Source: Hutton, Graham. "Programming in Haskell" (p. 267)

  1. Using foldMap, define a generic version of the higher-order function filter on lists that can be used with any foldable type:

filterF :: Foldable t => (a -> Bool) -> t a -> [a]

I am doing this exercise and have some questions:

  • Isn't the correct type filterF :: Foldable t => (a -> Bool) -> t a -> t a ? Isn't filter supposed to preserve the structure of the container ?

This is my attempt; is it correct ? Should I place a Monoid restriction on t ?

filterF :: Foldable t => (a -> Bool) -> t a -> t a
filterF p = foldMap (\x -> if p x then pure x else mempty)

Foldable is not powerful enough to implement a filter operation that preserves the shape of the container. I often think of Foldable as "anything you could make into a list". Notably this does not mean you could make a list back into a specific Foldable type. Thus, this filterF can only return [a].

Your implementation is fine, but doesn't match your type signature. Ask GHCI for the type, and you will find:

> :t filterF
  :: (Foldable t, Monoid (f a), Applicative f) =>
     (a -> Bool) -> t a -> f a

This can be specialized to the type that the book asks for (Foldable t => (a -> Bool) -> t a -> [a]), but not to the type you think this operation should have (Foldable t => (a -> Bool) -> t a -> t a). In particular, you claim that t ~ f, but you can't actually promise that: you use a different type, which must be Monoid and Applicative but need not be Foldable, to build up the return value.

  • 1
    Thank you so much ! Could you clarify ? When you said that I used a different type...which is the one you are talking about ?
    – F. Zer
    Jan 12 at 18:17
  • @F.Zer Your implementation returns a type f which is Applicative and Monoid. It does not return the same t that the input was. If t is both Applicative and Monoid, that can be the same as f (e.g., when applied to a list you can return a list). But you can't do it for all Foldables, which is what's promised by the signature you tried to apply.
    – amalloy
    Jan 12 at 20:15
  • Thank you for the clarification !
    – F. Zer
    Jan 12 at 21:24

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.