Counting odd cycles in locally dense graphs
Abstract
We prove that for any given >0 and d∈ [0,1], every sufficiently large (, d)-dense graph G contains for each odd integer r at least (dr-)|V(G)|r cycles of length r. Here, G being (, d)-dense means that every set X containing at least~\,|V(G)| vertices spans at least d2\, |X|2 edges, and what we really count is the number of homomorphisms from an r-cycle into G. The result adresses a question of Y. Kohayakawa, B. Nagle, V. R\"odl, and M. Schacht.
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