On some counting problems for semi-linear sets

Abstract

Let X be a subset of t or t. We can associate with X a function GX:t which returns, for every (n1, ..., nt)∈ t, the number GX(n1, ..., nt) of all vectors x∈ X such that, for every i=1,..., t, |xi| ≤ ni. This function is called the growth function of X. The main result of this paper is that the growth function of a semi-linear set of t or t is a box spline. By using this result and some theorems on semi-linear sets, we give a new proof of combinatorial flavour of a well-known theorem by Dahmen and Micchelli on the counting function of a system of Diophantine linear equations.