Smallest Domination Number and Largest Independence Number of Graphs and Forests with given Degree Sequence

Abstract

For a sequence d of non-negative integers, let G(d) and F(d) be the sets of all graphs and forests with degree sequence d, respectively. Let γ(d)=\ γ(G):G∈ G(d)\, α(d)=\ α(G):G∈ G(d)\, γ F(d)=\ γ(F):F∈ F(d)\, and α F(d)=\ α(F):F∈ F(d)\ where γ(G) is the domination number and α(G) is the independence number of a graph G. Adapting results of Havel and Hakimi, Rao showed in 1979 that α(d) can be determined in polynomial time. We establish the existence of realizations G∈ G(d) with γ(d)=γ(G), and Fγ,Fα∈ F(d) with γ F(d)=γ(Fγ) and α F(d)=α(Fα) that have strong structural properties. This leads to an efficient algorithm to determine γ(d) for every given degree sequence d with bounded entries as well as closed formulas for γ F(d) and α F(d).