module Data.Copointed where
import Data.Default
import Data.Functor.Identity
import Data.Functor.Compose
import Data.Functor.Coproduct
import Data.Tree
import Data.Semigroup as Semigroup
import Control.Monad.Trans.Identity
import qualified Control.Monad.Trans.Writer.Lazy as Lazy
import qualified Control.Monad.Trans.Writer.Strict as Strict
import Control.Comonad.Trans.Env
import Control.Comonad.Trans.Store
import Control.Comonad.Trans.Traced
import Data.List.NonEmpty (NonEmpty(..))
class Copointed p where
copoint :: p a -> a
instance Copointed Identity where
copoint = runIdentity
instance Default m => Copointed ((->)m) where
copoint f = f def
instance (Default m, Copointed w) => Copointed (TracedT m w) where
copoint (TracedT w) = copoint w def
instance Copointed ((,) a) where
copoint = snd
instance Copointed ((,,) a b) where
copoint (_,_,a) = a
instance Copointed ((,,,) a b c) where
copoint (_,_,_,a) = a
instance Copointed Tree where
copoint = rootLabel
instance (Copointed p, Copointed q) => Copointed (Compose p q) where
copoint = copoint . copoint . getCompose
instance (Copointed p, Copointed q) => Copointed (Coproduct p q) where
copoint = coproduct copoint copoint
instance Copointed m => Copointed (IdentityT m) where
copoint = copoint . runIdentityT
instance Copointed m => Copointed (Lazy.WriterT w m) where
copoint = fst . copoint . Lazy.runWriterT
instance Copointed m => Copointed (Strict.WriterT w m) where
copoint = fst . copoint . Strict.runWriterT
instance Copointed Dual where
copoint = getDual
instance Copointed Sum where
copoint = getSum
instance Copointed NonEmpty where
copoint ~(a :| _) = a
instance Copointed Semigroup.First where
copoint = Semigroup.getFirst
instance Copointed Semigroup.Last where
copoint = Semigroup.getLast
instance Copointed Semigroup.Max where
copoint = Semigroup.getMax
instance Copointed Semigroup.Min where
copoint = Semigroup.getMin
instance Copointed w => Copointed (EnvT e w) where
copoint = copoint . lowerEnvT
instance Copointed w => Copointed (StoreT s w) where
copoint (StoreT wf s) = copoint wf s