(t,r) broadcast domination in the infinite grid

Abstract

The (t,r) broadcast domination number of a graph G, γt,r(G), is a generalization of the domination number of a graph. γt,r(G) is the minimal number of towers needed, placed on vertices of G, each transmitting a signal of strength t which decays linearly, such that every vertex receives a total amount of at least r signal. In this paper we prove a conjecture by Drews, Harris, and Randolph about the minimal density of towers in Z2 that provide a (t,3) domination broadcast for t>17 and explore generalizations. Additionally, we determine the (t,r) broadcast domination number of powers of paths, Pn(k) and powers of cycles, Cn(k).