Copyright	(C) 2008-2013 Edward Kmett
License	BSD-style (see the file LICENSE)
Maintainer	Edward Kmett <ekmett@gmail.com>
Stability	provisional
Portability	MPTCs, fundeps
Safe Haskell	Safe
Language	Haskell2010

Control.Comonad.Cofree

Contents

Lenses into cofree comonads

Description

Cofree comonads

Synopsis

Documentation

data Cofree f a Source #

The Cofree Comonad of a functor f.

Formally

A Comonad v is a cofree Comonad for f if every comonad homomorphism from another comonad w to v is equivalent to a natural transformation from w to f.

A cofree functor is right adjoint to a forgetful functor.

Cofree is a functor from the category of functors to the category of comonads that is right adjoint to the forgetful functor from the category of comonads to the category of functors that forgets how to extract and duplicate, leaving you with only a Functor.

In practice, cofree comonads are quite useful for annotating syntax trees, or talking about streams.

A number of common comonads arise directly as cofree comonads.

For instance,

Cofree Maybe forms the a comonad for a non-empty list.
Cofree (Const b) is a product.
Cofree Identity forms an infinite stream.
Cofree ((->) b)' describes a Moore machine with states labeled with values of type a, and transitions on edges of type b.

Furthermore, if the functor f forms a monoid (for example, by being an instance of Alternative), the resulting Comonad is also a Monad. See Monadic Augment and Generalised Shortcut Fusion by Neil Ghani et al., Section 4.3 for more details.

In particular, if f a ≡ [a], the resulting data structure is a Rose tree. For a practical application, check Higher Dimensional Trees, Algebraically by Neil Ghani et al.

