#![recursion_limit = "1024"]
extern crate proc_macro;
extern crate proc_macro2;
extern crate syn;
#[macro_use]
extern crate quote;
extern crate num_bigint;
extern crate num_integer;
extern crate num_traits;
use num_bigint::BigUint;
use num_integer::Integer;
use num_traits::{One, ToPrimitive, Zero};
use quote::TokenStreamExt;
use std::str::FromStr;
#[proc_macro_derive(PrimeField, attributes(PrimeFieldModulus, PrimeFieldGenerator))]
pub fn prime_field(input: proc_macro::TokenStream) -> proc_macro::TokenStream {
let ast: syn::DeriveInput = syn::parse(input).unwrap();
let repr_ident = fetch_wrapped_ident(&ast.data)
.expect("PrimeField derive only operates over tuple structs of a single item");
let modulus: BigUint = fetch_attr("PrimeFieldModulus", &ast.attrs)
.expect("Please supply a PrimeFieldModulus attribute")
.parse()
.expect("PrimeFieldModulus should be a number");
let generator: BigUint = fetch_attr("PrimeFieldGenerator", &ast.attrs)
.expect("Please supply a PrimeFieldGenerator attribute")
.parse()
.expect("PrimeFieldGenerator should be a number");
let mut limbs = 1;
{
let mod2 = (&modulus) << 1;
let mut cur = BigUint::one() << 64;
while cur < mod2 {
limbs += 1;
cur = cur << 64;
}
}
let mut gen = proc_macro2::TokenStream::new();
let (constants_impl, sqrt_impl) =
prime_field_constants_and_sqrt(&ast.ident, &repr_ident, modulus, limbs, generator);
gen.extend(constants_impl);
gen.extend(prime_field_repr_impl(&repr_ident, limbs));
gen.extend(prime_field_impl(&ast.ident, &repr_ident, limbs));
gen.extend(sqrt_impl);
gen.into()
}
fn fetch_wrapped_ident(body: &syn::Data) -> Option<syn::Ident> {
match body {
&syn::Data::Struct(ref variant_data) => match variant_data.fields {
syn::Fields::Unnamed(ref fields) => {
if fields.unnamed.len() == 1 {
match fields.unnamed[0].ty {
syn::Type::Path(ref path) => {
if path.path.segments.len() == 1 {
return Some(path.path.segments[0].ident.clone());
}
}
_ => {}
}
}
}
_ => {}
},
_ => {}
};
None
}
fn fetch_attr(name: &str, attrs: &[syn::Attribute]) -> Option<String> {
for attr in attrs {
if let Ok(meta) = attr.parse_meta() {
match meta {
syn::Meta::NameValue(nv) => {
if nv.path.get_ident().map(|i| i.to_string()) == Some(name.to_string()) {
match nv.lit {
syn::Lit::Str(ref s) => return Some(s.value()),
_ => {
panic!("attribute {} should be a string", name);
}
}
}
}
_ => {
panic!("attribute {} should be a string", name);
}
}
}
}
None
}
fn prime_field_repr_impl(repr: &syn::Ident, limbs: usize) -> proc_macro2::TokenStream {
quote! {
#[derive(Copy, Clone, PartialEq, Eq, Default, Zeroize)]
pub struct #repr(pub [u64; #limbs]);
impl ::std::fmt::Debug for #repr
{
fn fmt(&self, f: &mut ::std::fmt::Formatter) -> ::std::fmt::Result {
write!(f, "0x")?;
for i in self.0.iter().rev() {
write!(f, "{:016x}", *i)?;
}
Ok(())
}
}
impl ::std::fmt::Display for #repr {
fn fmt(&self, f: &mut ::std::fmt::Formatter) -> ::std::fmt::Result {
write!(f, "0x")?;
