semigroupoids-4.5: src/Data/Functor/Bind.hs
{-# LANGUAGE CPP #-}
#ifdef MIN_VERSION_comonad
#if __GLASGOW_HASKELL__ >= 707 && (MIN_VERSION_comonad(3,0,3))
{-# LANGUAGE Safe #-}
#else
{-# LANGUAGE Trustworthy #-}
#endif
#else
{-# LANGUAGE Trustworthy #-}
#endif
{-# OPTIONS_GHC -fno-warn-orphans #-}
#if __GLASGOW_HASKELL__ >= 708 && __GLASGOW_HASKELL__ < 710
{-# OPTIONS_GHC -fno-warn-amp #-}
#endif
-----------------------------------------------------------------------------
-- |
-- Copyright : (C) 2011-2015 Edward Kmett
-- License : BSD-style (see the file LICENSE)
--
-- Maintainer : Edward Kmett <ekmett@gmail.com>
-- Stability : provisional
-- Portability : portable
--
-- NB: The definitions exported through "Data.Functor.Apply" need to be
-- included here because otherwise the instances for the transformers package
-- have orphaned heads.
----------------------------------------------------------------------------
module Data.Functor.Bind (
-- * Functors
Functor(..)
, (<$>) -- :: Functor f => (a -> b) -> f a -> f b
, ( $>) -- :: Functor f => f a -> b -> f b
-- * Applyable functors
, Apply(..)
, (<..>) -- :: Apply w => w a -> w (a -> b) -> w b
, liftF2 -- :: Apply w => (a -> b -> c) -> w a -> w b -> w c
, liftF3 -- :: Apply w => (a -> b -> c -> d) -> w a -> w b -> w c -> w d
-- * Wrappers
, WrappedApplicative(..)
, MaybeApply(..)
-- * Bindable functors
, Bind(..)
, (-<<)
, (-<-)
, (->-)
, apDefault
, returning
) where
-- import _everything_
import Control.Applicative
import Control.Applicative.Backwards
import Control.Applicative.Lift
import Control.Arrow
import Control.Category
import Control.Monad (ap)
#if defined(__GLASGOW_HASKELL__) && __GLASGOW_HASKELL__ < 707
import Control.Monad.Instances ()
#endif
import Control.Monad.Trans.Cont
import Control.Monad.Trans.Error
import Control.Monad.Trans.Except
import Control.Monad.Trans.Identity
import Control.Monad.Trans.Maybe
import Control.Monad.Trans.Reader
import Control.Monad.Trans.List
import qualified Control.Monad.Trans.RWS.Lazy as Lazy
import qualified Control.Monad.Trans.State.Lazy as Lazy
import qualified Control.Monad.Trans.Writer.Lazy as Lazy
import qualified Control.Monad.Trans.RWS.Strict as Strict
import qualified Control.Monad.Trans.State.Strict as Strict
import qualified Control.Monad.Trans.Writer.Strict as Strict
import Data.Functor.Compose
import Data.Functor.Constant
import Data.Functor.Identity
import Data.Functor.Product
import Data.Functor.Reverse
import Data.Functor.Extend
import Data.List.NonEmpty
import Data.Semigroup hiding (Product)
import Prelude hiding (id, (.))
#ifdef MIN_VERSION_containers
import qualified Data.IntMap as IntMap
import Data.IntMap (IntMap)
import qualified Data.Map as Map
import Data.Map (Map)
import Data.Sequence (Seq)
import Data.Tree (Tree)
#endif
#ifdef MIN_VERSION_comonad
import Control.Comonad
import Control.Comonad.Trans.Env
import Control.Comonad.Trans.Store
import Control.Comonad.Trans.Traced
#else
($>) :: Functor f => f a -> b -> f b
($>) = flip (<$)
#endif
infixl 1 >>-
infixr 1 -<<
infixl 4 <.>, <., .>, <..>
-- | A strong lax semi-monoidal endofunctor.
-- This is equivalent to an 'Applicative' without 'pure'.
