Is SF already defined anywhere, or does it at least have a name?

data SF a f x = SF a (f x)

instance Functor f => Functor (SF a f) where
  fmap g (SF a fx) = SF a (fmap g fx)
  • It looks like you are declaring a functor which contains another functor. – Code-Apprentice Oct 2 '14 at 19:22
  • AFAIK there isn't one already out there, but that doesn't mean that it doesn't exist in the corner of some random package I've never used. – bheklilr Oct 2 '14 at 19:28
  • @Code-Apprentice, I'm defining a functor transformer. SF a f is the same as functor f, but it carries an additional value of type a attached to it. – Artyom Oct 2 '14 at 19:37
  • (It's isomorphic to a product of Const a and Identity.) – AndrewC Oct 2 '14 at 20:18
  • 3
    @ArtyomKazak Since functors (and applicative functors, unlike monads) compose, there is no need for something like (applicative) functor transformer. See Data.Functor.* modules in transformers. – Petr Pudlák Oct 2 '14 at 20:24
up vote 4 down vote accepted

Your functor looks like

type SF a f = (,) a :. f

using functor-combo notation.

(I somehow prefer to look at it using composition, rather than using product and Const.)

  • 2
    A more mainstream name for your :. is Compose from the transformer's package. – Ørjan Johansen Oct 3 '14 at 12:32

You could just define functor products

data (f :* g) a = P (f a) (g a) deriving Functor

and then write it directly

type SF a f = Const a :* f

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