::mem::swap(&mut x0, &mut inv);

								    }


								    if inv < Zero::zero() {

								        inv += m0.clone()

								    }

								    inv

								}


								pub fn modinv_v3(a: &BigInt, q: &BigInt) -> BigInt {

								    let mut aa: BigInt = a.clone();

								    let mut qq: BigInt = q.clone();

								    if qq < Zero::zero() {

								        qq = -qq;

								    }

								    if aa < Zero::zero() {

								        aa = -aa;

								    }

								    let d = num::Integer::gcd(&aa, &qq);

								    if d != One::one() {

								        println!("ERR no mod_inv");

								    }

								    let res: BigInt;

								    if d < Zero::zero() {

								        res = d + qq;

								    } else {

								        res = d;

								    }

								    res

								}

								pub fn modinv_v4(x: &BigInt, q: &BigInt) -> BigInt {

								    let (gcd, inverse, _) = extended_gcd(x.clone(), q.clone());

								    let one: BigInt = One::one();

								    if gcd == one {

								        modulus(&inverse, q)

								    } else {

								        panic!("error: gcd!=one")

								    }

								}

								pub fn extended_gcd(a: BigInt, b: BigInt) -> (BigInt, BigInt, BigInt) {

								    let (mut s, mut old_s) = (BigInt::zero(), BigInt::one());

								    let (mut t, mut old_t) = (BigInt::one(), BigInt::zero());

								    let (mut r, mut old_r) = (b, a);


								    while r != BigInt::zero() {

								        let quotient = &old_r / &r;

								        old_r -= &quotient * &r;

								        std::mem::swap(&mut old_r, &mut r);

								        old_s -= &quotient * &s;

								        std::mem::swap(&mut old_s, &mut s);

								        old_t -= quotient * &t;

								        std::mem::swap(&mut old_t, &mut t);

								    }


								    let _quotients = (t, s); // == (a, b) / gcd


								    (old_r, old_s, old_t)

								}

								*/


								pub fn concatenate_arrays<T: Clone>(x: &[T], y: &[T]) -> Vec<T> {

								    x.iter().chain(y).cloned().collect()

								}


								#[allow(clippy::many_single_char_names)]

								pub fn modsqrt(a: &BigInt, q: &BigInt) -> Result<BigInt, String> {

								    // Tonelli-Shanks Algorithm (https://en.wikipedia.org/wiki/Tonelli%E2%80%93Shanks_algorithm)

								    //

								    // This implementation is following the Go lang core implementation https://golang.org/src/math/big/int.go?s=23173:23210#L859

								    // Also described in https://www.maa.org/sites/default/files/pdf/upload_library/22/Polya/07468342.di020786.02p0470a.pdf

								    // -> section 6


								    let zero: BigInt = Zero::zero();

								    let one: BigInt = One::one();

								    if legendre_symbol(a, q) != 1 || a == &zero || q == &2.to_bigint().unwrap() {

								        return Err("not a mod p square".to_string());

								    } else if q % 4.to_bigint().unwrap() == 3.to_bigint().unwrap() {

								        let r = a.modpow(&((q + one) / 4), q);

								        return Ok(r);

								    }


								    let mut s = q - &one;

								    let mut e: BigInt = Zero::zero();

								    while &s % 2 == zero {

								        s >>= 1;

								        e += &one;

								    }


								    let mut n: BigInt = 2.to_bigint().unwrap();

								    while legendre_symbol(&n, q) != -1 {

								        n = &n + &one;

								    }


								    let mut y = a.modpow(&((&s + &one) >> 1), q);

								    let mut b = a.modpow(&s, q);

								    let mut g = n.modpow(&s, q);

								    let mut r = e;


								    loop {

								        let mut t = b.clone();

								        let mut m: BigInt = Zero::zero();

								        while t != one {

								            t = modulus(&(&t * &t), q);

								            m += &one;

								        }


								        if m == zero {

								            return Ok(y);

