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I'm reading the LYAH chapter on applicative functors, and I don't seem to understand the following example:

ghci> :t fmap (++) (Just "hey")  
fmap (++) (Just "hey") :: Maybe ([Char] -> [Char])

But when I look at this:

ghci> :t (++)
(++) :: [a] -> [a] -> [a]
ghci> :t fmap
fmap :: Functor f => (a -> b) -> f a -> f b

I do understand how something like (*3) or (++"this") fits into the (a -> b) type, but I just can't see how [a] -> [a] -> [a] fits into (a -> b)?

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Isn't it like that: you need to provide (a -> b) to fmap, then f a and it produces f b, so when you give fmap [a] -> [a] -> [a] then [a] -> [a] unifies with (a -> b) and [a] with f a ? I already forgot almost everything about haskell though –  wasyl Aug 24 '12 at 13:07

5 Answers 5

up vote 5 down vote accepted

Putting the stuff side-by-side as usual,

fmap :: Functor f => ( a    ->      b      )   ->      f a        ->   f b
fmap                       (++)                    (Just "hey")   ::   f b
(++) ::               [c]   -> ([c] -> [c])


a ~ [c]  ,    b ~ ([c] -> [c])  ,    f ~ Maybe  ,    a ~ [Char]  ,   c ~ Char

f b ~ Maybe b ~ Maybe ([c] -> [c]) ~  Maybe ([Char] -> [Char])

No thinking is involved here. Unification of types is a mechanical process.

And to answer your specific question (paraphrased), " how [c] -> [c] -> [c] can be matched with a -> b", here goes:

  • Omitting parentheses in type signatures is evil (when teaching Haskell to newbies)
  • In Haskell, there are no binary functions. Every function is unary.
  • Hence (as others mentioned already), arrows in type signatures associate to the right.
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The key is that -> associates to the right, so a type like a -> b -> c is really a -> (b -> c). So [a] -> [a] -> [a] fits into c -> d by setting c ~ [a] and d ~ [a] -> [a]. You can view a function [a] -> [a] -> [a] either as a function of 2 arguments that returns a result of type [a], or a function of 1 argument that returns a result of type [a] -> [a].

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The thing to realise is that the b in a -> b doesn't have to be a scalar - it can be a function.

[a] -> [a] -> [a] can be thought of as [a] -> ([a] -> [a]), so b is [a] -> [a]

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It is simple really :-). let me add a simple parenthesis:

[a]->[a]->[a] is like [a]->([a]->[a])

So it fits in a->b by replacing a by [a] and b by [a]->[a]. You give a string to ++ and you get a function of type string->string in return

fmap (++) (Just "hey") is a maybe monad holding a function which prefix the string "hey" to another string. It is indeed of type Maybe ([Char] -> [Char])

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Consider the definition of fmap for the Maybe type.

fmap f (Just x) = Just (f x)

which for your example looks like

fmap (++) (Just "Hey") = Just ("Hey" ++) :: Maybe ([Char] -> [Char])

As fmap should, you have simply lifted the (++) function inside the Maybe container and applied it to the contents.

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