English

Extremal functions for sparse minors

Combinatorics 2022-07-25 v3

Abstract

The "extremal function" c(H)c(H) of a graph HH is the supremum of densities of graphs not containing HH as a minor, where the "density" of a graph GG is the ratio of the number of edges to the number of vertices. Myers and Thomason (2005), Norin, Reed, Thomason and Wood (2020), and Thomason and Wales (2019) determined the asymptotic behaviour of c(H)c(H) for all polynomially dense graphs HH, as well as almost all graphs HH of constant density. We explore the asymptotic behavior of the extremal function in the regime not covered by the above results, where in addition to having constant density the graph HH is in a graph class admitting strongly sublinear separators. We establish asymptotically tight bounds in many cases. For example, we prove that for every planar graph HH, c(H)=(1+o(1))max{V(H)2,V(H)α(H)},c(H) = (1+o(1))\cdot\max\left\{\frac{|V(H)|}{2},|V(H)| - \alpha (H)\right\}, extending recent results of Haslegrave, Kim and Liu (2020). We also show that an asymptotically tight bound on the extremal function of graphs in minor-closed families proposed by Haslegrave, Kim and Liu (2020) is equivalent to a well studied open weakening of Hadwiger's conjecture.

Keywords

Cite

@article{arxiv.2107.08658,
  title  = {Extremal functions for sparse minors},
  author = {Kevin Hendrey and Sergey Norin and David R. Wood},
  journal= {arXiv preprint arXiv:2107.08658},
  year   = {2022}
}
R2 v1 2026-06-24T04:18:39.610Z