On the existence of Hamiltonian cycles in hypercubes

Abstract

Building on the results of our previous work on Euclidean leaper tours, considering all integers k>1 and h>0, we study the existence of Hamiltonian cycles in the vertex set C(2,k):=\0,1\k of the k-dimensional hypercube when the Euclidean distance between consecutive vertices is fixed. Since the distance between two vertices of C(2,k) is h for some integer h, the problem amounts to determining for which integers k and h there exists a Hamiltonian cycle whose associated Euclidean distance is h. In this paper, we prove that such cycles exist if and only if h is odd and 1 ≤ h ≤ k-1. As a result, for all integers a ≥ 0, b ≥ a with b>0, we provide a necessary and sufficient condition for the existence of closed Euclidean (a,b)-leaper tours on 2 × 2 × ·s × 2 chessboards, where the associated distance equals a2+b2.