sdiehl/fails.hs

## fails.hs
{-# LANGUAGE OverloadedStrings #-}
{-# LANGUAGE FlexibleInstances #-}
{-# LANGUAGE FlexibleContexts #-}
{-# LANGUAGE ScopedTypeVariables #-}
{-# LANGUAGE DataKinds #-}
{-# LANGUAGE MultiParamTypeClasses #-}
{-# LANGUAGE KindSignatures #-}
{-# LANGUAGE QuantifiedConstraints #-}

module Test where

import Protolude

import Control.Monad.Random (Random(..), getRandom)

-------------------------------------------------------------------------------
-- Fields
-------------------------------------------------------------------------------

class (Num k, Random k) => Field k

newtype Prime (p :: Nat) = F {toInt :: Integer} deriving Show

instance KnownNat p => Num (Prime p) where
  F x + F y     = F (rem (x + y) (natVal (witness :: Prime p)))
  F x * F y     = F (rem (x * y) (natVal (witness :: Prime p)))
  F x - F y     = F (rem (x - y) (natVal (witness :: Prime p)))
  fromInteger x = F (mod x (natVal (witness :: Prime p)))
  abs           = panic "not implemented."
  signum        = panic "not implemented."

instance KnownNat p => Random (Prime p) where
  random  = first F . randomR (0, natVal (witness :: Prime p) - 1)
  randomR = panic "not implemented."

instance KnownNat p => Field (Prime p)

-------------------------------------------------------------------------------
-- Curves
-------------------------------------------------------------------------------

data Point f q r = Point q q q deriving Show

class (forall p . (KnownNat p, r ~ Prime p), Field q, Field r) => Curve f q r where
  gen :: Point f q r -- Curve generator
  mul :: Point f q r -> Prime p -> Point f q r -- Bad multiplication
  mul = (. toInt) . mul'
  mul' :: Point f q r -> Integer -> Point f q r -- Good multiplication
  mul' p n
    | n == 0    = Point 0 1 0
    | n == 1    = p
    | even n    = p'
    | otherwise = add p p'
    where
      p'
        = mul' (add p p) (div n 2)
      add (Point x y z) (Point x' y' z')
        = Point (x + x') (y + y') (z + z')

instance Curve f q r => Random (Point f q r) where
  random  = first (mul gen) . random
  randomR = panic "not implemented."

class Curve A q r => ACurve q r where
  genA :: Point A q r

instance (Field q, Field r, ACurve q r) => Curve A q r where
  gen = genA

-------------------------------------------------------------------------------
-- Example
-------------------------------------------------------------------------------

data A

type Fq = Prime 0xb0000000000000000000000953000000000000000000001f9d7

type Fr = Prime 0xb0000000000000000000000953000000000000000000001f9d7

instance ACurve Fq Fr where
  genA = Point
    0x101efb35fd1963c4871a2d17edaafa7e249807f58f8705126c6
    0x22389a3954375834304ba1d509a97de6c07148ea7f5951b20e7
    1

main :: IO ()
main = (getRandom :: IO (Point A Fq Fr)) >>= print

## succeeds.hs
{-# LANGUAGE OverloadedStrings #-}
{-# LANGUAGE FlexibleInstances #-}
{-# LANGUAGE FlexibleContexts #-}
{-# LANGUAGE ScopedTypeVariables #-}
{-# LANGUAGE DataKinds #-}
{-# LANGUAGE MultiParamTypeClasses #-}
{-# LANGUAGE KindSignatures #-}
{-# LANGUAGE QuantifiedConstraints #-}

module Test where

import Protolude

import Control.Monad.Random (Random(..), getRandom)

-------------------------------------------------------------------------------
-- Fields
-------------------------------------------------------------------------------

class (Num k, Random k) => Field k

newtype Prime p = F {toInt :: Integer} deriving Show

instance Num (Prime p) where
  F x + F y     = F (x + y)
  F x * F y     = F (x * y)
  F x - F y     = F (x - y)
  fromInteger x = F x
  abs           = panic "not implemented."
  signum        = panic "not implemented."

instance Random (Prime p) where
  random  = first F . random --(0, natVal (witness :: Prime p) - 1)
  randomR = panic "not implemented."

instance Field (Prime p)

