English

Rational Exponents for General Graphs

Combinatorics 2025-06-25 v1

Abstract

A rational number rr is a \textbf{realizable exponent} for a graph HH if there exists a finite family of graphs F\mathcal{F} such that ex(n,H,F)=Θ(nr)\mathrm{ex}(n,H,\mathcal{F})=\Theta(n^r), where ex(n,H,F)\mathrm{ex}(n,H,\mathcal{F}) denotes the maximum number of copies of HH that an nn-vertex F\mathcal{F}-free graph can have. Results for realizable exponents are currently known only when HH is either a star or a clique, with the full resolution of the H=K2H=K_2 case being a major breakthrough of Bukh and Conlon. In this paper, we establish the first set of results for realizable exponents which hold for arbitrary graphs HH by showing that for any graph HH with maximum degree Δ1\Delta \ge 1, every rational in the interval [v(H)e(H)2Δ2, v(H)]\left[v(H)-\frac{e(H)}{2\Delta^2},\ v(H)\right] is realizable for HH. We also prove a ``stability'' result for generalized Tur\'an numbers of trees which implies that if TK2T\ne K_2 is a tree with \ell leaves, then TT has no realizable exponents in [0,]Z[0,\ell]\setminus \mathbb{Z}. Our proof of this latter result uses a new variant of the classical Helly theorem for trees, which may be of independent interest.

Keywords

Cite

@article{arxiv.2506.19061,
  title  = {Rational Exponents for General Graphs},
  author = {Sean English and Sam Spiro},
  journal= {arXiv preprint arXiv:2506.19061},
  year   = {2025}
}
R2 v1 2026-07-01T03:30:14.754Z