Constructors

a :< (f (Cofree f a)) infixr 5

Instances

ComonadTrans Cofree Source #	This is not a true `Comonad` transformer, but this instance is convenient.
Methods lower :: Comonad w => Cofree w a -> w a #
ComonadHoist Cofree Source #
Methods cohoist :: (Comonad w, Comonad v) => (forall x. w x -> v x) -> Cofree w a -> Cofree v a #
ComonadEnv e w => ComonadEnv e (Cofree w) Source #
Methods ask :: Cofree w a -> e #
ComonadStore s w => ComonadStore s (Cofree w) Source #
Methods pos :: Cofree w a -> s # peek :: s -> Cofree w a -> a # peeks :: (s -> s) -> Cofree w a -> a # seek :: s -> Cofree w a -> Cofree w a # seeks :: (s -> s) -> Cofree w a -> Cofree w a # experiment :: Functor f => (s -> f s) -> Cofree w a -> f a #
ComonadTraced m w => ComonadTraced m (Cofree w) Source #
Methods trace :: m -> Cofree w a -> a #
Functor f => ComonadCofree f (Cofree f) Source #
Methods unwrap :: Cofree f a -> f (Cofree f a) Source #
Alternative f => Monad (Cofree f) Source #
Methods (>>=) :: Cofree f a -> (a -> Cofree f b) -> Cofree f b # (>>) :: Cofree f a -> Cofree f b -> Cofree f b # return :: a -> Cofree f a # fail :: String -> Cofree f a #
Functor f => Functor (Cofree f) Source #
Methods fmap :: (a -> b) -> Cofree f a -> Cofree f b # (<$) :: a -> Cofree f b -> Cofree f a #
Alternative f => Applicative (Cofree f) Source #
Methods pure :: a -> Cofree f a # (<>) :: Cofree f (a -> b) -> Cofree f a -> Cofree f b # liftA2 :: (a -> b -> c) -> Cofree f a -> Cofree f b -> Cofree f c # (>) :: Cofree f a -> Cofree f b -> Cofree f b # (<*) :: Cofree f a -> Cofree f b -> Cofree f a #
Foldable f => Foldable (Cofree f) Source #
Methods fold :: Monoid m => Cofree f m -> m # foldMap :: Monoid m => (a -> m) -> Cofree f a -> m # foldr :: (a -> b -> b) -> b -> Cofree f a -> b # foldr' :: (a -> b -> b) -> b -> Cofree f a -> b # foldl :: (b -> a -> b) -> b -> Cofree f a -> b # foldl' :: (b -> a -> b) -> b -> Cofree f a -> b # foldr1 :: (a -> a -> a) -> Cofree f a -> a # foldl1 :: (a -> a -> a) -> Cofree f a -> a # toList :: Cofree f a -> [a] # null :: Cofree f a -> Bool # length :: Cofree f a -> Int # elem :: Eq a => a -> Cofree f a -> Bool # maximum :: Ord a => Cofree f a -> a # minimum :: Ord a => Cofree f a -> a # sum :: Num a => Cofree f a -> a # product :: Num a => Cofree f a -> a #
Traversable f => Traversable (Cofree f) Source #
Methods traverse :: Applicative f => (a -> f b) -> Cofree f a -> f (Cofree f b) # sequenceA :: Applicative f => Cofree f (f a) -> f (Cofree f a) # mapM :: Monad m => (a -> m b) -> Cofree f a -> m (Cofree f b) # sequence :: Monad m => Cofree f (m a) -> m (Cofree f a) #
Eq1 f => Eq1 (Cofree f) Source #
Methods liftEq :: (a -> b -> Bool) -> Cofree f a -> Cofree f b -> Bool #
Ord1 f => Ord1 (Cofree f) Source #
Methods liftCompare :: (a -> b -> Ordering) -> Cofree f a -> Cofree f b -> Ordering #
Read1 f => Read1 (Cofree f) Source #
Methods liftReadsPrec :: (Int -> ReadS a) -> ReadS [a] -> Int -> ReadS (Cofree f a) # liftReadList :: (Int -> ReadS a) -> ReadS [a] -> ReadS [Cofree f a] # liftReadPrec :: ReadPrec a -> ReadPrec [a] -> ReadPrec (Cofree f a) # liftReadListPrec :: ReadPrec a -> ReadPrec [a] -> ReadPrec [Cofree f a] #
Show1 f => Show1 (Cofree f) Source #
Methods liftShowsPrec :: (Int -> a -> ShowS) -> ([a] -> ShowS) -> Int -> Cofree f a -> ShowS # liftShowList :: (Int -> a -> ShowS) -> ([a] -> ShowS) -> [Cofree f a] -> ShowS #
(Alternative f, MonadZip f) => MonadZip (Cofree f) Source #
Methods mzip :: Cofree f a -> Cofree f b -> Cofree f (a, b) # mzipWith :: (a -> b -> c) -> Cofree f a -> Cofree f b -> Cofree f c # munzip :: Cofree f (a, b) -> (Cofree f a, Cofree f b) #
Functor f => Comonad (Cofree f) Source #
Methods extract :: Cofree f a -> a # duplicate :: Cofree f a -> Cofree f (Cofree f a) # extend :: (Cofree f a -> b) -> Cofree f a -> Cofree f b #
ComonadApply f => ComonadApply (Cofree f) Source #
Methods (<@>) :: Cofree f (a -> b) -> Cofree f a -> Cofree f b # (@>) :: Cofree f a -> Cofree f b -> Cofree f b # (<@) :: Cofree f a -> Cofree f b -> Cofree f a #
Distributive f => Distributive (Cofree f) Source #
Methods distribute :: Functor f => f (Cofree f a) -> Cofree f (f a) # collect :: Functor f => (a -> Cofree f b) -> f a -> Cofree f (f b) # distributeM :: Monad m => m (Cofree f a) -> Cofree f (m a) # collectM :: Monad m => (a -> Cofree f b) -> m a -> Cofree f (m b) #
Traversable1 f => Traversable1 (Cofree f) Source #
Methods traverse1 :: Apply f => (a -> f b) -> Cofree f a -> f (Cofree f b) # sequence1 :: Apply f => Cofree f (f b) -> f (Cofree f b) #
Foldable1 f => Foldable1 (Cofree f) Source #
Methods fold1 :: Semigroup m => Cofree f m -> m # foldMap1 :: Semigroup m => (a -> m) -> Cofree f a -> m # toNonEmpty :: Cofree f a -> NonEmpty a #
Apply f => Apply (Cofree f) Source #
Methods (<.>) :: Cofree f (a -> b) -> Cofree f a -> Cofree f b # (.>) :: Cofree f a -> Cofree f b -> Cofree f b # (<.) :: Cofree f a -> Cofree f b -> Cofree f a # liftF2 :: (a -> b -> c) -> Cofree f a -> Cofree f b -> Cofree f c #
Functor f => Extend (Cofree f) Source #
Methods duplicated :: Cofree f a -> Cofree f (Cofree f a) # extended :: (Cofree f a -> b) -> Cofree f a -> Cofree f b #
(Eq1 f, Eq a) => Eq (Cofree f a) Source #
Methods (==) :: Cofree f a -> Cofree f a -> Bool # (/=) :: Cofree f a -> Cofree f a -> Bool #
(Typeable (* -> *) f, Data (f (Cofree f a)), Data a) => Data (Cofree f a) Source #
Methods gfoldl :: (forall d b. Data d => c (d -> b) -> d -> c b) -> (forall g. g -> c g) -> Cofree f a -> c (Cofree f a) # gunfold :: (forall b r. Data b => c (b -> r) -> c r) -> (forall r. r -> c r) -> Constr -> c (Cofree f a) # toConstr :: Cofree f a -> Constr # dataTypeOf :: Cofree f a -> DataType # dataCast1 :: Typeable (* -> ) t => (forall d. Data d => c (t d)) -> Maybe (c (Cofree f a)) # dataCast2 :: Typeable ( -> * -> *) t => (forall d e. (Data d, Data e) => c (t d e)) -> Maybe (c (Cofree f a)) # gmapT :: (forall b. Data b => b -> b) -> Cofree f a -> Cofree f a # gmapQl :: (r -> r' -> r) -> r -> (forall d. Data d => d -> r') -> Cofree f a -> r # gmapQr :: (r' -> r -> r) -> r -> (forall d. Data d => d -> r') -> Cofree f a -> r # gmapQ :: (forall d. Data d => d -> u) -> Cofree f a -> [u] # gmapQi :: Int -> (forall d. Data d => d -> u) -> Cofree f a -> u # gmapM :: Monad m => (forall d. Data d => d -> m d) -> Cofree f a -> m (Cofree f a) # gmapMp :: MonadPlus m => (forall d. Data d => d -> m d) -> Cofree f a -> m (Cofree f a) # gmapMo :: MonadPlus m => (forall d. Data d => d -> m d) -> Cofree f a -> m (Cofree f a) #
(Ord1 f, Ord a) => Ord (Cofree f a) Source #
Methods compare :: Cofree f a -> Cofree f a -> Ordering # (<) :: Cofree f a -> Cofree f a -> Bool # (<=) :: Cofree f a -> Cofree f a -> Bool # (>) :: Cofree f a -> Cofree f a -> Bool # (>=) :: Cofree f a -> Cofree f a -> Bool # max :: Cofree f a -> Cofree f a -> Cofree f a # min :: Cofree f a -> Cofree f a -> Cofree f a #
(Read1 f, Read a) => Read (Cofree f a) Source #
Methods readsPrec :: Int -> ReadS (Cofree f a) # readList :: ReadS [Cofree f a] # readPrec :: ReadPrec (Cofree f a) # readListPrec :: ReadPrec [Cofree f a] #
(Show1 f, Show a) => Show (Cofree f a) Source #
Methods showsPrec :: Int -> Cofree f a -> ShowS # show :: Cofree f a -> String # showList :: [Cofree f a] -> ShowS #

