Bounds on the Exponential Domination Number

Abstract

As a natural variant of domination in graphs, Dankelmann et al. [Domination with exponential decay, Discrete Math. 309 (2009) 5877-5883] introduce exponential domination, where vertices are considered to have some dominating power that decreases exponentially with the distance, and the dominated vertices have to accumulate a sufficient amount of this power emanating from the dominating vertices. More precisely, if S is a set of vertices of a graph G, then S is an exponential dominating set of G if Σv∈ S(12) dist(G,S)(u,v)-1≥ 1 for every vertex u in V(G) S, where dist(G,S)(u,v) is the distance between u∈ V(G) S and v∈ S in the graph G-(S \ v\). The exponential domination number γe(G) of G is the minimum order of an exponential dominating set of G. Dankelmann et al. show 14( d+2)≤ γe(G)≤ 25(n+2) for a connected graph G of order n and diameter d. We provide further bounds and in particular strengthen their upper bound. Specifically, for a connected graph G of order n, maximum degree at least 3, radius r at least 1, we show eqnarray* γe(G) & ≥ & (n13(-1)2)2(-1)+122(-1)+2(-1)+1,\\[3mm] γe(G) & ≤ & 22 r-2, and \\[3mm] γe(G) & ≤ & 43108(n+2). eqnarray*