I am trying to define a type class for bicategories and instantiate it with the bicategory of categories, functors and natural transformations.

```
{-# LANGUAGE NoImplicitPrelude, MultiParamTypeClasses,
TypeOperators, KindSignatures, Rank2Types,
ScopedTypeVariables, FlexibleInstances, InstanceSigs #-}
```

Here is the class for categories:

```
class Category (c :: * -> * -> *) where
id :: c x x
(.) ::c y z -> c x y -> c x z
```

Here is the class for functors:

```
class Functor c d f where
fmap :: c x y -> d (f x) (f y)
```

Here is the composition of functors:

```
newtype Comp g f t = Comp (g (f t))
```

The composition of two functors should be a functor.
However, the following instantiation is not accepted by Haskell because `f`

and `g`

are not in scope.
How would you define `fmap`

here?

```
instance Functor c e (Comp g f) where
fmap :: c x y -> e (Comp g f x) (Comp g f y)
fmap = fmap g . fmap f
```

Here are natural transformations (The parameter c is not used here but is useful for the next instantiation below.):

```
newtype NT f g (c :: * -> * -> *) d =
NT {unNT :: forall x. d (f x) (g x) }
```

Here is the class for bicategories (The operators `.|`

and `.-`

are respectively the vertical and horizontal compositions for 2-cells):

```
class Bicategory
(bicat :: (* -> *) -> (* -> *) -> (* -> * -> *) -> (* -> * -> *) -> *)
comp where
id1 :: Category d => bicat f f c d
(.|) :: Category d => bicat g h c d -> bicat f g c d -> bicat f h c d
(.-) :: bicat g g' d e -> bicat f f' c d -> bicat (g `comp` f) (g' `comp` f') c e
```

Categories, functors and natural transformations should form a bicategory.
However, the following instantiation is not accepted by Haskell because, in the definition of the horizontal composition `.-`

of natural transformations, g in not in scope.
How would you define the horizontal composition `(.-)`

here?

```
instance Bicategory NT Comp where
id1 = NT id
n .| m = NT (unNT n . unNT m)
(n :: NT g g' d e) .- m = NT (unNT n . fmap g (unNT m))
```

`f`

and`g`

are type-level variables, not value-level variables. – David Young Aug 8 '14 at 21:44`Category`

instance for`c`

and`e`

(and you also didn't give them a`Category`

constraint), so it's impossible. As it is written,`fmap`

must work for all possible choices of`c`

and`e`

. There is an implicit`forall`

. For example, what would it do if`c`

is`Const`

and`e`

is`Tagged`

? – David Young Aug 8 '14 at 21:57