{-# LANGUAGE UndecidableInstances #-}
module Pandora.Paradigm.Primary.Transformer.Reverse where

import Pandora.Pattern.Semigroupoid ((.))
import Pandora.Pattern.Category ((<--), (<---), (<----), (<-----))
import Pandora.Pattern.Functor.Covariant (Covariant ((<-|-)))
import Pandora.Pattern.Functor.Contravariant (Contravariant ((>-|-)))
import Pandora.Pattern.Functor.Semimonoidal (Semimonoidal (mult))
import Pandora.Pattern.Functor.Monoidal (Monoidal (unit))
import Pandora.Pattern.Functor.Traversable (Traversable ((<-/-), (<-/--)))
import Pandora.Pattern.Functor.Distributive (Distributive ((-<<), (--<<)))
import Pandora.Pattern.Transformer.Liftable (Liftable (lift))
import Pandora.Pattern.Transformer.Lowerable (Lowerable (lower))
import Pandora.Pattern.Transformer.Hoistable (Hoistable ((/|\)))
import Pandora.Paradigm.Primary.Transformer.Backwards (Backwards (Backwards))
import Pandora.Paradigm.Algebraic.Exponential (type (<--), type (-->))
import Pandora.Paradigm.Algebraic.Product ((:*:) ((:*:)))
import Pandora.Paradigm.Algebraic.Sum ((:+:))
import Pandora.Paradigm.Algebraic.One (One (One))
import Pandora.Paradigm.Algebraic (point, extract, empty, (<-||-))
import Pandora.Pattern.Morphism.Flip (Flip (Flip))
import Pandora.Pattern.Morphism.Straight (Straight (Straight))
import Pandora.Core.Interpreted (Interpreted (Primary, run, unite, (<~), (<~~~)))

newtype Reverse t a = Reverse (t a)

instance Covariant (->) (->) t => Covariant (->) (->) (Reverse t) where
	a -> b
f <-|- :: (a -> b) -> Reverse t a -> Reverse t b
<-|- Reverse t a
x = t b -> Reverse t b
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse (t b -> Reverse t b) -> t b -> Reverse t b
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<---- a -> b
f (a -> b) -> t a -> t b
forall (source :: * -> * -> *) (target :: * -> * -> *)
       (t :: * -> *) a b.
Covariant source target t =>
source a b -> target (t a) (t b)
<-|- t a
x

instance (Semimonoidal (-->) (:*:) (:*:) t, Covariant (->) (->) t) => Semimonoidal (-->) (:*:) (:*:) (Reverse t) where
	mult :: (Reverse t a :*: Reverse t b) --> Reverse t (a :*: b)
mult = ((Reverse t a :*: Reverse t b) -> Reverse t (a :*: b))
-> (Reverse t a :*: Reverse t b) --> Reverse t (a :*: b)
forall (v :: * -> * -> *) a e. v a e -> Straight v a e
Straight (((Reverse t a :*: Reverse t b) -> Reverse t (a :*: b))
 -> (Reverse t a :*: Reverse t b) --> Reverse t (a :*: b))
-> ((Reverse t a :*: Reverse t b) -> Reverse t (a :*: b))
-> (Reverse t a :*: Reverse t b) --> Reverse t (a :*: b)
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<-- \(Reverse t a
x :*: Reverse t b
y) -> t (a :*: b) -> Reverse t (a :*: b)
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse (t (a :*: b) -> Reverse t (a :*: b))
-> t (a :*: b) -> Reverse t (a :*: b)
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<---- forall k (p :: * -> * -> *) (source :: * -> * -> *)
       (target :: k -> k -> k) (t :: k -> *) (a :: k) (b :: k).
Semimonoidal p source target t =>
p (source (t a) (t b)) (t (target a b))
forall (source :: * -> * -> *) (target :: * -> * -> *)
       (t :: * -> *) a b.
Semimonoidal (-->) source target t =>
source (t a) (t b) --> t (target a b)
mult @(-->) ((t a :*: t b) --> t (a :*: b)) -> (t a :*: t b) -> t (a :*: b)
forall (m :: * -> * -> *) (t :: * -> *) a.
Interpreted m t =>
(m < t a) < Primary t a
<~~~ t a
x t a -> t b -> t a :*: t b
forall s a. s -> a -> s :*: a
:*: t b
y

