Upper bounds and heuristics for the 2-club problem

Given an undirected graph G = ( V, E), a k-club is a subset of V that induces a subgraph of diameter at most k. The k-club problem is that of finding the maximum cardinality k-club in G. In this paper we present valid inequalities for the 2-club polytope and derive conditions for them to define face...

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Vydané v:	European journal of operational research Ročník 210; číslo 3; s. 489 - 494
Hlavní autori:	Carvalho, Filipa D., Almeida, M. Teresa
Médium:	Journal Article
Jazyk:	English
Vydavateľské údaje:	Amsterdam Elsevier B.V 01.05.2011 Elsevier Elsevier Sequoia S.A
Edícia:	European Journal of Operational Research
Predmet:	Applied sciences Combinatorial optimization Combinatorial optimization Integer programming k-club problem Heuristics Computer science; control theory; systems Cutting Density Exact sciences and technology Flows in networks. Combinatorial problems Graph theory Graphs Heuristic Heuristics Inequalities Information retrieval. Graph Integer programming k-club problem Linear programming Mathematical models Mathematical programming Operational research Operational research and scientific management Operational research. Management science Optimization Optimization algorithms Studies Theoretical computing Upper bounds Integer programming k-club problem Combinatorial optimization Heuristics Polytope Linear programming Cutting plane method Upper bound Cardinal number Optimal solution Heuristic method Subgraph Relaxation method Diameter Non directed graph
ISSN:	0377-2217, 1872-6860
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Popis
Shrnutí:	Given an undirected graph G = ( V, E), a k-club is a subset of V that induces a subgraph of diameter at most k. The k-club problem is that of finding the maximum cardinality k-club in G. In this paper we present valid inequalities for the 2-club polytope and derive conditions for them to define facets. These inequalities are the basis of a strengthened formulation for the 2-club problem and a cutting plane algorithm. The LP relaxation of the strengthened formulation is used to compute upper bounds on the problem’s optimum and to guide the generation of near-optimal solutions. Numerical experiments indicate that this approach is quite effective in terms of solution quality and speed, especially for low density graphs.
Bibliografia:	SourceType-Scholarly Journals-1 ObjectType-Feature-1 content type line 14 ObjectType-Article-2 content type line 23
ISSN:	0377-2217 1872-6860
DOI:	10.1016/j.ejor.2010.11.023