Hamiltonian paths and cycles in some 4-uniform hypergraphs

Abstract

In 1999, Katona and Kierstead conjectured that if a k-uniform hypergraph H on n vertices has minimum co-degree n-k+32, i.e., each set of k-1 vertices is contained in at least n-k+32 edges, then it has a Hamiltonian cycle. R\"odl, Ruci\'nski and Szemer\'edi in 2011 proved that the conjecture is true when k=3 and n is large. We show that this Katona-Kierstead conjecture holds if k=4, n is large, and V( H) has a partition A, B such that |A|= n/2, |\e∈ E( H):|e A|=2\| <ε n4 for a fixed small constant ε>0.