module Pandora.Paradigm.Primary.Functor.These where

import Pandora.Pattern.Category (($), (#))
import Pandora.Pattern.Functor.Covariant (Covariant ((<$>)), Covariant_ ((-<$>-)))
import Pandora.Pattern.Functor.Pointable (Pointable (point), Pointable_ (point_))
import Pandora.Pattern.Functor.Traversable (Traversable ((->>)))
import Pandora.Pattern.Object.Semigroup (Semigroup ((+)))
import Pandora.Paradigm.Primary.Functor.Function ()

data These e a = This a | That e | These e a

instance Covariant (These e) where
	a -> b
f <$> :: (a -> b) -> These e a -> These e b
<$> This a
x = b -> These e b
forall e a. a -> These e a
This (b -> These e b) -> b -> These e b
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
$ a -> b
f a
x
	a -> b
_ <$> That e
y = e -> These e b
forall e a. e -> These e a
That e
y
	a -> b
f <$> These e
y a
x = e -> b -> These e b
forall e a. e -> a -> These e a
These e
y (b -> These e b) -> b -> These e b
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
$ a -> b
f a
x

instance Covariant_ (These e) (->) (->) where
	a -> b
f -<$>- :: (a -> b) -> These e a -> These e b
-<$>- This a
x = b -> These e b
forall e a. a -> These e a
This (b -> These e b) -> b -> These e b
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
$ a -> b
f a
x
	a -> b
_ -<$>- That e
y = e -> These e b
forall e a. e -> These e a
That e
y
	a -> b
f -<$>- These e
y a
x = e -> b -> These e b
forall e a. e -> a -> These e a
These e
y (b -> These e b) -> b -> These e b
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
$ a -> b
f a
x

instance Pointable (These e) (->) where
	point :: a -> These e a
point = a -> These e a
forall e a. a -> These e a
This

instance Pointable_ (These e) (->) where
	point_ :: a -> These e a
point_ = a -> These e a
forall e a. a -> These e a
This

instance Traversable (These e) where
	This a
x ->> :: These e a -> (a -> u b) -> (u :. These e) := b
->> a -> u b
f = b -> These e b
forall e a. a -> These e a
This (b -> These e b) -> u b -> (u :. These e) := b
forall (t :: * -> *) a b. Covariant t => (a -> b) -> t a -> t b
<$> a -> u b
f a
x
	That e
y ->> a -> u b
_ = These e b -> (u :. These e) := b
forall (t :: * -> *) (source :: * -> * -> *) a.
Pointable t source =>
source a (t a)
point (These e b -> (u :. These e) := b)
-> These e b -> (u :. These e) := b
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
$ e -> These e b
forall e a. e -> These e a
That e
y
	These e
y a
x ->> a -> u b
f = e -> b -> These e b
forall e a. e -> a -> These e a
These e
y (b -> These e b) -> u b -> (u :. These e) := b
forall (t :: * -> *) a b. Covariant t => (a -> b) -> t a -> t b
<$> a -> u b
f a
x

instance (Semigroup e, Semigroup a) => Semigroup (These e a) where
	This a
x + :: These e a -> These e a -> These e a
+ This a
x' = a -> These e a
forall e a. a -> These e a
This (a -> These e a) -> a -> These e a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
# a
x a -> a -> a
forall a. Semigroup a => a -> a -> a
+ a
x'
	This a
x + That e
y = e -> a -> These e a
forall e a. e -> a -> These e a
These e
y a
x
	This a
x + These e
y a
x' = e -> a -> These e a
forall e a. e -> a -> These e a
These e
y (a -> These e a) -> a -> These e a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
# a
x a -> a -> a
forall a. Semigroup a => a -> a -> a
+ a
x'
	That e
y + This a
x' = e -> a -> These e a
forall e a. e -> a -> These e a
These e
y a
x'
	That e
y + That e
y' = e -> These e a
forall e a. e -> These e a
That (e -> These e a) -> e -> These e a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
# e
y e -> e -> e
forall a. Semigroup a => a -> a -> a
+ e
y'
	That e
y + These e
y' a
x = e -> a -> These e a
forall e a. e -> a -> These e a
These (e -> a -> These e a) -> e -> a -> These e a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
# e
y e -> e -> e
forall a. Semigroup a => a -> a -> a
+ e
y' (a -> These e a) -> a -> These e a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
# a
x
	These e
y a
x + This a
x' = e -> a -> These e a
forall e a. e -> a -> These e a
These e
y (a -> These e a) -> a -> These e a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
# a
x a -> a -> a
forall a. Semigroup a => a -> a -> a
+ a
x'
	These e
y a
x + That e
y' = e -> a -> These e a
forall e a. e -> a -> These e a
These (e -> a -> These e a) -> e -> a -> These e a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
# e
y e -> e -> e
forall a. Semigroup a => a -> a -> a
+ e
y' (a -> These e a) -> a -> These e a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
# a
x
	These e
y a
x + These e
y' a
x' = e -> a -> These e a
forall e a. e -> a -> These e a
These (e -> a -> These e a) -> e -> a -> These e a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
# e
y e -> e -> e
forall a. Semigroup a => a -> a -> a
+ e
y' (a -> These e a) -> a -> These e a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
# a
x a -> a -> a
forall a. Semigroup a => a -> a -> a
+ a
x'

these :: (a -> r) -> (e -> r) -> (e -> a -> r) -> These e a -> r
these :: (a -> r) -> (e -> r) -> (e -> a -> r) -> These e a -> r
these a -> r
f e -> r
_ e -> a -> r
_ (This a
x) = a -> r
f a
x
these a -> r
_ e -> r
g e -> a -> r
_ (That e
y) = e -> r
g e
y
these a -> r
_ e -> r
_ e -> a -> r
h (These e
y a
x) = e -> a -> r
h e
y a
x