Exact bipartite Tur\'an numbers of large even cycles

Abstract

Let the bipartite Tur\'an number ex(m,n,H) of a graph H be the maximum number of edges in an H-free bipartite graph with two parts of sizes m and n, respectively. In this paper, we prove that ex(m,n,C2t)=(t-1)n+m-t+1 for any positive integers m,n,t with n≥ m≥ t≥ m2+1. This confirms the rest of a conjecture of Gy\"ori G97 (in a stronger form), and improves the upper bound of ex(m,n,C2t) obtained by Jiang and Ma JM18 for this range. We also prove a tight edge condition for consecutive even cycles in bipartite graphs, which settles a conjecture in A09. As a main tool, for a longest cycle C in a bipartite graph, we obtain an estimate on the upper bound of the number of edges which are incident to at most one vertex in C. Our two results generalize or sharpen a classical theorem due to Jackson J85 in different ways.