--
-- Laws:
--
-- > associative composition: (.) <$> u <.> v <.> w = u <.> (v <.> w)
class Functor f => Apply f where
(<.>) :: f (a -> b) -> f a -> f b
-- | > a .> b = const id <$> a <.> b
(.>) :: f a -> f b -> f b
a .> b = const id <$> a <.> b
-- | > a <. b = const <$> a <.> b
(<.) :: f a -> f b -> f a
a <. b = const <$> a <.> b
instance Apply f => Apply (Backwards f) where
Backwards f <.> Backwards a = Backwards (a <..> f)
instance (Apply f, Apply g) => Apply (Compose f g) where
Compose f <.> Compose x = Compose ((<.>) <$> f <.> x)
instance Semigroup f => Apply (Constant f) where
Constant a <.> Constant b = Constant (a <> b)
Constant a <. Constant b = Constant (a <> b)
Constant a .> Constant b = Constant (a <> b)
instance Apply f => Apply (Lift f) where
Pure f <.> Pure x = Pure (f x)
Pure f <.> Other y = Other (f <$> y)
Other f <.> Pure x = Other (($ x) <$> f)
Other f <.> Other y = Other (f <.> y)
instance (Apply f, Apply g) => Apply (Product f g) where
Pair f g <.> Pair x y = Pair (f <.> x) (g <.> y)
instance Apply f => Apply (Reverse f) where
Reverse a <.> Reverse b = Reverse (a <.> b)
instance Semigroup m => Apply ((,)m) where
(m, f) <.> (n, a) = (m <> n, f a)
(m, a) <. (n, _) = (m <> n, a)
(m, _) .> (n, b) = (m <> n, b)
instance Apply NonEmpty where
(<.>) = ap
instance Apply (Either a) where
Left a <.> _ = Left a
Right _ <.> Left a = Left a
Right f <.> Right b = Right (f b)
Left a <. _ = Left a
Right _ <. Left a = Left a
Right a <. Right _ = Right a
Left a .> _ = Left a
Right _ .> Left a = Left a
Right _ .> Right b = Right b
instance Semigroup m => Apply (Const m) where
Const m <.> Const n = Const (m <> n)
Const m <. Const n = Const (m <> n)
Const m .> Const n = Const (m <> n)
instance Apply ((->)m) where
(<.>) = (<*>)
(<. ) = (<* )
( .>) = ( *>)
instance Apply ZipList where
(<.>) = (<*>)
(<. ) = (<* )
( .>) = ( *>)
instance Apply [] where
(<.>) = (<*>)
(<. ) = (<* )
( .>) = ( *>)
instance Apply IO where
(<.>) = (<*>)
(<. ) = (<* )
( .>) = ( *>)
instance Apply Maybe where
(<.>) = (<*>)
(<. ) = (<* )
( .>) = ( *>)
instance Apply Option where
(<.>) = (<*>)
(<. ) = (<* )
( .>) = ( *>)
instance Apply Identity where
(<.>) = (<*>)
(<. ) = (<* )
( .>) = ( *>)
instance Apply w => Apply (IdentityT w) where
IdentityT wa <.> IdentityT wb = IdentityT (wa <.> wb)
instance Monad m => Apply (WrappedMonad m) where
(<.>) = (<*>)
(<. ) = (<* )
( .>) = ( *>)
instance Arrow a => Apply (WrappedArrow a b) where
(<.>) = (<*>)
(<. ) = (<* )
( .>) = ( *>)
#ifdef MIN_VERSION_containers
-- | A Map is not 'Applicative', but it is an instance of 'Apply'
instance Ord k => Apply (Map k) where
(<.>) = Map.intersectionWith id
(<. ) = Map.intersectionWith const
( .>) = Map.intersectionWith (const id)
-- | An IntMap is not 'Applicative', but it is an instance of 'Apply'
instance Apply IntMap where
(<.>) = IntMap.intersectionWith id
(<. ) = IntMap.intersectionWith const
( .>) = IntMap.intersectionWith (const id)
