Packing tight Hamilton cycles in 3-uniform hypergraphs

Abstract

Let H be a 3-uniform hypergraph with N vertices. A tight Hamilton cycle C ⊂ H is a collection of N edges for which there is an ordering of the vertices v1, ..., vN such that every triple of consecutive vertices vi, vi+1, vi+2 is an edge of C (indices are considered modulo N). We develop new techniques which enable us to prove that under certain natural pseudo-random conditions, almost all edges of H can be covered by edge-disjoint tight Hamilton cycles, for N divisible by 4. Consequently, we derive the corollary that random 3-uniform hypergraphs can be almost completely packed with tight Hamilton cycles w.h.p., for N divisible by 4 and P not too small. Along the way, we develop a similar result for packing Hamilton cycles in pseudo-random digraphs with even numbers of vertices.