for i in self.0.iter().rev() {
write!(f, "{:016x}", *i)?;
}
Ok(())
}
}
impl AsRef<[u64]> for #repr {
#[inline(always)]
fn as_ref(&self) -> &[u64] {
&self.0
}
}
impl AsMut<[u64]> for #repr {
#[inline(always)]
fn as_mut(&mut self) -> &mut [u64] {
&mut self.0
}
}
impl From<u64> for #repr {
#[inline(always)]
fn from(val: u64) -> #repr {
use std::default::Default;
let mut repr = Self::default();
repr.0[0] = val;
repr
}
}
impl Ord for #repr {
#[inline(always)]
fn cmp(&self, other: &#repr) -> ::std::cmp::Ordering {
for (a, b) in self.0.iter().rev().zip(other.0.iter().rev()) {
if a < b {
return ::std::cmp::Ordering::Less
} else if a > b {
return ::std::cmp::Ordering::Greater
}
}
::std::cmp::Ordering::Equal
}
}
impl PartialOrd for #repr {
#[inline(always)]
fn partial_cmp(&self, other: &#repr) -> Option<::std::cmp::Ordering> {
Some(self.cmp(other))
}
}
impl ::ff::PrimeFieldRepr for #repr {
#[inline(always)]
fn is_odd(&self) -> bool {
self.0[0] & 1 == 1
}
#[inline(always)]
fn is_even(&self) -> bool {
!self.is_odd()
}
#[inline(always)]
fn is_zero(&self) -> bool {
self.0.iter().all(|&e| e == 0)
}
#[inline(always)]
fn shr(&mut self, mut n: u32) {
if n as usize >= 64 * #limbs {
*self = Self::from(0);
return;
}
while n >= 64 {
let mut t = 0;
for i in self.0.iter_mut().rev() {
::std::mem::swap(&mut t, i);
}
n -= 64;
}
if n > 0 {
let mut t = 0;
for i in self.0.iter_mut().rev() {
let t2 = *i << (64 - n);
*i >>= n;
*i |= t;
t = t2;
}
}
}
#[inline(always)]
fn div2(&mut self) {
let mut t = 0;
for i in self.0.iter_mut().rev() {
let t2 = *i << 63;
*i >>= 1;
*i |= t;
t = t2;
}
}
#[inline(always)]
fn mul2(&mut self) {
let mut last = 0;
for i in &mut self.0 {
let tmp = *i >> 63;
*i <<= 1;
*i |= last;
last = tmp;
}
}
#[inline(always)]
fn shl(&mut self, mut n: u32) {
if n as usize >= 64 * #limbs {
*self = Self::from(0);
return;
}
while n >= 64 {
let mut t = 0;
for i in &mut self.0 {
::std::mem::swap(&mut t, i);
}
n -= 64;
}
if n > 0 {
let mut t = 0;
for i in &mut self.0 {
let t2 = *i >> (64 - n);
*i <<= n;
*i |= t;
t = t2;
}
}
}
#[inline(always)]
fn num_bits(&self) -> u32 {
let mut ret = (#limbs as u32) * 64;
for i in self.0.iter().rev() {
let leading = i.leading_zeros();
ret -= leading;
if leading != 64 {
break;
}
}
ret
}
#[inline(always)]
fn add_nocarry(&mut self, other: &#repr) {
let mut carry = 0;
for (a, b) in self.0.iter_mut().zip(other.0.iter()) {
*a = ::ff::adc(*a, *b, &mut carry);
}
}
#[inline(always)]
fn sub_noborrow(&mut self, other: &#repr) {
let mut borrow = 0;
for (a, b) in self.0.iter_mut().zip(other.0.iter()) {
*a = ::ff::sbb(*a, *b, &mut borrow);
}
}
}
}
}
fn biguint_to_real_u64_vec(mut v: BigUint, limbs: usize) -> Vec<u64> {
let m = BigUint::one() << 64;
let mut ret = vec![];
while v > BigUint::zero() {
ret.push((&v % &m).to_u64().unwrap());
v = v >> 64;
}
while ret.len() < limbs {
ret.push(0);
}
assert!(ret.len() == limbs);
ret
}
fn biguint_to_u64_vec(v: BigUint, limbs: usize) -> proc_macro2::TokenStream {
