English

Extremal results for odd cycles in sparse pseudorandom graphs

Combinatorics 2016-03-15 v2

Abstract

We consider extremal problems for subgraphs of pseudorandom graphs. For graphs FF and Γ\Gamma the generalized Tur\'an density πF(Γ)\pi_F(\Gamma) denotes the density of a maximum subgraph of Γ\Gamma, which contains no copy of~FF. Extending classical Tur\'an type results for odd cycles, we show that πF(Γ)=1/2\pi_{F}(\Gamma)=1/2 provided FF is an odd cycle and Γ\Gamma is a sufficiently pseudorandom graph. In particular, for (n,d,λ)(n,d,\lambda)-graphs Γ\Gamma, i.e., nn-vertex, dd-regular graphs with all non-trivial eigenvalues in the interval [λ,λ][-\lambda,\lambda], our result holds for odd cycles of length \ell, provided λ2d1nlog(n)(2)(3). \lambda^{\ell-2}\ll \frac{d^{\ell-1}}n\log(n)^{-(\ell-2)(\ell-3)}\,. Up to the polylog-factor this verifies a conjecture of Krivelevich, Lee, and Sudakov. For triangles the condition is best possible and was proven previously by Sudakov, Szab\'o, and Vu, who addressed the case when FF is a complete graph. A construction of Alon and Kahale (based on an earlier construction of Alon for triangle-free (n,d,λ)(n,d,\lambda)-graphs) shows that our assumption on Γ\Gamma is best possible up to the polylog-factor for every odd 5\ell\geq 5.

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Cite

@article{arxiv.1602.03663,
  title  = {Extremal results for odd cycles in sparse pseudorandom graphs},
  author = {Elad Aigner-Horev and Hiep Hàn and Mathias Schacht},
  journal= {arXiv preprint arXiv:1602.03663},
  year   = {2016}
}
R2 v1 2026-06-22T12:48:13.643Z