Rainbow Hamilton cycle in hypergraph system

Abstract

In this paper, we develop a new rainbow Hamilton framework, which is of independent interest, settling the problem proposed by Gupta, Hamann, M\"uyesser, Parczyk, and Sgueglia when k=3, and draw the general conclusion for any k≥3 as follows. A k-graph system H=\Hi\i∈[n] is a family of not necessarily distinct k-graphs on the same n-vertex set V, moreover, a k-graph H on V is rainbow if E(H)⊂eq i∈[n]E(Hi) and |E(H) E(Hi)|≤1 for i∈[n]. We show that given γ> 0, sufficiently large n and an n-vertex k-graph system H=\Hi\i∈[n] , if δk-2(Hi)≥(5/9+γ)n2 for i∈[n] where k≥3, then there exists a rainbow tight Hamilton cycle. This result implies the conclusion in a single graph, which was proved by Lang and Sanhueza-Matamala [J. Lond. Math. Soc., 2022], Polcyn, Reiher, R\"odl and Sch\"ulke [J. Combin. Theory \ Ser. B, 2021] independently.