cryptonite/tests/Number/F2m.hs

module Number.F2m (tests) where

import Imports hiding ((.&.))
import Data.Bits
import Crypto.Number.Basic (log2)
import Crypto.Number.F2m

addTests = testGroup "addF2m"
    [ testProperty "commutative"
        $ \a b -> a `addF2m` b == b `addF2m` a
    , testProperty "associative"
        $ \a b c -> (a `addF2m` b) `addF2m` c == a `addF2m` (b `addF2m` c)
    , testProperty "0 is neutral"
        $ \a -> a `addF2m` 0 == a
    , testProperty "nullable"
        $ \a -> a `addF2m` a == 0
    , testProperty "works per bit"
        $ \a b -> (a `addF2m` b) .&. b == (a .&. b) `addF2m` b
    ]

modTests = testGroup "modF2m"
    [ testProperty "idempotent"
        $ \(Positive m) (NonNegative a) -> modF2m m a == modF2m m (modF2m m a)
    , testProperty "upper bound"
        $ \(Positive m) (NonNegative a) -> modF2m m a < 2 ^ log2 m
    , testProperty "reach upper"
        $ \(Positive m) -> let a = 2 ^ log2 m - 1 in modF2m m (m `addF2m` a) == a
    , testProperty "lower bound"
        $ \(Positive m) (NonNegative a) -> modF2m m a >= 0
    , testProperty "reach lower"
        $ \(Positive m) -> modF2m m m == 0
    , testProperty "additive"
        $ \(Positive m) (NonNegative a) (NonNegative b)
            -> modF2m m a `addF2m` modF2m m b == modF2m m (a `addF2m` b)
    ]

mulTests = testGroup "mulF2m"
    [ testProperty "commutative"
        $ \(Positive m) (NonNegative a) (NonNegative b) -> mulF2m m a b == mulF2m m b a
    , testProperty "associative"
        $ \(Positive m) (NonNegative a) (NonNegative b) (NonNegative c)
            -> mulF2m m (mulF2m m a b) c == mulF2m m a (mulF2m m b c)
    , testProperty "1 is neutral"
        $ \(Positive m) (NonNegative a) -> mulF2m m a 1 == modF2m m a
    , testProperty "0 is annihilator"
        $ \(Positive m) (NonNegative a) -> mulF2m m a 0 == 0
    , testProperty "distributive"
        $ \(Positive m) (NonNegative a) (NonNegative b) (NonNegative c)
            -> mulF2m m a (b `addF2m` c) == mulF2m m a b `addF2m` mulF2m m a c
    ]

squareTests = testGroup "squareF2m"
    [ testProperty "sqr(a) == a * a"
        $ \(Positive m) (NonNegative a) -> mulF2m m a a == squareF2m m a
    -- disabled because we require @m@ to be a suitable modulus and there is no
    -- way to guarantee this
    -- , testProperty "sqrt(a) * sqrt(a) = a"
    --     $ \(Positive m) (NonNegative aa) -> let a = sqrtF2m m aa in mulF2m m a a == modF2m m aa
    , testProperty "sqrt(a) * sqrt(a) = a in GF(2^16)"
        $ let m = 65581 :: Integer -- x^16 + x^5 + x^3 + x^2 + 1
              nums = [0 .. 65535 :: Integer]
          in  nums == [let y = sqrtF2m m x in squareF2m m y | x <- nums]
    ]

powTests = testGroup "powF2m"
    [ testProperty "2 is square"
        $ \(Positive m) (NonNegative a) -> powF2m m a 2 == squareF2m m a
    , testProperty "1 is identity"
        $ \(Positive m) (NonNegative a) -> powF2m m a 1 == modF2m m a
    , testProperty "0 is annihilator"
        $ \(Positive m) (NonNegative a) -> powF2m m a 0 == modF2m m 1
    , testProperty "(a * b) ^ c == (a ^ c) * (b ^ c)"
        $ \(Positive m) (NonNegative a) (NonNegative b) (NonNegative c)
            -> powF2m m (mulF2m m a b) c == mulF2m m (powF2m m a c) (powF2m m b c)
    , testProperty "a ^ (b + c) == (a ^ b) * (a ^ c)"
        $ \(Positive m) (NonNegative a) (NonNegative b) (NonNegative c)
            -> powF2m m a (b + c) == mulF2m m (powF2m m a b) (powF2m m a c)
    , testProperty "a ^ (b * c) == (a ^ b) ^ c"
        $ \(Positive m) (NonNegative a) (NonNegative b) (NonNegative c)
            -> powF2m m a (b * c) == powF2m m (powF2m m a b) c
    ]

invTests = testGroup "invF2m"
    [ testProperty "1 / a * a == 1"
        $ \(Positive m) (NonNegative a)
            -> maybe True (\c -> mulF2m m c a == modF2m m 1) (invF2m m a)
    , testProperty "1 / a == a (mod a^2-1)"
        $ \(NonNegative a) -> a < 2 || invF2m (squareF2m' a `addF2m` 1) a == Just a
    ]

divTests = testGroup "divF2m"
    [ testProperty "1 / a == inv a"
        $ \(Positive m) (NonNegative a) -> divF2m m 1 a == invF2m m a
    , testProperty "a / b == a * inv b"
        $ \(Positive m) (NonNegative a) (NonNegative b)
            -> divF2m m a b == (mulF2m m a <$> invF2m m b)
    , testProperty "a * b / b == a"
        $ \(Positive m) (NonNegative a) (NonNegative b)
            -> invF2m m b == Nothing || divF2m m (mulF2m m a b) b == Just (modF2m m a)
    ]

tests = testGroup "number.F2m"
    [ addTests
    , modTests
    , mulTests
    , squareTests
    , powTests
    , invTests
    , divTests
    ]