A generalization of the Hoffman-Lovász upper bound on the independence number of a regular graph


Autoria(s): Luz, C. J.; Cardoso, Domingos M.
Data(s)

10/11/2011

1998

Resumo

A family of quadratic programming problems whose optimal values are upper bounds on the independence number of a graph is introduced. Among this family, the quadratic programming problem which gives the best upper bound is identified. Also the proof that the upper bound introduced by Hoffman and Lovász for regular graphs is a particular case of this family is given. In addition, some new results characterizing the class of graphs for which the independence number attains the optimal value of the above best upper bound are given. Finally a polynomial-time algorithm for approximating the size of the maximum independent set of an arbitrary graph is described and the computational experiments carried out on 36 DIMACS clique benchmark instances are reported.

Identificador

0254-5330

http://hdl.handle.net/10773/4316

Idioma(s)

eng

Publicador

Springer Verlag

Relação

http://www.scopus.com/inward/record.url?eid=2-s2.0-0042228890&partnerID=40&md5=e94be98584e6a96f1388c25d1cbbfb4d

http://www.springerlink.com/content/q77h145367453152/

Direitos

restrictedAccess

restrictedAccess

Palavras-Chave #Combinatorial optimization #Graph theory #Maximum independent set #Quadratic programming
Tipo

article