Factoring complete graphs and hypergraphs into factors with few maximal cliques

Abstract

For integers r,t≥2 and n≥1 let fr(t,n) be the minimum, over all factorizations of the complete r-uniform hypergraph of order n into t factors H1,…,Ht, of Σi=1tc(Hi) where c(Hi) is the number of maximal cliques in Hi. It is known that f2(2,n)=n+1; in fact, if G is a graph of order n, then c(G)+c( G)≥ n+1 with equality iff ω(G)+α(G)=n+1 where ω is the clique number and α the independence number. In this paper we investigate fr(t,n) when r>2 or t>2. We also characterize graphs G of order n with c(G)+c( G)=n+2.