Which graphs can be counted in C4-free graphs?

Abstract

For which graphs F is there a sparse F-counting lemma in C4-free graphs? We are interested in identifying graphs F with the property that, roughly speaking, if G is an n-vertex C4-free graph with on the order of n3/2 edges, then the density of F in G, after a suitable normalization, is approximately at least the density of F in an ε-regular approximation of G. In recent work, motivated by applications in extremal and additive combinatorics, we showed that C5 has this property. Here we construct a family of graphs with the property.

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