instance (Covariant (->) (->) t, Monoidal (-->) (-->) (:*:) (:*:) t) => Monoidal (-->) (-->) (:*:) (:*:) (Reverse t) where
	unit :: Proxy (:*:) -> (Unit (:*:) --> a) --> Reverse t a
unit Proxy (:*:)
_ = (Straight (->) One a -> Reverse t a)
-> Straight (->) (Straight (->) One a) (Reverse t a)
forall (v :: * -> * -> *) a e. v a e -> Straight v a e
Straight ((Straight (->) One a -> Reverse t a)
 -> Straight (->) (Straight (->) One a) (Reverse t a))
-> (Straight (->) One a -> Reverse t a)
-> Straight (->) (Straight (->) One a) (Reverse t a)
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<-- t a -> Reverse t a
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse (t a -> Reverse t a)
-> (Straight (->) One a -> t a)
-> Straight (->) One a
-> Reverse t a
forall (m :: * -> * -> *) b c a.
Semigroupoid m =>
m b c -> m a b -> m a c
. a -> t a
forall (t :: * -> *) a. Pointable t => a -> t a
point (a -> t a)
-> (Straight (->) One a -> a) -> Straight (->) One a -> t a
forall (m :: * -> * -> *) b c a.
Semigroupoid m =>
m b c -> m a b -> m a c
. (Straight (->) One a -> One -> a
forall (m :: * -> * -> *) (t :: * -> *) a.
Interpreted m t =>
(m < t a) < Primary t a
<~ One
One)

instance (Semimonoidal (<--) (:*:) (:*:) t, Covariant (->) (->) t) => Semimonoidal (<--) (:*:) (:*:) (Reverse t) where
	mult :: (Reverse t a :*: Reverse t b) <-- Reverse t (a :*: b)
mult = (Reverse t (a :*: b) -> Reverse t a :*: Reverse t b)
-> (Reverse t a :*: Reverse t b) <-- Reverse t (a :*: b)
forall (v :: * -> * -> *) a e. v e a -> Flip v a e
Flip ((Reverse t (a :*: b) -> Reverse t a :*: Reverse t b)
 -> (Reverse t a :*: Reverse t b) <-- Reverse t (a :*: b))
-> (Reverse t (a :*: b) -> Reverse t a :*: Reverse t b)
-> (Reverse t a :*: Reverse t b) <-- Reverse t (a :*: b)
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<-- (t a -> Reverse t a
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse (t a -> Reverse t a)
-> (t a :*: Reverse t b) -> Reverse t a :*: Reverse t b
forall (m :: * -> * -> *) (p :: * -> * -> *) a b c.
(Covariant m m (Flip p c), Interpreted m (Flip p c)) =>
m a b -> m (p a c) (p b c)
<-||-) ((t a :*: Reverse t b) -> Reverse t a :*: Reverse t b)
-> (Reverse t (a :*: b) -> t a :*: Reverse t b)
-> Reverse t (a :*: b)
-> Reverse t a :*: Reverse t b
forall (m :: * -> * -> *) b c a.
Semigroupoid m =>
m b c -> m a b -> m a c
. (t b -> Reverse t b
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse (t b -> Reverse t b) -> (t a :*: t b) -> t a :*: Reverse t b
forall (source :: * -> * -> *) (target :: * -> * -> *)
       (t :: * -> *) a b.
Covariant source target t =>
source a b -> target (t a) (t b)
<-|-) ((t a :*: t b) -> t a :*: Reverse t b)
-> (Reverse t (a :*: b) -> t a :*: t b)
-> Reverse t (a :*: b)
-> t a :*: Reverse t b
forall (m :: * -> * -> *) b c a.
Semigroupoid m =>
m b c -> m a b -> m a c
. (forall k (p :: * -> * -> *) (source :: * -> * -> *)
       (target :: k -> k -> k) (t :: k -> *) (a :: k) (b :: k).
Semimonoidal p source target t =>
p (source (t a) (t b)) (t (target a b))
forall (source :: * -> * -> *) (target :: * -> * -> *)
       (t :: * -> *) a b.
Semimonoidal (<--) source target t =>
source (t a) (t b) <-- t (target a b)
mult @(<--) ((t a :*: t b) <-- t (a :*: b)) -> t (a :*: b) -> t a :*: t b
forall (m :: * -> * -> *) (t :: * -> *) a.
Interpreted m t =>
(m < t a) < Primary t a
<~) (t (a :*: b) -> t a :*: t b)
-> (Reverse t (a :*: b) -> t (a :*: b))
-> Reverse t (a :*: b)
-> t a :*: t b
forall (m :: * -> * -> *) b c a.
Semigroupoid m =>
m b c -> m a b -> m a c
. Reverse t (a :*: b) -> t (a :*: b)
forall (m :: * -> * -> *) (t :: * -> *) a.
Interpreted m t =>
(m < t a) < Primary t a
run

