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In most of programming languages that support mutable variables, one can easily implement something like this Java example:

interface Accepter<T> {
    void accept(T t);

<T> T getFromDoubleAccepter(Accepter<Accepter<T>> acc){
    final List<T> l = new ArrayList<T>();
    acc.accept(new Accepter<T>(){

        public void accept(T t) {

    return l.get(0); //Not being called? Exception!

Just for those do not understand Java, the above code receives something can can be provided a function that takes one parameter, and it supposed to grape this parameter as the final result.

This is not like callCC: there is no control flow alternation. Only the inner function's parameter is concerned.

I think the equivalent type signature in Haskell should be

getFromDoubleAccepter :: (forall b. (a -> b) -> b) -> a

So, if someone can gives you a function (a -> b) -> b for a type of your choice, he MUST already have an a in hand. So your job is to give them a "callback", and than keep whatever they sends you in mind, once they returned to you, return that value to your caller.

But I have no idea how to implement this. There are several possible solutions I can think of. Although I don't know how each of them would work, I can rate and order them by prospected difficulties:

  • Cont or ContT monad. This I consider to be easiest.

  • RWS monad or similar.

  • Any other monads. Pure monads like Maybe I consider harder.

  • Use only standard pure functional features like lazy evaluation, pattern-matching, the fixed point contaminator, etc. This I consider the hardest (or even impossible).

I would like to see answers using any of the above techniques (and prefer harder ways).

Note: There should not be any modification of the type signature, and the solution should do the same thing that the Java code does.


Once I seen somebody commented out getFromDoubleAccepter f = f id I realize that I have made something wrong. Basically I use forall just to make the game easier but it looks like this twist makes it too easy. Actually, the above type signature forces the caller to pass back whatever we gave them, so if we choose a as b then that implementation gives the same expected result, but it is just... not expected.

Actually what came up to my mind is a type signature like:

getFromDoubleAccepter :: ((a -> ()) -> ()) -> a

And this time it is harder.

Another comment writer asks for reasoning. Let's look at a similar function

getFunctionFromAccepter :: (((a -> b) -> b) -> b) -> a -> b

This one have an naive solution:

getFunctionFromAccepter f = \a -> f $ \x -> x a

But in the following test code it fails on the third:

exeMain = do
    print $ getFunctionFromAccepter (\f -> f (\x -> 10)) "Example 1" -- 10
    print $ getFunctionFromAccepter (\f -> 20) "Example 2" -- 20
    print $ getFunctionFromAccepter (\f -> 10 + f (\x -> 30)) "Example 3" --40, should be 30

In the failing case, we pass a function that returns 30, and we expect to get that function back. However the final result is in turn 40, so it fails. Are there any way to implement doing Just that thing I wanted?

If this can be done in Haskell there are a lot of interesting sequences. For example, tuples (or other "algebraic" types) can be defined as functions as well, since we can say something like type (a,b) = (a->b->())->() and implement fst and snd in term of this. And this, is the way I used in a couple of other languages that do not have native "tuple" support but features "closure".

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I don't fully follow the Java, but I'm pretty certain your type signature is unsatisfiable. The first parameter is odd: it says how to get any type b from an a, but I think that's unlikely to be satisfiable. And then it's meant to produce a type a despite having no way to do so (even if the first parameter was slightly less funky there's no way it can output an a). So I think you need to fix your type signature (which you say should not be modified in the answer) before it can be answered. –  Neil Brown Aug 13 '13 at 3:33
Could you please explain what your Java code is supposed to do? –  chris Aug 13 '13 at 3:36
@NeilBrown, I'm not to the point of understanding the Java either, but that type signature is definitely satisfiable. Indeed, the only total implementation is getFromDoubleAccepter f = f id. –  luqui Aug 13 '13 at 3:43
All those monads you're talking about are implemented with "standard pure functional features like lazy evaluation, pattern-matching" etc. So if it's impossible with these "standard features" then it's also impossible with the monads. I also don't see how you can possibly assess the difficulty of any of those approaches if you don't actually know how to solve the problem with any of them. –  Ben Aug 13 '13 at 3:59
You aren't going to be able to move your intuition from Java to Haskell through a hypothetical situation like this. When programming Haskell, whatever problem it is you're trying to solve with this isn't going to come up, at least not in the form you're accustomed to reasoning about with your Java example. I strongly suggest instead of trying to pursue this line of thought, try to write actual programs in Haskell and see what you run into. That's the only real way to build a Haskell intuition. –  Daniel Lyons Aug 13 '13 at 4:07

