English

Induced subgraphs with many distinct degrees

Combinatorics 2017-06-29 v3

Abstract

Let hom(G)\hom(G) denote the size of the largest clique or independent set of a graph GG. In 2007, Bukh and Sudakov proved that every nn-vertex graph GG with hom(G)=O(logn)\hom(G) = O(\log n) contains an induced subgraph with Ω(n1/2)\Omega(n^{1/2}) distinct degrees, and raised the question of deciding whether an analogous result holds for every nn-vertex graph GG with hom(G)=O(nϵ)\hom(G) = O(n^\epsilon), where ϵ>0\epsilon > 0 is a fixed constant. Here, we answer their question in the affirmative and show that every graph GG on nn vertices contains an induced subgraph with Ω((n/hom(G))1/2)\Omega((n/\hom(G))^{1/2}) distinct degrees. We also prove a stronger result for graphs with large cliques or independent sets and show, for any fixed kNk \in \mathbb{N}, that if an nn-vertex graph GG contains no induced subgraph with kk distinct degrees, then hom(G)n/(k1)o(n)\hom(G) \ge n/(k-1)-o(n); this bound is essentially best-possible.

Keywords

Cite

@article{arxiv.1609.01677,
  title  = {Induced subgraphs with many distinct degrees},
  author = {Bhargav Narayanan and István Tomon},
  journal= {arXiv preprint arXiv:1609.01677},
  year   = {2017}
}

Comments

17 pages, Combinatorics, Probability and Computing

R2 v1 2026-06-22T15:41:35.870Z