An equivalent formulation of chromatic quasi-polynomials

Abstract

Given a central integral arrangement, the reduction of the arrangement modulo positive integers q gives rise to a subgroup arrangement in (Z/qZ). Kamiya-Takemura-Terao (2008) introduced the notion of characteristic quasi-polynomials, which uses to evaluate the cardinality of the complement of the subgroup arrangement. Chen-Wang (2012) found a similar but more general setting that replacing the integral arrangement by its restriction to a subspace of R, and evaluating the cardinality of the q-reduction complement will also lead to a quasi-polynomial in q. On an independent study, Br\"and\'en-Moci (2014) defined the so-called chromatic quasi-polynomial, and initiated the study of q-colorings on a finite list of elements in a finitely generated abelian group. The main purpose of this paper is to verify that the Chen-Wang's quasi-polynomial and the Br\"and\'en-Moci's chromatic quasi-polynomial are equivalent in the sense that the quasi-polynomials enumerate the cardinalities of isomorphic sets.