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.

Say I have the following (erroneous) code.

data A a b where
  APure ::  (A a b)
  AApply :: A (A b c) c

test :: (A a b) -> a -> b
test (APure) a = a
test AApply a = undefined

GHC will then give me this error:

Couldn't match type `b' with `A b1 b'
  `b' is a rigid type variable bound by
      the type signature for test :: A a b -> a -> b
Inaccessible code in
  a pattern with constructor
    AApply :: forall c b. A (A b c) c,
  in an equation for `test'
In the pattern: AApply
In an equation for `test': test AApply a = undefined

Isn't this error message completely wrong? The error has nothing to do with AApply.

share|improve this question
1  
How is AApply supposed to have the general type A a b if you declare it as A (A b c) c already? It's like if you were defining concat' :: [a] -> [b] as concat' = concat: how is Haskell going to unify a "down" to [b]?. –  leftaroundabout Apr 21 '13 at 18:48
1  
Yes, it's unintuitive. Perhaps you should file a bug. –  Mikhail Glushenkov Apr 21 '13 at 18:57
    
@leftaroundabout I do not really understand what you mean, but that case is entierlly correct. Read up on patternmatching with GADTs. –  nulvinge Apr 21 '13 at 19:01
    
@MikhailGlushenkov, I'll do that –  nulvinge Apr 21 '13 at 19:01
    
Yeah right, I was confused by the absence of data fields. –  leftaroundabout Apr 21 '13 at 19:44

1 Answer 1

up vote 4 down vote accepted

Isn't this error message completely wrong? The error has nothing to do with AApply.

Not completely. It's arguably a bug that you get that error message, but it's not completely off base.

Look at the whole thing together after looking at the pieces.

test (APure) a = a

says we have a function

test :: A a b -> r -> r

Put that together with the signature

test :: (A a b) -> a -> b

and unify, ignoring the type error from the first equation, the type is refined to

test :: A r r -> r -> r

Then look at the equation

test AApply a = undefined

and see how that is inaccessible under the refined type, since

AApply :: A (A b c) c

would entail

c ~ A b c

if AApply were a valid first argument.

share|improve this answer
    
I suspected something like this happened. Why does it unify to A r r -> r -> r? How can the type change to something else when the type of the function is specified? –  nulvinge Apr 22 '13 at 1:04
    
With GADTs, you get type refinement. I think what happens here is a bug in the type-checker (and with 6.12.3, you get the unsurprising Couldn't match expected type `b' against inferred type `a' for the first equation; 7.0, 7.2 and 7.4 give only the error for the second equation; 7.6 both) - resp. the error-message producer, refinement gone awry. It should have stopped on the error in the first equation. But once it continued after that, it worked with inconsistent hypotheses, so it isn't too surprising that it ends with a silly result. –  Daniel Fischer Apr 22 '13 at 2:46
    
Oh, so it is a bug that is fixed (but my GHC version is to old). Thanks! –  nulvinge Apr 22 '13 at 3:51

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.