Biclique Coverings and the Chromatic Number

Abstract

Consider a graph G with chromatic number k and a collection of complete bipartite graphs, or bicliques, that cover the edges of G. We prove the following two results: If the bicliques partition the edges of G, then their number is at least 22 k. This is the first improvement of the easy lower bound of 2 k, while the Alon-Saks-Seymour conjecture states that this can be improved to k-1. The sum of the orders of the bicliques is at least (1-o(1))k2 k. This generalizes, in asymptotic form, a result of Katona and Szemer\'edi who proved that the minimum is k2 k when G is a clique.