Improved upper bounds on even-cycle creating Hamilton paths
Abstract
We study the function , the maximum number of Hamilton paths such that the union of any pair of them contains as a subgraph. We give upper bounds on this quantity for , improving results of Harcos and Solt\'esz, and we show that if a conjecture of Ustimenko is true then one additionally obtains improved upper bounds for all . {We also give bounds on and . In order to prove our results, we extend a theorem of Krivelevich which counts Hamilton cycles in -graphs to bipartite or irregular graphs, and then apply these results to generalized polygons and the constructions of Lubotzky-Phillips-Sarnak and F\"uredi.
Keywords
Cite
@article{arxiv.2304.02164,
title = {Improved upper bounds on even-cycle creating Hamilton paths},
author = {John Byrne and Michael Tait},
journal= {arXiv preprint arXiv:2304.02164},
year = {2023}
}
Comments
improved results: we now improve previous bounds for all even cycles of length at least 6. Additionally we discuss the cases corresponding to K_{2,3} and K_{2,4}