Needless to say, the standard construction in Haskell

```
newtype Fix f = Fix { getFix :: f (Fix f) }
cata :: (Functor f) => (f a -> a) -> Fix f -> a
cata f = f . fmap (cata f) . getFix
```

is awesome and extremely useful.

Trying to define a similar thing in Agda (I'll put it just for completeness sake)

```
data Fix (f : Set -> Set) : Set where
mkFix : f (Fix f) -> Fix f
```

fails because `f`

is not necessarily strictly positive. This makes sense -- I could easily get a contradiction from this construction by picking appropriately.

My question is: is there any hope of encoding recursion schemes in Agda? Has it been done? What would be required?