{-# 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 {forall a. Max a -> Maybe a
getMax :: Maybe a}
newtype Min a = Min {forall a. Min a -> Maybe a
getMin :: Maybe a}

-- | @since 4.11.0.0
instance Ord a => Semigroup (Max a) where
    {-# INLINE (<>) #-}
    Max a
m <> :: Max a -> Max a -> Max a
<> Max Maybe a
Nothing = Max a
m
    Max Maybe a
Nothing <> Max a
n = Max a
n
    (Max m :: Maybe a
m@(Just a
x)) <> (Max n :: Maybe a
n@(Just a
y))
      | a
x a -> a -> Bool
forall a. Ord a => a -> a -> Bool
>= a
y    = Maybe a -> Max a
forall a. Maybe a -> Max a
Max Maybe a
m
      | Bool
otherwise = Maybe a -> Max a
forall a. Maybe a -> Max a
Max Maybe a
n

-- | @since 4.8.0.0
instance Ord a => Monoid (Max a) where
    mempty :: Max a
mempty = Maybe a -> Max a
forall a. Maybe a -> Max a
Max Maybe a
forall a. Maybe a
Nothing

-- | @since 4.11.0.0
instance Ord a => Semigroup (Min a) where
    {-# INLINE (<>) #-}
    Min a
m <> :: Min a -> Min a -> Min a
<> Min Maybe a
Nothing = Min a
m
    Min Maybe a
Nothing <> Min a
n = Min a
n
    (Min m :: Maybe a
m@(Just a
x)) <> (Min n :: Maybe a
n@(Just a
y))
      | a
x a -> a -> Bool
forall a. Ord a => a -> a -> Bool
<= a
y    = Maybe a -> Min a
forall a. Maybe a -> Min a
Min Maybe a
m
      | Bool
otherwise = Maybe a -> Min a
forall a. Maybe a -> Min a
Min Maybe a
n

-- | @since 4.8.0.0
instance Ord a => Monoid (Min a) where
    mempty :: Min a
mempty = Maybe a -> Min a
forall a. Maybe a -> Min a
Min Maybe a
forall a. Maybe a
Nothing

-- left-to-right state-transforming monad
newtype StateL s a = StateL { forall s a. StateL s a -> s -> (s, a)
runStateL :: s -> (s, a) }

-- | @since 4.0
instance Functor (StateL s) where
    fmap :: forall a b. (a -> b) -> StateL s a -> StateL s b
fmap a -> b
f (StateL s -> (s, a)
k) = (s -> (s, b)) -> StateL s b
forall s a. (s -> (s, a)) -> StateL s a
StateL ((s -> (s, b)) -> StateL s b) -> (s -> (s, b)) -> StateL s b
forall a b. (a -> b) -> a -> b
$ \ s
s -> let (s
s', a
v) = s -> (s, a)
k s
s in (s
s', a -> b
f a
v)

-- | @since 4.0
instance Applicative (StateL s) where
    pure :: forall a. a -> StateL s a
pure a
x = (s -> (s, a)) -> StateL s a
forall s a. (s -> (s, a)) -> StateL s a
StateL (\ s
s -> (s
s, a
x))
    StateL s -> (s, a -> b)
kf <*> :: forall a b. StateL s (a -> b) -> StateL s a -> StateL s b
<*> StateL s -> (s, a)
kv = (s -> (s, b)) -> StateL s b
forall s a. (s -> (s, a)) -> StateL s a
StateL ((s -> (s, b)) -> StateL s b) -> (s -> (s, b)) -> StateL s b
forall a b. (a -> b) -> a -> b
$ \ s
s ->
        let (s
s', a -> b
f) = s -> (s, a -> b)
kf s
s
            (s
s'', a
v) = s -> (s, a)
kv s
s'
        in (s
s'', a -> b
f a
v)
    liftA2 :: forall a b c.
(a -> b -> c) -> StateL s a -> StateL s b -> StateL s c
liftA2 a -> b -> c
f (StateL s -> (s, a)
kx) (StateL s -> (s, b)
ky) = (s -> (s, c)) -> StateL s c
forall s a. (s -> (s, a)) -> StateL s a
StateL ((s -> (s, c)) -> StateL s c) -> (s -> (s, c)) -> StateL s c
forall a b. (a -> b) -> a -> b
$ \s
s ->
        let (s
s', a
x) = s -> (s, a)
kx s
s
            (s
s'', b
y) = s -> (s, b)
ky s
s'
        in (s
s'', a -> b -> c
f a
x b
y)

-- right-to-left state-transforming monad
newtype StateR s a = StateR { forall s a. StateR s a -> s -> (s, a)
runStateR :: s -> (s, a) }

-- | @since 4.0
instance Functor (StateR s) where
    fmap :: forall a b. (a -> b) -> StateR s a -> StateR s b
fmap a -> b
f (StateR s -> (s, a)
k) = (s -> (s, b)) -> StateR s b
forall s a. (s -> (s, a)) -> StateR s a
StateR ((s -> (s, b)) -> StateR s b) -> (s -> (s, b)) -> StateR s b
forall a b. (a -> b) -> a -> b
$ \ s
s -> let (s
s', a
v) = s -> (s, a)
k s
s in (s
s', a -> b
f a
v)

-- | @since 4.0
instance Applicative (StateR s) where
    pure :: forall a. a -> StateR s a
pure a
x = (s -> (s, a)) -> StateR s a
forall s a. (s -> (s, a)) -> StateR s a
StateR (\ s
s -> (s
s, a
x))
    StateR s -> (s, a -> b)
kf <*> :: forall a b. StateR s (a -> b) -> StateR s a -> StateR s b
<*> StateR s -> (s, a)
kv = (s -> (s, b)) -> StateR s b
forall s a. (s -> (s, a)) -> StateR s a
StateR ((s -> (s, b)) -> StateR s b) -> (s -> (s, b)) -> StateR s b
forall a b. (a -> b) -> a -> b
$ \ s
s ->
        let (s
s', a
v) = s -> (s, a)
kv s
s
            (s
s'', a -> b
f) = s -> (s, a -> b)
kf s
s'
        in (s
s'', a -> b
f a
v)
    liftA2 :: forall a b c.
(a -> b -> c) -> StateR s a -> StateR s b -> StateR s c
liftA2 a -> b -> c
f (StateR s -> (s, a)
kx) (StateR s -> (s, b)
ky) = (s -> (s, c)) -> StateR s c
forall s a. (s -> (s, a)) -> StateR s a
StateR ((s -> (s, c)) -> StateR s c) -> (s -> (s, c)) -> StateR s c
forall a b. (a -> b) -> a -> b
$ \ s
s ->
        let (s
s', b
y) = s -> (s, b)
ky s
s
            (s
s'', a
x) = s -> (s, a)
kx s
s'
        in (s
s'', a -> b -> c
f a
x b
y)

-- See Note [Function coercion]
(#.) :: Coercible b c => (b -> c) -> (a -> b) -> (a -> c)
#. :: forall b c a. Coercible b c => (b -> c) -> (a -> b) -> a -> c
(#.) b -> c
_f = (a -> b) -> a -> c
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.
-}