instance Apply Seq where
(<.>) = ap
instance Apply Tree where
(<.>) = (<*>)
(<. ) = (<* )
( .>) = ( *>)
#endif
-- MaybeT is _not_ the same as Compose f Maybe
instance (Functor m, Monad m) => Apply (MaybeT m) where
(<.>) = apDefault
-- ErrorT e is _not_ the same as Compose f (Either e)
instance (Functor m, Monad m) => Apply (ErrorT e m) where
(<.>) = apDefault
instance (Functor m, Monad m) => Apply (ExceptT e m) where
(<.>) = apDefault
instance Apply m => Apply (ReaderT e m) where
ReaderT f <.> ReaderT a = ReaderT $ \e -> f e <.> a e
instance Apply m => Apply (ListT m) where
ListT f <.> ListT a = ListT $ (<.>) <$> f <.> a
-- unfortunately, WriterT has its wrapped product in the wrong order to just use (<.>) instead of flap
instance (Apply m, Semigroup w) => Apply (Strict.WriterT w m) where
Strict.WriterT f <.> Strict.WriterT a = Strict.WriterT $ flap <$> f <.> a where
flap (x,m) (y,n) = (x y, m <> n)
instance (Apply m, Semigroup w) => Apply (Lazy.WriterT w m) where
Lazy.WriterT f <.> Lazy.WriterT a = Lazy.WriterT $ flap <$> f <.> a where
flap ~(x,m) ~(y,n) = (x y, m <> n)
instance Bind m => Apply (Strict.StateT s m) where
(<.>) = apDefault
instance Bind m => Apply (Lazy.StateT s m) where
(<.>) = apDefault
instance (Bind m, Semigroup w) => Apply (Strict.RWST r w s m) where
(<.>) = apDefault
instance (Bind m, Semigroup w) => Apply (Lazy.RWST r w s m) where
(<.>) = apDefault
instance Apply (ContT r m) where
ContT f <.> ContT v = ContT $ \k -> f $ \g -> v (k . g)
#ifdef MIN_VERSION_comonad
instance (Semigroup e, Apply w) => Apply (EnvT e w) where
EnvT ef wf <.> EnvT ea wa = EnvT (ef <> ea) (wf <.> wa)
instance (Apply w, Semigroup s) => Apply (StoreT s w) where
StoreT ff m <.> StoreT fa n = StoreT ((<*>) <$> ff <.> fa) (m <> n)
instance Apply w => Apply (TracedT m w) where
TracedT wf <.> TracedT wa = TracedT (ap <$> wf <.> wa)
#endif
-- | Wrap an 'Applicative' to be used as a member of 'Apply'
newtype WrappedApplicative f a = WrapApplicative { unwrapApplicative :: f a }
instance Functor f => Functor (WrappedApplicative f) where
fmap f (WrapApplicative a) = WrapApplicative (f <$> a)
instance Applicative f => Apply (WrappedApplicative f) where
WrapApplicative f <.> WrapApplicative a = WrapApplicative (f <*> a)
WrapApplicative a <. WrapApplicative b = WrapApplicative (a <* b)
WrapApplicative a .> WrapApplicative b = WrapApplicative (a *> b)
instance Applicative f => Applicative (WrappedApplicative f) where
pure = WrapApplicative . pure
WrapApplicative f <*> WrapApplicative a = WrapApplicative (f <*> a)
WrapApplicative a <* WrapApplicative b = WrapApplicative (a <* b)
WrapApplicative a *> WrapApplicative b = WrapApplicative (a *> b)
instance Alternative f => Alternative (WrappedApplicative f) where
empty = WrapApplicative empty
WrapApplicative a <|> WrapApplicative b = WrapApplicative (a <|> b)
-- | Transform a Apply into an Applicative by adding a unit.
