# Set of an Unordered Data Type with a given ordering

I'm trying to put this data type in a Haskell Set, but I don't want to give it a general instance of Ord. So I want to give the set an ordering on y-coördinate but without instance Ord Vector. Is this possible?

``````    data Vector = V
{ x :: Double
, y :: Double
} deriving (Eq)
``````
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Can you store the coordinates as a tuple `(y, x)`? –  KennyTM Mar 25 '10 at 8:52
I could do that, but what does that help me? Actually I want to use different orderings in different functions (one time x-coordinate, one time the y-coordinate) and later on I want to expand it in more dimensions. –  Ingdas Mar 25 '10 at 8:57

`Set` requires you to use the default `Ord` instance of the element type.

If you want to use a different `Ord` instance, the standard way to do that is to use a custom `newtype` wrapper and then write an `Ord` instance for that:

``````newtype Y = Y { unY :: Vector } deriving Eq
instance Ord Y where compare = comparing ((y . unY) &&& (x . unY))
``````

But since this way of comparing is equivalent to the way binary tuples are compared, KennyTM's solution is the simplest here.

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Nice. I was just typing in the exact same thing. –  jrockway Mar 25 '10 at 9:41
I can get it to work but i don't fully understand what I'm typing. So i figured i can replace &&& by (\l -> ((y.unY l),(x.unY l))). But i don't really see how this is a function Num => b->a (i'm getting this signature out of the documentation of comparing) Can you rewrite this in lower-lever Haskell? I'm still a bit of a newbie in Haskell –  Ingdas Mar 25 '10 at 11:05
@Ingdas: Where did you get `Num`? The signature of `comparing` is `Ord a => (b -> a) -> b -> b -> Ordering` (hackage.haskell.org/packages/archive/base/latest/doc/html/…) –  KennyTM Mar 25 '10 at 11:40

You can convert the vector into a tuple:

``````toTuple :: Vector -> (Double, Double)
toTuple (V x y) = (y, x)

fromTuple :: (Double, Double) -> Vector
fromTuple (y, x) = V x y
``````

Since tuples derive Ord (using lexicographic comparison), they can be inserted to the Set. (Define 2 other functions for x-major ordering.)

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I've made a version of the `Set` datatype which does not have the `Ord` context, but instead needs a function of type `a -> a -> Ordering` passed in wherever a `Set` is constructed. Could that be useful in your case?