Is it possible to write the Y Combinator in Haskell?

It seems like it would have an infinitely recursive type.

```
Y :: f -> b -> c
where f :: (f -> b -> c)
```

or something. Even a simple slightly factored factorial

```
factMaker _ 0 = 1
factMaker fn n = n * ((fn fn) (n -1)
{- to be called as
(factMaker factMaker) 5
-}
```

fails with "Occurs check: cannot construct the infinite type: t = t -> t2 -> t1"

(The Y combinator looks like this

```
(define Y
(lambda (X)
((lambda (procedure)
(X (lambda (arg) ((procedure procedure) arg))))
(lambda (procedure)
(X (lambda (arg) ((procedure procedure) arg)))))))
```

in scheme) Or, more succinctly as

```
(λ (f) ((λ (x) (f (λ (a) ((x x) a))))
(λ (x) (f (λ (a) ((x x) a))))))
```

For the applicative order And

```
(λ (f) ((λ (x) (f (x x)))
(λ (x) (f (x x)))))
```

Which is just a eta contraction away for the lazy version.

If you prefer short variable names.