{-# LANGUAGE CPP #-} {-# LANGUAGE Rank2Types #-} {-# LANGUAGE TypeFamilies #-} {-# LANGUAGE FlexibleContexts #-} {-# LANGUAGE FlexibleInstances #-} {-# LANGUAGE UndecidableInstances #-} {-# LANGUAGE MultiParamTypeClasses #-} #if defined(__GLASGOW_HASKELL__) && __GLASGOW_HASKELL__ >= 702 {-# LANGUAGE Trustworthy #-} #endif ----------------------------------------------------------------------------- -- | -- Module : Data.Functor.Yoneda -- Copyright : (C) 2011-2013 Edward Kmett -- License : BSD-style (see the file LICENSE) -- -- Maintainer : Edward Kmett -- Stability : provisional -- Portability : MPTCs, fundeps -- -- The covariant form of the Yoneda lemma states that @f@ is naturally -- isomorphic to @Yoneda f@. -- -- This is described in a rather intuitive fashion by Dan Piponi in -- -- ---------------------------------------------------------------------------- module Data.Functor.Yoneda ( Yoneda(..) , liftYoneda, lowerYoneda , maxF, minF, maxM, minM -- * as a right Kan extension , yonedaToRan, ranToYoneda -- * as a right Kan lift , yonedaToRift, riftToYoneda ) where import Control.Applicative import Control.Monad (MonadPlus(..), liftM) import Control.Monad.Fix import Control.Monad.Free.Class import Control.Monad.Trans.Class import Control.Comonad import Control.Comonad.Trans.Class import Data.Distributive import Data.Foldable import Data.Function (on) import Data.Functor.Adjunction import Data.Functor.Bind import Data.Functor.Extend import Data.Functor.Identity import Data.Functor.Kan.Ran import Data.Functor.Kan.Rift import Data.Functor.Plus import Data.Functor.Rep import Data.Semigroup.Foldable import Data.Semigroup.Traversable import Data.Traversable import Text.Read hiding (lift) import Prelude hiding (sequence, lookup, zipWith) -- | @Yoneda f a@ can be viewed as the partial application of 'fmap' to its second argument. newtype Yoneda f a = Yoneda { runYoneda :: forall b. (a -> b) -> f b } -- | The natural isomorphism between @f@ and @'Yoneda' f@ given by the Yoneda lemma -- is witnessed by 'liftYoneda' and 'lowerYoneda' -- -- @ -- 'liftYoneda' . 'lowerYoneda' ≡ 'id' -- 'lowerYoneda' . 'liftYoneda' ≡ 'id' -- @ -- -- @ -- lowerYoneda (liftYoneda fa) = -- definition -- lowerYoneda (Yoneda (\f -> fmap f a)) -- definition -- (\f -> fmap f fa) id -- beta reduction -- fmap id fa -- functor law -- fa -- @ -- -- @ -- 'lift' = 'liftYoneda' -- @ liftYoneda :: Functor f => f a -> Yoneda f a liftYoneda a = Yoneda (\f -> fmap f a) lowerYoneda :: Yoneda f a -> f a lowerYoneda (Yoneda f) = f id {-# RULES "lower/lift=id" liftYoneda . lowerYoneda = id #-} {-# RULES "lift/lower=id" lowerYoneda . liftYoneda = id #-} -- | @Yoneda f@ can be viewed as the right Kan extension of @f@ along the 'Identity' functor. -- -- @ -- 'yonedaToRan' . 'ranToYoneda' ≡ 'id' -- 'ranToYoneda' . 'yonedaToRan' ≡ 'id' -- @ yonedaToRan :: Yoneda f a -> Ran Identity f a yonedaToRan (Yoneda m) = Ran (m . fmap runIdentity) ranToYoneda :: Ran Identity f a -> Yoneda f a ranToYoneda (Ran m) = Yoneda (m . fmap Identity) {-# RULES "yonedaToRan/ranToYoneda=id" yonedaToRan . ranToYoneda = id #-} {-# RULES "ranToYoneda/yonedaToRan=id" ranToYoneda . yonedaToRan = id #-} -- | @Yoneda f@ can be viewed as the right Kan lift of @f@ along the 'Identity' functor. -- -- @ -- 'yonedaToRift' . 'riftToYoneda' ≡ 'id' -- 'riftToYoneda' . 'yonedaToRift' ≡ 'id' -- @ yonedaToRift :: Yoneda f a -> Rift Identity f a yonedaToRift m = Rift (runYoneda m . runIdentity) {-# INLINE yonedaToRift #-} riftToYoneda :: Rift Identity f a -> Yoneda f a riftToYoneda m = Yoneda (runRift m . Identity) {-# INLINE riftToYoneda #-} {-# RULES "yonedaToRift/riftToYoneda=id" yonedaToRift . riftToYoneda = id #-} {-# RULES "riftToYoneda/yonedaToRift=id" riftToYoneda . yonedaToRift = id #-} instance Functor (Yoneda f) where fmap f m = Yoneda (\k -> runYoneda m (k . f)) instance Apply f => Apply (Yoneda f) where Yoneda m <.