论文信息 - Polynomially Solvable Cases for the Maximum Stable Set Problem

Polynomially Solvable Cases for the Maximum Stable Set Problem

Abstract We describe two classes of graphs for which the stability number can be computed in polynomial time. The first approach is based on an iterative procedure which, at each step, builds from a graph G a new graph G′ which has fewer vertices and has the property that α(G′) = α(G) − 1. For the second class, it can be decided in polynomial time whether there exists a stable set of given size k.

Alain Hertz | A. Hertz

[1] Peter L. Hammer,et al. Stability in CAN-free graphs , 1985, J. Comb. Theory, Ser. B.

[2] Najiba Sbihi,et al. Algorithme de recherche d'un stable de cardinalite maximum dans un graphe sans etoile , 1980, Discret. Math..

[3] L. Lovász,et al. Polynomial Algorithms for Perfect Graphs , 1984 .

[4] Peter L. Hammer,et al. The struction of a graph: Application toCN-free graphs , 1985, Comb..

[5] Caterina De Simone,et al. Stability Number of Bull- and Chair-Free Graphs , 1993, Discret. Appl. Math..

[6] Fred Glover,et al. Tabu Search - Part II , 1989, INFORMS J. Comput..

[7] P. Hammer,et al. Pseudo-Boolean functions and stability of graphs , 1984 .

[8] A. Hertz. Some uses of struction , 1986 .

[9] Alain Hertz,et al. On the stability number of AH-free graphs , 1993, J. Graph Theory.

[10] David S. Johnson,et al. Computers and Intractability: A Guide to the Theory of NP-Completeness , 1978 .