I was playing around with the FunctionalDependencies-Extension of Haskell, along with MultiParamTypeClasses. I defined the following:
class Add a b c | a b -> c where (~+) :: a -> b -> c (~-) :: a -> b -> c neg :: a -> a zero :: a
which works fine (I've tried with instances for Int and Double with the ultimate goal of being able to add Int and Doubles without explicit conversion).
When I try to define default implementations for neg or (~-) like so:
class Add ... ... neg n = zero ~- n
GHCi (7.0.4) tells me the following:
Ambiguous type variables `a0', `b0', `c0' in the constraint: (Add a0 b0 c0) arising from a use of `zero' Probable fix: add a type signature that fixes these type variable(s) In the first argument of `(~-)', namely `zero' In the expression: zero ~- n In an equation for `neg': neg n = zero ~- n Ambiguous type variable `a0' in the constraint: (Add a0 a a) arising from a use of `~-' Probable fix: add a type signature that fixes these type variable(s) In the expression: zero ~- n In an equation for `neg': neg n = zero ~- n
I think I do understand the problem here. GHC does not know which zero to use, since it could be any zero yielding anything which in turn is fed into a
~- which we only know of, that it has an
a in it's right argument and yields an
So how can I specify that it should be the zero from the very same instance, i.e. how can I express something like:
neg n = (zero :: Add a b c) ~- n
I think the
c here are not the a b c form the surrounding class, but any a b and c, so how can I express a type which is a reference to the local type variables?