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I was reading a research paper about Haskell and how HList is implemented and wondering when the techniques described are and are not decidable for the type checker. Also, because you can do similar things with GADTs, I was wondering if GADT type checking is always decidable.

I would prefer citations if you have them so I can read/understand the explanations.


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This question might be better directed to the authors of the research paper. It's a bit esoteric for Stack Overflow. (I've always had great success contacting researchers for comment. They're usually ecstatic anybody is reading their work.) – Chris Conway Sep 7 '08 at 23:58
I think this attitude (that theoretical questions have no bearing on a pragmatic forum) is harmful and obsolete. Pragmatic approaches should be open to new technologies, because those technologies can likely improve daily activities in the near future. eg: functional features in c#/python. – rcreswick Sep 8 '08 at 1:30
That said, Chirs's comment is probably right-on, practically speaking. I wish it weren't though. – rcreswick Sep 8 '08 at 1:32
rcreswick: I don't think the question has no bearing. I just don't think the Stack Overflow community is likely to produce a satisfactory answer. – Chris Conway Sep 8 '08 at 3:55

2 Answers 2

up vote 8 down vote accepted

I believe GADT type checking is always decidable; it's inference which is undecidable, as it requires higher order unification. But a GADT type checker is a restricted form of the proof checkers you see in eg. Coq, where the constructors build up the proof term. For example, the classic example of embedding lambda calculus into GADTs has a constructor for each reduction rule, so if you want to find the normal form of a term, you have to tell it which constructors will get you to it. The halting problem has been moved into the user's hands :-)

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That's a good point. So I guess I'm interested in when GHC's type inference of GADTs is decidable. – Jason Dagit Jun 24 '11 at 18:09

You've probably already seen this but there are a collection of papers on this issue at Microsoft research: Type Checking papers. The first one describes the decidable algorithm actually used in the Glasgow Haskell compiler.

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The referenced papers are good papers, but they don't seem to answer my question. – Jason Dagit Sep 16 '08 at 3:33

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