# Hilbert polynomials in two variables with Macaulay2

In J. Symb. Comput. (1999) 28, 681-710, Levin worked with bifiltered, finitely generated $$R$$-modules ($$R$$ being a polynomial ring in two sets of variables) and he found an analogue of the Hilbert polynomial in two variables.

So, is it possible to compute or to do computations with Hilbert polynomials in two variables using Macaulay2?