Hamiltonian cycles and paths in hypercubes with disjoint faulty edges

Abstract

We consider hypercubes with pairwise disjoint faulty edges. An n-dimensional hypercube Qn is an undirected graph with 2n nodes, each labeled with a distinct binary strings of length n. The parity of the vertex is 0 if the number of ones in its labels is even, and is 1 if the number of ones is odd. Two vertices a and b are connected by the edge iff a and b differ in one position. If a and b differ in position i, then we say that the edge (a,b) goes in direction i and we define the parity of the edge as the parity of the end with 0 on the position i. It was already known that Qn is not Hamiltonian if all edges going in one direction and of the same parity are faulty. In this paper we show that if n4 then all other hypercubes are Hamiltonian. In other words, every cube Qn, with n4 and disjoint faulty edges is Hamiltonian if and only if for each direction there are two healthy crossing edges of different parity.