Line k-Arboricity in Product Networks

Abstract

A linear k-forest is a forest whose components are paths of length at most k. The linear k-arboricity of a graph G, denoted by lak(G), is the least number of linear k-forests needed to decompose G. Recently, Zuo, He and Xue studied the exact values of the linear (n-1)-arboricity of Cartesian products of various combinations of complete graphs, cycles, complete multipartite graphs. In this paper, for general k we show that \ lak(G), la(H)\≤ la\k,\(G H)≤ lak(G)+ la(H) for any two graphs G and H. Denote by G H, G× H and G H the lexicographic product, direct product and strong product of two graphs G and H, respectively. We also derive upper and lower bounds of lak(G H), lak(G× H) and lak(G H) in this paper. The linear k-arboricity of a 2-dimensional grid graph, a r-dimensional mesh, a r-dimensional torus, a r-dimensional generalized hypercube and a 2-dimensional hyper Petersen network are also studied.