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On the vertex cover $$P_3$$ P 3 problem parameterized by treewidth

Jianhua Tu (), Lidong Wu (), Jing Yuan () and Lei Cui ()
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Jianhua Tu: Beijing University of Chemical Technology
Lidong Wu: The University of Texas at Tyler
Jing Yuan: The University of Texas at Dallas
Lei Cui: The University of Texas at Dallas

Journal of Combinatorial Optimization, 2017, vol. 34, issue 2, No 7, 414-425

Abstract: Abstract Consider a graph G. A subset of vertices, F, is called a vertex cover $$P_t$$ P t ( $$VCP_t$$ V C P t ) set if every path of order t contains at least one vertex in F. Finding a minimum $$VCP_t$$ V C P t set in a graph is is NP-hard for any integer $$t\ge 2$$ t ≥ 2 and is called the $$MVCP_3$$ M V C P 3 problem. In this paper, we study the parameterized algorithms for the $$MVCP_3$$ M V C P 3 problem when the underlying graph G is parameterized by the treewidth. Given an n-vertex graph together with its tree decomposition of width at most p, we present an algorithm running in time $$4^{p}\cdot n^{O(1)}$$ 4 p · n O ( 1 ) for the $$MVCP_3$$ M V C P 3 problem. Moreover, we show that for the $$MVCP_3$$ M V C P 3 problem on planar graphs, there is a subexponential parameterized algorithm running in time $$2^{O(\sqrt{k})}\cdot n^{O(1)}$$ 2 O ( k ) · n O ( 1 ) where k is the size of the optimal solution.

Keywords: Graph algorithms; Parameterized complexity; Vertex cover $$P_3$$ P 3 problem; Tree decomposition; Treewidth (search for similar items in EconPapers)
Date: 2017
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DOI: 10.1007/s10878-016-9999-6

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