{-# LANGUAGE Trustworthy #-} {-# LANGUAGE NoImplicitPrelude #-} ----------------------------------------------------------------------------- -- This is a non-exposed internal module. -- -- This code contains utility function and data structures that are used -- to improve the efficiency of several instances in the Data.* namespace. ----------------------------------------------------------------------------- module Data.Functor.Utils where import Data.Coerce (Coercible, coerce) import GHC.Base ( Applicative(..), Functor(..), Maybe(..), Monoid(..), Ord(..) , Semigroup(..), ($), otherwise ) -- We don't expose Max and Min because, as Edward Kmett pointed out to me, -- there are two reasonable ways to define them. One way is to use Maybe, as we -- do here; the other way is to impose a Bounded constraint on the Monoid -- instance. We may eventually want to add both versions, but we don't want to -- trample on anyone's toes by imposing Max = MaxMaybe. newtype Max a = Max {getMax :: Maybe a} newtype Min a = Min {getMin :: Maybe a} -- | @since 4.11.0.0 instance Ord a => Semigroup (Max a) where {-# INLINE (<>) #-} m <> Max Nothing = m Max Nothing <> n = n (Max m@(Just x)) <> (Max n@(Just y)) | x >= y = Max m | otherwise = Max n -- | @since 4.8.0.0 instance Ord a => Monoid (Max a) where mempty = Max Nothing -- | @since 4.11.0.0 instance Ord a => Semigroup (Min a) where {-# INLINE (<>) #-} m <> Min Nothing = m Min Nothing <> n = n (Min m@(Just x)) <> (Min n@(Just y)) | x <= y = Min m | otherwise = Min n -- | @since 4.8.0.0 instance Ord a => Monoid (Min a) where mempty = Min Nothing -- left-to-right state transformer newtype StateL s a = StateL { runStateL :: s -> (s, a) } -- | @since 4.0 instance Functor (StateL s) where fmap f (StateL k) = StateL $ \ s -> let (s', v) = k s in (s', f v) -- | @since 4.0 instance Applicative (StateL s) where pure x = StateL (\ s -> (s, x)) StateL kf <*> StateL kv = StateL $ \ s -> let (s', f) = kf s (s'', v) = kv s' in (s'', f v) liftA2 f (StateL kx) (StateL ky) = StateL $ \s -> let (s', x) = kx s (s'', y) = ky s' in (s'', f x y) -- right-to-left state transformer newtype StateR s a = StateR { runStateR :: s -> (s, a) } -- | @since 4.0 instance Functor (StateR s) where fmap f (StateR k) = StateR $ \ s -> let (s', v) = k s in (s', f v) -- | @since 4.0 instance Applicative (StateR s) where pure x = StateR (\ s -> (s, x)) StateR kf <*> StateR kv = StateR $ \ s -> let (s', v) = kv s (s'', f) = kf s' in (s'', f v) liftA2 f (StateR kx) (StateR ky) = StateR $ \ s -> let (s', y) = ky s (s'', x) = kx s' in (s'', f x y) -- See Note [Function coercion] (#.) :: Coercible b c => (b -> c) -> (a -> b) -> (a -> c) (#.) _f = coerce {-# INLINE (#.) #-} {- Note [Function coercion] ~~~~~~~~~~~~~~~~~~~~~~~ Several functions here use (#.) instead of (.) to avoid potential efficiency problems relating to #7542. The problem, in a nutshell: If N is a newtype constructor, then N x will always have the same representation as x (something similar applies for a newtype deconstructor). However, if f is a function, N . f = \x -> N (f x) This looks almost the same as f, but the eta expansion lifts it--the lhs could be _|_, but the rhs never is. This can lead to very inefficient code. Thus we steal a technique from Shachaf and Edward Kmett and adapt it to the current (rather clean) setting. Instead of using N . f, we use N #. f, which is just coerce f `asTypeOf` (N . f) That is, we just *pretend* that f has the right type, and thanks to the safety of coerce, the type checker guarantees that nothing really goes wrong. We still have to be a bit careful, though: remember that #. completely ignores the *value* of its left operand. -}