Integer packing sets form a well-quasi-ordering
Abstract
An integer packing set is a set of non-negative integer vectors with the property that, if a vector is in the set, then every non-negative integer vector with is in the set as well. Integer packing sets appear naturally in Integer Optimization. In fact, the set of integer points in any packing polyhedron is an integer packing set. The main result of this paper is that integer packing sets, ordered by inclusion, form a well-quasi-ordering. This result allows us to answer a question recently posed by Bodur et al. In fact, we prove that the k-aggregation closure of any packing polyhedron is again a packing polyhedron. The generality of our main result allows us to provide a generalization to non-polyhedral sets: The k-aggregation closure of any downset of is a packing polyhedron.
Cite
@article{arxiv.1911.12841,
title = {Integer packing sets form a well-quasi-ordering},
author = {Alberto Del Pia and Dion Gijswijt and Jeff Linderoth and Haoran Zhu},
journal= {arXiv preprint arXiv:1911.12841},
year = {2020}
}
Comments
8 pages