module Data.TrieMap.Regular.Eq where
import Data.TrieMap.Regular.Base
import Data.TrieMap.Modifiers
class EqT f where
eqT0 :: (a -> a -> Bool) -> f a -> f a -> Bool
eqT :: (EqT f, Eq a) => f a -> f a -> Bool
eqT = eqT0 (==)
instance Eq a => EqT (K0 a) where
eqT0 _ (K0 a) (K0 b) = a == b
instance EqT I0 where
eqT0 (==) (I0 a) (I0 b) = a == b
instance EqT [] where
eqT0 (==) = eqT' where
eqT' (a:as) (b:bs) = a == b && eqT' as bs
eqT' [] [] = True
eqT' _ _ = False
instance (EqT f, EqT g) => EqT (f :*: g) where
eqT0 (==) (x1 :*: y1) (x2 :*: y2) = eqT0 (==) x1 x2 && eqT0 (==) y1 y2
instance (EqT f, EqT g) => EqT (f :+: g) where
eqT0 (==) a b = case (a, b) of
(L a, L b) -> eqT0 (==) a b
(R a, R b) -> eqT0 (==) a b
_ -> False
instance EqT U0 where
eqT0 _ _ _ = True
instance EqT f => EqT (L f) where
eqT0 (==) (List xs) (List ys) = eqT' xs ys where
eqT0' = eqT0 (==)
eqT' (a:as) (b:bs) = eqT0' a b && eqT' as bs
eqT' [] [] = True
eqT' _ _ = False
instance (Regular a, Functor (PF a), EqT (PF a)) => Eq (Reg a) where
a == b = eqT (from' a) (from' b)
instance (EqT f, Eq r) => Eq (L f r) where
(==) = eqT
instance (EqT f, EqT g, Eq r) => Eq ((f :*: g) r) where
(==) = eqT
instance (EqT f, EqT g, Eq r) => Eq ((f :+: g) r) where
(==) = eqT
instance (EqT f, EqT g) => EqT (f `O` g) where
eqT0 (==) (O x) (O y) = eqT0 (eqT0 (==)) x y
instance (EqT f, EqT g, Eq r) => Eq ((f `O` g) r) where
(==) = eqT
instance Eq a => Eq (K0 a r) where
K0 a == K0 b = a == b
instance Eq r => Eq (I0 r) where
I0 a == I0 b = a == b
instance Eq (U0 r) where
_ == _ = True
instance Eq a => EqT ((,) a) where
eqT0 (=#=) (a, b) (c, d) = a == c && b =#= d
instance Eq a => EqT (Either a) where
eqT0 _ (Left a) (Left b) = a == b
eqT0 (==) (Right a) (Right b) = a == b
eqT0 _ _ _ = False
instance EqT Ordered where
eqT0 (==) (Ord x) (Ord y) = x == y
instance EqT Rev where
eqT0 (==) (Rev x) (Rev y) = y == x