instance (Covariant (->) (->) t, Monoidal (<--) (-->) (:*:) (:*:) t) => Monoidal (<--) (-->) (:*:) (:*:) (Reverse t) where
	unit :: Proxy (:*:) -> (Unit (:*:) --> a) <-- Reverse t a
unit Proxy (:*:)
_ = (Reverse t a -> Straight (->) One a)
-> Flip (->) (Straight (->) One a) (Reverse t a)
forall (v :: * -> * -> *) a e. v e a -> Flip v a e
Flip ((Reverse t a -> Straight (->) One a)
 -> Flip (->) (Straight (->) One a) (Reverse t a))
-> (Reverse t a -> Straight (->) One a)
-> Flip (->) (Straight (->) One a) (Reverse t a)
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<-- \(Reverse t a
x) -> (One -> a) -> Straight (->) One a
forall (v :: * -> * -> *) a e. v a e -> Straight v a e
Straight (\One
_ -> t a -> a
forall (t :: * -> *) a. Extractable t => t a -> a
extract t a
x)

instance (Semimonoidal (-->) (:*:) (:+:) t, Covariant (->) (->) t) => Semimonoidal (-->) (:*:) (:+:) (Reverse t) where
	mult :: (Reverse t a :*: Reverse t b) --> Reverse t (a :+: b)
mult = ((Reverse t a :*: Reverse t b) -> Reverse t (a :+: b))
-> (Reverse t a :*: Reverse t b) --> Reverse t (a :+: b)
forall (v :: * -> * -> *) a e. v a e -> Straight v a e
Straight (((Reverse t a :*: Reverse t b) -> Reverse t (a :+: b))
 -> (Reverse t a :*: Reverse t b) --> Reverse t (a :+: b))
-> ((Reverse t a :*: Reverse t b) -> Reverse t (a :+: b))
-> (Reverse t a :*: Reverse t b) --> Reverse t (a :+: b)
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<-- \(Reverse t a
x :*: Reverse t b
y) -> t (a :+: b) -> Reverse t (a :+: b)
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse (t (a :+: b) -> Reverse t (a :+: b))
-> t (a :+: b) -> Reverse t (a :+: b)
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<---- forall k (p :: * -> * -> *) (source :: * -> * -> *)
       (target :: k -> k -> k) (t :: k -> *) (a :: k) (b :: k).
Semimonoidal p source target t =>
p (source (t a) (t b)) (t (target a b))
forall (t :: * -> *) a b.
Semimonoidal (-->) (:*:) (:+:) t =>
(t a :*: t b) --> t (a :+: b)
mult @(-->)  @(:*:) @(:+:) ((t a :*: t b) --> t (a :+: b)) -> (t a :*: t b) -> t (a :+: b)
forall (m :: * -> * -> *) (t :: * -> *) a.
Interpreted m t =>
(m < t a) < Primary t a
<~~~ t a
x t a -> t b -> t a :*: t b
forall s a. s -> a -> s :*: a
:*: t b
y

instance (Covariant (->) (->) t, Monoidal (-->) (-->) (:*:) (:+:) t) => Monoidal (-->) (-->) (:*:) (:+:) (Reverse t) where
	unit :: Proxy (:*:) -> (Unit (:+:) --> a) --> Reverse t a
unit Proxy (:*:)
_ = ((Zero --> a) -> Reverse t a)
-> Straight (->) (Zero --> a) (Reverse t a)
forall (v :: * -> * -> *) a e. v a e -> Straight v a e
Straight (((Zero --> a) -> Reverse t a)
 -> Straight (->) (Zero --> a) (Reverse t a))
-> ((Zero --> a) -> Reverse t a)
-> Straight (->) (Zero --> a) (Reverse t a)
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<-- \Zero --> a
_ -> t a -> Reverse t a
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse t a
forall (t :: * -> *) a. Emptiable t => t a
empty

