-- | Indicate that something is the `Remaining` part of something. module NewtypeZoo.Remaining ( Remaining(Remaining) , _theRemaining , theRemaining ) where import Control.DeepSeq (NFData) import Control.Monad.Fix (MonadFix) import Control.Monad.Zip (MonadZip) import Data.Bits (Bits,FiniteBits) import Data.Copointed (Copointed) import Data.Default (Default) import Data.Functor.Classes (Eq1, Ord1, Read1, Show1) import Data.Functor.Identity import Data.Ix (Ix) import Data.Profunctor (Profunctor, dimap) import Data.Pointed (Pointed) import Data.String (IsString) import Data.Typeable (Typeable) import Foreign.Storable (Storable) import GHC.Generics (Generic, Generic1) import System.Random (Random) import Test.QuickCheck (Arbitrary) newtype Remaining a = Remaining a deriving ( Eq , Ord , Read , Show , NFData , Foldable , Traversable , Functor , Default , Monoid , Semigroup , Typeable , Generic , Generic1 , Random , Arbitrary , Bounded , Enum , Floating , Fractional , Integral , Num , Real , RealFloat , RealFrac , Ix , IsString , Bits , FiniteBits ) deriving ( Eq1 , Ord1 , Read1 , Show1 , Pointed , Copointed , Applicative , MonadFix , Monad , MonadZip ) via Identity _theRemaining :: Remaining x -> x _theRemaining (Remaining !x) = x {-# INLINE _theRemaining #-} theRemaining :: forall a b p f. (Profunctor p, Functor f) => p a (f b) -> p (Remaining a) (f (Remaining b)) theRemaining = dimap _theRemaining (fmap Remaining) {-# INLINE theRemaining #-}