3 Answers 3

Thanks to the above answers, I finally concluded that in Haskell we can do some different things than other languages.

Actually, the motivation of this post is to translate the famous "single axiom classical logic reduction system". I have implemented this in some other languages. It should be no problem to implement the

Axiom: (a|(b|c)) | ((d|(d|d)) | ((e|b) | ((a|e) | (a|e))))

However, since the reduction rule looks like

Rule: a|(b|c), a |-- c

It is necessary to extract the inner parameter as the final result. In other languages, this is done by using side-effects like mutable slots. However, in Haskell we do not have mutable slots and involving IO will be ugly so I keep looking for solutions.

In the first glance (as show in my question), the getFromDoubleAccepter f = f id seems nonsense, but I realise that it actually work in this case! For example:

rule :: (forall r.a -> (b -> c -> r) -> r) -> a -> c
rule abc a = abc a $ flip const

The trick is still the same: since the existential qualification hides r from the caller, and it is up to the callee to pick up a type for it, we can specify c to be r, so we simply apply the given function to get the result. On the other hand, the given function has to use our input to produce the final answer, so it effectively limiting the implementation to what we exactally want!

Putting them together, let's see what we can do with it:

newtype I r a b = I { runI :: a -> b -> r }

rule :: (forall r. I r a (I r b c)) -> a -> c
rule (I abc) a = abc a (I (\b c -> c))

axiom :: I r0 (I r1 a (I r2 b c)) 
          (I r0 (I r3 d (I r3 d d)) 
                (I r4 (I r2 e b) (I r4 (I r1 a e) (I r1 a e))))
axiom = let 
        a1 (I eb) e = I $ \b c -> eb e b
        a2 =  I $ \d (I dd) -> dd d d
        a3 (I abc) eb = I $ \a e -> abc a (a1 eb e)
        a4 abc = I $ \eb aeae -> runI a2 (a3 abc eb) aeae
    in I $ \abc (I dddebaeae) -> dddebaeae a2 (a4 abc)

Here I use a naming convention to trace the type signatures: a variable name is combinded by the "effective" type varialbes (means it is not result type - all r* type variable).

I wouldn't repeat the prove represented in the sited essay, but I want to show something. In the above definition of axiom we use some let bindings variables to construct the result. Not surprisingly, those variables themselves can be extracted by using rule and axiom. let's see how:

--Equal to a4
t4 :: I r0 a (I r1 b c) -> I r2 (I r1 d b) (I r2 (I r0 a d) (I r0 a d))
t4 abc = rule axiom abc

--Equal to a3
t3 :: I r0 a (I r1 b c) -> I r1 d b -> I r0 a d
t3 abc eb = rule (t4 abc) eb

--Equal to a2
t2 :: I r a (I r a a)
t2 = rule (t3 axiom (t3 (t4 axiom) axiom)) axiom

--Equal to a1
t1 :: I r a b -> a -> I r b c
t1 ab a = rule (t3 t2 (t3 (t3 t2 t2) ab)) a

One thing left to be proved is that we can use t1 to t4 only to prove all tautologies. I feel it is the case but have not yet proved it.

Compare to other languages, the Haskell salutation seems more effective and expressive.

