Grundy domination and zero forcing in regular graphs

Abstract

Given a finite graph G, the maximum length of a sequence (v1,…,vk) of vertices in G such that each vi dominates a vertex that is not dominated by any vertex in \v1,…,vi-1\ is called the Grundy domination number, γ gr(G), of G. A small modification of the definition yields the Z-Grundy domination number, which is the dual invariant of the well-known zero forcing number. In this paper, we prove that γ gr(G) ≥ n + k2 - 2k-1 holds for every connected k-regular graph of order n different from Kk+1 and 2C4. The bound in the case k=3 reduces to γ gr(G) ≥ n2, and we characterize the connected cubic graphs with γ gr(G)=n2. If G is different from K4 and K3,3, then n2 is also an upper bound for the zero forcing number of a connected cubic graph, and we characterize the connected cubic graphs attaining this bound.