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crypton-1.0.2: tests/ECC/Edwards25519.hs

{-# LANGUAGE OverloadedStrings #-}

module ECC.Edwards25519 (tests) where

import Crypto.ECC.Edwards25519
import Crypto.Error
import qualified Data.ByteString as B
import Data.Word (Word8)
import Imports

instance Arbitrary Scalar where
    arbitrary =
        fmap
            (throwCryptoError . scalarDecodeLong)
            (arbitraryBS 64)

smallScalar :: Word8 -> Scalar
smallScalar = throwCryptoError . scalarDecodeLong . B.singleton

newtype PrimeOrder = PrimeOrder Point
    deriving (Show)

-- points in the prime-order subgroup
instance Arbitrary PrimeOrder where
    arbitrary = (PrimeOrder . toPoint) `fmap` arbitrary

-- arbitrary curve point, including points with a torsion component
instance Arbitrary Point where
    arbitrary = do
        a <- arbitrary
        b <- elements $ map smallScalar [0 .. 7]
        return (pointsMulVarTime a b torsion8)

-- an 8-torsion point
torsion8 :: Point
torsion8 =
    throwCryptoError $
        pointDecode
            ( "\199\ETBjp=M\216O\186<\vv\r\DLEg\SI* S\250,9\204\198N\199\253w\146\172\ETXz"
                :: ByteString
            )

tests =
    testGroup
        "ECC.Edwards25519"
        [ testGroup
            "vectors"
            [ testCase "11*G" $ p011 @=? toPoint s011
            , testCase "123*G" $ p123 @=? toPoint s123
            , testCase "134*G" $ p134 @=? toPoint s134
            , testCase "123*G + 11*G" $ p134 @=? pointAdd p123 p011
            ]
        , testGroup
            "scalar arithmetic"
            [ testProperty "scalarDecodeLong.scalarEncode==id" $ \s ->
                let bs = scalarEncode s :: ByteString
                    ss = scalarDecodeLong bs
                 in CryptoPassed s `propertyEq` ss
            , testCase "curve order" $ s0 @=? sN
            , testProperty "addition with zero" $ \s ->
                propertyHold
                    [ eqTest "zero left" s (scalarAdd s0 s)
                    , eqTest "zero right" s (scalarAdd s s0)
                    ]
            , testProperty "addition associative" $ \sa sb sc ->
                scalarAdd sa (scalarAdd sb sc) === scalarAdd (scalarAdd sa sb) sc
            , testProperty "addition commutative" $ \sa sb ->
                scalarAdd sa sb === scalarAdd sb sa
            , testProperty "multiplication with zero" $ \s ->
                propertyHold
                    [ eqTest "zero left" s0 (scalarMul s0 s)
                    , eqTest "zero right" s0 (scalarMul s s0)
                    ]
            , testProperty "multiplication with one" $ \s ->
                propertyHold
                    [ eqTest "one left" s (scalarMul s1 s)
                    , eqTest "one right" s (scalarMul s s1)
                    ]
            , testProperty "multiplication associative" $ \sa sb sc ->
                scalarMul sa (scalarMul sb sc) === scalarMul (scalarMul sa sb) sc
            , testProperty "multiplication commutative" $ \sa sb ->
                scalarMul sa sb === scalarMul sb sa
            , testProperty "multiplication distributive" $ \sa sb sc ->
                propertyHold
                    [ eqTest
                        "distributive left"
                        ((sa `scalarMul` sb) `scalarAdd` (sa `scalarMul` sc))
                        (sa `scalarMul` (sb `scalarAdd` sc))
                    , eqTest
                        "distributive right"
                        ((sb `scalarMul` sa) `scalarAdd` (sc `scalarMul` sa))
                        ((sb `scalarAdd` sc) `scalarMul` sa)
                    ]
            ]
        , testGroup
            "point arithmetic"
            [ testProperty "pointDecode.pointEncode==id" $ \p ->
                let bs = pointEncode p :: ByteString
                    p' = pointDecode bs
                 in CryptoPassed p `propertyEq` p'
            , testProperty "pointEncode.pointDecode==id" $ \p ->
                let b = pointEncode p :: ByteString
                    p' = pointDecode b
                    b' = pointEncode `fmap` p'
                 in CryptoPassed b `propertyEq` b'
            , testProperty "addition with identity" $ \p ->
                propertyHold
                    [ eqTest "identity left" p (pointAdd p0 p)
                    , eqTest "identity right" p (pointAdd p p0)
                    ]
            , testProperty "addition associative" $ \pa pb pc ->
                pointAdd pa (pointAdd pb pc) === pointAdd (pointAdd pa pb) pc
            , testProperty "addition commutative" $ \pa pb ->
                pointAdd pa pb === pointAdd pb pa
            , testProperty "negation" $ \p ->
                p0 `propertyEq` pointAdd p (pointNegate p)
            , testProperty "doubling" $ \p ->
                pointAdd p p `propertyEq` pointDouble p
            , testProperty "multiplication by cofactor" $ \p ->
                pointMul s8 p `propertyEq` pointMulByCofactor p
            , testProperty "prime order" $ \(PrimeOrder p) ->
                True `propertyEq` pointHasPrimeOrder p
            , testCase "8-torsion point" $ do
                assertBool "mul by 4" $ p0 /= pointMul s4 torsion8
                assertBool "mul by 8" $ p0 == pointMul s8 torsion8
            , testProperty "scalarmult with zero" $ \p ->
                p0 `propertyEq` pointMul s0 p
            , testProperty "scalarmult with one" $ \p ->
                p `propertyEq` pointMul s1 p
            , testProperty "scalarmult with two" $ \p ->
                pointDouble p `propertyEq` pointMul s2 p
            , testProperty "scalarmult with curve order - 1" $ \p ->
                pointHasPrimeOrder p === (pointNegate p == pointMul sI p)
            , testProperty "scalarmult commutative" $ \a b ->
                pointMul a (toPoint b) === pointMul b (toPoint a)
            , testProperty "scalarmult distributive" $ \x y (PrimeOrder p) ->
                let pR = pointMul x p `pointAdd` pointMul y p
                 in pR `propertyEq` pointMul (x `scalarAdd` y) p
            , testProperty "double scalarmult" $ \n1 n2 p ->
                let pR = pointAdd (toPoint n1) (pointMul n2 p)
                 in pR `propertyEq` pointsMulVarTime n1 n2 p
            ]
        ]
  where
    p0 = toPoint s0
    s0 = smallScalar 0
    s1 = smallScalar 1
    s2 = smallScalar 2
    s4 = smallScalar 4
    s8 = smallScalar 8
    sI =
        throwCryptoError $
            scalarDecodeLong
                ( "\236\211\245\\\SUBc\DC2X\214\156\247\162\222\249\222\DC4\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\DLE"
                    :: ByteString
                )
    sN =
        throwCryptoError $
            scalarDecodeLong
                ( "\237\211\245\\\SUBc\DC2X\214\156\247\162\222\249\222\DC4\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\NUL\DLE"
                    :: ByteString
                )