let ret = biguint_to_real_u64_vec(v, limbs);
quote!([#(#ret,)*])
}
fn biguint_num_bits(mut v: BigUint) -> u32 {
let mut bits = 0;
while v != BigUint::zero() {
v = v >> 1;
bits += 1;
}
bits
}
fn exp(base: BigUint, exp: &BigUint, modulus: &BigUint) -> BigUint {
let mut ret = BigUint::one();
for i in exp
.to_bytes_be()
.into_iter()
.flat_map(|x| (0..8).rev().map(move |i| (x >> i).is_odd()))
{
ret = (&ret * &ret) % modulus;
if i {
ret = (ret * &base) % modulus;
}
}
ret
}
#[test]
fn test_exp() {
assert_eq!(
exp(
BigUint::from_str("4398572349857239485729348572983472345").unwrap(),
&BigUint::from_str("5489673498567349856734895").unwrap(),
&BigUint::from_str(
"52435875175126190479447740508185965837690552500527637822603658699938581184513"
)
.unwrap()
),
BigUint::from_str(
"4371221214068404307866768905142520595925044802278091865033317963560480051536"
)
.unwrap()
);
}
fn prime_field_constants_and_sqrt(
name: &syn::Ident,
repr: &syn::Ident,
modulus: BigUint,
limbs: usize,
generator: BigUint,
) -> (proc_macro2::TokenStream, proc_macro2::TokenStream) {
let modulus_num_bits = biguint_num_bits(modulus.clone());
let repr_shave_bits = (64 * limbs as u32) - biguint_num_bits(modulus.clone());
let r = (BigUint::one() << (limbs * 64)) % &modulus;
let mut s: u32 = 0;
let mut t = &modulus - BigUint::from_str("1").unwrap();
while t.is_even() {
t = t >> 1;
s += 1;
}
let root_of_unity = biguint_to_u64_vec(
(exp(generator.clone(), &t, &modulus) * &r) % &modulus,
limbs,
);
let generator = biguint_to_u64_vec((generator.clone() * &r) % &modulus, limbs);
let mod_minus_1_over_2 =
biguint_to_u64_vec((&modulus - BigUint::from_str("1").unwrap()) >> 1, limbs);
let legendre_impl = quote! {
fn legendre(&self) -> ::ff::LegendreSymbol {
let s = self.pow(#mod_minus_1_over_2);
if s == Self::zero() {
::ff::LegendreSymbol::Zero
} else if s == Self::one() {
::ff::LegendreSymbol::QuadraticResidue
} else {
::ff::LegendreSymbol::QuadraticNonResidue
}
}
};
let sqrt_impl =
if (&modulus % BigUint::from_str("4").unwrap()) == BigUint::from_str("3").unwrap() {
let mod_minus_3_over_4 =
biguint_to_u64_vec((&modulus - BigUint::from_str("3").unwrap()) >> 2, limbs);
let rneg = biguint_to_u64_vec(&modulus - &r, limbs);
quote! {
impl ::ff::SqrtField for #name {
#legendre_impl
fn sqrt(&self) -> Option<Self> {
let mut a1 = self.pow(#mod_minus_3_over_4);
let mut a0 = a1;
a0.square();
a0.mul_assign(self);
if a0.0 == #repr(#rneg) {
None
} else {
a1.mul_assign(self);
Some(a1)
}
}
}
}
} else if (&modulus % BigUint::from_str("16").unwrap()) == BigUint::from_str("1").unwrap() {
let t_plus_1_over_2 = biguint_to_u64_vec((&t + BigUint::one()) >> 1, limbs);
let t = biguint_to_u64_vec(t.clone(), limbs);
quote! {
impl ::ff::SqrtField for #name {
#legendre_impl
fn sqrt(&self) -> Option<Self> {
match self.legendre() {
::ff::LegendreSymbol::Zero => Some(*self),
::ff::LegendreSymbol::QuadraticNonResidue => None,
