Logistic is to setters as Distributive is to getters
Distributive functors are containers where getters can be enumerated as their own types.
This is the definition of the Distributive class:
class Functor g => Distributive g where
distribute :: Functor f => f (g a) -> g (f a)
One easy-to-understand instance is Complex.
data Complex a = !a :+ !a
realPart :: Complex a -> a
realPart (x :+ _) = x
imagPart :: Complex a -> a
imagPart (_ :+ y) = y
instance Distributive Complex where
distribute wc = fmap realPart wc :+ fmap imagPart wc
Given any functor-wrapped value, distribute fmaps the getters of Complex to it.
distribute id instantiates it as the function ((->) r) functor. In this case, distribute id is equal to realPart :+ imagPart.
However, we cannot modify the elements this way because distribute passes getters but not setters.
Here we introduce a new Logistic class to provide settability to containers:
class Functor t => Logistic t where
deliver :: Contravariant f => f (t a -> t a) -> t (f (a -> a))
While the type of deliver is slightly more intimidating, it’s actually very close to the distribute;
the Functor constraint is Contravariant instead and the contents are endomorphisms.
Here’s the instance for Complex. deliver f contramaps a setter function to f for each field:
instance Logistic Complex where
deliver f
= contramap (\g (a :+ b) -> g a :+ b) f
:+ contramap (\g (a :+ b) -> a :+ g b) f
Instantiating the Op contravariant functor, it is trivial to obtain a collection of setters.
newtype Op a b = Op { getOp :: b -> a }
setters :: Logistic t => t ((a -> a) -> t a -> t a)
setters = getOp <$> deliver (Op id)
ghci> let setR :+ setI = setters
ghci> setR (+1) (0 :+ 1)
1 :+ 1
ghci> setI (+1) (0 :+ 1)
0 :+ 2
deliver has a generic default implementation which works for any single-constructor products.
This class can be useful to complement Distributive. Generalisation to higher-kinded data would also be interesting.
