C4-free subgraphs of high degree with geometric applications

Abstract

The Zarankiewicz problem, a cornerstone problem in extremal graph theory, asks for the maximum number of edges in an n-vertex graph that does not contain the complete bipartite graph Ks,s. While the problem remains widely open in the case of general graphs, the past two decades have seen significant progress on this problem for various restricted graph classes -- particularly those arising from geometric settings -- leading to a deeper understanding of their structure. In this paper, we develop a new structural tool for addressing Zarankiewicz-type problems. More specifically, we show that for any positive integer k, every graph with average degree d either contains an induced C4-free subgraph with average degree at least k, or it contains a d-vertex subgraph with k(d2) edges. As an application of this dichotomy, we propose a unified approach to a large number of Zarankiewicz-type problems in geometry, obtaining optimal bounds in each case.