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I would like to define a parameterized class called ExtendedNumber which would take some form of whole number such as Int or Byte and extend it so as to include infinity, -infinity and null. In particular, I'd like to use MaxValue to represent infinity. If MaxValue was a static member, I believe I could do something like this:

class ExtendedNumber[T <: {val MaxValue : T}] {
  val infinity = T.MaxValue
  ...
}

However, since MaxValue is defined in the companion object, I believe I need to put a type constraint on the companion object. Is this possible? I'm also open to other solutions of the general problem.

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I don't believe you can directly constrain a companion object since companions are not really a part of the type system but rather a relaxation of the access rules when certain lexical relationship holds between a class and an object. Companions are also reflected in the implicit resolution rules and it's conceivable, I guess, that you could hook in to that somehow. But I'd look at using a context bound to convey the value bearing the infinity, -infinity etc. values (possibly a zero, as well) to ExtendedNumber. –  Randall Schulz Feb 25 '13 at 15:56

1 Answer 1

The general solution is to add a type class, for example:

trait ExtendedNumber[T] {
  def infinity: T
}

implicit object extendedInt extends ExtendedNumber[Int] {
  def infinity = Int.MaxValue
}

def foo[T](v: T)(implicit en: ExtendedNumber[T]) = v == en.infinity
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