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An improved derandomized approximation algorithmfor the max-controlled set problem

Published online by Cambridge University Press:  28 February 2011

Carlos Martinhon
Affiliation:
Fluminense Federal University, Institute of Computing, Rua Passo da Pátria 156, Bloco E, 24210-230, Niterói, RJ, Brazil; mart@dcc.ic.uff.br; fabio@ic.uff.br
Fábio Protti
Affiliation:
Fluminense Federal University, Institute of Computing, Rua Passo da Pátria 156, Bloco E, 24210-230, Niterói, RJ, Brazil; mart@dcc.ic.uff.br; fabio@ic.uff.br
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Abstract

A vertex i of a graph G = (V,E) is said to be controlled by $M \subseteq V$ if the majority of the elements of the neighborhood of i (including itself) belong to M. The set M is a monopoly in G if every vertex $i\in V$ is controlled by M. Given a set $M \subseteq V$ and two graphs G1 = ($V,E_1$) and G2 = ($V,E_2$) where $E_1\subseteq E_2$, the monopoly verification problem (mvp) consists of deciding whether there exists a sandwich graph G = (V,E) (i.e., a graph where $E_1\subseteq E\subseteq E_2$) such that M is a monopoly in G = (V,E). If the answer to the mvp is No, we then consider the max-controlled set problem (mcsp), whose objective is to find a sandwich graph G = (V,E) such that the number of vertices of G controlled by M is maximized. The mvp can be solved in polynomial time; the mcsp, however, is NP-hard. In this work, we present a deterministic polynomial time approximation algorithm for the mcsp with ratio $\frac{1}{2}$ + $\frac{1+\sqrt{n}}{2n-2}$, where n=|V|>4. (The case $n\leq4$ is solved exactly by considering the parameterized version of the mcsp.) The algorithm is obtained through the use of randomized rounding and derandomization techniques based on the method of conditional expectations. Additionally, we show how to improve this ratio if good estimates of expectation are obtained in advance.

Type
Research Article
Copyright
© EDP Sciences, 2011

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