Odd cycles in subgraphs of sparse pseudorandom graphs

Abstract

We answer two extremal questions about odd cycles that naturally arise in the study of sparse pseudorandom graphs. Let be an (n,d,λ)-graph, i.e., n-vertex, d-regular graphs with all nontrivial eigenvalues in the interval [-λ,λ]. Krivelevich, Lee, and Sudakov conjectured that, whenever λ2k-1 d2k/n, every subgraph G of with (1/2+o(1))e() edges contains an odd cycle C2k+1. Aigner-Horev, H\`an, and the third author proved a weaker statement by allowing an extra polylogarithmic factor in the assumption λ2k-1 d2k/n, but we completely remove it and hence settle the conjecture. This also generalises Sudakov, Szabo, and Vu's Tur\'an-type theorem for triangles. Secondly, we obtain a Ramsey multiplicity result for odd cycles. Namely, in the same range of parameters, we prove that every 2-edge-colouring of contains at least (1-o(1))2-2kd2k+1 monochromatic copies of C2k+1. Both results are asymptotically best possible by Alon and Kahale's construction of C2k+1-free pseudorandom graphs.