So, in my ongoing attempts to half-understand Curry-Howard through small Haskell exercises, I've gotten stuck at this point:

```
{-# LANGUAGE GADTs #-}
import Data.Void
type Not a = a -> Void
-- | The type of type equality proofs, which can only be instantiated if a = b.
data Equal a b where
Refl :: Equal a a
-- | Derive a contradiction from a putative proof of @Equal Int Char@.
intIsNotChar :: Not (Equal Int Char)
intIsNotChar intIsChar = ???
```

Clearly the type `Equal Int Char`

has no (non-bottom) inhabitants, and thus semantically there ought to be an `absurdEquality :: Equal Int Char -> a`

function... but for the life of me I can't figure out any way to write one other than using `undefined`

.

So either:

- I'm missing something, or
- There is some limitation of the language that makes this an impossible task, and I haven't managed to understand what it is.

I suspect the answer is something like this: the compiler is unable to exploit the fact that there are no `Equal`

constructors that don't have a = b. But if that is so, what makes it true?