This is a terminological question, which makes it hard to ask!

Let me give an example. Suppose I am writing a symbolic-differentiation algorithm. I have an abstract class Exp that is a superclass of a bunch of expression types (sums, integrals, whatever). There is an abstract method derivative such that e.derivative() is supposed to be the derivative of the expression e. All the concrete subclasses of Exp (imagine a whole hierarchy here) implement a derivative method that captures knowledge of how to differentiate expressions of that type. A given method will typically compute the derivative of an expression by combining derivatives of subexpressions.

The details of the example are not important. The important thing is that all of these scattered methods can be considered pieces of one (recursive) algorithm. This is not true of all methods, but it's true of many of them (and the use of overloading to reuse the same method name for fundamentally different operations is considered a Bad Idea). The question is, what is the term for 'derivative,' considered as a single function? It's not a method; in another language it would be a function, and the various clauses (what to do with sums, what to do with integrals) would be in the same place. I don't care which approach or languaage is better, or whether that style can be used in Java. I just want to know what term to use for 'derivative' considered as a single function or procedure (the idea is not limited to functional programming, nor is recursion a key feature). When I tell someone what I did today, I'd like to say "I tried to implement a symbolic-differentation **__**, but every algorithm I thought of didn't work." What goes in the blank?

I assume the same issue comes up for other OO languages, but Java is the one I'm most familiar with. I'm so familiar with it that I'm pretty sure there is no standard term, but I thought I would ask our fine battery of experts here before jumping to that conclusion.