# How to make Haskell compute the correct polymorphic type?

I just realized how useful the little `on`-function can be.

Ex:

``````orderByLength = sortBy (compare `on` length)
``````

But unfortunately, the inferred types can be somewhat counter-intuitive.

According to the very definition

``````f `on` g = \x y -> f (g x) (g y)
``````

one could e.g. replace

``````(==) `on` length
``````

with

``````\x y -> (length x) == (length y)
``````

But both have different types!

The first has `[a] -> [a] -> Bool` whereas the second has the correct, more generic type of `[a] -> [b] -> Bool`.

This disallows obviously correct terms like `(on (==) length) [1, 2, 3] ["a", "b", "c"]` (which should yield `True` but now even fails type-checking).

I know this restriction comes up due to the usage of first-rank types, but how to overcome this? Can someone formulate an implementation of `on` that can deal correctly with polymorphic functions (using universal quantification/rank-n types)?

-

``````{-# LANGUAGE Rank2Types #-}
on' :: (a -> a -> b) -> (forall d. c d -> a) -> c e -> c f -> b
on' f g x y = f (g x) (g y)
``````

This results in

```Prelude> :t on' (==)
on' (==) :: (Eq a) => (forall d. c d -> a) -> c e -> c f -> Bool
Prelude> :t on' (==) length
on' (==) length :: [e] -> [f] -> Bool
```

On the other hand, this signature also makes `flip on' id` illegal, which is somewhat less than desirable.

``````{-# LANGUAGE TemplateHaskell #-}
onE f g = do
x <- newName "x"
y <- newName "y"
lamE [varP x, varP y] \$ f `appE` (g `appE` varE x) `appE` (g `appE` varE y)
``````
```Prelude> :set -XTemplateHaskell
Prelude> \$(onE [|(==)|] [|length|]) [1,2,3] ["a","b","c"]
True
Prelude> \$(onE [|(==)|] [|id|]) 4 5
False
```
-
Cool thing - What is `c`? A kind `* -> *`? Ah, it's to wrap the potential use of `[type]` ... Can you generalize it for any kind? –  Dario Dec 1 '09 at 20:51
Cool, thanks for both ideas –  Dario Dec 2 '09 at 14:15