module Curve.Edwards.JubJub
( module Curve.Edwards
, module Curve.Edwards.JubJub
, Point(..)
) where
import Protolude
import PrimeField
import Curve.Edwards
data JubJub
type Fq = PrimeField 0x73eda753299d7d483339d80809a1d80553bda402fffe5bfeffffffff00000001
type Fr = PrimeField 0xe7db4ea6533afa906673b0101343b00a6682093ccc81082d0970e5ed6f72cb7
instance Curve 'Edwards c JubJub Fq Fr => ECurve c JubJub Fq Fr where
a_ = const _a
{-# INLINABLE a_ #-}
d_ = const _d
{-# INLINABLE d_ #-}
h_ = const _h
{-# INLINABLE h_ #-}
q_ = const _q
{-# INLINABLE q_ #-}
r_ = const _r
{-# INLINABLE r_ #-}
x_ = const _x
{-# INLINABLE x_ #-}
y_ = const _y
{-# INLINABLE y_ #-}
type PA = EAPoint JubJub Fq Fr
instance EACurve JubJub Fq Fr where
gA_ = gA
{-# INLINABLE gA_ #-}
type PP = EPPoint JubJub Fq Fr
instance EPCurve JubJub Fq Fr where
gP_ = gP
{-# INLINABLE gP_ #-}
_a :: Fq
_a = 0x73eda753299d7d483339d80809a1d80553bda402fffe5bfeffffffff00000000
{-# INLINABLE _a #-}
_d :: Fq
_d = 0x2a9318e74bfa2b48f5fd9207e6bd7fd4292d7f6d37579d2601065fd6d6343eb1
{-# INLINABLE _d #-}
_h :: Integer
_h = 0x8
{-# INLINABLE _h #-}
_q :: Integer
_q = 0x73eda753299d7d483339d80809a1d80553bda402fffe5bfeffffffff00000001
{-# INLINABLE _q #-}
_r :: Integer
_r = 0xe7db4ea6533afa906673b0101343b00a6682093ccc81082d0970e5ed6f72cb7
{-# INLINABLE _r #-}
_x :: Fq
_x = 0x5183972af8eff38ca624b4df00384882000c546bf2f39ede7f4ecf1a74f976c4
{-# INLINABLE _x #-}
_y :: Fq
_y = 0x3b43f8472ca2fc2c9e8fcc5abd9dc308096c8707ffa6833b146bad709349702e
{-# INLINABLE _y #-}
gA :: PA
gA = A _x _y
{-# INLINABLE gA #-}
gP :: PP
gP = P _x _y 1
{-# INLINABLE gP #-}