If I have a recursive ADT

data MyType = A | B | C MyType | D MyType MyType

I could write a function to determine whether an instance of MyType contains an A like so:

hasA :: MyType -> Bool
hasA A = True
hasA B = False
hasA (C x) = hasA x
hasA (D x y) = (hasA x) || (hasA y)

This would work for acyclic instances, but it does not halt for cyclic structures, e.g.

let x = C x in hasA x

Instead, in this example it should return False. In other cases (making use of D) it would erroneously not halt instead of returning True.

So, the question is how do I most easily write functions like hasA that work on cyclic structures? Racket has a particularly nice feature for this in the form of define/fix, that allows you to make a function like hasA behave as intended and return False for the structure in the example above, with hardly any extra code. Is there a way of doing something similar in Haskell? Is there an extension for it?

Edit: I have now found that define/fix is in fact a macro created by Matt Might that takes advantage of Racket's meta-programming features, not a built-in feature, but this does not make it any less of a great feature of Racket. Maybe this macro could be reproduced in Haskell?

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    you'll definitely have to reify cycles in your graph, or keep track of the data you need for hasA in some other way when you construct it (e.g. at the top level have a Set of all the structures below). This might have some good info for you: stackoverflow.com/questions/9732084/… – jberryman Oct 12 '13 at 17:57
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    @jberryman What about using StableName for equality tests to detect cycles? Is there a downside to that that I have missed? And thank you very much for that link. – Dylan Oct 12 '13 at 18:21
  • @Dylan using StableName to check for equality should be fine for this. The only downside I can think of is that it operates in IO. – John L Oct 12 '13 at 19:18
  • @JohnL Would it be "safe" to use that with unsafePerformIO for this purpose? – Dylan Oct 12 '13 at 22:30
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    @Dylan: No! Purity is exactly why StableName lives in IO. Equational reasoning says that let x = C x in hasA x should be the same as let x = C x in hasA (C x), but StableNames would let you violate that. – Antal Spector-Zabusky Oct 13 '13 at 0:09

The key words to search for on Hackage are observable sharing. The data-reify package in those results looks especially relevant:

data-reify provided [sic] the ability to turn recursive structures into explicit graphs. Many (implicitly or explicitly) recursive data structure can be given this ability, via a type class instance. This gives an alternative to using Ref for observable sharing.

  • Very nice links. Just what I was looking for. Thanks. – Dylan Oct 18 '13 at 8:43

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