Clique packings in random graphs

Abstract

We consider the question of how many edge-disjoint near-maximal cliques may be found in the dense Erdos-R\'enyi random graph G(n,p). Recently Acan and Kahn showed that the largest such family contains only O(n2/(n)3) cliques, with high probability, which disproved a conjecture of Alon and Spencer. We prove the corresponding lower bound, (n2/(n)3), by considering a random graph process which sequentially selects and deletes near-maximal cliques. To analyse this process we use the Differential Equation Method. We also give a new proof of the upper bound O(n2/(n)3) and discuss the problem of the precise size of the largest such clique packing.

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