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1998

Upper domination and upper irredundance perfect graphs

14 years 9 days ago
Upper domination and upper irredundance perfect graphs
Let β(G), Γ(G) and IR(G) be the independence number, the upper domination number and the upper irredundance number, respectively. A graph G is called Γperfect if β(H) = Γ(H), for every induced subgraph H of G. A graph G is called IR-perfect if Γ(H) = IR(H), for every induced subgraph H of G. In this paper, we present a characterization of Γ-perfect graphs in terms of some family of forbidden induced subgraphs, and show that the class of Γ-perfect graphs is a subclass of IR-perfect graphs and that the class of absorbantly perfect graphs is a subclass of Γ-perfect graphs. These results imply a number of known theorems on Γ-perfect graphs and IR-perfect graphs. Moreover, we prove a sufficient condition for a graph to be Γ-perfect and IR-perfect which improves a known analogous result. Discrete Math. 190 (1998), 95–105
Gregory Gutin, Vadim E. Zverovich
Added 22 Dec 2010
Updated 22 Dec 2010
Type Journal
Year 1998
Where DM
Authors Gregory Gutin, Vadim E. Zverovich
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