::ff::LegendreSymbol::QuadraticResidue => {
let mut c = #name(ROOT_OF_UNITY);
let mut r = self.pow(#t_plus_1_over_2);
let mut t = self.pow(#t);
let mut m = S;
while t != Self::one() {
let mut i = 1;
{
let mut t2i = t;
t2i.square();
loop {
if t2i == Self::one() {
break;
}
t2i.square();
i += 1;
}
}
for _ in 0..(m - i - 1) {
c.square();
}
r.mul_assign(&c);
c.square();
t.mul_assign(&c);
m = i;
}
Some(r)
}
}
}
}
}
} else {
quote! {}
};
let r2 = biguint_to_u64_vec((&r * &r) % &modulus, limbs);
let r = biguint_to_u64_vec(r, limbs);
let modulus = biguint_to_real_u64_vec(modulus, limbs);
let mut inv = 1u64;
for _ in 0..63 {
inv = inv.wrapping_mul(inv);
inv = inv.wrapping_mul(modulus[0]);
}
inv = inv.wrapping_neg();
(
quote! {
const MODULUS: #repr = #repr([#(#modulus,)*]);
const MODULUS_BITS: u32 = #modulus_num_bits;
const REPR_SHAVE_BITS: u32 = #repr_shave_bits;
const R: #repr = #repr(#r);
const R2: #repr = #repr(#r2);
const INV: u64 = #inv;
const GENERATOR: #repr = #repr(#generator);
const S: u32 = #s;
const ROOT_OF_UNITY: #repr = #repr(#root_of_unity);
},
sqrt_impl,
)
}
fn prime_field_impl(
name: &syn::Ident,
repr: &syn::Ident,
limbs: usize,
) -> proc_macro2::TokenStream {
fn get_temp(n: usize) -> syn::Ident {
syn::Ident::new(&format!("r{}", n), proc_macro2::Span::call_site())
}
let mut mont_paramlist = proc_macro2::TokenStream::new();
mont_paramlist.append_separated(
(0..(limbs * 2)).map(|i| (i, get_temp(i))).map(|(i, x)| {
if i != 0 {
quote! {mut #x: u64}
} else {
quote! {#x: u64}
}
}),
proc_macro2::Punct::new(',', proc_macro2::Spacing::Alone),
);
fn mont_impl(limbs: usize) -> proc_macro2::TokenStream {
let mut gen = proc_macro2::TokenStream::new();
for i in 0..limbs {
{
let temp = get_temp(i);
gen.extend(quote! {
let k = #temp.wrapping_mul(INV);
let mut carry = 0;
::ff::mac_with_carry(#temp, k, MODULUS.0[0], &mut carry);
});
}
for j in 1..limbs {
let temp = get_temp(i + j);
gen.extend(quote! {
#temp = ::ff::mac_with_carry(#temp, k, MODULUS.0[#j], &mut carry);
});
}
let temp = get_temp(i + limbs);
if i == 0 {
gen.extend(quote! {
#temp = ::ff::adc(#temp, 0, &mut carry);
});
} else {
gen.extend(quote! {
#temp = ::ff::adc(#temp, carry2, &mut carry);
});
}
if i != (limbs - 1) {
gen.extend(quote! {
let carry2 = carry;
});
}
}
for i in 0..limbs {
let temp = get_temp(limbs + i);
gen.extend(quote! {
(self.0).0[#i] = #temp;
});
}
gen
}
fn sqr_impl(a: proc_macro2::TokenStream, limbs: usize) -> proc_macro2::TokenStream {
let mut gen = proc_macro2::TokenStream::new();
for i in 0..(limbs - 1) {
gen.extend(quote! {
let mut carry = 0;
});
for j in (i + 1)..limbs {
let temp = get_temp(i + j);
if i == 0 {
gen.extend(quote! {
let #temp = ::ff::mac_with_carry(0, (#a.0).0[#i], (#a.0).0[#j], &mut carry);
});
} else {
gen.extend(quote!{
let #temp = ::ff::mac_with_carry(#temp, (#a.0).0[#i], (#a.0).0[#j], &mut carry);
});
}
}
let temp = get_temp(i + limbs);
gen.extend(quote! {