> Yoneda n = Yoneda (\f -> m (f .) <.> n id) instance Applicative f => Applicative (Yoneda f) where pure a = Yoneda (\f -> pure (f a)) Yoneda m <*> Yoneda n = Yoneda (\f -> m (f .) <*> n id) instance Foldable f => Foldable (Yoneda f) where foldMap f = foldMap f . lowerYoneda instance Foldable1 f => Foldable1 (Yoneda f) where foldMap1 f = foldMap1 f . lowerYoneda instance Traversable f => Traversable (Yoneda f) where traverse f = fmap liftYoneda . traverse f . lowerYoneda instance Traversable1 f => Traversable1 (Yoneda f) where traverse1 f = fmap liftYoneda . traverse1 f . lowerYoneda instance Distributive f => Distributive (Yoneda f) where collect f = liftYoneda . collect (lowerYoneda . f) instance Representable g => Representable (Yoneda g) where type Rep (Yoneda g) = Rep g tabulate = liftYoneda . tabulate index = index . lowerYoneda instance Adjunction f g => Adjunction (Yoneda f) (Yoneda g) where unit = liftYoneda . fmap liftYoneda . unit counit (Yoneda m) = counit (m lowerYoneda) -- instance Show1 f => Show1 (Yoneda f) where instance Show (f a) => Show (Yoneda f a) where showsPrec d (Yoneda f) = showParen (d > 10) $ showString "liftYoneda " . showsPrec 11 (f id) -- instance Read1 f => Read1 (Yoneda f) where #ifdef __GLASGOW_HASKELL__ instance (Functor f, Read (f a)) => Read (Yoneda f a) where readPrec = parens $ prec 10 $ do Ident "liftYoneda" <- lexP liftYoneda <$> step readPrec #endif instance Eq (f a) => Eq (Yoneda f a) where (==) = (==) `on` lowerYoneda instance Ord (f a) => Ord (Yoneda f a) where compare = compare `on` lowerYoneda maxF :: (Functor f, Ord (f a)) => Yoneda f a -> Yoneda f a -> Yoneda f a Yoneda f `maxF` Yoneda g = liftYoneda $ f id `max` g id -- {-# RULES "max/maxF" max = maxF #-} {-# INLINE maxF #-} minF :: (Functor f, Ord (f a)) => Yoneda f a -> Yoneda f a -> Yoneda f a Yoneda f `minF` Yoneda g = liftYoneda $ f id `max` g id -- {-# RULES "min/minF" min = minF #-} {-# INLINE minF #-} maxM :: (Monad m, Ord (m a)) => Yoneda m a -> Yoneda m a -> Yoneda m a Yoneda f `maxM` Yoneda g = lift $ f id `max` g id -- {-# RULES "max/maxM" max = maxM #-} {-# INLINE maxM #-} minM :: (Monad m, Ord (m a)) => Yoneda m a -> Yoneda m a -> Yoneda m a Yoneda f `minM` Yoneda g = lift $ f id `min` g id -- {-# RULES "min/minM" min = minM #-} {-# INLINE minM #-} instance Alt f => Alt (Yoneda f) where Yoneda f Yoneda g = Yoneda (\k -> f k g k) instance Plus f => Plus (Yoneda f) where zero = Yoneda $ const zero instance Alternative f => Alternative (Yoneda f) where empty = Yoneda $ const empty Yoneda f <|> Yoneda g = Yoneda (\k -> f k <|> g k) instance Bind m => Bind (Yoneda m) where Yoneda m >>- k = Yoneda (\f -> m id >>- \a -> runYoneda (k a) f) instance Monad m => Monad (Yoneda m) where return a = Yoneda (\f -> return (f a)) Yoneda m >>= k = Yoneda (\f -> m id >>= \a -> runYoneda (k a) f) instance MonadFix m => MonadFix (Yoneda m) where mfix f = lift $ mfix (lowerYoneda . f) instance MonadPlus m => MonadPlus (Yoneda m) where mzero = Yoneda (const mzero) Yoneda f `mplus` Yoneda g = Yoneda (\k -> f k `mplus` g k) instance MonadTrans Yoneda where lift a = Yoneda (\f -> liftM f a) instance (Functor f, MonadFree f m) => MonadFree f (Yoneda m) where wrap = lift . wrap . fmap lowerYoneda instance Extend w => Extend (Yoneda w) where extended k (Yoneda m) = Yoneda (\f -> extended (f . k . liftYoneda) (m id)) instance Comonad w => Comonad (Yoneda w) where extend k (Yoneda m) = Yoneda (\f -> extend (f . k . liftYoneda) (m id)) extract = extract . lowerYoneda instance ComonadTrans Yoneda where lower = lowerYoneda