Biclique graphs and biclique matrices

A biclique of a graph G is a maximal induced complete bipar tite subgraph of G. Given a graph G, the biclique matrix of G is a {0,1, -1} matrix having one row for each biclique and one column for each vertex of G, and such that a pair of 1, -1 entries in a same row corresponds exactly to adjacent ve...

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Detalles Bibliográficos
Autores principales: Groshaus, M., Szwarcfiter, J.L.
Formato: JOUR
Materias:
Biclique graphs
Bicliques
Bipartite matrices
Clique graphs
Cliques
Adjacent vertices
Biclique
Bipartite graphs
Graph G
Intersection graph
matrix
Subgraphs
Acceso en línea:http://hdl.handle.net/20.500.12110/paper_03649024_v63_n1_p1_Groshaus
Aporte de:
Biblioteca Digital - Facultad de Ciencias Exactas y Naturales (UBA) de Universidad de Buenos Aires
Descripción
Sumario:A biclique of a graph G is a maximal induced complete bipar tite subgraph of G. Given a graph G, the biclique matrix of G is a {0,1, -1} matrix having one row for each biclique and one column for each vertex of G, and such that a pair of 1, -1 entries in a same row corresponds exactly to adjacent vertices in the corresponding biclique. We describe a characterization of biclique matrices, in similar terms as those employed in Gilmore's characterization of clique matrices. On the other hand, the biclique graph of a graph is the intersection graph of the bicliques of G. Using the concept of biclique matrices, we describe a Krausz-type char acterization of biclique graphs. Finally, we show that every induced P3 of a biclique graph must be included in a diamond or in a 3-fan and we also characterize biclique graphs of bipartite graphs. © 2009 Wiley Periodicals, inc.

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