Lower Bounds for the Exponential Domination Number of Cm × Cn

Abstract

A vertex v in a porous exponential dominating set assigns weight (12)dist(v,u) to vertex u. A porous exponential dominating set of a graph G is a subset of V(G) such that every vertex in V(G) has been assigned a sum weight of at least 1. In this paper the porous exponential dominating number, denoted by γe*(G), for the graph G = Cm × Cn is discussed. Anderson et. al. proved that mn15.875 γe*(Cm × Cn) mn13 and conjectured that mn13 is also the asymptotic lower bound. We use a linear programing approach to sharpen the lower bound to mn13.7619 + ε(m,n).