On the Biclique cover of the complete graph

Abstract

Let K be a set of k positive integers. A biclique cover of type K of a graph G is a collection of complete bipartite subgraphs of G such that for every edge e of G, the number of bicliques need to cover e is a member of K. If K=\1,2,..., k\ then the maximum number of the vertices of a complete graph that admits a biclique cover of type K with d bicliques, n(k,d), is the maximum possible cardinality of a k-neighborly family of standard boxes in Rd. In this paper, we obtain an upper bound for n(k,d). Also, we show that the upper bound can be improved in some special cases. Moreover, we show that the existence of the biclique cover of type K of the complete bipartite graph with a perfect matching removed is equivalent to the existence of a cross K-intersection family.