let #temp = carry;
});
}
for i in 1..(limbs * 2) {
let temp0 = get_temp(limbs * 2 - i);
let temp1 = get_temp(limbs * 2 - i - 1);
if i == 1 {
gen.extend(quote! {
let #temp0 = #temp1 >> 63;
});
} else if i == (limbs * 2 - 1) {
gen.extend(quote! {
let #temp0 = #temp0 << 1;
});
} else {
gen.extend(quote! {
let #temp0 = (#temp0 << 1) | (#temp1 >> 63);
});
}
}
gen.extend(quote! {
let mut carry = 0;
});
for i in 0..limbs {
let temp0 = get_temp(i * 2);
let temp1 = get_temp(i * 2 + 1);
if i == 0 {
gen.extend(quote! {
let #temp0 = ::ff::mac_with_carry(0, (#a.0).0[#i], (#a.0).0[#i], &mut carry);
});
} else {
gen.extend(quote!{
let #temp0 = ::ff::mac_with_carry(#temp0, (#a.0).0[#i], (#a.0).0[#i], &mut carry);
});
}
gen.extend(quote! {
let #temp1 = ::ff::adc(#temp1, 0, &mut carry);
});
}
let mut mont_calling = proc_macro2::TokenStream::new();
mont_calling.append_separated(
(0..(limbs * 2)).map(|i| get_temp(i)),
proc_macro2::Punct::new(',', proc_macro2::Spacing::Alone),
);
gen.extend(quote! {
self.mont_reduce(#mont_calling);
});
gen
}
fn mul_impl(
a: proc_macro2::TokenStream,
b: proc_macro2::TokenStream,
limbs: usize,
) -> proc_macro2::TokenStream {
let mut gen = proc_macro2::TokenStream::new();
for i in 0..limbs {
gen.extend(quote! {
let mut carry = 0;
});
for j in 0..limbs {
let temp = get_temp(i + j);
if i == 0 {
gen.extend(quote! {
let #temp = ::ff::mac_with_carry(0, (#a.0).0[#i], (#b.0).0[#j], &mut carry);
});
} else {
gen.extend(quote!{
let #temp = ::ff::mac_with_carry(#temp, (#a.0).0[#i], (#b.0).0[#j], &mut carry);
});
}
}
let temp = get_temp(i + limbs);
gen.extend(quote! {
let #temp = carry;
});
}
let mut mont_calling = proc_macro2::TokenStream::new();
mont_calling.append_separated(
(0..(limbs * 2)).map(|i| get_temp(i)),
proc_macro2::Punct::new(',', proc_macro2::Spacing::Alone),
);
gen.extend(quote! {
self.mont_reduce(#mont_calling);
});
gen
}
let squaring_impl = sqr_impl(quote! {self}, limbs);
let multiply_impl = mul_impl(quote! {self}, quote! {other}, limbs);
let montgomery_impl = mont_impl(limbs);
let mut into_repr_params = proc_macro2::TokenStream::new();
into_repr_params.append_separated(
(0..limbs)
.map(|i| quote! { (self.0).0[#i] })
.chain((0..limbs).map(|_| quote! {0})),
proc_macro2::Punct::new(',', proc_macro2::Spacing::Alone),
);
let top_limb_index = limbs - 1;
quote! {
impl ::std::marker::Copy for #name { }
impl ::std::clone::Clone for #name {
fn clone(&self) -> #name {
*self
}
}
impl ::std::cmp::PartialEq for #name {
fn eq(&self, other: &#name) -> bool {
self.0 == other.0
}
}
impl ::std::cmp::Eq for #name { }
impl ::std::fmt::Debug for #name
{
fn fmt(&self, f: &mut ::std::fmt::Formatter) -> ::std::fmt::Result {
write!(f, "{}({:?})", stringify!(#name), self.into_repr())
}
}
impl Ord for #name {
#[inline(always)]
fn cmp(&self, other: &#name) -> ::std::cmp::Ordering {
self.into_repr().cmp(&other.into_repr())
}
}
impl PartialOrd for #name {
#[inline(always)]