newtype MaybeApply f a = MaybeApply { runMaybeApply :: Either (f a) a }
instance Functor f => Functor (MaybeApply f) where
fmap f (MaybeApply (Right a)) = MaybeApply (Right (f a ))
fmap f (MaybeApply (Left fa)) = MaybeApply (Left (f <$> fa))
instance Apply f => Apply (MaybeApply f) where
MaybeApply (Right f) <.> MaybeApply (Right a) = MaybeApply (Right (f a ))
MaybeApply (Right f) <.> MaybeApply (Left fa) = MaybeApply (Left (f <$> fa))
MaybeApply (Left ff) <.> MaybeApply (Right a) = MaybeApply (Left (($a) <$> ff))
MaybeApply (Left ff) <.> MaybeApply (Left fa) = MaybeApply (Left (ff <.> fa))
MaybeApply a <. MaybeApply (Right _) = MaybeApply a
MaybeApply (Right a) <. MaybeApply (Left fb) = MaybeApply (Left (a <$ fb))
MaybeApply (Left fa) <. MaybeApply (Left fb) = MaybeApply (Left (fa <. fb))
MaybeApply (Right _) .> MaybeApply b = MaybeApply b
MaybeApply (Left fa) .> MaybeApply (Right b) = MaybeApply (Left (fa $> b ))
MaybeApply (Left fa) .> MaybeApply (Left fb) = MaybeApply (Left (fa .> fb))
instance Apply f => Applicative (MaybeApply f) where
pure a = MaybeApply (Right a)
(<*>) = (<.>)
(<* ) = (<. )
( *>) = ( .>)
-- | A variant of '<.>' with the arguments reversed.
(<..>) :: Apply w => w a -> w (a -> b) -> w b
(<..>) = liftF2 (flip id)
{-# INLINE (<..>) #-}
-- | Lift a binary function into a comonad with zipping
liftF2 :: Apply w => (a -> b -> c) -> w a -> w b -> w c
liftF2 f a b = f <$> a <.> b
{-# INLINE liftF2 #-}
-- | Lift a ternary function into a comonad with zipping
liftF3 :: Apply w => (a -> b -> c -> d) -> w a -> w b -> w c -> w d
liftF3 f a b c = f <$> a <.> b <.> c
{-# INLINE liftF3 #-}
instance Extend f => Extend (MaybeApply f) where
duplicated w@(MaybeApply Right{}) = MaybeApply (Right w)
duplicated (MaybeApply (Left fa)) = MaybeApply (Left (extended (MaybeApply . Left) fa))
#ifdef MIN_VERSION_comonad
instance Comonad f => Comonad (MaybeApply f) where
duplicate w@(MaybeApply Right{}) = MaybeApply (Right w)
duplicate (MaybeApply (Left fa)) = MaybeApply (Left (extend (MaybeApply . Left) fa))
extract (MaybeApply (Left fa)) = extract fa
extract (MaybeApply (Right a)) = a
instance Apply (Cokleisli w a) where
Cokleisli f <.> Cokleisli a = Cokleisli (\w -> (f w) (a w))
#endif
-- | A 'Monad' sans 'return'.
--
-- Minimal definition: Either 'join' or '>>-'
--
-- If defining both, then the following laws (the default definitions) must hold:
--
-- > join = (>>- id)
-- > m >>- f = join (fmap f m)
--
-- Laws:
--
-- > induced definition of <.>: f <.> x = f >>- (<$> x)
--
-- Finally, there are two associativity conditions:
--
-- > associativity of (>>-): (m >>- f) >>- g == m >>- (\x -> f x >>- g)
-- > associativity of join: join . join = join . fmap join
--
-- These can both be seen as special cases of the constraint that
--
-- > associativity of (->-): (f ->- g) ->- h = f ->- (g ->- h)
--
class Apply m => Bind m where
(>>-) :: m a -> (a -> m b) -> m b
m >>- f = join (fmap f m)
join :: m (m a) -> m a
join = (>>- id)
#if __GLASGOW_HASKELL__ >= 708
{-# MINIMAL (>>-) | join #-}
#endif
returning :: Functor f => f a -> (a -> b) -> f b
returning = flip fmap
(-<<) :: Bind m => (a -> m b) -> m a -> m b
(-<<) = flip (>>-)
(->-) :: Bind m => (a -> m b) -> (b -> m c) -> a -> m c
f ->- g = \a -> f a >>- g
(-<-) :: Bind m => (b -> m c) -> (a -> m b) -> a -> m c
