The Complexity of the Proper Orientation Number

Abstract

Graph orientation is a well-studied area of graph theory. A proper orientation of a graph G = (V,E) is an orientation D of E(G) such that for every two adjacent vertices v and u , d-D(v) ≠ d-D(u) where dD-(v) is the number of edges with head v in D. The proper orientation number of G is defined as (G) = D∈ v∈ V(G) d-D(v) where is the set of proper orientations of G. We have (G)-1 ≤ (G)≤ (G) . We show that, it is NP -complete to decide whether (G)=2, for a given planar graph G. Also, we prove that there is a polynomial time algorithm for determining the proper orientation number of 3-regular graphs. In sharp contrast, we will prove that this problem is NP -hard for 4-regular graphs.