On the Zarankiewicz problem for graphs with bounded VC-dimension

Abstract

The problem of Zarankiewicz asks for the maximum number of edges in a bipartite graph on n vertices which does not contain the complete bipartite graph Kk,k as a subgraph. A classical theorem due to Kov\'ari, S\'os, and Tur\'an says that this number of edges is O(n2 - 1/k). An important variant of this problem is the analogous question in bipartite graphs with VC-dimension at most d, where d is a fixed integer such that k ≥ d ≥ 2. A remarkable result of Fox, Pach, Sheffer, Suk, and Zahl [J. Eur. Math. Soc. (JEMS), no. 19, 1785-1810] with multiple applications in incidence geometry shows that, under this additional hypothesis, the number of edges in a bipartite graph on n vertices and with no copy of Kk,k as a subgraph must be O(n2 - 1/d). This theorem is sharp when k=d=2, because by design any K2,2-free graph automatically has VC-dimension at most 2, and there are well-known examples of such graphs with (n3/2) edges. However, it turns out this phenomenon no longer carries through for any larger d. We show the following improved result: the maximum number of edges in bipartite graphs with no copies of Kk,k and VC-dimension at most d is o(n2-1/d), for every k ≥ d ≥ 3.