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Can one define fmap in terms of the Data typeclass from Data.Data?

It seems that using gfoldl one could not modify types.. Are there other combinators which can do this?

I'm guessing that it can't be done in the general case as one would have no way of only affecting the "Right" a's in an Either a a, but perhaps it could be done for some cases such as Maybe?

(I know that fmap is easily derivable but am still interested in whether this is achievable using Data)

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There is an example using syb given here at the bottom. It uses unsafeCoerce; not sure if there is a less disgusting way of doing it. –  jberryman Dec 12 '12 at 18:26
    
@jberryman: you should post this as an answer. –  sclv Feb 1 '13 at 4:18

1 Answer 1

Here's on example using syb from here

{-# LANGUAGE DeriveDataTypeable, ScopedTypeVariables, FlexibleContexts #-}
import Data.Generics
import Unsafe.Coerce

{- | C tags the type that is actually parameterized, so to avoid touching the
Int when a ~ Int:

> data T a = T Int a

by changing the type (not representation) to:

> x :: T Int (C Int)
-}
newtype C a = C a deriving (Data,Typeable)

fmapData :: forall t a b. (Typeable a, Data (t (C a)), Data (t a)) =>
    (a -> b) -> t a -> t b
fmapData f input = uc . everywhere (mkT $ \(x::C a) -> uc (f (uc x)))
                    $ (uc input :: t (C a))
    where uc = unsafeCoerce
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