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The type of accept is void accept(T) so the equivalent Haskell type is t -> IO () (since every function in Java is essentially IO). Thus getFromDoubleAccepted can be directly translated as

import Data.IORef

type Accepter t = t -> IO ()

getFromDoubleAccepter :: Accepter (Accepter a) -> IO a
getFromDoubleAccepter acc = do
    l <- newIORef $ error "Not called"
    acc $ writeIORef l
    readIORef l

If you want an idiomatic, non-IO solution in Haskell, you need to be more specific about what your actual end goal is besides trying to imitate some Java-pattern.

EDIT: regarding the update

getFromDoubleAccepter :: ((a -> ()) -> ()) -> a

I'm sorry, but this signature is in no way equal to the Java version. What you are saying is that for any a, given a function that takes a function that takes an a but doesn't return anything or do any kind of side effects, you want to somehow conjure up a value of type a. The only implementation that satisfies the given signature is essentially:

getFromDoubleAccepter :: ((a -> ()) -> ()) -> a
getFromDoubleAccepter f = getFromDoubleAccepter f
share|improve this answer
This is an excellent answer and good translation from Java. that uses IO but it is still have to modify the given interface. –  Earth Engine Aug 13 '13 at 6:17

First, I'll transliterate as much as I can. I'm going to lift these computations to a monad because accept returns void (read () in Haskell-land), which is useless unless there is some effect.

type Accepter m t = t -> m ()

getFromDoubleAccepter :: (MonadSomething m) => Accepter m (Accepter m t) -> m t
getFromDoubleAccepter acc = do
    l <- {- new mutable list -}
    acc $ \t -> add l t
    return (head l)

Of course, we can't make a mutable list like that, so we'll have to use some intuitive sparks here. When an action just adds an element to some accumulator, I think of the Writer monad. So maybe that line should be:

    acc $ \t -> tell [t]

Since you are simply returning the head of the list at the end, which doesn't have any effects, I think the signature should become:

getFromDoubleAccepter :: Accepter M (Accepter M t) -> t

where M is an appropriate monad. It needs to be able to write [t]s, so that gives us:

type M t = Writer [t]

getFromDoubleAccepter :: Accepter (M t) (Accepter (M t) t) -> t

And now the type of this function informs us how to write the rest of it:

getFromDoubleAccepter acc = 
    head . execWriter . acc $ \t -> tell [t]

We can check that it does something...

ghci> getFromDoubleAccepter $ \acc -> acc 42

So that seems right, I guess. I'm still a bit unclear on what this code is supposed to mean.

The explicit M t in the type signature is a bit aesthetically bothersome to me. If I knew what problem I was solving I would look at that carefully. If you mean that the argument can be a sequence of commands, but otherwise has no computational features available, then you could specialize the type signature to:

getFromDoubleAccepter :: (forall m. (Monad m) => Accepter m (Accepter m t)) -> t

which still works with our example. Of course, this is all a bit silly. Consider

   forall m. (Monad m) => Accepter m (Accepter m t))
=  forall m. (Monad m) => (t -> m ()) -> m ()

The only thing a function with this type can do is call its argument with various ts in order and then return (). The information in such a function is completely characterized[1] by those ts, so we could just as easily have used

getFromDoubleAccepter :: [t] -> t
getFromDoubleAccepter = head

[1] As long as I'm going on about nothing, I might as well say that that is not quite accurate in the face of infinity. The computation

crazy :: Integer -> Accepter m (Accepter m Integer)
crazy n acc = crazy (n+1) >> acc n

can be used to form the infinite sequence

... >> acc 3 >> acc 2 >> acc 1 >> acc 0

which has no first element. If we tried to interpret this as a list, we would get an infinite loop when trying to find the first element. However this computation has more information than an infinite loop -- if instead of a list, we used the Last monoid to interpret it, we would be able to extract 0 off the end. So really

forall m. (Monad m) => Accepter m (Accepter m t)

is isomorphic to something slightly more general than a list; specifically a free monoid.

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+1 for a lot of information for me to learn about. However I am still waiting for better answers. –  Earth Engine Aug 13 '13 at 6:11

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