The GHC user's guide describes the impredicative polymorphism extension with reference to the following example:

```
f :: Maybe (forall a. [a] -> [a]) -> Maybe ([Int], [Char])
f (Just g) = Just (g [3], g "hello")
f Nothing = Nothing
```

However, when I define this example in a file and try to call it, I get a type error:

```
ghci> f (Just reverse)
<interactive>:8:9:
Couldn't match expected type `forall a. [a] -> [a]'
with actual type `[a0] -> [a0]'
In the first argument of `Just', namely `reverse'
In the first argument of `f', namely `(Just reverse)'
In the expression: f (Just reverse)
ghci> f (Just id)
<interactive>:9:9:
Couldn't match expected type `forall a. [a] -> [a]'
with actual type `a0 -> a0'
In the first argument of `Just', namely `id'
In the first argument of `f', namely `(Just id)'
In the expression: f (Just id)
```

Seemingly only `undefined`

, `Nothing`

, or `Just undefined`

satisfies the type-checker.

I have two questions, therefore:

- Can the above function be called with
`Just f`

for any non-bottom`f`

? - Can someone provide an example of a value only definable with impredicative polymorphism, and usable in a non-trivial way?

The latter is particularly with the HaskellWiki page on Impredicative Polymorphism in mind, which currently makes a decidedly unconvincing case for the existence of the extension.

`forall a. [a] -> [a]`

.`forall a. Maybe ([a] -> [a])`

fails, because the type checker seems to try to instantiate`a`

to both`Int`

and`Char`

.`Maybe (forall a. [a] -> [a])`

fails, because it expects`forall a. [a] -> [a]`

, but it gets a`[a0] -> [a0]`

where`a0`

is fresh. So,with`Maybe`

, the nested type scheme is only instantiated once, butwithout`Maybe`

, everything is just fine. – Rhymoid Dec 27 '12 at 0:00