profunctors-4.0: src/Data/Profunctor/Rep.hs
{-# LANGUAGE UndecidableInstances #-}
{-# LANGUAGE FlexibleInstances #-}
{-# LANGUAGE FlexibleContexts #-}
{-# LANGUAGE TypeFamilies #-}
{-# LANGUAGE CPP #-}
#if defined(__GLASGOW_HASKELL__) && __GLASGOW_HASKELL__ >= 702
{-# LANGUAGE Trustworthy #-}
#endif
-----------------------------------------------------------------------------
-- |
-- Module : Data.Profunctor.Rep
-- Copyright : (C) 2011-2012 Edward Kmett,
-- License : BSD-style (see the file LICENSE)
--
-- Maintainer : Edward Kmett <ekmett@gmail.com>
-- Stability : provisional
-- Portability : Type-Families
--
----------------------------------------------------------------------------
module Data.Profunctor.Rep
(
-- * Representable Profunctors
Representable(..), tabulated
-- * Corepresentable Profunctors
, Corepresentable(..), cotabulated
) where
import Control.Arrow
import Control.Comonad
import Data.Functor.Identity
import Data.Profunctor
import Data.Proxy
import Data.Tagged
-- * Representable Profunctors
-- | A 'Profunctor' @p@ is 'Representable' if there exists a 'Functor' @f@ such that
-- @p d c@ is isomorphic to @d -> f c@.
class (Functor (Rep p), Profunctor p) => Representable p where
type Rep p :: * -> *
tabulate :: (d -> Rep p c) -> p d c
rep :: p d c -> d -> Rep p c
instance Representable (->) where
type Rep (->) = Identity
tabulate f = runIdentity . f
{-# INLINE tabulate #-}
rep f = Identity . f
{-# INLINE rep #-}
instance (Monad m, Functor m) => Representable (Kleisli m) where
type Rep (Kleisli m) = m
tabulate = Kleisli
{-# INLINE tabulate #-}
rep = runKleisli
{-# INLINE rep #-}
instance Functor f => Representable (UpStar f) where
type Rep (UpStar f) = f
tabulate = UpStar
{-# INLINE tabulate #-}
rep = runUpStar
{-# INLINE rep #-}
-- | 'tabulate' and 'rep' form two halves of an isomorphism.
--
-- This can be used with the combinators from the @lens@ package.
--
-- @'tabulated' :: 'Representable' p => 'Iso'' (d -> 'Rep' p c) (p d c)@
tabulated :: (Profunctor r, Functor f, Representable p, Representable q)
=> r (p d c) (f (q d' c'))
-> r (d -> Rep p c) (f (d' -> Rep q c'))
tabulated = dimap tabulate (fmap rep)
{-# INLINE tabulated #-}
-- * Corepresentable Profunctors
-- | A 'Profunctor' @p@ is 'Corepresentable' if there exists a 'Functor' @f@ such that
-- @p d c@ is isomorphic to @f d -> c@.
class (Functor (Corep p), Profunctor p) => Corepresentable p where
type Corep p :: * -> *
cotabulate :: (Corep p d -> c) -> p d c
corep :: p d c -> Corep p d -> c
instance Corepresentable (->) where
type Corep (->) = Identity
cotabulate f = f . Identity
{-# INLINE cotabulate #-}
corep f (Identity d) = f d
{-# INLINE corep #-}
instance Functor w => Corepresentable (Cokleisli w) where
type Corep (Cokleisli w) = w
cotabulate = Cokleisli
{-# INLINE cotabulate #-}
corep = runCokleisli
{-# INLINE corep #-}
instance Corepresentable Tagged where
type Corep Tagged = Proxy
cotabulate f = Tagged (f Proxy)
{-# INLINE cotabulate #-}
corep (Tagged a) _ = a
{-# INLINE corep #-}
instance Functor f => Corepresentable (DownStar f) where
type Corep (DownStar f) = f
cotabulate = DownStar
{-# INLINE cotabulate #-}
corep = runDownStar
{-# INLINE corep #-}
-- | 'cotabulate' and 'corep' form two halves of an isomorphism.
--
-- This can be used with the combinators from the @lens@ package.
--
-- @'tabulated' :: 'Corep' f p => 'Iso'' (f d -> c) (p d c)@
cotabulated :: (Profunctor r, Functor h, Corepresentable p, Corepresentable q)
=> r (p d c) (h (q d' c'))
-> r (Corep p d -> c) (h (Corep q d' -> c'))
cotabulated = dimap cotabulate (fmap corep)
{-# INLINE cotabulated #-}