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When using Existential types, we have to use a pattern-matching syntax for extracting the foralled value. We can't use the ordinary record selectors as functions. GHC reports an error and suggest using pattern-matching with this definition of yALL:

{-# LANGUAGE ExistentialQuantification #-}

data ALL = forall a. Show a => ALL { theA :: a }
-- data ok

xALL :: ALL -> String
xALL (ALL a) = show a
-- pattern matching ok

-- ABOVE: heaven
-- BELOW: hell

yALL :: ALL -> String
yALL all = show $ theA all
-- record selector failed

    Cannot use record selector `theA' as a function due to escaped type variables
    Probable fix: use pattern-matching syntax instead
    In the second argument of `($)', namely `theA all'
    In the expression: show $ theA all
    In an equation for `yALL': yALL all = show $ theA all

Some of my data take more than 5 elements. It's hard to maintain the code if I use pattern-matching:

func1 (BigData _ _ _ _ elemx _ _) = func2 elemx

Is there a good method to make code like that maintainable or to wrap it up so that I can use some kind of selectors?

share|improve this question
Hint: What would be the type of theA? – Louis Wasserman Apr 17 '12 at 15:01
@Louis Wasserman: do you mean using existential syntax in yALL ? how? – Nybble Apr 18 '12 at 5:39
Basically, the answer is that it doesn't have an expressible type, so you need pattern matching to get a workable type. – Louis Wasserman Apr 18 '12 at 14:37
Or more accurately, it would have the type exists a. Show a => ALL -> a, were Haskell to have first-class existential types. – javawizard Jan 25 '13 at 3:04
up vote 15 down vote accepted

You can use record syntax in pattern matching,

func1 BigData{ someField = elemx } = func2 elemx

works and is much less typing for huge types.

share|improve this answer
Great Answer! I just found it later: data B { x :: Int, y :: Int} ; fun B{..} = x + y; that can be an alternative. – Nybble May 19 '12 at 0:28

Existential types work in a more elaborate manner than regular types. GHC is (rightly) forbidding you from using theA as a function. But imagine there was no such prohibition. What type would that function have? It would have to be something like this:

-- Not a real type signature!
theA :: ALL -> t  -- for a fresh type t on each use of theA; t is an instance of Show

To put it very crudely, forall makes GHC "forget" the type of the constructor's arguments; all that the type system knows is that this type is an instance of Show. So when you try to extract the value of the constructor's argument, there is no way to recover the original type.

What GHC does, behind the scenes, is what the comment to the fake type signature above says—each time you pattern match against the ALL constructor, the variable bound to the constructor's value is assigned a unique type that's guaranteed to be different from every other type. Take for example this code:

case ALL "foo" of
    ALL x -> show x

The variable x gets a unique type that is distinct from every other type in the program and cannot be matched with any type variable. These unique types are not allowed to escape to the top level—which is the reason why theA cannot be used as a function.

share|improve this answer
Generally, you can think of an existential type as a dependent tuple, where the first element is a type (*) and the second is a value of that type - Σ[ a : * ] a. The problem is, that when you attempt to write a type signature for a projection of the second element of the tuple, you need to know the value of the first element. This cannot be expressed in Haskell. If you have dependently typed language you can write it as (using Agda notation): (x : Σ[ a : * ] a) → fst x. – Vitus Apr 17 '12 at 21:36
+1 This explains the error message "Cannot use record selector `theA' as a function due to escaped type variables" – Dan Burton Apr 18 '12 at 2:56

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