instance Traversable (->) (->) t => Traversable (->) (->) (Reverse t) where
	a -> u b
f <-/- :: (a -> u b) -> Reverse t a -> u (Reverse t b)
<-/- Reverse t a
x = t b -> Reverse t b
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse (t b -> Reverse t b) -> u (t b) -> u (Reverse t b)
forall (source :: * -> * -> *) (target :: * -> * -> *)
       (t :: * -> *) a b.
Covariant source target t =>
source a b -> target (t a) (t b)
<-|- Backwards u (t b) -> u (t b)
forall (m :: * -> * -> *) (t :: * -> *) a.
Interpreted m t =>
(m < t a) < Primary t a
run (u b -> Backwards u b
forall k (t :: k -> *) (a :: k). t a -> Backwards t a
Backwards (u b -> Backwards u b) -> (a -> u b) -> a -> Backwards u b
forall (m :: * -> * -> *) b c a.
Semigroupoid m =>
m b c -> m a b -> m a c
. a -> u b
f (a -> Backwards u b) -> t a -> Backwards u (t b)
forall (source :: * -> * -> *) (target :: * -> * -> *)
       (t :: * -> *) (u :: * -> *) a b.
(Traversable source target t, Covariant source target u,
 Monoidal (Straight source) (Straight target) (:*:) (:*:) u) =>
source a (u b) -> target (t a) (u (t b))
<-/-- t a
x)

instance Distributive (->) (->) t => Distributive (->) (->) (Reverse t) where
	a -> Reverse t b
f -<< :: (a -> Reverse t b) -> u a -> Reverse t (u b)
-<< u a
x = t (u b) -> Reverse t (u b)
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse (t (u b) -> Reverse t (u b)) -> t (u b) -> Reverse t (u b)
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<--- Reverse t b -> t b
forall (m :: * -> * -> *) (t :: * -> *) a.
Interpreted m t =>
(m < t a) < Primary t a
run (Reverse t b -> t b) -> (a -> Reverse t b) -> a -> t b
forall (m :: * -> * -> *) b c a.
Semigroupoid m =>
m b c -> m a b -> m a c
. a -> Reverse t b
f (a -> t b) -> u a -> t (u b)
forall (source :: * -> * -> *) (target :: * -> * -> *)
       (t :: * -> *) (u :: * -> *) a b.
(Distributive source target t, Covariant source target u) =>
source a (t b) -> target (u a) (t (u b))
-<< u a
x

instance Contravariant (->) (->) t => Contravariant (->) (->) (Reverse t) where
	a -> b
f >-|- :: (a -> b) -> Reverse t b -> Reverse t a
>-|- Reverse t b
x = t a -> Reverse t a
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse (t a -> Reverse t a) -> t a -> Reverse t a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<---- a -> b
f (a -> b) -> t b -> t a
forall (source :: * -> * -> *) (target :: * -> * -> *)
       (t :: * -> *) a b.
Contravariant source target t =>
source a b -> target (t b) (t a)
>-|- t b
x

instance Interpreted (->) (Reverse t) where
	type Primary (Reverse t) a = t a
	run :: ((->) < Reverse t a) < Primary (Reverse t) a
run ~(Reverse t a
x) = t a
Primary (Reverse t) a
x
	unite :: ((->) < Primary (Reverse t) a) < Reverse t a
unite = ((->) < Primary (Reverse t) a) < Reverse t a
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse

instance Liftable (->) Reverse where
	lift :: u a -> Reverse u a
lift = u a -> Reverse u a
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse

instance Lowerable (->) Reverse where
	lower :: Reverse u a -> u a
lower = Reverse u a -> u a
forall (m :: * -> * -> *) (t :: * -> *) a.
Interpreted m t =>
(m < t a) < Primary t a
run

instance Hoistable (->) Reverse where
	forall a. u a -> v a
f /|\ :: (forall a. u a -> v a) -> forall a. Reverse u a -> Reverse v a
/|\ Reverse u a
x = v a -> Reverse v a
forall k (t :: k -> *) (a :: k). t a -> Reverse t a
Reverse (v a -> Reverse v a) -> v a -> Reverse v a
forall (m :: * -> * -> *) a b. Category m => m (m a b) (m a b)
<-- u a -> v a
forall a. u a -> v a
f u a
x