English

Upper tails for arithmetic progressions in a random set

Probability 2019-11-12 v3 Combinatorics Number Theory

Abstract

Let XkX_k denote the number of kk-term arithmetic progressions in a random subset of Z/NZ\mathbb{Z}/N\mathbb{Z} or {1,,N}\{1, \dots, N\} where every element is included independently with probability pp. We determine the asymptotics of logP(Xk(1+δ)EXk)\log \mathbb{P}(X_k \ge (1+\delta) \mathbb{E} X_k) (also known as the large deviation rate) where p0p \to 0 with pNckp \ge N^{-c_k} for some constant ck>0c_k > 0, which answers a question of Chatterjee and Dembo. The proofs rely on the recent nonlinear large deviation principle of Eldan, which improved on earlier results of Chatterjee and Dembo. Our results complement those of Warnke, who used completely different methods to estimate, for the full range of pp, the large deviation rate up to a constant factor.

Keywords

Cite

@article{arxiv.1605.02994,
  title  = {Upper tails for arithmetic progressions in a random set},
  author = {Bhaswar B. Bhattacharya and Shirshendu Ganguly and Xuancheng Shao and Yufei Zhao},
  journal= {arXiv preprint arXiv:1605.02994},
  year   = {2019}
}
R2 v1 2026-06-22T13:57:27.126Z