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A very popular monad explanation is here:

http://blog.sigfpe.com/2007/04/trivial-monad.html

I get everything but the part:

bind :: (a -> W b) -> (W a -> W b)
bind f (W x) = f x

I have a basic knowledge of Haskell (haven't used it for a long time), but this signature didn't seem right.

I installed GHC and checked what it thinks - turned out it thinks what I do, i.e.:

:t bind
bind :: (t1 -> t) -> W t1 -> t

What am I missing?

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you typed in the definition without its type signature. If you include the signature, you get the right type: using Maybe for W, I tried GHCi> :t let { bind :: (a -> Maybe b) -> (Maybe a -> Maybe b); bind f (Just x) = f x } in bind and got back :: (a -> Maybe b) -> Maybe a -> Maybe b. That function, bind, is Haskell's bind >>=, flipped: flip (>>=) :: (Monad m) => (a -> m b) -> m a -> m b. –  Will Ness Dec 11 '13 at 12:11

1 Answer 1

up vote 6 down vote accepted

Haskell's type inferer always considers the most general signature. Since in your implementation of bind you're not doing anything that gives out the argument f as anything more specific than a function from any type to any other type (not specifically W b), i.e. having a signature a -> b (or t1 -> t, as the inferer has written), of course it leaves it that way.

In other words, a signature (a -> b) -> W a -> b is a strictly more general version of (a -> W b) -> (W a -> W b).

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Ok. Please help me on one more thing: the tutorial's author type is "a function that takes a function from a to W b and returns a function from W a to W b", right? And the inferred type is a function that takes a function AND a W t1 AND returns a t... ? –  Parobay Dec 11 '13 at 8:43
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@Parobay W t1 is the type of a single argument. Just as, for example, Maybe Int is a single type. –  pelotom Dec 11 '13 at 8:48
2  
@Parobay Due to currying (a -> W b) -> (W a -> W b) == (a -> W b) -> W a -> W b. I.e. when bind is supplied with a single argument, it returns a function W a -> W b, when supplied with two, it returns just a W b. –  Nikita Volkov Dec 11 '13 at 8:53
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@Parobay, you can't remove parenthesis from the arguments. There's plenty of reading material on "Currying" and "Partial application". You can start from here. –  Nikita Volkov Dec 11 '13 at 8:59
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@Parobay function types associate to the right, so a -> b -> c -> d is the same as a -> (b -> (c -> d)), which is not the same as (a -> b) -> (c -> d). That's why you need the parens on the left but not the right. –  pelotom Dec 11 '13 at 10:12

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