论文信息 - The Colorful Helly Property for Hypergraphs

The Colorful Helly Property for Hypergraphs

Abstract Helly's theorem for convex sets motivated the definition of the p-Helly property for hypergraphs. On the other hand, the colorful Helly theorem for collections of convex sets, by Lovasz, generalizes Helly's theorem. Motivated by Lovasz's theorem, we define the colorful p-Helly property for a family of p hypergraphs. We describe complexity results related to the latter. We show that it is Co-NP-complete to decide if a family of p hypergraphs is colorful p-Helly, even if p = 2 . However, for any fixed p, we describe a polynomial time algorithm to decide if such family is colorful p-Helly, provided p − 1 of the hypergraphs are p-Helly.

Jayme Luiz Szwarcfiter | Mitre Costa Dourado | Rommel M. Barbosa | Erika M. Martins

[1] Jayme Luiz Szwarcfiter,et al. Complexity aspects of generalized Helly hypergraphs , 2006, Inf. Process. Lett..

[2] Imre Bárány,et al. Colourful Linear Programming and its Relatives , 1997, Math. Oper. Res..

[3] Driss Aboutajdine,et al. Hypergraph imaging: an overview , 2002, Pattern Recognit..

[4] C. Berge. Graphes et hypergraphes , 1970 .

[5] Jayme Luiz Szwarcfiter,et al. Improved algorithms for recognizing p , 2008, Inf. Process. Lett..

[6] Imre Bárány,et al. A generalization of carathéodory's theorem , 1982, Discret. Math..

[7] M. C. Dourado,et al. Complexity aspects of the Helly property: graphs and hypergraphs. , 2009 .