Adjacency and Broadcast Dimension of Grid and Directed Graphs

Abstract

Let G be a simple undirected graph. A function f : V(G) Z≥ 0 is a resolving broadcast of G if for any distinct x, y ∈ V(G), there exists a vertex z ∈ V(G) with f(z) > 0 such that \ d(z, x), f(z)+1 \ ≠ \ d(z, y), f(z)+1 \. The broadcast dimension bdim(G) of G is the minimum of Σv ∈ V(G) f(v) over all resolving broadcasts f of G. Similarly, the adjacency dimension adim(G) of G is the minimum of Σv ∈ V(G) f(v) over all resolving broadcasts f of G where f takes values in \0,1\. These parameters are defined analogously for directed graphs by considering directed distances. We partially resolve a question of Zhang by obtaining precise bounds for the adjacency dimension of certain Cartesian products of path graphs, namely adim(P2 Pn) and adim(P3 Pn). Additionally, we study the behavior of adjacency and broadcast dimension on directed graphs. First, we explicitly calculate the adjacency dimension of a directed complete k-ary tree, where every edge is directed towards the leaves. Next, we prove that adim(G) = bdim(G) for some particular directed trees G. Furthermore, we show that bdim(G) can be as large as an exponential function of bdim(G) or as small as a logarithmic function of bdim(G).