Improved Domination--Packing Bounds in Claw-Free Cubic Graphs and Unit Disk Graphs

Abstract

Given a graph G, the domination number γ(G) is the minimum cardinality of a dominating set in G, and the packing number ρ(G) is the maximum cardinality of a set of vertices that are pairwise at distance at least 3. The ratio between these parameters has been widely studied in several graph classes. It is known that γ(G) 2ρ(G) for claw-free subcubic graphs, up to finitely many exceptions, and that γ(G) 32ρ(G) for unit disk graphs. In this paper, we improve the latter bound by showing that γ(G) 16ρ(G) for a unit disk graph G. For the former bound, we show that it can be improved in the cubic bridgeless setting; more precisely, every bridgeless claw-free cubic graph G satisfies γ(G) 74ρ(G) + 56. These results are not tight. In fact, we give example of an infinite family of bridgeless cubic graphs G with γ(G) = 5ρ(G)/4 and an infnite family of unit disk graphs G in which γ(G) = 3ρ(G).