English

The Clique Density Theorem

Combinatorics 2016-10-25 v2

Abstract

Tur\'{a}n's theorem is a cornerstone of extremal graph theory. It asserts that for any integer r2r \geq 2 every graph on nn vertices with more than r22(r1)n2{\tfrac{r-2}{2(r-1)}\cdot n^2} edges contains a clique of size rr, i.e., rr mutually adjacent vertices. The corresponding extremal graphs are balanced (r1)(r-1)-partite graphs. The question as to how many such rr-cliques appear at least in any nn-vertex graph with γn2\gamma n^2 edges has been intensively studied in the literature. In particular, Lov\'{a}sz and Simonovits conjectured in the 1970s that asymptotically the best possible lower bound is given by the complete multipartite graph with γn2\gamma n^2 edges in which all but one vertex class is of the same size while the remaining one may be smaller. Their conjecture was recently resolved for r=3r=3 by Razborov and for r=4r=4 by Nikiforov. In this article, we prove the conjecture for all values of rr.

Keywords

Cite

@article{arxiv.1212.2454,
  title  = {The Clique Density Theorem},
  author = {Christian Reiher},
  journal= {arXiv preprint arXiv:1212.2454},
  year   = {2016}
}

Comments

25 pages, second version addresses changes arising from the referee reports

R2 v1 2026-06-21T22:52:24.970Z