{-# LANGUAGE CPP #-}
{-# LANGUAGE DataKinds #-}
{-# LANGUAGE GADTs #-}
{-# LANGUAGE MultiParamTypeClasses #-}
{-# LANGUAGE RankNTypes #-}
{-# OPTIONS_GHC -fno-warn-orphans #-}
module Data.Vec.Pull.Lens (
ix,
_Cons,
_head,
_tail,
_Vec,
) where
import Control.Lens ((<&>))
import Data.Fin (Fin (..))
import Data.Nat (Nat (..))
import qualified Control.Lens as L
import qualified Data.Type.Nat as N
import Data.Vec.Pull
ix :: Fin n -> L.Lens' (Vec n a) a
ix :: Fin n -> Lens' (Vec n a) a
ix Fin n
i a -> f a
f (Vec Fin n -> a
v) = a -> f a
f (Fin n -> a
v Fin n
i) f a -> (a -> Vec n a) -> f (Vec n a)
forall (f :: * -> *) a b. Functor f => f a -> (a -> b) -> f b
<&> \a
a -> (Fin n -> a) -> Vec n a
forall (n :: Nat) a. (Fin n -> a) -> Vec n a
Vec ((Fin n -> a) -> Vec n a) -> (Fin n -> a) -> Vec n a
forall a b. (a -> b) -> a -> b
$ \Fin n
j ->
if Fin n
i Fin n -> Fin n -> Bool
forall a. Eq a => a -> a -> Bool
== Fin n
j
then a
a
else Fin n -> a
v Fin n
j
_Cons :: L.Iso (Vec ('S n) a) (Vec ('S n) b) (a, Vec n a) (b, Vec n b)
_Cons :: p (a, Vec n a) (f (b, Vec n b))
-> p (Vec ('S n) a) (f (Vec ('S n) b))
_Cons = (Vec ('S n) a -> (a, Vec n a))
-> ((b, Vec n b) -> Vec ('S n) b)
-> Iso (Vec ('S n) a) (Vec ('S n) b) (a, Vec n a) (b, Vec n b)
forall s a b t. (s -> a) -> (b -> t) -> Iso s t a b
L.iso (\(Vec Fin ('S n) -> a
v) -> (Fin ('S n) -> a
v Fin ('S n)
forall (n1 :: Nat). Fin ('S n1)
FZ, (Fin n -> a) -> Vec n a
forall (n :: Nat) a. (Fin n -> a) -> Vec n a
Vec (Fin ('S n) -> a
v (Fin ('S n) -> a) -> (Fin n -> Fin ('S n)) -> Fin n -> a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Fin n -> Fin ('S n)
forall (n1 :: Nat). Fin n1 -> Fin ('S n1)
FS))) (\(b
x, Vec n b
xs) -> b -> Vec n b -> Vec ('S n) b
forall a (n :: Nat). a -> Vec n a -> Vec ('S n) a
cons b
x Vec n b
xs)
_head :: L.Lens' (Vec ('S n) a) a
_head :: (a -> f a) -> Vec ('S n) a -> f (Vec ('S n) a)
_head a -> f a
f (Vec Fin ('S n) -> a
v) = a -> f a
f (Fin ('S n) -> a
v Fin ('S n)
forall (n1 :: Nat). Fin ('S n1)
FZ) f a -> (a -> Vec ('S n) a) -> f (Vec ('S n) a)
forall (f :: * -> *) a b. Functor f => f a -> (a -> b) -> f b
<&> \a
a -> (Fin ('S n) -> a) -> Vec ('S n) a
forall (n :: Nat) a. (Fin n -> a) -> Vec n a
Vec ((Fin ('S n) -> a) -> Vec ('S n) a)
-> (Fin ('S n) -> a) -> Vec ('S n) a
forall a b. (a -> b) -> a -> b
$ \Fin ('S n)
j -> case Fin ('S n)
j of
Fin ('S n)
FZ -> a
a
Fin ('S n)
_ -> Fin ('S n) -> a
v Fin ('S n)
j
{-# INLINE _head #-}
_tail :: L.Lens' (Vec ('S n) a) (Vec n a)
_tail :: (Vec n a -> f (Vec n a)) -> Vec ('S n) a -> f (Vec ('S n) a)
_tail Vec n a -> f (Vec n a)
f (Vec Fin ('S n) -> a
v) = Vec n a -> f (Vec n a)
f ((Fin n -> a) -> Vec n a
forall (n :: Nat) a. (Fin n -> a) -> Vec n a
Vec (Fin ('S n) -> a
v (Fin ('S n) -> a) -> (Fin n -> Fin ('S n)) -> Fin n -> a
forall b c a. (b -> c) -> (a -> b) -> a -> c
. Fin n -> Fin ('S n)
forall (n1 :: Nat). Fin n1 -> Fin ('S n1)
FS)) f (Vec n a) -> (Vec n a -> Vec ('S n) a) -> f (Vec ('S n) a)
forall (f :: * -> *) a b. Functor f => f a -> (a -> b) -> f b
<&> \Vec n a
xs -> a -> Vec n a -> Vec ('S n) a
forall a (n :: Nat). a -> Vec n a -> Vec ('S n) a
cons (Fin ('S n) -> a
v Fin ('S n)
forall (n1 :: Nat). Fin ('S n1)
FZ) Vec n a
xs
{-# INLINE _tail #-}
_Vec :: N.SNatI n => L.Prism' [a] (Vec n a)
_Vec :: Prism' [a] (Vec n a)
_Vec = (Vec n a -> [a])
-> ([a] -> Maybe (Vec n a)) -> Prism' [a] (Vec n a)
forall b s a. (b -> s) -> (s -> Maybe a) -> Prism s s a b
L.prism' Vec n a -> [a]
forall (n :: Nat) a. SNatI n => Vec n a -> [a]
toList [a] -> Maybe (Vec n a)
forall (n :: Nat) a. SNatI n => [a] -> Maybe (Vec n a)
fromList
#if !MIN_VERSION_lens(5,0,0)
instance L.FunctorWithIndex (Fin n) (Vec n) where
imap = imap
instance N.SNatI n => L.FoldableWithIndex (Fin n) (Vec n) where
ifoldMap = ifoldMap
ifoldr = ifoldr
#endif