论文信息 - On Stable Cutsets in Line Graphs

On Stable Cutsets in Line Graphs

We answer a question of Brandstadt et al. by showing that deciding whether a line graph with maximum degree 5 has a stable cutset is NP-complete. Conversely, the existence of a stable cutset in a line graph with maximum degree at most 4 can be decided efficiently. The proof of our NP-completeness result is based on a refinement on a result due to Chvatal that recognizing decomposable graphs with maximum degree 4 is an NP-complete problem. Here, a graph is decomposable if its vertices can be colored red and blue in such a way that each color appears on at least one vertex but each vertex v has at most one neighbor having a different color from v. We also discuss some open problems on stable cutsets.

Van Bang Le | Bert Randerath | V. B. Le | B. Randerath

[1] Jean Fonlupt,et al. Stable Set Bonding in Perfect Graphs and Parity Graphs , 1993, J. Comb. Theory, Ser. B.

[2] Nick Roussopoulos,et al. A MAX{m, n} Algorithm for Determining the Graph H from Its Line Graph C , 1973, Inf. Process. Lett..

[3] Xingxing Yu,et al. A note on fragile graphs , 2002, Discret. Math..

[4] Philippe G. H. Lehot. An Optimal Algorithm to Detect a Line Graph and Output Its Root Graph , 1974, JACM.

[5] Feodor F. Dragan,et al. On stable cutsets in graphs , 2000, Discret. Appl. Math..

[6] Alan Tucker. Coloring graphs with stable cutsets , 1983, J. Comb. Theory, Ser. B.

[7] Vasek Chvátal,et al. Recognizing decomposable graphs , 1984, J. Graph Theory.

[8] Robert E. Tarjan,et al. Decomposition by clique separators , 1985, Discret. Math..

[9] C. Figueiredo,et al. The NP-completeness of multi-partite cutset testing , 1996 .

[10] Augustine M. Moshi. Matching cutsets in graphs , 1989, J. Graph Theory.

[11] Sue Whitesides,et al. An Algorithm for Finding Clique Cut-Sets , 1981, Inf. Process. Lett..

[12] Daniele Degiorgi. A new linear algorithm to detect a line graph and output its root graph , 1990 .