class (Functor f, Comonad w) => ComonadCofree f w | w -> f where Source #

Allows you to peel a layer off a cofree comonad.

Minimal complete definition

unwrap

Methods

unwrap :: w a -> f (w a) Source #

Remove a layer.

Instances

ComonadCofree [] Tree Source #
Methods unwrap :: Tree a -> [Tree a] Source #
ComonadCofree Maybe NonEmpty Source #
Methods unwrap :: NonEmpty a -> Maybe (NonEmpty a) Source #
Functor f => ComonadCofree f (Cofree f) Source #
Methods unwrap :: Cofree f a -> f (Cofree f a) Source #
Comonad w => ComonadCofree Identity (CoiterT w) Source #
Methods unwrap :: CoiterT w a -> Identity (CoiterT w a) Source #
(ComonadCofree f w, Monoid m) => ComonadCofree f (TracedT m w) Source #
Methods unwrap :: TracedT m w a -> f (TracedT m w a) Source #
ComonadCofree f w => ComonadCofree f (StoreT s w) Source #
Methods unwrap :: StoreT s w a -> f (StoreT s w a) Source #
ComonadCofree f w => ComonadCofree f (EnvT e w) Source #
Methods unwrap :: EnvT e w a -> f (EnvT e w a) Source #
ComonadCofree f w => ComonadCofree f (IdentityT * w) Source #
Methods unwrap :: IdentityT * w a -> f (IdentityT * w a) Source #
(Functor f, Comonad w) => ComonadCofree f (CofreeT f w) Source #
Methods unwrap :: CofreeT f w a -> f (CofreeT f w a) Source #
ComonadCofree (Const * b) ((,) b) Source #
Methods unwrap :: (b, a) -> Const * b (b, a) Source #

section :: Comonad f => f a -> Cofree f a Source #

lower . section = id

coiter :: Functor f => (a -> f a) -> a -> Cofree f a Source #

Use coiteration to generate a cofree comonad from a seed.

coiter f = unfold (id &&& f)

coiterW :: (Comonad w, Functor f) => (w a -> f (w a)) -> w a -> Cofree f a Source #

Like coiter for comonadic values.

unfold :: Functor f => (b -> (a, f b)) -> b -> Cofree f a Source #

Unfold a cofree comonad from a seed.

unfoldM :: (Traversable f, Monad m) => (b -> m (a, f b)) -> b -> m (Cofree f a) Source #

Unfold a cofree comonad from a seed, monadically.

hoistCofree :: Functor f => (forall x. f x -> g x) -> Cofree f a -> Cofree g a Source #

Lenses into cofree comonads

_extract :: Functor f => (a -> f a) -> Cofree g a -> f (Cofree g a) Source #

This is a lens that can be used to read or write from the target of extract.

