Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I want to implement an order-insensitive version of functional application in Haskell. By way of a little background: a prominent tradition in the semantics of natural language (deriving from Richard Montague, among others) assigns lambda functions of various types as the semantic values (sv's) of expressions. The truth-value of a sentence is computed by performing functional application on the sv's of the sentence's constituents. For a simple example, consider:

tl = [1..10]

bill :: Int
bill = 1

tall :: Int -> Bool
tall = \x -> x `elem` tl

Think of the sentence 'Bill is tall' as a tree with the left leaf occupied by 'Bill' and the right leaf occupied by 'tall'. We compute the truth-value of the sentence by applying the sv of the right leaf to the sv of the left leaf. Now consider 'Some man is tall': here the left leaf is occupied by `some man' [the sv of which is of type :: (Int -> Bool) -> Bool] and the right leaf is occupied by 'tall' [the sv of which is of type :: (Int -> Bool)]. We compute the truth-value of the sentence by applying the sv of the left leaf to the sv of the right leaf.

So, in this system, given a tree with left leaf a and right leaf b, we first check which leaf is in the domain of the other, and then apply functional application accordingly: if a is in the domain of b, we do b(a), whereas if b is in the domain of a, we do a(b).

How would I implement this kind of "order-insensitive" functional application in Haskell? I have written some functions that determine which leaf is in the domain of the other by parsing the result of

show (typeOf a)

for a leaf a. However, this seems to me unnecessarily cumbersome. Ghci gives an error if you try to e.g. evaluate

bill tall

So a simple way to check which item is in the domain of the other would be to just try applying one item to the other, and seeing whether an error/exception results. My question, then, is: how do I catch exceptions which result from a type-mismatch? That is, how do I catch non-IO exceptions of this sort?

share|improve this question

2 Answers 2

up vote 7 down vote accepted

You can't catch a type mismatch at run time; it's a compile-time error. (At least, not without using ghc-api to compile code at runtime. ghci is a wrapper around ghc-api, which is why it can do this.) You would need to find a way to capture this type distinction in an ADT to do it at runtime, or possibly use a typeclass (this introduces other complications, though).

share|improve this answer

You may get a long way with some type-class extensions:

{-# LANGUAGE FlexibleInstances     #-}
{-# LANGUAGE MultiParamTypeClasses #-}
{-# LANGUAGE TypeFamilies          #-}

class Copula l r where
  type Sem l r :: *
  is :: l -> r -> Sem l r

instance Copula (a -> b) a where
  type Sem (a -> b) a = b
  is = ($)

instance Copula a (a -> b) where
  type Sem a (a -> b) = b
  is = flip ($)   

For example, if we now define

bill :: Int
bill = 1

tall :: Int -> Bool
tall = \x -> x `elem` tl

someMan :: (Int -> Bool) -> Bool
someMan = flip any [1 .. 20]

allMan :: (Int -> Bool) -> Bool
allMan = flip all [1 .. 20]

we get

> bill `is` tall
True

> someMan `is` tall
True

> allMan `is` tall
False

Straightforwardly, with

are :: Copula l r => l -> r -> Sem l r
are = is

we can do

> someMan `are` tall
True

> allMan `are` tall
False

which may look a bit nicer.

Note: although this looks neat, in general, in polymorphic contexts the type checker needs quite some help figuring out what to do. For example

> [] `is` null

<interactive>:37:4:                                                              
    No instance for (Copula [a0] ([a1] -> Bool))
      arising from a use of `is'
    Possible fix:
      add an instance declaration for (Copula [a0] ([a1] -> Bool))
    In the expression: [] `is` null
    In an equation for `it': it = [] `is` null

while

> ([] :: [Int]) `is` (null :: [Int] -> Bool)
True
share|improve this answer
    
Thanks, that's very helpful! I think I'll pursue this strategy then. –  EB Mudd Apr 24 '12 at 16:08

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.