Converting a type level natural number into a regular number

I'm trying to get the hang of type level natural numbers with a simple example of implementing a dot product. I represent the dot product like this:

``````data DotP (n::Nat) = DotP [Int]
deriving Show
``````

Now, I can create a monoid instance (where `mappend` is the actual dot product) for each individual size of the dot product like this:

``````instance Monoid (DotP 0) where
mempty                      = DotP \$ replicate 0 0
mappend (DotP xs) (DotP ys) = DotP \$ zipWith (*) xs ys

instance Monoid (DotP 1) where
mempty                      = DotP \$ replicate 1 0
mappend (DotP xs) (DotP ys) = DotP \$ zipWith (*) xs ys

instance Monoid (DotP 2) where
mempty                      = DotP \$ replicate 2 0
mappend (DotP xs) (DotP ys) = DotP \$ zipWith (*) xs ys
``````

But I want to define a much more general instance like this:

``````instance Monoid (DotP n) where
mempty                      = DotP \$ replicate n 0
mappend (DotP xs) (DotP ys) = DotP \$ zipWith (*) xs ys
``````

I'm not sure how to convert the type's number into a regular number that I can work with inside the mempty function.

Edit: It would also be cool to have a function `dotplength :: (DotP n) -> n` that ran in time O(1) by just looking up what type it is, rather than having to traverse the whole list.

-

To get the `Integer` corresponding to the type level natural `n`, you can use

``````fromSing (sing :: Sing n) :: Integer
``````

After fiddling around a bit, I got this to compile:

``````{-# LANGUAGE DataKinds, KindSignatures, ScopedTypeVariables #-}

import Data.Monoid
import GHC.TypeLits

data DotP (n :: Nat) = DotP [Int]
deriving Show

instance SingI n => Monoid (DotP n) where
mempty = DotP \$ replicate (fromInteger k) 0
where k = fromSing (sing :: Sing n)

mappend (DotP xs) (DotP ys) = DotP \$ zipWith (*) xs ys

dotplength :: forall n. SingI n => DotP n -> Integer
dotplength _ = fromSing (sing :: Sing n)
``````
-
I didn't realize ScopedTypeVariables was a thing. That makes things so much easier :) – Mike Izbicki Oct 17 '12 at 0:38