English

Small Minors in Dense Graphs

Combinatorics 2013-05-24 v4 Discrete Mathematics

Abstract

A fundamental result in structural graph theory states that every graph with large average degree contains a large complete graph as a minor. We prove this result with the extra property that the minor is small with respect to the order of the whole graph. More precisely, we describe functions ff and hh such that every graph with nn vertices and average degree at least f(t)f(t) contains a KtK_t-model with at most h(t)lognh(t)\cdot\log n vertices. The logarithmic dependence on nn is best possible (for fixed tt). In general, we prove that f(t)2t1+\epsf(t)\leq 2^{t-1}+\eps. For t4t\leq 4, we determine the least value of f(t)f(t); in particular f(3)=2+\epsf(3)=2+\eps and f(4)=4+\epsf(4)=4+\eps. For t4t\leq4, we establish similar results for graphs embedded on surfaces, where the size of the KtK_t-model is bounded (for fixed tt).

Keywords

Cite

@article{arxiv.1005.0895,
  title  = {Small Minors in Dense Graphs},
  author = {Samuel Fiorini and Gwenaël Joret and Dirk Oliver Theis and David R. Wood},
  journal= {arXiv preprint arXiv:1005.0895},
  year   = {2013}
}
R2 v1 2026-06-21T15:19:10.044Z