Regarding two conjectures on clique and biclique partitions

Abstract

For a graph G, let cp(G) denote the minimum number of cliques of G needed to cover the edges of G exactly once. Similarly, let bpk(G) denote the minimum number of bicliques (i.e. complete bipartite subgraphs of G) needed to cover each edge of G exactly k times. We consider two conjectures -- one regarding the maximum possible value of cp(G) + cp(G) (due to de Caen, Erdos, Pullman and Wormald) and the other regarding bpk(Kn) (due to de Caen, Gregory and Pritikin). We disprove the first, obtaining improved lower and upper bounds on G cp(G) + cp(G), and we prove an asymptotic version of the second, showing that bpk(Kn) = (1+o(1))n.