{-# LANGUAGE BangPatterns #-} {-# LANGUAGE CPP #-} {-# LANGUAGE Rank2Types #-} {-# LANGUAGE FlexibleInstances #-} {-# LANGUAGE UndecidableInstances #-} {-# LANGUAGE MultiParamTypeClasses #-} #ifndef MIN_VERSION_base #define MIN_VERSION_base(x,y,z) 1 #endif ----------------------------------------------------------------------------- -- | -- Module : Control.Monad.Free.Church -- Copyright : (C) 2011-2012 Edward Kmett -- License : BSD-style (see the file LICENSE) -- -- Maintainer : Edward Kmett <ekmett@gmail.com> -- Stability : provisional -- Portability : non-portable (rank-2 polymorphism) -- -- \"Free Monads for Less\" -- -- The most straightforward way of implementing free monads is as a recursive -- datatype that allows for arbitrarily deep nesting of the base functor. This is -- akin to a tree, with the leaves containing the values, and the nodes being a -- level of 'Functor' over subtrees. -- -- For each time that the `fmap` or `>>=` operations is used, the old tree is -- traversed up to the leaves, a new set of nodes is allocated, and -- the old ones are garbage collected. Even if the Haskell runtime -- optimizes some of the overhead through laziness and generational garbage -- collection, the asymptotic runtime is still quadratic. -- -- On the other hand, if the Church encoding is used, the tree only needs to be -- constructed once, because: -- -- * All uses of `fmap` are collapsed into a single one, so that the values on the -- _leaves_ are transformed in one pass. -- -- prop> fmap f . fmap g == fmap (f . g) -- -- * All uses of `>>=` are right associated, so that every new subtree created -- is final. -- -- prop> (m >>= f) >>= g == m >>= (\x -> f x >>= g) -- -- Asymptotically, the Church encoding supports the monadic operations more -- efficiently than the naïve 'Free'. -- -- This is based on the \"Free Monads for Less\" series of articles by Edward Kmett: -- -- * <http://comonad.com/reader/2011/free-monads-for-less/ Free monads for less — Part 1> -- -- * <http://comonad.com/reader/2011/free-monads-for-less-2/ Free monads for less — Part 2> ---------------------------------------------------------------------------- module Control.Monad.Free.Church ( F(..) , improve , fromF , iterM , toF , retract , hoistF , MonadFree(..) , liftF ) where import Control.Applicative import Control.Monad as Monad import Control.Monad.Fix import Control.Monad.Free hiding (retract, iterM) import Control.Monad.Reader.Class import Control.Monad.Writer.Class import Control.Monad.Cont.Class import Control.Monad.Trans.Class import Control.Monad.State.Class import Data.Foldable import Data.Functor.Bind import Prelude hiding (foldr) -- | The Church-encoded free monad for a functor @f@. -- -- It is /asymptotically/ more efficient to use ('>>=') for 'F' than it is to ('>>=') with 'Free'. -- -- <http://comonad.com/reader/2011/free-monads-for-less-2/> newtype F f a = F { runF :: forall r. (a -> r) -> (f r -> r) -> r } -- | Like iter for monadic values. iterM :: (Monad m, Functor f) => (f (m a) -> m a) -> F f a -> m a iterM phi xs = runF xs return phi instance Functor (F f) where fmap f (F g) = F (\kp -> g (kp . f)) instance Apply (F f) where (<.>) = (<*>) instance Applicative (F f) where pure a = F (\kp _ -> kp a) F f <*> F g = F (\kp kf -> f (\a -> g (kp . a) kf) kf) instance Alternative f => Alternative (F f) where empty = F (\_ kf -> kf empty) F f <|> F g = F (\kp kf -> kf (pure (f kp kf) <|> pure (g kp kf))) instance Bind (F f) where (>>-) = (>>=) instance Monad (F f) where return a = F (\kp _ -> kp a) F m >>= f = F (\kp kf -> m (\a -> runF (f a) kp kf) kf) instance MonadFix (F f) where mfix f = a where a = f (impure a) impure (F x) = x id (error "MonadFix (F f): wrap") instance (Foldable f, Functor f) => Foldable (F f) where foldr f r xs = runF xs f (foldr (.) id) r {-# INLINE foldr #-} #if MIN_VERSION_base(4,6,0) foldl' f z xs = runF xs (\a !r -> f r a) (flip $ foldl' $ \r g -> g r) z {-# INLINE foldl' #-} #endif instance MonadPlus f => MonadPlus (F f) where mzero = F (\_ kf -> kf mzero) F f `mplus` F g = F (\kp kf -> kf (return (f kp kf) `mplus` return (g kp kf))) instance MonadTrans F where lift f = F (\kp kf -> kf (liftM kp f)) instance Functor f => MonadFree f (F f) where wrap f = F (\kp kf -> kf (fmap (\ (F m) -> m kp kf) f)) instance MonadState s m => MonadState s (F m) where get = lift get put = lift . put instance MonadReader e m => MonadReader e (F m) where ask = lift ask local f = lift . local f . retract instance MonadWriter w m => MonadWriter w (F m) where tell = lift . tell pass = lift . pass . retract listen = lift . listen . retract instance MonadCont m => MonadCont (F m) where callCC f = lift $ callCC (retract . f . fmap lift) -- | -- 'retract' is the left inverse of 'lift' and 'liftF' -- -- @ -- 'retract' . 'lift' = 'id' -- 'retract' . 'liftF' = 'id' -- @ retract :: Monad m => F m a -> m a retract (F m) = m return Monad.join {-# INLINE retract #-} -- | Lift a natural transformation from @f@ to @g@ into a natural transformation from @F f@ to @F g@. hoistF :: (forall x. f x -> g x) -> F f a -> F g a hoistF t (F m) = F (\p f -> m p (f . t)) -- | Convert to another free monad representation. fromF :: MonadFree f m => F f a -> m a fromF (F m) = m return wrap {-# INLINE fromF #-} -- | Generate a Church-encoded free monad from a 'Free' monad. toF :: Functor f => Free f a -> F f a toF xs = F (\kp kf -> go kp kf xs) where go kp _ (Pure a) = kp a go kp kf (Free fma) = kf (fmap (go kp kf) fma) -- | Improve the asymptotic performance of code that builds a free monad with only binds and returns by using 'F' behind the scenes. -- -- This is based on the \"Free Monads for Less\" series of articles by Edward Kmett: -- -- * <http://comonad.com/reader/2011/free-monads-for-less/ Free monads for less — Part 1> -- -- * <http://comonad.com/reader/2011/free-monads-for-less-2/ Free monads for less — Part 2> -- -- and <http://www.iai.uni-bonn.de/~jv/mpc08.pdf \"Asymptotic Improvement of Computations over Free Monads\"> by Janis Voightländer. improve :: Functor f => (forall m. MonadFree f m => m a) -> Free f a improve m = fromF m {-# INLINE improve #-}