g -<- f = \a -> f a >>- g
apDefault :: Bind f => f (a -> b) -> f a -> f b
apDefault f x = f >>- \f' -> f' <$> x
instance Semigroup m => Bind ((,)m) where
~(m, a) >>- f = let (n, b) = f a in (m <> n, b)
instance Bind (Either a) where
Left a >>- _ = Left a
Right a >>- f = f a
instance (Bind f, Bind g) => Bind (Product f g) where
Pair m n >>- f = Pair (m >>- fstP . f) (n >>- sndP . f) where
fstP (Pair a _) = a
sndP (Pair _ b) = b
instance Bind ((->)m) where
f >>- g = \e -> g (f e) e
instance Bind [] where
(>>-) = (>>=)
instance Bind NonEmpty where
(>>-) = (>>=)
instance Bind IO where
(>>-) = (>>=)
instance Bind Maybe where
(>>-) = (>>=)
instance Bind Option where
(>>-) = (>>=)
instance Bind Identity where
(>>-) = (>>=)
instance Bind m => Bind (IdentityT m) where
IdentityT m >>- f = IdentityT (m >>- runIdentityT . f)
instance Monad m => Bind (WrappedMonad m) where
WrapMonad m >>- f = WrapMonad $ m >>= unwrapMonad . f
instance (Functor m, Monad m) => Bind (MaybeT m) where
(>>-) = (>>=) -- distributive law requires Monad to inject @Nothing@
instance (Apply m, Monad m) => Bind (ListT m) where
(>>-) = (>>=) -- distributive law requires Monad to inject @[]@
instance (Functor m, Monad m) => Bind (ErrorT e m) where
m >>- k = ErrorT $ do
a <- runErrorT m
case a of
Left l -> return (Left l)
Right r -> runErrorT (k r)
instance (Functor m, Monad m) => Bind (ExceptT e m) where
m >>- k = ExceptT $ do
a <- runExceptT m
case a of
Left l -> return (Left l)
Right r -> runExceptT (k r)
instance Bind m => Bind (ReaderT e m) where
ReaderT m >>- f = ReaderT $ \e -> m e >>- \x -> runReaderT (f x) e
instance (Bind m, Semigroup w) => Bind (Lazy.WriterT w m) where
m >>- k = Lazy.WriterT $
Lazy.runWriterT m >>- \ ~(a, w) ->
Lazy.runWriterT (k a) `returning` \ ~(b, w') ->
(b, w <> w')
instance (Bind m, Semigroup w) => Bind (Strict.WriterT w m) where
m >>- k = Strict.WriterT $
Strict.runWriterT m >>- \ (a, w) ->
Strict.runWriterT (k a) `returning` \ (b, w') ->
(b, w <> w')
instance Bind m => Bind (Lazy.StateT s m) where
m >>- k = Lazy.StateT $ \s ->
Lazy.runStateT m s >>- \ ~(a, s') ->
Lazy.runStateT (k a) s'
instance Bind m => Bind (Strict.StateT s m) where
m >>- k = Strict.StateT $ \s ->
Strict.runStateT m s >>- \ ~(a, s') ->
Strict.runStateT (k a) s'
instance (Bind m, Semigroup w) => Bind (Lazy.RWST r w s m) where
m >>- k = Lazy.RWST $ \r s ->
Lazy.runRWST m r s >>- \ ~(a, s', w) ->
Lazy.runRWST (k a) r s' `returning` \ ~(b, s'', w') ->
(b, s'', w <> w')
instance (Bind m, Semigroup w) => Bind (Strict.RWST r w s m) where
m >>- k = Strict.RWST $ \r s ->
Strict.runRWST m r s >>- \ (a, s', w) ->
Strict.runRWST (k a) r s' `returning` \ (b, s'', w') ->
(b, s'', w <> w')
instance Bind (ContT r m) where
m >>- k = ContT $ \c -> runContT m $ \a -> runContT (k a) c
{-
instance ArrowApply a => Bind (WrappedArrow a b) where
(>>-) = (>>=)
-}
#ifdef MIN_VERSION_containers
-- | A 'Map' is not a 'Monad', but it is an instance of 'Bind'
instance Ord k => Bind (Map k) where
m >>- f = Map.mapMaybeWithKey (\k -> Map.lookup k . f) m
-- | An 'IntMap' is not a 'Monad', but it is an instance of 'Bind'
instance Bind IntMap where
m >>- f = IntMap.mapMaybeWithKey (\k -> IntMap.lookup k . f) m
instance Bind Seq where
(>>-) = (>>=)
instance Bind Tree where
(>>-) = (>>=)
#endif