Induced even cycles in locally sparse graphs

Abstract

A graph G is (c,t)-sparse if for every pair of vertex subsets A,B⊂ V(G) with |A|,|B|≥ t, e(A,B)≤ (1-c)|A||B|. In this paper we prove that for every c>0 and integer , there exists C>1 such that if an n-vertex graph G is (c,t)-sparse for some t, and has at least C t1-1/n1+1/ edges, then G contains an induced copy of C2. This resolves a conjecture of Fox, Nenadov and Pham.

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