Dominating and Irredundant Broadcasts in Graphs

Abstract

A broadcast on a nontrivial connected graph G=(V,E) is a function f from V(G) to 0,1,...,diam(G) such that f(v) does not exceed the eccentricity of v. The cost of f is the sum of the function values. A broadcast f is dominating if each vertex of G is at distance at most f(v) from a vertex v with positive f(v). We use properties of minimal dominating broadcasts to define the concept of an irredundant broadcast on G. We determine conditions under which an irredundant broadcast is maximal irredundant. Denoting the minimum costs of dominating and maximal irredundant broadcasts by gammab(G) and irb(G) respectively, the definitions imply that irb(G) is bounded above by gammab(G) for all graphs. We show that gammab in turn is bounded above by (5/4)irb(G) for all graphs G. We also briefly consider the upper broadcast number Gammab(G) and upper irredundant broadcast number IRb(G), and illustrate that the ratio IRb to Gammab is unbounded for general graphs.