English

On some counting problems for semi-linear sets

Discrete Mathematics 2009-07-20 v1 Formal Languages and Automata Theory

Abstract

Let XX be a subset of Nt\N^t or Zt\Z^t. We can associate with XX a function GX:NtN{\cal G}_X:\N^t\longrightarrow\N which returns, for every (n1,...,nt)Nt(n_1, ..., n_t)\in \N^t, the number GX(n1,...,nt){\cal G}_X(n_1, ..., n_t) of all vectors xXx\in X such that, for every i=1,...,t,xinii=1,..., t, |x_{i}| \leq n_{i}. This function is called the {\em growth function} of XX. The main result of this paper is that the growth function of a semi-linear set of Nt\N^t or Zt\Z^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.

Cite

@article{arxiv.0907.3005,
  title  = {On some counting problems for semi-linear sets},
  author = {Flavio D'Alessandro and Benedetto Intrigila and Stefano Varricchio},
  journal= {arXiv preprint arXiv:0907.3005},
  year   = {2009}
}

Comments

34 pages

R2 v1 2026-06-21T13:26:00.874Z