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WG
2005
Springer

On Stable Cutsets in Claw-Free Graphs and Planar Graphs

14 years 6 months ago
On Stable Cutsets in Claw-Free Graphs and Planar Graphs
To decide whether a line graph (hence a claw-free graph) of maximum degree five admits a stable cutset has been proven to be an NP-complete problem. The same result has been known for K4-free graphs. Here we show how to decide this problem in polynomial time for (claw, K4)-free graphs and for a claw-free graph of maximum degree at most four. As a by-product we prove that the stable cutset problem is polynomially solvable for claw-free planar graphs, and for planar line graphs. Now, the computational complexity of the stable cutset problem restricted to claw-free graphs and claw-free planar graphs is known for all bounds on the maximum degree. Moreover, we prove that the stable cutset problem remains NPcomplete for K4-free planar graphs of maximum degree five.
Van Bang Le, Raffaele Mosca, Haiko Müller
Added 28 Jun 2010
Updated 28 Jun 2010
Type Conference
Year 2005
Where WG
Authors Van Bang Le, Raffaele Mosca, Haiko Müller
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