Almost balanced ordered biclique covering of graphs

Abstract

Let f(n,k) be the minimum size of a collection of bicliques such that (i) every edge of the complete graph Kn is covered by at least one and at most k bicliques in the collection, and (ii) for each edge \u,v\, the number of bicliques in which u appears in the first class and v in the second class differs by at most one from the number of bicliques in which u appears in the second class and v in the first class. For k=1, f(n,k) reduces to the biclique partition number of Kn, and the Graham-Pollak theorem gives f(n,1)=n-1. For k=2, f(n,k) is the ordered biclique partition number of Kn, for which it is known that c1 n1/2 f(n,2) c2 n1/2+o(1) for some positive constants c1 and c2. In this note, we give almost tight bounds for f(n,k) for fixed k 2: \[ (1+o(1))c1(k)· n1 k/2+1 f(n,k) (1+o(1))c2(k)· n1 k/2+1+o(1), \] where c1(k) and c2(k) are positive constants.