Counting edges in factorization graphs of numerical semigroup elements

Abstract

A numerical semigroup S is an additively-closed set of non-negative integers, and a factorization of an element n of S is an expression of n as a sum of generators of S. It is known that for a given numerical semigroup S, the number of factorizations of n coincides with a quasipolynomial (that is, a polynomial whose coefficients are periodic functions of n). One of the standard methods for computing certain semigroup-theoretic invariants involves assembling a graph or simplicial complex derived from the factorizations of n. In this paper, we prove that for two such graphs (which we call the factorization support graph and the trade graph), the number of edges coincides with a quasipolynomial function of n, and identify the degree, period, and leading coefficient of each. In the process, we uncover a surprising geometric connection: a combinatorially-assembled cubical complex that is homeomorphic to real projective space.