A Highly Symmetric Hamilton Decomposition for Hypercubes

Abstract

A Hamilton decomposition of a graph is a partitioning of its edge set into disjoint spanning cycles. The existence of such decompositions is known for all hypercubes of even dimension 2n. We give a decomposition for the case n = 2a3b that is highly symmetric in the sense that every cycle can be derived from every other cycle just by permuting the axes. We conjecture that a similar decomposition exists for every n.