# How to partially apply the flip function?

I am a little confused about what the "partial" application of flip might do.

Since the type of the `flip` function is:

``````flip :: (a -> b -> c) -> b -> a -> c
``````

which we can write without the parenthesis as:

``````flip :: a -> b -> c -> b -> a -> c
``````

How can I partially apply it to only the first argument `a`? To get a function with the type:

``````flipa ::     b -> c -> b -> a -> c
``````

Or it doesn't make sense?

For example if I have something like:

``````let foo a b = (Just a, b)
:t foo
> foo:: a -> t -> (Maybe a, t)
``````

It makes sense to partially apply it:

``````let a = foo 1
:t a
a :: t -> (Maybe Integer, t)
``````
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`(->)` is right-associative, not left-associative: the `flipa` you describe is an entirely different function (AFAIK the type dictates it must be `flipa _ x _ _ = x`). –  delnan Feb 24 '12 at 15:40
Another view of why aren't these two equivalent: let's take `f :: (a → a) → a` and `g :: a → a → a`. By Curry-Howard isomorphism, `g` represents theorem `a ⇒ a ⇒ a`, i.e. if `a` is true, then `a` implies `a` (which is true; it can be derived from `a ⇒ (b ⇒ a)` (axiom of intuitionistic logic)). On the other hand, `(a ⇒ a) ⇒ a` tells us nothing about `a` (if `a` implies `a` then `a`; but as you can see, `a` could also be false and `a ⇒ a` still holds). Indeed, if you have `f :: (a → a) → a`, you can prove that false is true: `boom :: False; boom = f id` (where False is empty data type) –  Vitus Feb 24 '12 at 16:19

It doesn't make sense. The signature

``````f :: a -> b -> c
``````

is equivalent to

``````f :: a -> (b -> c)
``````

and not equivalent to

``````f :: (a -> b) -> c
``````

This convention is why you can partially apply function in Haskell in the first place. Since all functions are curried by default, the signature `f :: a -> b -> c` can be interpreted as

f takes a and b, and returns c

or can equally validly be interpreted as

f takes a, and returns a function that takes b and returns c

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Hm.. what about a simple function as see in my updated question. –  drozzy Feb 24 '12 at 15:47
What's your question about that function? –  Chris Taylor Feb 24 '12 at 15:51
"Partial application" is a valid synonym for "currying" –  amindfv Feb 24 '12 at 15:58
Well, yes, considering function `(a × b × c) → d`, currying turns it into `a → b → c → d`, while partial application fixes any of the arguments into function `(b × c) → d` (or other pair depending on the argument being applied). –  Vitus Feb 24 '12 at 16:56
@drozzy: You can and you in fact already did! Imagine that flip has type `d → b → a → c`, where `d` must be a function of type `a → b → c`. If you apply `flip` to a function `f` of type `d`, you get back a new function `b → a → c` with the `d` argument fixed. –  Vitus Feb 24 '12 at 19:23

As others have noted, the type `(a -> b -> c) -> b -> a -> c` is not the same as `a -> b -> c -> b -> a -> c`.

However, it is the same as `(a -> b -> c) -> (b -> a -> c)`.

That shows that `flip` is a function that takes a single argument as input and therefore can't be partially applied*.

*: from the point of view of that `flip` returns a function of type `b -> a -> c`, which is not the only valid point of view in Haskell.

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Why is it the same as `(a -> b -> c) -> (b -> a -> c)`? How come you can take the parenthesis of the last triple, but not the first? –  drozzy Feb 24 '12 at 19:15
@drozzy -- Learn You a Haskell says `because functions are curried by default, the second pair of parentheses is really unnecessary, because -> is right associative by default. (a -> b -> c) -> (b -> a -> c) is the same as (a -> b -> c) -> (b -> (a -> c)), which is the same as (a -> b -> c) -> b -> a -> c`. So it's because of the associativity of `->`. –  Matt Fenwick Feb 24 '12 at 19:25
@drozzy: That's because `->` is right associative. In other words, `a → (b → (c → (d → e)))` is the same as `a → b → c → d → e`. As an example, division on real numbers is left associative, that means `((5 / 4) / 3) / 2 = 5 / 4 / 3 / 2` but not `5 / (4 / (3 / 2))`. edit: perhaps even more suggestive example: `(5 / 4) / (3 / 2) ≠ 5 / 4 / 3 / 2` –  Vitus Feb 24 '12 at 19:26

`(a -> b -> c) -> b -> a -> c` is not the same as `a -> b -> c -> b -> a -> c` because the `->` operator is right-associative, not left-associative. Therefore, partially applying `flip` is meaningless because it only has one parameter in the first place.

Also, your example doesn't make much sense because it would still produce an output function taking an `a`, which you would presumably not want. But if you take that out, you get a function which takes a unary function and produces exactly the same unary function, so just partially apply the original function and you're done.

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I see three parameters :D (but surely, not five!) –  Ptival Feb 24 '12 at 15:55
It depends how you look at it, but in its normal usage flip has one parameter and produces a function which takes two parameters. Of course in Haskell because of currying this is exactly the same as partially applying a function that takes three parameters. –  Matthew Walton Feb 27 '12 at 12:58