Fibonacci index and stability number of graphs: a polyhedral study

Bruyère, Véronique; Mélot, Hadrien

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Fibonacci index and stability number of graphs: a polyhedral study

Bruyère, Véronique; Mélot, Hadrien

2009 • In Journal of Combinatorial Optimization, 18, p. 207 - 228

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Abstract :

[en] The Fibonacci index of a graph is the number of its stable sets. This parameter is widely studied and has applications in chemical graph theory. In this paper, we establish tight upper bounds for the Fibonacci index in terms of the stability number and the order of general graphs and connected graphs. Turán graphs frequently appear in extremal graph theory. We show that Turán graphs and a connected variant of them are also extremal for these particular problems. We also make a polyhedral study by establishing all the optimal linear inequalities for the stability number and the Fibonacci index, inside the classes of general and connected graphs of order n.

Disciplines :

Electrical & electronics engineering
Mathematics

Author, co-author :

Bruyère, Véronique ; Université de Mons > Faculté des Sciences > Service d'Informatique théorique

Mélot, Hadrien

Language :

English

Title :

Fibonacci index and stability number of graphs: a polyhedral study

Publication date :

01 May 2009

Journal title :

Journal of Combinatorial Optimization

ISSN :

1382-6905

eISSN :

1573-2886

Publisher :

Kluwer Academic Publishers, Netherlands

Volume :

Pages :

207 - 228

Peer reviewed :

Peer Reviewed verified by ORBi

Research unit :

S829 - Informatique théorique
S825 - Algorithmique

Commentary :

ISNN1573-2886 (Online)

Available on ORBi UMONS :

since 10 June 2010

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