Turan numbers for bipartite graphs plus an odd cycle

Abstract

For an odd integer k, let Ck = \C3,C5,...,Ck\ denote the family of all odd cycles of length at most k and let C denote the family of all odd cycles. Erdos and Simonovits ESi1 conjectured that for every family F of bipartite graphs, there exists k such that nF Ck nF C as n → ∞. This conjecture was proved by Erdos and Simonovits when F = \C4\, and for certain families of even cycles in KSV. In this paper, we give a general approach to the conjecture using Scott's sparse regularity lemma. Our approach proves the conjecture for complete bipartite graphs K2,t and K3,3: we obtain more strongly that for any odd k ≥ 5, \[ nF \Ck\ nF C\] and we show further that the extremal graphs can be made bipartite by deleting very few edges. In contrast, this formula does not extend to triangles -- the case k = 3 -- and we give an algebraic construction for odd t ≥ 3 of K2,t-free C3-free graphs with substantially more edges than an extremal K2,t-free bipartite graph on n vertices. Our general approach to the Erdos-Simonovits conjecture is effective based on some reasonable assumptions on the maximum number of edges in an m by n bipartite F-free graph.