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On a hypergraph Turan problem of Frankl

组合数学 2007-05-23 v1

摘要

Let Cr2kC^{2k}_r be the 2k2k-uniform hypergraph obtained by letting P1,...,PrP_1,...,P_r be pairwise disjoint sets of size kk and taking as edges all sets PiPjP_i \cup P_j with iji \neq j. This can be thought of as the `kk-expansion' of the complete graph KrK_r: each vertex has been replaced with a set of size kk. We determine the exact Turan number of C32kC^{2k}_3 and the corresponding extremal hypergraph, thus confirming a conjecture of Frankl. Sidorenko has given an upper bound of (r2)/(r1)(r-2) / (r-1) for the Tur\'an density of Cr2kC^{2k}_r for any rr, and a construction establishing a matching lower bound when rr is of the form 2p+12^p + 1. We show that when r=2p+1r = 2^p + 1, any Cr4C^4_r-free hypergraph of density (r2)/(r1)o(1)(r-2)/(r-1) - o(1) looks approximately like Sidorenko's construction. On the other hand, when rr is not of this form, we show that corresponding constructions do not exist and improve the upper bound on the Tur\'an density of Cr4C^4_r to (r2)/(r1)c(r)(r-2)/(r-1) - c(r), where c(r)c(r) is a constant depending only on rr. The backbone of our arguments is a strategy of first proving approximate structure theorems, and then showing that any imperfections in the structure must lead to a suboptimal configuration. The tools for its realisation draw on extremal graph theory, linear algebra, the Kruskal-Katona theorem and properties of Krawtchouck polynomials.

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引用

@article{arxiv.math/0211179,
  title  = {On a hypergraph Turan problem of Frankl},
  author = {Peter Keevash and Benny Sudakov},
  journal= {arXiv preprint arXiv:math/0211179},
  year   = {2007}
}

备注

25 pages, no figures