After reading Milewski's F-algebra article, I tried to implement it and use for a real-world problem. However, I can't seem to figure out how to write instances for Fix,
newtype Fix f = Fx { unFix :: f (Fix f) }
cata :: Functor f => (f a -> a) -> Fix f -> a
cata alg = alg . fmap (cata alg) . unFix
For example, let's say I this simple algebra:
data NatF a = Zero | Succ a deriving Eq
type Nat = Fix NatF
and now I try to implement an instance of Eq (note: deriving doesn't work):
instance ??? => Eq (Fix f) where
(==) = ???
And this is where I get stuck. How do I fill in the ??? to make this work? Is this even possible to do?
The simplest instance I could find was just
{-# LANGUAGE UndecidableInstances, FlexibleContexts #-}
import Data.Function (on)
instance Eq (f (Fix f)) => Eq (Fix f) where
(==) = (==) `on` unFix
All that we require is that Fix f is an instance of Eq precisely when f (Fix f) is an instance of Eq. Since in general we have instances like Eq a => Eq (f a) this works just fine.
> Fx Zero == Fx Zero
True