A survey of Zarankiewicz problems in geometry

Abstract

One of the central topics in extremal graph theory is the study of the function ex(n,H), which represents the maximum number of edges a graph with n vertices can have while avoiding a fixed graph H as a subgraph. Tur\'an provided a complete characterization for the case when H is a complete graph on r vertices. Erd os, Stone, and Simonovits extended Tur\'an's result to arbitrary graphs H with (H) > 2 (chromatic number greater than 2). However, determining the asymptotics of ex(n, H) for bipartite graphs H remains a widely open problem. A classical example of this is Zarankiewicz's problem, which asks for the asymptotics of ex(n, Kt,t). In this paper, we survey Zarankiewicz's problem, with a focus on graphs that arise from geometry. Incidence geometry, in particular, can be viewed as a manifestation of Zarankiewicz's problem in geometrically defined graphs.