{-# Language DeriveDataTypeable, FlexibleInstances, KindSignatures, MultiParamTypeClasses, RankNTypes,
StandaloneDeriving, TypeFamilies, UndecidableInstances #-}
-- | Type classes 'Functor', 'Foldable', and 'Traversable' that correspond to the standard type classes of the same
-- name. The [rank2classes](https://hackage.haskell.org/package/rank2classes) package provides the equivalent set
-- of classes for natural transformations. This module extends the functionality to unnatural transformations.
module Transformation.Shallow where
import Control.Applicative (Applicative, liftA2)
import Data.Functor.Compose (Compose)
import Data.Functor.Const (Const)
import qualified Rank2
import Transformation (Transformation, Domain, Codomain)
import Prelude hiding (Foldable(..), Traversable(..), Functor(..), Applicative(..), (<$>), fst, snd)
-- | Like Rank2.'Rank2.Functor' except it takes a 'Transformation' instead of a polymorphic function
class (Transformation t, Rank2.Functor g) => Functor t g where
(<$>) :: t -> g (Domain t) -> g (Codomain t)
-- | Like Rank2.'Rank2.Foldable' except it takes a 'Transformation' instead of a polymorphic function
class (Transformation t, Rank2.Foldable g) => Foldable t g where
foldMap :: (Codomain t ~ Const m, Monoid m) => t -> g (Domain t) -> m
-- | Like Rank2.'Rank2.Traversable' except it takes a 'Transformation' instead of a polymorphic function
class (Transformation t, Rank2.Traversable g) => Traversable t g where
traverse :: Codomain t ~ Compose m f => t -> g (Domain t) -> m (g f)
instance (Functor t g, Functor t h) => Functor t (Rank2.Product g h) where
t <$> Rank2.Pair left right = Rank2.Pair (t <$> left) (t <$> right)
instance (Foldable t g, Foldable t h, Codomain t ~ Const m, Monoid m) => Foldable t (Rank2.Product g h) where
foldMap t (Rank2.Pair left right) = foldMap t left <> foldMap t right
instance (Traversable t g, Traversable t h, Codomain t ~ Compose m f, Applicative m) => Traversable t (Rank2.Product g h) where
traverse t (Rank2.Pair left right) = liftA2 Rank2.Pair (traverse t left) (traverse t right)
-- | Alphabetical synonym for '<$>'
fmap :: Functor t g => t -> g (Domain t) -> g (Codomain t)
fmap = (<$>)