Here is a simple example where the identity Functor works well:

```
newtype R a = R a
instance Functor R where
fmap f (R a) = R $ f a
```

but if I add an intermediate type family, things get wonky:

```
data IntT
data a :-> b
type family Sem a :: *
type instance Sem IntT = Int
type instance Sem (a :-> b) = Sem a -> Sem b
newtype S a = S (Sem a)
```

and now I can't make S into a Functor. I can easily define a new class of Functor-like things, but then I will also need a class of Applicative-like and Monad-like, and that seems like an unhappy road. Especially as

```
smap f (S a) = S $ f a
```

actually has the type I want, namely `smap :: (Sem a -> Sem b) -> S a -> S b`

. But, of course, this is not the type of a Functor. (Don't you just hate it when the "same" code has 2 different, incompatible types?)

I have explored Data.Category.Functor as well as Generics.Pointless.Functors, but neither seemed to quite solve my problem either. PointlessTypeFamilies seemed to have further good ideas, and yet I am still unsure how to get something sufficiently Functor-like out of this.

It *has* dawned onto me that even though the code for `smap`

is identical to that of `fmap`

for `R`

, what is going on is slightly different. In a way, if I had a natural transformation from `Sem`

to `S`

, then somehow I ought to be able to lift that to obtain `smap`

. At that point, I figured I might as well ask here, that might save me quite a bit of trouble!

`smap`

can be thought of as a functor, but doesn't mean much. it's just the 'witness' of the trivial isomorphism between subcategories of types`Sem a`

and`S a`

(where they are defined). What's more important perhaps is that`IntT`

is not isomorphic to`Int`

. That changes everything. – mnish Nov 14 '12 at 4:40`IntT`

is not isomorphic to`Int`

- that is on purpose. The whole point of Sem is to be able to map`IntT`

to "other things", like for example P({even, odd}) for the purposes of doing abstract interpretation. Or I could map`IntT`

to`Nat`

for computing the length of programs, and so on. – Jacques Carette Nov 14 '12 at 13:10