You may want to clarify whether you're asking about "functors in Haskell", or `Functor`

s. It's not always clear what category is being assumed when Category Theory terms are used in Haskell.

But yes, the default assumption is **Hask**, which is taken to be the category of Haskell types with functions as morphisms. In that case, an endofunctor F on **Hask** would map any type A to a type F(A) and any function *f* between two types A and B to a function F(*f*) between some types F(A) and F(B).

If we then limit ourselves to only those endofunctors which map any type `a`

to a type `(f a)`

where `f`

is a type constructor with kind `* -> *`

, then we can describe the associated map for functions as a higher-order function with type `(a -> b) -> (f a -> f b)`

, which is of course the type class called `Functor`

.

However, one can easily imagine well-behaved endofunctors on **Hask** which can't be written (directly) as an instance of `Functor`

, such as a functor mapping a type `a`

to `Either a t`

. And while there's obviously not much sense in a functor from **Hask** to some other category entirely, it's reasonable to consider a (contravariant) functor from **Hask** to **Hask**^{op}.

Beyond that, instances of `Functor`

necessarily map from the entire category **Hask** onto some subset of it that, thus, also forms a category. But it's also reasonable to talk about functors *between* subsets of **Hask**. For instance, consider a functor that sends types `Maybe a`

to `[a]`

.

You may wish to peruse the `category-extras`

package, which provides some Category Theory-inspired structures embedded within **Hask** instead of assuming the entirety of it.

`E`

..."?