-------------------------------------------------------------------------------
-- Curves
-------------------------------------------------------------------------------

data Point f q r = Point q q q deriving Show

class (forall p . r ~ Prime p, Field q, Field r) => Curve f q r where
  gen :: Point f q r -- Curve generator
  mul :: Point f q r -> Prime p -> Point f q r -- Bad multiplication
  mul = (. toInt) . mul'
  mul' :: Point f q r -> Integer -> Point f q r -- Good multiplication
  mul' p n
    | n == 0    = Point 0 1 0
    | n == 1    = p
    | even n    = p'
    | otherwise = add p p'
    where
      p'
        = mul' (add p p) (div n 2)
      add (Point x y z) (Point x' y' z')
        = Point (x + x') (y + y') (z + z')

instance Curve f q r => Random (Point f q r) where
  random  = first (mul gen) . random
  randomR = panic "not implemented."

class Curve A q r => ACurve q r where
  genA :: Point A q r

instance (Field q, Field r, ACurve q r) => Curve A q r where
  gen = genA

-------------------------------------------------------------------------------
-- Example
-------------------------------------------------------------------------------

data A

type Fq = Prime ()--0xb0000000000000000000000953000000000000000000001f9d7

type Fr = Prime ()--0xb0000000000000000000000953000000000000000000001f9d7

instance ACurve Fq Fr where
  genA = Point
    0x101efb35fd1963c4871a2d17edaafa7e249807f58f8705126c6
    0x22389a3954375834304ba1d509a97de6c07148ea7f5951b20e7
    1

main :: IO ()
main = (getRandom :: IO (Point A Fq Fr)) >>= print
	{-# LANGUAGE OverloadedStrings #-}
	{-# LANGUAGE FlexibleInstances #-}
	{-# LANGUAGE FlexibleContexts #-}
	{-# LANGUAGE ScopedTypeVariables #-}
	{-# LANGUAGE DataKinds #-}
	{-# LANGUAGE MultiParamTypeClasses #-}
	{-# LANGUAGE KindSignatures #-}
	{-# LANGUAGE QuantifiedConstraints #-}

	module Test where

	import Protolude

	import Control.Monad.Random (Random(..), getRandom)

	-------------------------------------------------------------------------------
	-- Fields
	-------------------------------------------------------------------------------

	class (Num k, Random k) => Field k

	newtype Prime (p :: Nat) = F {toInt :: Integer} deriving Show

	instance KnownNat p => Num (Prime p) where
	F x + F y = F (rem (x + y) (natVal (witness :: Prime p)))
	F x * F y = F (rem (x * y) (natVal (witness :: Prime p)))
	F x - F y = F (rem (x - y) (natVal (witness :: Prime p)))
	fromInteger x = F (mod x (natVal (witness :: Prime p)))
	abs = panic "not implemented."
	signum = panic "not implemented."

	instance KnownNat p => Random (Prime p) where
	random = first F . randomR (0, natVal (witness :: Prime p) - 1)
	randomR = panic "not implemented."

	instance KnownNat p => Field (Prime p)

	-------------------------------------------------------------------------------
	-- Curves
	-------------------------------------------------------------------------------

	data Point f q r = Point q q q deriving Show

	class (forall p . (KnownNat p, r ~ Prime p), Field q, Field r) => Curve f q r where
	gen :: Point f q r -- Curve generator
	mul :: Point f q r -> Prime p -> Point f q r -- Bad multiplication
	mul = (. toInt) . mul'
	mul' :: Point f q r -> Integer -> Point f q r -- Good multiplication
	mul' p n
	\| n == 0 = Point 0 1 0
	\| n == 1 = p
	\| even n = p'
	\| otherwise = add p p'
	where
	p'
	= mul' (add p p) (div n 2)
	add (Point x y z) (Point x' y' z')
	= Point (x + x') (y + y') (z + z')

	instance Curve f q r => Random (Point f q r) where
	random = first (mul gen) . random
	randomR = panic "not implemented."

	class Curve A q r => ACurve q r where
	genA :: Point A q r

	instance (Field q, Field r, ACurve q r) => Curve A q r where
	gen = genA

	-------------------------------------------------------------------------------
	-- Example
	-------------------------------------------------------------------------------

	data A

	type Fq = Prime 0xb0000000000000000000000953000000000000000000001f9d7

	type Fr = Prime 0xb0000000000000000000000953000000000000000000001f9d7

	instance ACurve Fq Fr where
	genA = Point
	0x101efb35fd1963c4871a2d17edaafa7e249807f58f8705126c6
	0x22389a3954375834304ba1d509a97de6c07148ea7f5951b20e7
	1

	main :: IO ()
	main = (getRandom :: IO (Point A Fq Fr)) >>= print