English

Supersaturation beyond color-critical graphs

Combinatorics 2023-10-13 v1

Abstract

The supersaturation problem for a given graph FF asks for the minimum number hF(n,q)h_F(n,q) of copies of FF in an nn-vertex graph with ex(n,F)+qex(n,F)+q edges. Subsequent works by Rademacher, Erd\H{o}s, and Lov\'{a}sz and Simonovits determine the optimal range of qq (which is linear in nn) for cliques FF such that hF(n,q)h_F(n,q) equals the minimum number tF(n,q)t_F(n,q) of copies of FF obtained from a maximum FF-free nn-vertex graph by adding qq new edges. A breakthrough result of Mubayi extends this line of research from cliques to color-critical graphs FF, and this was further strengthened by Pikhurko and Yilma who established the equality hF(n,q)=tF(n,q)h_F(n,q)=t_F(n,q) for 1qϵFn1\leq q\leq \epsilon_F n and sufficiently large nn. In this paper, we present several results on the supersaturation problem that extend beyond the existing framework. Firstly, we explicitly construct infinitely many graphs FF with restricted properties for which hF(n,q)<qtF(n,1)h_F(n,q)<q\cdot t_F(n,1) holds when nq4n\gg q\geq 4, thus refuting a conjecture of Mubayi. Secondly, we extend the result of Pikhurko-Yilma by showing the equality hF(n,q)=tF(n,q)h_F(n,q)=t_F(n,q) in the range 1qϵFn1\leq q\leq \epsilon_F n for any member FF in a diverse and abundant graph family (which includes color-critical graphs, disjoint unions of cliques KrK_r, and the Petersen graph). Lastly, we prove the existence of a graph FF for any positive integer ss such that hF(n,q)=tF(n,q)h_F(n,q)=t_F(n,q) holds when 1qϵFn11/s1\leq q\leq \epsilon_F n^{1-1/s}, and hF(n,q)<tF(n,q)h_F(n,q)<t_F(n,q) when n11/s/ϵFqϵFnn^{1-1/s}/\epsilon_F\leq q\leq \epsilon_F n, indicating that q=Θ(n11/s)q=\Theta(n^{1-1/s}) serves as the threshold for the equality hF(n,q)=tF(n,q)h_F(n,q)=t_F(n,q). We also discuss some additional remarks and related open problems.

Keywords

Cite

@article{arxiv.2310.08081,
  title  = {Supersaturation beyond color-critical graphs},
  author = {Jie Ma and Long-Tu Yuan},
  journal= {arXiv preprint arXiv:2310.08081},
  year   = {2023}
}
R2 v1 2026-06-28T12:48:17.118Z