Counting Hamilton cycles in Dirac hypergraphs

Abstract

A tight Hamilton cycle in a k-uniform hypergraph (k-graph) G is a cyclic ordering of the vertices of G such that every set of k consecutive vertices in the ordering forms an edge. R\"odl, Ruci\'nski, and Szemer\'edi proved that for k≥ 3, every k-graph on n vertices with minimum codegree at least n/2+o(n) contains a tight Hamilton cycle. We show that the number of tight Hamilton cycles in such k-graphs is (n n-(n)). As a corollary, we obtain a similar estimate on the number of Hamilton -cycles in such k-graphs for all ∈\0,…,k-1\, which makes progress on a question of Ferber, Krivelevich and Sudakov.