Copyright | (C) 2008-2013 Edward Kmett |
---|---|
License | BSD-style (see the file LICENSE) |
Maintainer | Edward Kmett <ekmett@gmail.com> |
Stability | provisional |
Portability | portable |
Safe Haskell | Safe |
Language | Haskell2010 |
The store comonad holds a constant value along with a modifiable accessor function, which maps the stored value to the focus.
This module defines the strict store (aka state-in-context/costate) comonad transformer.
stored value = (1, 5)
, accessor = fst
, resulting focus = 1
:
>>>
:{
let storeTuple :: Store (Int, Int) Int storeTuple = store fst (1, 5) :}
Add something to the focus:
>>>
:{
let addToFocus :: Int -> Store (Int, Int) Int -> Int addToFocus x wa = x + extract wa :}
>>>
:{
let added3 :: Store (Int, Int) Int added3 = extend (addToFocus 3) storeTuple :}
The focus of added3 is now 1 + 3 = 4
. However, this action changed only
the accessor function and therefore the focus but not the stored value:
>>>
pos added3
(1,5)
>>>
extract added3
4
The strict store (state-in-context/costate) comonad transformer is subject to the laws:
x = seek (pos x) x y = pos (seek y x) seek y x = seek y (seek z x)
Thanks go to Russell O'Connor and Daniel Peebles for their help formulating and proving the laws for this comonad transformer.
Synopsis
- type Store s = StoreT s Identity
- store :: (s -> a) -> s -> Store s a
- runStore :: Store s a -> (s -> a, s)
- data StoreT s w a = StoreT (w (s -> a)) s
- runStoreT :: StoreT s w a -> (w (s -> a), s)
- pos :: StoreT s w a -> s
- seek :: s -> StoreT s w a -> StoreT s w a
- seeks :: (s -> s) -> StoreT s w a -> StoreT s w a
- peek :: Comonad w => s -> StoreT s w a -> a
- peeks :: Comonad w => (s -> s) -> StoreT s w a -> a
- experiment :: (Comonad w, Functor f) => (s -> f s) -> StoreT s w a -> f a
The Store comonad
store :: (s -> a) -> s -> Store s a Source #
Create a Store using an accessor function and a stored value
The Store comonad transformer
StoreT (w (s -> a)) s |
Instances
ComonadTraced m w => ComonadTraced m (StoreT s w) Source # | |
Defined in Control.Comonad.Traced.Class | |
Comonad w => ComonadStore s (StoreT s w) Source # | |
Defined in Control.Comonad.Store.Class | |
ComonadEnv e w => ComonadEnv e (StoreT t w) Source # | |
Defined in Control.Comonad.Env.Class | |
ComonadHoist (StoreT s) Source # | |
ComonadTrans (StoreT s) Source # | |
Functor w => Functor (StoreT s w) Source # | |
(Applicative w, Monoid s) => Applicative (StoreT s w) Source # | |
Defined in Control.Comonad.Trans.Store | |
(ComonadApply w, Semigroup s) => ComonadApply (StoreT s w) Source # | |
Comonad w => Comonad (StoreT s w) Source # | |
Operations
seek :: s -> StoreT s w a -> StoreT s w a Source #
Set the stored value
>>>
pos . seek (3,7) $ store fst (1,5)
(3,7)
Seek satisfies the law
seek s = peek s . duplicate
seeks :: (s -> s) -> StoreT s w a -> StoreT s w a Source #
Modify the stored value
>>>
pos . seeks swap $ store fst (1,5)
(5,1)
Seeks satisfies the law
seeks f = peeks f . duplicate
peek :: Comonad w => s -> StoreT s w a -> a Source #
Peek at what the current focus would be for a different stored value
Peek satisfies the law
peek x . extend (peek y) = peek y
peeks :: Comonad w => (s -> s) -> StoreT s w a -> a Source #
Peek at what the current focus would be if the stored value was modified by some function
experiment :: (Comonad w, Functor f) => (s -> f s) -> StoreT s w a -> f a Source #
Applies a functor-valued function to the stored value, and then uses the new accessor to read the resulting focus.
>>>
let f x = if x > 0 then Just (x^2) else Nothing
>>>
experiment f $ store (+1) 2
Just 5>>>
experiment f $ store (+1) (-2)
Nothing