Semi-perfect 1-Factorizations of the Hypercube

Abstract

A 1-factorization M = \M1,M2,…,Mn\ of a graph G is called perfect if the union of any pair of 1-factors Mi, Mj with i j is a Hamilton cycle. It is called k-semi-perfect if the union of any pair of 1-factors Mi, Mj with 1 i k and k+1 j n is a Hamilton cycle. We consider 1-factorizations of the discrete cube Qd. There is no perfect 1-factorization of Qd, but it was previously shown that there is a 1-semi-perfect 1-factorization of Qd for all d. Our main result is to prove that there is a k-semi-perfect 1-factorization of Qd for all k and all d, except for one possible exception when k=3 and d=6. This is, in some sense, best possible. We conclude with some questions concerning other generalisations of perfect 1-factorizations.