Antimagic orientations of disconnected even regular graphs

Abstract

A labeling of a digraph D with m arcs is a bijection from the set of arcs of D to \1,2,…,m\. A labeling of D is antimagic if no two vertices in D have the same vertex-sum, where the vertex-sum of a vertex u ∈ V(D) for a labeling is the sum of labels of all arcs entering u minus the sum of labels of all arcs leaving u. An antimagic orientation D of a graph G is antimagic if D has an antimagic labeling. Hefetz, Mutze and Schwartz in [J. Graph Theory 64(2010)219-232] raised the question: Does every graph admits an antimagic orientation? It had been proved that for any integer d, every 2d-regular graph with at most two odd components has an antimagic orientation. In this paper, we consider the 2d-regular graph with many odd components. We show that every 2d-regular graph with any odd components has an antimagic orientation provide each odd component with enough order.