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I have some algebraic data types A, B, and C each implements the class:

class Dog a where
   dog :: a -> Bool

If I create a new algebraic data type:

data D = A | B | C

Is there an easy way to have D implement Dog without having to redefine each instance for A, B and C again?


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Do you mean create a new data type that uses the originals? Or combining the existing types into a single type that replaces them? Although, the answer is probably "no, not really" in either case. :T –  C. A. McCann Jul 14 '11 at 2:37
How does Dog relate to D? What exactly are you trying to do? dog :: D -> Bool dog A = True dog B = False Something like this? –  eternalmatt Jul 14 '11 at 2:37

1 Answer 1

up vote 8 down vote accepted

Before answering, I should point out that you may be falling into a common beginner's misconception about ADT's. Remember, Haskell has two separate namespaces for the type and term levels. So if we write:

data A = Foo
data B = Bar
data C = Baz
data D = A | B | C

...then there's no connection between the type A and the constructor A of type D. Therefore I suspect (but am not totally sure!) that the question you meant to ask had the following format for type D, instead:

data D = A A | B B | C C

In this case, the short answer is "no". You might wish that you could tack on a deriving Dog or some such thing and be done, but that facility is not provided by the language. That said, there are some packages for generic programming that could help: just check the Hackage packages list and search for "deriv" and you'll get about ten hits.

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Thanks for the answer, and for the correct assumption. That's exactly what I wanted to know. –  Charles Durham Jul 18 '11 at 0:14

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