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Is there anyone who can explain to me why there's no Set datatype defined in Haskell?

Sidenote: I'm only learning Haskell as part of a course on logic in which set theory is very important thus it would be really handy to have the notion of a set in Haskell. Having a list and removing duplicates (and possibly sorting) would result in a set as well but I'm curious if there's a particular reason why it's not built-in?

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Moderator Note Comments under this question were mostly noise, or a reaction to noise and they have been removed. Please keep comments constructive and on topic. –  Tim Post Sep 26 '11 at 17:43

4 Answers 4

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As other answers indicate, the question "Why is there no Set data type in Haskell?" is misguided: there is a Set data type.

If you'd like to know why Set isn't "built in" to Haskell, you could be asking one of two things.

To answer the former, it is because the language is powerful enough to express the idea of a set without needing to bake it in. Being a language with a high emphasis on functional programming, special syntax for tuples and lists is built in, but even simple data types like Bool are defined in Prelude.

To answer the latter, well, again, with the emphasis on functional programming, most Haskellers tend to use lists. The list monad represents nondeterministic choice, and by allowing duplicates, you can sort of represent weighted choices.

Note how similar list comprehension syntax is to set notation. You can always use Set.fromList to convert a list into a "real" set, if necessary. As a begrudging shout out to Barry, this would be similar to using Python's set() method; Python has list comprehensions as well.

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Technically, Data.Set is in GHC, but it's not in either the Haskell 98 or 2010 reports –  user102008 Sep 26 '11 at 20:08
    
@user102008 "in GHC"? It's in the containers package, which is included with the Haskell Platform, but I'm not sure what you mean by saying it is "in GHC". –  Dan Burton Sep 26 '11 at 22:10
    
@DanBurton well, the containers package ships with GHC, even if you don't get the Platform. –  ivanm Sep 27 '11 at 1:11

It exists as Data.Set. However, as you said, it can be implemented on top of list and so is not necessary to build up the language which, I think, is why it is in a module rather than being part of the definition of the language itself.

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Well, lists could also be defined using other things too... –  Dietrich Epp Sep 26 '11 at 14:43
    
@DietrichEpp yes but the syntax would be really heavy if you add to write list as an explicit chain of Cons. –  mb14 Sep 26 '11 at 14:50
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@mb14 (:) == Cons; there's just syntactic sugar for explicit finite lists and as wrappers around the various enum{From}{Then}{To} functions. –  ivanm Sep 27 '11 at 1:13

On a more philosophical level --- there can't ever be a strict correspondence between the mathematical concept of a set and a Haskell set implementation. Why not? Well, the type system, for starters. A mathematical set can have anything at all in it: {x | x is a positive integer, i < 15} is a set, but so is {1, tree, ham sandwich}. In Haskell, a Set a will need to hold some particular type. Putting Doubles and Floats into the same set won't typecheck.

As others have said, if you need to do some set-like things and don't mind the type restriction, Data.Set exists. It's not in Prelude because lists are usually more practical. But really, from a language design perspective, it doesn't make sense to think of mathematical sets as one datatype among many. Sets are more fundamental than that. You don't have sets, and numbers, and lists; you have sets of numbers, and sets of lists. The power of recursive types tends to obscure that distinction, but it's still real.

There is a place in Haskell, though, where we define arbitrary collections, and then define functions over those collections. The closest analog of the mathematical concept of sets in Haskell is the type system itself.

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A lot of times, sets in mathematics are considered in the context of a "universe" (en.wikipedia.org/wiki/Universe_(mathematics)) –  user102008 Sep 26 '11 at 20:10
    
@Zopa: you can still express that using a sum-type. –  ivanm Sep 27 '11 at 1:13
    
It's true, as you say, that "in Haskell, a Set a will need to hold some particular type". But the type that a is instantiated at could be an existential type, of which 1, tree and ham sandwich might very well be members, assuming tree and ham sandwich are themselves well-typed terms... what you could meaningfully do with such a set I have no idea ;) However I do agree with your conclusion, that types themselves are the closest thing Haskell has to the mathematical notion of sets. –  pelotom Sep 27 '11 at 7:30
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A Set also requires elements to be part of the class Ord (except singleton sets). –  u0b34a0f6ae Sep 27 '11 at 13:46

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