Loose Hamilton Cycles in Regular Hypergraphs

Abstract

We establish a relation between two uniform models of random k-graphs (for constant k 3) on n labeled vertices: H(n,m), the random k-graph with exactly m edges, and H(n,d), the random d-regular k-graph. By extending to k-graphs the switching technique of McKay and Wormald, we show that, for some range of d = d(n) and a constant c > 0, if m cnd, then one can couple H(n,m) and H(n,d) so that the latter contains the former with probability tending to one as n ∞. In view of known results on the existence of a loose Hamilton cycle in H(n,m), we conclude that H(n,d) contains a loose Hamilton cycle when n = o(d) (or just d C log n, if k = 3) and d = o(n1/2).