New bounds on even cycle creating Hamiltonian paths using expander graphs

Abstract

We say that two graphs on the same vertex set are G-creating if their union (the union of their edges) contains G as a subgraph. Let Hn(G) be the maximum number of pairwise G-creating Hamiltonian paths of Kn. Cohen, Fachini and K\"orner proved \[n12n-o(n)≤ Hn(C4) ≤ n34n+o(n).\] In this paper we close the superexponential gap between their lower and upper bounds by proving \[n12n-12nn-O(1)≤ Hn(C4) ≤ n12n+o(nn ).\] We also improve the previously established upper bounds on Hn(C2k) for k>3, and we present a small improvement on the lower bound of F\"uredi, Kantor, Monti and Sinaimeri on the maximum number of so-called pairwise reversing permutations. One of our main tools is a theorem of Krivelevich, which roughly states that (certain kinds of) good expanders contain many Hamiltonian paths.