Using (^.) from the lens package:

foo ^. _extract == extract foo

For more on lenses see the lens package on hackage

_extract :: Lens' (Cofree g a) a

_unwrap :: Functor f => (g (Cofree g a) -> f (g (Cofree g a))) -> Cofree g a -> f (Cofree g a) Source #

This is a lens that can be used to read or write to the tails of a Cofree Comonad.

Using (^.) from the lens package:

foo ^. _unwrap == unwrap foo

For more on lenses see the lens package on hackage

_unwrap :: Lens' (Cofree g a) (g (Cofree g a))

telescoped :: Functor f => [(Cofree g a -> f (Cofree g a)) -> g (Cofree g a) -> f (g (Cofree g a))] -> (a -> f a) -> Cofree g a -> f (Cofree g a) Source #

Construct an Lens into a Cofree g given a list of lenses into the base functor. When the input list is empty, this is equivalent to _extract. When the input list is non-empty, this composes the input lenses with _unwrap to walk through the Cofree g before using _extract to get the element at the final location.

For more on lenses see the lens package on hackage.

telescoped :: [Lens' (g (Cofree g a)) (Cofree g a)] -> Lens' (Cofree g a) a

telescoped :: [Traversal' (g (Cofree g a)) (Cofree g a)] -> Traversal' (Cofree g a) a

telescoped :: [Getter (g (Cofree g a)) (Cofree g a)] -> Getter (Cofree g a) a

telescoped :: [Fold (g (Cofree g a)) (Cofree g a)] -> Fold (Cofree g a) a

telescoped :: [Setter' (g (Cofree g a)) (Cofree g a)] -> Setter' (Cofree g a) a

telescoped_ :: Functor f => [(Cofree g a -> f (Cofree g a)) -> g (Cofree g a) -> f (g (Cofree g a))] -> (Cofree g a -> f (Cofree g a)) -> Cofree g a -> f (Cofree g a) Source #

Construct an Lens into a Cofree g given a list of lenses into the base functor. The only difference between this and telescoped is that telescoped focuses on a single value, but this focuses on the entire remaining subtree. When the input list is empty, this is equivalent to id. When the input list is non-empty, this composes the input lenses with _unwrap to walk through the Cofree g.

For more on lenses see the lens package on hackage.

telescoped :: [Lens' (g (Cofree g a)) (Cofree g a)] -> Lens' (Cofree g a) (Cofree g a)

telescoped :: [Traversal' (g (Cofree g a)) (Cofree g a)] -> Traversal' (Cofree g a) (Cofree g a)

telescoped :: [Getter (g (Cofree g a)) (Cofree g a)] -> Getter (Cofree g a) (Cofree g a)

telescoped :: [Fold (g (Cofree g a)) (Cofree g a)] -> Fold (Cofree g a) (Cofree g a)

telescoped :: [Setter' (g (Cofree g a)) (Cofree g a)] -> Setter' (Cofree g a) (Cofree g a)

shoots :: (Applicative f, Traversable g) => (a -> f a) -> Cofree g a -> f (Cofree g a) Source #

A Traversal' that gives access to all non-leaf a elements of a Cofree g a, where non-leaf is defined as x from (x :< xs) where null xs is False.

Because this doesn't give access to all values in the Cofree g, it cannot be used to change types.

shoots :: Traversable g => Traversal' (Cofree g a) a

N.B. On GHC < 7.9, this is slightly less flexible, as it has to use null (toList xs) instead.

leaves :: (Applicative f, Traversable g) => (a -> f a) -> Cofree g a -> f (Cofree g a) Source #

A Traversal' that gives access to all leaf a elements of a Cofree g a, where leaf is defined as x from (x :< xs) where null xs is True.

Because this doesn't give access to all values in the Cofree g, it cannot be used to change types.

shoots :: Traversable g => Traversal' (Cofree g a) a

N.B. On GHC < 7.9, this is slightly less flexible, as it has to use null (toList xs) instead.