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 `Functor`

and `Monad`

(and functions that takes `Functor`

s and `Monad`

s as arguments) but with cute names like `Furry`

and `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 `Misty`

:

```
class Misty m where
unicorn :: a -> m a
banana :: (a -> m b) -> m a -> m b
```

(the functions `unicorn`

and `banana`

are `return`

and `>>=`

, in case it's not obvious) and here's my implementation of `apple`

(equivalent to `flip ap`

):

```
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 `liftM`

, `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
```

Now, `banana1`

(equivalent to `liftM`

or `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**?

`@pl`

in lambdabot). – ehird Dec 30 '11 at 16:25