On the maximum number of points in a maximal intersecting family of finite sets

Abstract

Paul Erdos and L\'aszl\'o Lov\'asz proved in a landmark article that, for any positive integer k, up to isomorphism there are only finitely many maximal intersecting families of k-sets (maximal k-cliques). So they posed the problem of determining or estimating the largest number N(k) of the points in such a family. They also proved by means of an example that N(k)≥2k-2+122k-2k-1. Much later, Zsolt Tuza proved that the bound is best possible up to a multiplicative constant by showing that asymptotically N(k) is at most 4 times this lower bound. In this paper we reduce the gap between the lower and upper bound by showing that asymptotically N(k) is at most 3 times the Erdos-Lov\'asz lower bound. Conjecturally, the explicit upper bound obtained in this paper is only double the lower bound.