On splitting infinite-fold covers
Combinatorics
2009-11-17 v1 Logic
Abstract
Let be a set, be a cardinal number and let be a family of subsets of which covers each at least times. What assumptions can ensure that can be decomposed into many disjoint subcovers? We examine this problem under various assumptions on the set and on the cover : among other situations, we consider covers of topological spaces by closed sets, interval covers of linearly ordered sets and covers of by polyhedra and by arbitrary convex sets. We focus on these problems mainly for infinite . Besides numerous positive and negative results, many questions turn out to be independent of the usual axioms of set theory.
Keywords
Cite
@article{arxiv.0911.2774,
title = {On splitting infinite-fold covers},
author = {Márton Elekes and Tamás Mátrai and Lajos Soukup},
journal= {arXiv preprint arXiv:0911.2774},
year = {2009}
}