# What is the correct way to define an already existing (e.g. in Prelude) operator between a user-defined type and an existing type?

Suppose I have a custom type wrapping an existing type,

``````newtype T = T Int deriving Show
``````

and suppose I want to be able to add up `T`s, and that adding them up should result in adding the wrapped values up; I would do this via

``````instance Num T where
(T t1) + (T t2) = T (t1 + t2)
-- all other Num's methods = undefined
``````

I think we are good so far. Please, tell me if there are major concerns up to this point.

Now let's suppose that I want to be able to multiply a `T` by an `Int` and that the result should be a `T` whose wrapping value is the former multiplied by the int; I would go for something like this:

``````instance Num T where
(T t1) + (T t2) = T (t1 + t2)
(T t) * k = T (t * k)
-- all other Num's methods = undefined
``````

which obviously doesn't work because `class Num` declares `(*) :: a -> a -> a`, thus requiring the two operands (and the result) to be all of the same type.

Even defining `(*)` as a free function poses a similar problem (i.e. `(*)` exists already in `Prelude`).

How could I deal with this?

As for the why of this question, I can device the following

• in my program I want to use `(Int,Int)` for 2D vectors in a cartesian plane,
• but I also use `(Int,Int)` for another unrelated thing,
• therefore I have to disambiguate between the two, by using a `newtype` for at least one of them or, if use `(Int,Int)` for several other reasons, then why not making all of them `newtype`s wrapping `(Int,Int)`?
• since `newtype Vec2D = Vec2D (Int,Int)` represents a vector in the plain, it makes sense to be able to do `Vec2D (2,3) * 4 == Vec2D (8,12)`.

Very similar examples have been asked often already, and the answer is that this is not a number type and therefore should not have a `Num` instance. What it actually is is a vector space type, accordingly you should define instead

``````{-# LANGUAGE TypeFamilies #-}

import Data.VectorSpace

newtype T = T Int deriving Show

instance AdditiveGroup T where
T t1 ^+^ T t2 = T \$ t1 + t2
zeroV = T 0
negateV (T t) = T \$ -t

instance VectorSpace T where
type Scalar T = Int
k *^ T t = T \$ k * t
``````

Then your `T -> Int -> T` operator is `^*`, which is simply `flip (*^)`.

That leads also to the more general what you should do when overloading a standard operator with a different meaning: just make it a separate definition. You don't even need to give it a different name, this can also be disambiguated using `qualified` module imports.

Just please don't instantiate classes incompletely, in particular not `Num`. This just leads to php-ish confusion when somebody uses a generic function with those types, it compiles just fine but then horribly breaks at runtime when the calling code expects `Num` semantics but the type fails to actually offer that.

• I'm fairly happy with this answer, but I have a follow-up question: I see that accepting that `T` being not a `Num`ber, and adopting your suggested solution, implies that `(T 3) * 3` cannot (probably should not, based on what you write) be made meaningful because at least I have to use another symbol instead of `*`. Is this correct? Jan 9, 2021 at 10:15
• @Enlico If you really want to you can use the symbol `*`, but whether you do or don't use the same symbol it will be entirely unrelated to the existing one. But it's quite a pain to use two unrelated operators with the same name (you'd have to import the Prelude hiding `*` and then write things like `x Prelude.* y` to get to multiplication from `Num`, or do that with your operator). And normal number multiplication is pretty common, so that's not very convenient. So most people decide to simply give operators like this a different name that emphasizes the connection to the original, like `^*`.
– Ben
Jan 9, 2021 at 12:20
• @Enlico Worth noting, however, that it in no way makes your new type compatible with the existing operator (anyone else who imports your type won't be able to use `*` with it; they'll have to also hide the Prelude's `*` and import your new operator). I've played around with this sort of thing before, and ended up concluding that since Prelude's `*` is fundamentally a different operation from the one I wanted, it's actually nicer to just use a different symbol for it.
– Ben
Jan 9, 2021 at 22:07
• @Ben yeah, I'm getting to the same conclusion. No need for another answer, I guess, as it would express a similar idea as this one. Jan 9, 2021 at 22:09
• @Ben I've toyed around with “one to ring to rule them all” (pun semi-intended) multiplication operators as well. You can actually get quite close with a “tensor quotient” type family. The `·` operator subsumes numerical, vector-scaling, and inner-product multiplication, however it's still awkward to use in practice because one of the arguments is a type family that can only be inferred from the other argument and the computation result. Jan 9, 2021 at 23:10