								        }


								        t = g.modpow(&(2.to_bigint().unwrap().modpow(&(&r - &m - 1), q)), q);

								        g = g.modpow(&(2.to_bigint().unwrap().modpow(&(r - &m), q)), q);

								        y = modulus(&(y * t), q);

								        b = modulus(&(b * &g), q);

								        r = m.clone();

								    }

								}


								#[allow(dead_code)]

								#[allow(clippy::many_single_char_names)]

								pub fn modsqrt_v2(a: &BigInt, q: &BigInt) -> Result<BigInt, String> {

								    // Tonelli-Shanks Algorithm (https://en.wikipedia.org/wiki/Tonelli%E2%80%93Shanks_algorithm)

								    //

								    // This implementation is following this Python implementation by Dusk https://github.com/dusk-network/dusk-zerocaf/blob/master/tools/tonelli.py


								    let zero: BigInt = Zero::zero();

								    let one: BigInt = One::one();

								    if legendre_symbol(a, q) != 1 || a == &zero || q == &2.to_bigint().unwrap() {

								        return Err("not a mod p square".to_string());

								    } else if q % 4.to_bigint().unwrap() == 3.to_bigint().unwrap() {

								        let r = a.modpow(&((q + one) / 4), q);

								        return Ok(r);

								    }


								    let mut p = q - &one;

								    let mut s: BigInt = Zero::zero();

								    while &p % 2.to_bigint().unwrap() == zero {

								        s += &one;

								        p >>= 1;

								    }


								    let mut z: BigInt = One::one();

								    while legendre_symbol(&z, q) != -1 {

								        z = &z + &one;

								    }

								    let mut c = z.modpow(&p, q);


								    let mut x = a.modpow(&((&p + &one) >> 1), q);

								    let mut t = a.modpow(&p, q);

								    let mut m = s;


								    while t != one {

								        let mut i: BigInt = One::one();

								        let mut e: BigInt = 2.to_bigint().unwrap();

								        while i < m {

								            if t.modpow(&e, q) == one {

								                break;

								            }

								            e *= 2.to_bigint().unwrap();

								            i += &one;

								        }


								        let b = c.modpow(&(2.to_bigint().unwrap().modpow(&(&m - &i - 1), q)), q);

								        x = modulus(&(x * &b), q);

								        t = modulus(&(t * &b * &b), q);

								        c = modulus(&(&b * &b), q);

								        m = i.clone();

								    }

								    Ok(x)

								}


								pub fn legendre_symbol(a: &BigInt, q: &BigInt) -> i32 {

								    // returns 1 if has a square root modulo q

								    let one: BigInt = One::one();

								    let ls: BigInt = a.modpow(&((q - &one) >> 1), q);

								    if ls == q - one {

								        return -1;

								    }

								    1

								}


								#[cfg(test)]

								mod tests {

								    use super::*;


								    #[test]

								    fn test_mod_inverse() {

								        let a = BigInt::parse_bytes(b"123456789123456789123456789123456789123456789", 10).unwrap();

								        let b = BigInt::parse_bytes(b"12345678", 10).unwrap();

								        assert_eq!(

								            modinv(&a, &b).unwrap(),

								            BigInt::parse_bytes(b"641883", 10).unwrap()

								        );

								    }


								    #[test]

								    fn test_sqrtmod() {

								        let a = BigInt::parse_bytes(

								            b"6536923810004159332831702809452452174451353762940761092345538667656658715568",

								            10,

								        )

								        .unwrap();

								        let q = BigInt::parse_bytes(

								            b"7237005577332262213973186563042994240857116359379907606001950938285454250989",

								            10,

								        )

								        .unwrap();


								        assert_eq!(

								            (modsqrt(&a, &q).unwrap()).to_string(),

								            "5464794816676661649783249706827271879994893912039750480019443499440603127256"

								        );

								        assert_eq!(

								            (modsqrt_v2(&a, &q).unwrap()).to_string(),

								            "5464794816676661649783249706827271879994893912039750480019443499440603127256"

								        );

								    }

								}