Turan numbers of bipartite subdivisions

Abstract

Given a graph H, the Tur\'an number ex(n,H) is the largest number of edges in an H-free graph on n vertices. We make progress on a recent conjecture of Conlon, Janzer, and Lee on the Tur\'an numbers of bipartite graphs, which in turn yields further progress on a conjecture of Erdos and Simonovits. Let s,t,k≥ 2 be integers. Let Ks,tk denote the graph obtained from the complete bipartite graph Ks,t by replacing each edge uv in it with a path of length k between u and v such that the st replacing paths are internally disjoint. It follows from a general theorem of Bukh and Conlon that ex(n,Ks,tk)=(n1+1k-1sk). Conlon, Janzer, and Lee recently conjectured that for any integers s,t,k≥ 2, ex(n,Ks,tk)=O(n1+1k-1sk). Among many other things, they settled the k=2 case of their conjecture. As the main result of this paper, we prove their conjecture for k=3,4. Our main results also yield infinitely many new so-called Tur\'an exponents: rationals r∈ (1,2) for which there exists a bipartite graph H with ex(n, H)=(nr), adding to the lists recently obtained by Jiang, Ma, Yepremyan, by Kang, Kim, Liu, and by Conlon, Janzer, Lee. Our method builds on an extension of the Conlon-Janzer-Lee method. We also note that the extended method also gives a weaker version of the Conlon-Janzer-Lee conjecture for all k≥ 2.