module Data.Lens.Common
( Lens(..)
, lens
, iso
, getL
, setL
, modL
, mergeL
, (^$), (^$!)
, (^.), (^!)
, (^=), (^!=)
, (^%=), (^!%=)
, (^%%=)
, (^+=), (^!+=)
, (^-=), (^!-=)
, (^*=), (^!*=)
, (^/=), (^!/=)
, fstLens
, sndLens
, mapLens
, intMapLens
, setLens
, intSetLens
) where
import Control.Applicative
import Control.Comonad.Trans.Store
import Control.Category
import Control.Category.Product
import Data.Functor.Identity
import Data.Functor.Apply
import Data.Semigroupoid
import Prelude hiding ((.), id)
import Data.IntMap (IntMap)
import qualified Data.Map as Map
import Data.Set (Set)
import qualified Data.IntMap as IntMap
import Data.Map (Map)
import qualified Data.Set as Set
import Data.IntSet (IntSet)
import qualified Data.IntSet as IntSet
newtype Lens a b = Lens { runLens :: a -> Store b a }
instance Semigroupoid Lens where
Lens f `o` Lens g = Lens $ \a -> case g a of
StoreT wba b -> case f b of
StoreT wcb c -> StoreT ((.) <$> wba <.> wcb) c
instance Category Lens where
id = Lens $ StoreT (pure id)
Lens f . Lens g = Lens $ \a -> case g a of
StoreT wba b -> case f b of
StoreT wcb c -> StoreT ((.) <$> wba <*> wcb) c
lens :: (a -> b) -> (b -> a -> a) -> Lens a b
lens get set = Lens $ \a -> store (`set` a) (get a)
iso :: (a -> b) -> (b -> a) -> Lens a b
iso f g = Lens (store g . f)
getL :: Lens a b -> a -> b
getL (Lens f) a = pos (f a)
infixr 0 ^$, ^$!
(^$), (^$!) :: Lens a b -> a -> b
(^$) = getL
Lens f ^$! a = pos (f $! a)
infixl 9 ^., ^!
(^.), (^!) :: a -> Lens a b -> b
a ^. Lens f = pos (f a)
a ^! Lens f = pos (f $! a)
setL :: Lens a b -> b -> a -> a
setL (Lens f) b = peek b . f
infixr 4 ^=, ^!=
(^=), (^!=) :: Lens a b -> b -> a -> a
(^=) = setL
Lens f ^!= b = \a -> case f a of
StoreT (Identity g) _ -> g $! b
modL :: Lens a b -> (b -> b) -> a -> a
modL (Lens f) g = peeks g . f
mergeL :: Lens a c -> Lens b c -> Lens (Either a b) c
Lens f `mergeL` Lens g =
Lens $ either (\a -> Left <$> f a) (\b -> Right <$> g b)
infixr 4 ^%=, ^!%=
(^%=), (^!%=) :: Lens a b -> (b -> b) -> a -> a
(^%=) = modL
Lens f ^!%= g = \a -> case f a of
StoreT (Identity h) b -> h $! g b
infixr 4 ^%%=
(^%%=) :: Functor f => Lens a b -> (b -> f b) -> a -> f a
Lens f ^%%= g = \a -> case f a of
StoreT (Identity h) b -> h <$> g b
infixr 4 ^+=, ^!+=, ^-=, ^!-=, ^*=, ^!*=
(^+=), (^!+=), (^-=), (^!-=), (^*=), (^!*=) :: Num b => Lens a b -> b -> a -> a
l ^+= n = l ^%= (+ n)
l ^-= n = l ^%= subtract n
l ^*= n = l ^%= (* n)
l ^!+= n = l ^!%= (+ n)
l ^!-= n = l ^!%= subtract n
l ^!*= n = l ^!%= (* n)
infixr 4 ^/=, ^!/=
(^/=), (^!/=) :: Fractional b => Lens a b -> b -> a -> a
l ^/= r = l ^%= (/ r)
l ^!/= r = l ^!%= (/ r)
fstLens :: Lens (a,b) a
fstLens = Lens $ \(a,b) -> store (\ a' -> (a', b)) a
sndLens :: Lens (a,b) b
sndLens = Lens $ \(a,b) -> store (\ b' -> (a, b')) b
mapLens :: Ord k => k -> Lens (Map k v) (Maybe v)
mapLens k = Lens $ \m -> store (\mv -> case mv of
Nothing -> Map.delete k m
Just v' -> Map.insert k v' m
) (Map.lookup k m)
intMapLens :: Int -> Lens (IntMap v) (Maybe v)
intMapLens k = Lens $ \m -> store (\mv -> case mv of
Nothing -> IntMap.delete k m
Just v' -> IntMap.insert k v' m
) (IntMap.lookup k m)
setLens :: Ord k => k -> Lens (Set k) Bool
setLens k = Lens $ \m -> store (\mv ->
if mv then Set.insert k m else Set.delete k m
) (Set.member k m)
intSetLens :: Int -> Lens IntSet Bool
intSetLens k = Lens $ \m -> store (\mv ->
if mv then IntSet.insert k m else IntSet.delete k m
) (IntSet.member k m)
instance Tensor Lens where
Lens f *** Lens g =
Lens $ \(a, c) ->
let x = f a
y = g c
in store (\(b, d) -> (peek b x, peek d y)) (pos x, pos y)