    s011 = throwCryptoError $ scalarDecodeLong ("\011" :: ByteString)
    s123 = throwCryptoError $ scalarDecodeLong ("\123" :: ByteString)
    s134 = throwCryptoError $ scalarDecodeLong ("\134" :: ByteString)

    p011 =
        throwCryptoError $
            pointDecode
                ( "\x13\x37\x03\x6a\xc3\x2d\x8f\x30\xd4\x58\x9c\x3c\x1c\x59\x58\x12\xce\x0f\xff\x40\xe3\x7c\x6f\x5a\x97\xab\x21\x3f\x31\x82\x90\xad"
                    :: ByteString
                )
    p123 =
        throwCryptoError $
            pointDecode
                ( "\xc4\xb8\x00\xc8\x70\x10\xf9\x46\x83\x03\xde\xea\x87\x65\x03\xe8\x86\xbf\xde\x19\x00\xe9\xe8\x46\xfd\x4c\x3c\xd0\x9c\x1c\xbc\x9f"
                    :: ByteString
                )
    p134 =
        throwCryptoError $
            pointDecode
                ( "\x51\x20\xab\xe0\x3c\xa2\xaf\x66\xc7\x7c\xa3\x20\xf0\xb2\x1f\xb5\x56\xf6\xb6\x5f\xdd\x7e\x32\x64\xc1\x4a\x30\xd9\x7b\xf7\xa7\x6f"
                    :: ByteString
                )

-- Using <http://cr.yp.to/python/py>:
--
-- >>> import ed25519
-- >>> encodepoint(scalarmult(B, 11)).encode('hex')
-- '1337036ac32d8f30d4589c3c1c595812ce0fff40e37c6f5a97ab213f318290ad'
-- >>> encodepoint(scalarmult(B, 123)).encode('hex')
-- 'c4b800c87010f9468303deea876503e886bfde1900e9e846fd4c3cd09c1cbc9f'
-- >>> encodepoint(scalarmult(B, 134)).encode('hex')
-- '5120abe03ca2af66c77ca320f0b21fb556f6b65fdd7e3264c14a30d97bf7a76f'