The Undirected Optical Indices of Trees

Abstract

For a connected graph G, an instance I is a set of pairs of vertices and a corresponding routing R is a set of paths specified for all vertex-pairs in I. Let RI be the collection of all routings with respect to I. The undirected optical index of G with respect to I refers to the minimum integer k to guarantee the existence of a mapping φ:R\1,2,…,k\, such that φ(P)≠φ(P') if P and P' have common edge(s), over all routings R∈RI. A natural lower bound of the undirected optical index is the edge-forwarding index, which is defined to be the minimum of the maximum edge-load over all possible routings. Let w(G,I) and π(G,I) denote the undirected optical index and edge-forwarding index with respect to I, respectively. In this paper, we derive the inequality w(T,IA)<32π(T,IA) for any tree T, where IA:=\\x,y\:\,x,y∈ V(T)\ is the all-to-all instance.