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data Vector a = Vector a a a deriving (Eq, Show)

instance Functor Vector where
    fmap f (Vector x y z) = Vector (f x) (f y) (f z)

So far so good.

instance Num ((Num a) => Vector a) where
    negate = fmap negate

Doesn't work. I tried many different variations on that first line but GHC keeps complaining. I want to make a Vector containing numbers an instance of Num; surely this should be possible? Otherwise I would have to make an instance for Int, Integer, Float, Double, etc. all with the same definition.

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2 Answers 2

up vote 8 down vote accepted
instance Num a => Num (Vector a) where
   negate = fmap negate

Consider writing other methods too.

(You can write deriving (Eq, Show, Functor) if you turn on -XDeriveFunctor.)

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So it was just the syntax I hadn't got right—Thanks, I should have figured this one out myself… I thought I had already tried that, evidently not. –  Mk12 May 18 '12 at 0:16
If you're doing guess and check then you've probably gone beyond the point of productivity. Finding a solid reference would be a huge time saver. –  Thomas M. DuBuisson May 18 '12 at 1:55
@Mk12, and example of a solid reference for typeclasses is the appropriate section of LYAH, and also that of RWH. –  huon-dbaupp May 18 '12 at 11:52
@ThomasM.DuBuisson: You're right. I think I had tried this first, but I was mising the parentheses, and for some reason I was thinking that you couldn't do this so I was going to ask here to make sure. –  Mk12 May 18 '12 at 20:12
@dbaupp: Thanks, I'm still working my way through LYAH. –  Mk12 May 18 '12 at 20:13

It is probably a bad idea to make Vector an instance of Num. Here's the declaration of Num:

class Num a where
  (+) :: a -> a -> a
  (*) :: a -> a -> a
  (-) :: a -> a -> a
  negate :: a -> a
  abs :: a -> a
  signum :: a -> a
  fromInteger :: Integer -> a

+ and - and negate are no problem. One can define * as cross product, but only for 3-vectors, and this is really stretching it. abs, signum and fromInteger have no meaningful definitions.

In short, it is possible to shoehorn Vector into Num, but the result is not nice.

You may want to explore alternative type class hierarchies which replace the standard Prelude ones, e.g. the Numeric prelude.

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Of course, one could make (*) and the other ones lexicographic just like (+) and (-). Then negate is equivalent to (-1 *) –  Thomas Eding May 18 '12 at 19:30
Of course you can define these operations somehow (everything results in a zero-vector, for example). The point is to come up with useful definitions. Component-wise * is not useful for vectors (as in, components of a vector-space). –  n.m. May 18 '12 at 20:02
(+) and (-) can be defined for Vectors. I don't think it's a stretch to implement negate and abs as a simple component mapping. This seems more practical to me than defining ugly operators like <+> and functions like vnegate; is there a better solution? Is using Num only bad in that it's not completely semantically meaninful? I'll take a look at Numeric prelude, but I wouldn't have thought it would be this hard to elegantly implement vectors in Haskell. –  Mk12 May 18 '12 at 20:38
negate is OK, as it is just multiplication by scalar (-1). abs is dubious, there's no meaningful vector-space operator that corresponds to it. OK so you can define abs in any way you want, it does not have to be meaningful. But no matter what you do, you simply cannot make (*) denote the vector-by-scalar multiplication. This is, in my opinion, the reason to not bother with shoehorning vectors into Num. –  n.m. May 18 '12 at 20:53
Yes, I see what you mean… I'm wondering, if I'm not going to be instancing Num anyway, if maybe I should just make things a lot simpler and represent Vectors as Num a => [a] rather than making a new type. –  Mk12 May 18 '12 at 21:06

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