D-Antimagic Labelings on Oriented Linear Forests

Abstract

Let G be an oriented graph with the vertex set V(G) and the arc set A(G). Suppose that D⊂eq \0,1,…,∂ \ is a distance set where ∂= \d(u,v)<∞|u,v∈ V(G)\. Given a bijection h:V(G) →\1,2,…,|V(G)|\, the D-weight of a vertex v∈ V(G) is defined as ωD(v)=Σu∈ ND(v)h(u), where ND(v)=\u∈ V|d(v,u)∈ D\. A bijection h is called a D-antimagic labeling if for every pair of distinct vertices x and y, ωD(x) ωD(y). An oriented graph G is called D-antimagic if it admits such a labeling. In addition to introducing the notion of D-antimagic labeling for oriented graphs, we investigate some properties of D-antimagic oriented graphs. In particular, we study D-antimagic linear forests for some D. We characterize D-antimagic paths where 1 ∈ D, n-1∈ D, or \0,n-2\⊂ D. We characterize distance antimagic trees and forests. We conclude by constructing D-antimagic labelings on oriented linear forests.