Path coverings with prescribed ends in faulty hypercubes

Abstract

We discuss the existence of vertex disjoint path coverings with prescribed ends for the n-dimensional hypercube with or without deleted vertices. Depending on the type of the set of deleted vertices and desired properties of the path coverings we establish the minimal integer m such that for every n m such path coverings exist. Using some of these results, for k 4, we prove Locke's conjecture that a hypercube with k deleted vertices of each parity is Hamiltonian if n k +2. Some of our lemmas substantially generalize known results of I. Havel and T. Dvor\'ak. At the end of the paper we formulate some conjectures supported by our results.