Generalized Borsuk Graphs
Abstract
Given a finite group acting freely on a compact metric space , and , we define the -Borsuk graph on by drawing edges whenever there is a non-identity such that . We show that when is small, its chromatic number is determined by the topology of via its -covering number, which is the minimum such that there is a closed cover with for all . We are interested in bounding this number. We give lower bounds using -actions on Hom-complexes, and upper bounds using a recursive formula on the dimension of . We conjecture that the true chromatic number coincides with the lower bound, and give computational evidence. We also study random -Borsuk graphs, which are random induced subgraphs. For these, we compute thresholds for that guarantee that the chromatic number is still that of the whole -Borsuk graph. Our results are tight (up to a constant) when the -index and dimension of coincide.
Keywords
Cite
@article{arxiv.2110.06453,
title = {Generalized Borsuk Graphs},
author = {Francisco Martinez-Figueroa},
journal= {arXiv preprint arXiv:2110.06453},
year = {2024}
}
Comments
28 pages, 1 figure, 1 table