Go to DBLP homepageStability, Vertex Stability, and Unfrozenness for Special Graph Classes
Abstract: Frei et al. (J. Comput. Syst. Sci. 123, 103–121, 2022) show that the stability, vertex stability, and unfrozenness problems with respect to certain graph parameters are complete for \(\varvec{\Theta _{2}^{\textrm{P}}}\), the class of problems solvable in polynomial time by parallel access to an NP oracle. They studied the common graph parameters \(\varvec{\alpha }\) (the independence number), \(\varvec{\beta }\) (the vertex cover number), \(\varvec{\omega }\) (the clique number), and \(\varvec{\chi }\) (the chromatic number). We complement their approach by providing polynomial-time algorithms solving these problems for special graph classes, namely for graphs with bounded tree-width or bounded clique-width. In order to improve these general time bounds even further, we then focus on trees, forests, bipartite graphs, and co-graphs.
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