Computing upper bounds for optimal density of (t,r) broadcasts on the infinite grid

Abstract

The domination number of a finite graph G with vertex set V is the cardinality of the smallest set S⊂eq V such that for every vertex v∈ V either v∈ S or v is adjacent to a vertex in S. A set S satisfying these conditions is called a dominating set. In 2015 Blessing, Insko, Johnson, and Mauretour introduced (t,r) broadcast domination, a generalization of graph domination parameterized by the nonnegative integers t and r. In this setting, we say that the signal a vertex v∈ V receives from a tower of strength t located at vertex T is defined by sig(v,T)=max(t-dist(v,T),0). Then a (t,r) broadcast dominating set on G is a set S⊂eq V such that the sum of all signal received at each vertex v ∈ V is at least r. In this paper, we consider (t,r) broadcasts of the infinite grid and present a Python program to compute upper bounds on the minimal density of a (t,r) broadcast on the infinite grid. These upper bounds allow us to construct counterexamples to a conjecture by Blessing et al. that the (t,r) and (t+1, r+2) broadcasts are equal whenever t,r≥ 1.