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 have an interesting problem, well at least to me and I can't seem to figure out how to resolve it, so i'm hoping you can help.

instance (Finite a, Finite b) => Finite (Either a b) where
    elems = combineLists [Left x | x <- elems] [Right x | x <-elems]
    size ??? = (size a) + (size b)

I'm working on an assignment for a class and the purpose for this particular portion is to make the size function more efficient than simply counting all the elements in elems. I've settled on summing the two types that make up the list, but i can't seem to create the signature of the size function.

From Prelude: Either a b = Left a | Right b

The first thing I tried was to match 'Either' but of course, it is a type so that doesn't work. Next I tried ((Left a) | (Right b)) but no go on that either. Nothing else seems to match the type Either a b

I was able to get size (Left a) to compile, but since it's missing the b component, I recieve the error:

Ambiguous type variable `b' in the constraint:
  `Finite b' arising from a use of `size' at <interactive>:1:0-12

which of course makes sense in the context, but I really have no clue how to match Either a b.

Anybody have any thoughts?

share|improve this question
    
You seem a little confused about the difference between a type and a constructor. "Either a b" is a type with two constructors, "Left" and "Right". Types go in type signatures, while constructors go in code. This is a common confusion because a lot of types use the same name for the type and the constructor, as in "data Foo = Foo Int String"; the first "Foo" is the type, while the second is the constructor. –  Paul Johnson Feb 25 '10 at 20:17
    
I understand the difference on a meta level, it would just be nice to have something that I could match against any constructor of Type Either and pattern match specific cases if I wanted to. Ah, there's always more to learn :) –  Fry Feb 26 '10 at 2:29

3 Answers 3

up vote 18 down vote accepted

Something of type Either a b is either a Left a or a Right b, so you have two cases that can be handled separately:

size (Left x) = size x
size (Right x) = size x

The error about the ambiguous type variable is a separate issue. If you just type something like size (Left 1) into the interpreter, the system can't deduce what the "right" type of that Left 1 value would be. It could be Either Int anything and as long as it is not known what type that anything is, it cannot be checked if it is in class Finite (which is required by size).

You can avoid that problem by specifying an explicit type signature:

size (Left 1 :: Either Int String)
share|improve this answer
2  
Face palm Wow, ok - yeah - that makes complete sense and honestly I've used that trick enough in my own coding, I should have known to do that by now... At least it will stick with me :) Thanks! –  Fry Feb 22 '10 at 17:05

The trouble seems to be that you need a dummy argument for size, but you can't pass dummies for both types a and b in a single Either a b. Perhaps you can use the elems to get a dummy of each type:

size _ = (size . head) (elems :: [a]) + (size . head) (elems :: [b])
share|improve this answer

I think the core issue you are having is that you want a type that represents a datum from each of two other types at the same time. Either a b can only be one of a or b at a give time.

A simple data type that represents both an a and a b at the same time is a 2-tuple. The type signature for such a thing is (a, b), which is also the expression for creating one, and hence pattern maching one:

> :type (4,5)
(4,5) :: (Num t, Num t1) => (t, t1)
> let f (a, b) = 2*a + b
> f (4,5)
13

You should consider writing your first line with a 2-tuple, like so:

 instance (Finite a, Finite b) => Finite (a, b) where

What does this Finite (a, b) represent? What would the member function definitions be?

share|improve this answer
    
Actually I've already written the definition of that, it is the product of a and b, creating a mapping of all a's to all b's –  Fry Feb 22 '10 at 17:03

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.