An {cal O}(mlog n) algorithm for the weighted stable set problem in claw-free graphs with α({G}) le 3
classification
💻 cs.DM
keywords
alphastabletimeclaw-freemaximumproblemproducealgorithm
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In this paper we show how to solve the \emph{Maximum Weight Stable Set Problem} in a claw-free graph $G(V, E)$ with $\alpha(G) \le 3$ in time ${\cal O}(|E|\log|V|)$. More precisely, in time ${\cal O}(|E|)$ we check whether $\alpha(G) \le 3$ or produce a stable set with cardinality at least $4$; moreover, if $\alpha(G) \le 3$ we produce in time ${\cal O}(|E|\log|V|)$ a maximum stable set of $G$. This improves the bound of ${\cal O}(|E||V|)$ due to Faenza et al.
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