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I have this code:

fmapM :: Monad m => (a -> m b) -> (t, a) -> m (t, b)
fmapM f (id, e) = do 
  ev <- f e
  return (id, ev)

which basically applies the function to the 2nd element in the tuple and then "extracts" the monad. Since the tuple is a functor, is there a way to generalize this for all functors? I cannot think of an implementation, but the type signature should be:

fmapM :: (Monad m, Functor f) => (a -> m b) -> f a -> m f b

it would seem like the 2nd step would be a "sequence" operation, which extracts the monad from another functor (the list). But sequence is not generalized to all functors. Can you come up with a generic implementation of fmapM?

Edit: I've realized that an old version of hugs did have this function implemented. However, I can't find the code. Now, it is suggested that I use foldable/traversable to achieve the same.

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Ah, I see the fmapM you mean in old Hugs, but that was just a less general version of Traversable. It's still a class with a different implementation for each type. –  shachaf Jul 10 '13 at 5:18
    
(You can derive fmap -- as well as a lot of other functions -- from just traverse, but not vice versa.) –  shachaf Jul 10 '13 at 5:19

1 Answer 1

up vote 10 down vote accepted

The function you're looking for is traverse, from Data.Traversable:

traverse :: (Applicative f, Traversable t) => (a -> f b) -> t a -> f (t b)

Note that you can't traverse any Functor -- for example, (r ->) -- so there's a separate subclass of Traversable functors. Also note that you don't need Monad -- just Applicative (this generalization is useful).

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A minimal implementation of Traversable for (,) a would be something like sequenceA (a, b) = do { b' <- b; return $ (,) a b' } in monadic notation and (,) a <$> b in applicative notation... but traversable wants (,) a to be Foldable as well, and that does not seem to be possible... –  BruceBerry Jul 10 '13 at 14:14
1  
It is possible. In fact, if you defined traverse (rather than sequenceA), you can automatically write both a Functor and a Foldable instance using fmapDefault and foldMapDefault respectively. –  shachaf Jul 10 '13 at 19:01
    
traverse for (,) a looks like: traverse f (x,y) = (,) x <$> f y. foldMap and fmap look like: foldMap f (x,y) = f y; fmap f (x,y) = (x, f y). traverse is a direct generalization of the two. –  shachaf Jul 10 '13 at 19:04
    
thanks. any reason why (,) a has a functor instance in the prelude, but there's no foldable and traversable instances? Given the functor instance in the prelude, there's little else that the foldable and traversable instances can do that makes sense, other than act on the second element and repack everything together... –  BruceBerry Jul 10 '13 at 19:22
1  
Nope. No reason. –  shachaf Jul 10 '13 at 19:38

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