I am working through the 20 Intermediate Haskell Exercises at the moment, which is quite a fun exercise. It involves implementing various instances of the typeclasses
Monad (and functions that takes
Monads as arguments) but with cute names like
Misty to disguise what we're doing (makes for some interesting code).
I've been trying to do some of this in a point-free style, and I wondered if there's a general scheme for turning a point-ful (?) definition into a point-free definition. For example, here is the typeclass for
class Misty m where unicorn :: a -> m a banana :: (a -> m b) -> m a -> m b
>>=, in case it's not obvious) and here's my implementation of
apple (equivalent to
apple :: (Misty m) => m a -> m (a -> b) -> m b apple x f = banana (\g -> banana (unicorn . g) x) f
Later parts of the exercises have you implement versions of
liftM2 etc. Here are my solutions:
appleTurnover :: (Misty m) => m (a -> b) -> m a -> m b appleTurnover = flip apple banana1 :: (Misty m) => (a -> b) -> m a -> m b banana1 = appleTurnover . unicorn banana2 :: (Misty m) => (a -> b -> c) -> m a -> m b -> m c banana2 f = appleTurnover . banana1 f banana3 :: (Misty m) => (a -> b -> c -> d) -> m a -> m b -> m c -> m d banana3 f x = appleTurnover . banana2 f x banana4 :: (Misty m) => (a -> b -> c -> d -> e) -> m a -> m b -> m c -> m d -> m e banana4 f x y = appleTurnover . banana3 f x y
banana1 (equivalent to
fmap) I was able to implement in pointfree style, by a suitable definition of
appleTurnover. But with the other three functions I've had to use parameters.
My question is: is there a recipe for turning definitions like these into point-free definitions?