On the Broadcast Independence Number of Circulant Graphs

Abstract

An independent broadcast on a graph G is a function f: V \0,…, diam(G)\ such that (i) f(v)≤ e(v) for every vertex v∈ V(G), where diam(G) denotes the diameter of G and e(v) the eccentricity of vertex v, and (ii) d(u,v) > \f(u), f(v)\ for every two distinct vertices u and v with f(u)f(v)>0. The broadcast independence number βb(G) of G is then the maximum value of Σv ∈ V f(v), taken over all independent broadcasts on G. We prove that every circulant graph of the form C(n;1,a), 3 a n2 , admits an optimal 2-bounded independent broadcast, that is, an independent broadcast~f satisfying f(v) 2 for every vertex v, except when n=2a+1, or n=2a and a is even. We then determine the broadcast independence number of various classes of such circulant graphs, and prove that, for most of these classes, the equality βb(C(n;1,a)) = α(C(n;1,a)) holds, where α(C(n;1,a)) denotes the independence number of C(n;1,a).