Bipartite Turán problems via graph gluing

Abstract

For graphs H1 and H2, if we glue them by identifying a given pair of vertices u ∈ V(H1) and v ∈ V(H2), what is the extremal number of the resulting graph H1u H2v? In this paper, we study this problem and show that interestingly it is equivalent to an old question of Erdős and Simonovits on the Zarankiewicz problem. When H1, H2 are copies of a same bipartite graph H and u, v come from a same part, we prove that ex(n, H1u H2v) = Θ( ex(n, H) ). As a corollary, we provide a short self-contained disproof of a conjecture of Erdős, which was recently disproved by Janzer.

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