English

Robust (rainbow) subdivisions and simplicial cycles

Combinatorics 2024-01-04 v4

Abstract

We present several results in extremal graph and hypergraph theory of topological nature. First, we show that if α>0\alpha>0 and =Ω(1αlog1α)\ell=\Omega(\frac{1}{\alpha}\log\frac{1}{\alpha}) is an odd integer, then every graph GG with nn vertices and at least n1+αn^{1+\alpha} edges contains an \ell-subdivision of the complete graph KtK_t, where t=nΘ(α)t=n^{\Theta(\alpha)}. Also, this remains true if in addition the edges of GG are properly colored, and one wants to find a rainbow copy of such a subdivision. In the sparser regime, we show that properly edge colored graphs on nn vertices with average degree (logn)2+o(1)(\log n)^{2+o(1)} contain rainbow cycles, while average degree (logn)6+o(1)(\log n)^{6+o(1)} guarantees rainbow subdivisions of KtK_t for any fixed tt, thus improving recent results of Janzer and Jiang et al., respectively. Furthermore, we consider certain topological notions of cycles in pure simplicial complexes (uniform hypergraphs). We show that if GG is a 22-dimensional pure simplicial complex (33-graph) with nn 11-dimensional and at least n1+αn^{1+\alpha} 2-dimensional faces, then GG contains a triangulation of the cylinder and the M\"obius strip with O(1αlog1α)O(\frac{1}{\alpha}\log\frac{1}{\alpha}) vertices. We present generalizations of this for higher dimensional pure simplicial complexes as well. In order to prove these results, we consider certain (properly edge colored) graphs and hypergraphs GG with strong expansion. We argue that if one randomly samples the vertices (and colors) of GG with not too small probability, then many pairs of vertices are connected by a short path whose vertices (and colors) are from the sampled set, with high probability.

Keywords

Cite

@article{arxiv.2201.12309,
  title  = {Robust (rainbow) subdivisions and simplicial cycles},
  author = {István Tomon},
  journal= {arXiv preprint arXiv:2201.12309},
  year   = {2024}
}

Comments

Final version. 37 pages, 4 figures

R2 v1 2026-06-24T09:07:53.532Z