Clique covers and decompositions of cliques of graphs
Abstract
In 1966, Erdos, Goodman, and P\'osa showed that if G is an n-vertex graph, then at most n2/4 cliques of G are needed to cover the edges of G, and the bound is best possible as witnessed by the balanced complete bipartite graph. This was generalized independently by Gyori--Kostochka, Kahn, and Chung, who showed that every n-vertex graph admits an edge-decomposition into cliques of total `cost' at most 2 n2/4 , where an i-vertex clique has cost i. Erdos suggested the following strengthening: every n-vertex graph admits an edge-decomposition into cliques of total cost at most n2/4 , where now an i-vertex clique has cost i-1. We prove fractional relaxations and asymptotically optimal versions of both this conjecture and a conjecture of Dau, Milenkovic, and Puleo on covering the t-vertex cliques of a graph instead of the edges. Our proofs introduce a general framework for these problems using Zykov symmetrization, the Frankl-R\"odl nibble method, and the Szemer\'edi Regularity Lemma.
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