On the number of graphs without large cliques
Abstract
In 1976 Erdos, Kleitman and Rothschild determined the number of graphs without a clique of size . In this note we extend their result to the case of forbidden cliques of increasing size. More precisely we prove that for n 12( n)1/4 there are 2(1-1/(n-1))n2/2+o(n2/n) K_n-free graphs of order n. Our proof is based on the recent hypergraph container theorems of Saxton, Thomason and Balogh, Morris, Samotij, in combination with a theorem of Lovasz and Simonovits.
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