fn partial_cmp(&self, other: &#name) -> Option<::std::cmp::Ordering> {
Some(self.cmp(other))
}
}
impl ::std::fmt::Display for #name {
fn fmt(&self, f: &mut ::std::fmt::Formatter) -> ::std::fmt::Result {
write!(f, "{}({})", stringify!(#name), self.into_repr())
}
}
impl From<#name> for #repr {
fn from(e: #name) -> #repr {
e.into_repr()
}
}
impl ::ff::PrimeField for #name {
type Repr = #repr;
fn from_repr(r: #repr) -> Result<#name, PrimeFieldDecodingError> {
let mut r = #name(r);
if r.is_valid() {
r.mul_assign(&#name(R2));
Ok(r)
} else {
Err(PrimeFieldDecodingError::NotInField(format!("{}", r.0)))
}
}
fn into_repr(&self) -> #repr {
let mut r = *self;
r.mont_reduce(
#into_repr_params
);
r.0
}
fn char() -> #repr {
MODULUS
}
const NUM_BITS: u32 = MODULUS_BITS;
const CAPACITY: u32 = Self::NUM_BITS - 1;
fn multiplicative_generator() -> Self {
#name(GENERATOR)
}
const S: u32 = S;
fn root_of_unity() -> Self {
#name(ROOT_OF_UNITY)
}
}
impl ::ff::Field for #name {
fn random<R: ::rand_core::RngCore + ?std::marker::Sized>(rng: &mut R) -> Self {
loop {
let mut tmp = {
let mut repr = [0u64; #limbs];
for i in 0..#limbs {
repr[i] = rng.next_u64();
}
#name(#repr(repr))
};
tmp.0.as_mut()[#top_limb_index] &= 0xffffffffffffffff >> REPR_SHAVE_BITS;
if tmp.is_valid() {
return tmp
}
}
}
#[inline]
fn zero() -> Self {
#name(#repr::from(0))
}
#[inline]
fn one() -> Self {
#name(R)
}
#[inline]
fn is_zero(&self) -> bool {
self.0.is_zero()
}
#[inline]
fn add_assign(&mut self, other: &#name) {
self.0.add_nocarry(&other.0);
self.reduce();
}
#[inline]
fn double(&mut self) {
self.0.mul2();
self.reduce();
}
#[inline]
fn sub_assign(&mut self, other: &#name) {
if other.0 > self.0 {
self.0.add_nocarry(&MODULUS);
}
self.0.sub_noborrow(&other.0);
}
#[inline]
fn negate(&mut self) {
if !self.is_zero() {
let mut tmp = MODULUS;
tmp.sub_noborrow(&self.0);
self.0 = tmp;
}
}
fn inverse(&self) -> Option<Self> {
if self.is_zero() {
None
} else {
let one = #repr::from(1);
let mut u = self.0;
let mut v = MODULUS;
let mut b = #name(R2);
let mut c = Self::zero();
while u != one && v != one {
while u.is_even() {
u.div2();
if b.0.is_even() {
b.0.div2();
} else {
b.0.add_nocarry(&MODULUS);
b.0.div2();
}
}
while v.is_even() {
v.div2();
if c.0.is_even() {
c.0.div2();
} else {
c.0.add_nocarry(&MODULUS);
c.0.div2();
}
}
if v < u {
u.sub_noborrow(&v);
b.sub_assign(&c);
} else {
v.sub_noborrow(&u);
c.sub_assign(&b);
}
}
if u == one {
Some(b)
} else {
Some(c)
}
}
}
#[inline(always)]
fn frobenius_map(&mut self, _: usize) {
}
#[inline]
fn mul_assign(&mut self, other: &#name)
{
#multiply_impl
}
#[inline]
fn square(&mut self)
{
#squaring_impl
}
}
impl #name {
#[inline(always)]
fn is_valid(&self) -> bool {
self.0 < MODULUS
}
#[inline(always)]
fn reduce(&mut self) {
if !self.is_valid() {
self.0.sub_noborrow(&MODULUS);
}
}
#[inline(always)]
fn mont_reduce(
&mut self,
#mont_paramlist
)
{
#montgomery_impl
self.reduce();
}
}
}
}