On graph classes with constant domination-packing ratio
Abstract
The dominating number γ(G) of a graph G is the minimum size of a vertex set whose closed neighborhood covers all the vertices of the graph. The packing number (G) of G is the maximum size of a vertex set whose closed neighborhoods are pairwise disjoint. In this paper we study graph classes G such that γ(G)/(G) is bounded by a constant c G for each G∈ G. We propose an inductive proof technique to prove that if G is the class of 2-degenerate graphs, then there is such a constant bound c G. We note that this is the first monotone, dense graph class that is shown to have constant ratio. We also show that the classes of AT-free and unit-disk graphs have bounded ratio. In addition, our technique gives improved bounds on c G for planar graphs, graphs of bounded treewidth or bounded twin-width. Finally, we provide some new examples of graph classes where the ratio is unbounded.
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