English

On restricted sumsets with bounded degree relations

Combinatorics 2025-09-05 v3 Number Theory

Abstract

Given two subsets A,BFpA, B \subseteq \mathbb{F}_p and a binary relation RA×B\mathcal{R} \subseteq A \times B, the restricted sumset of A,BA, B with respect to R\mathcal{R} is defined as A+RB={a+b ⁣:(a,b)R}A +_{\mathcal{R}} B = \{ a+b \colon (a,b) \notin \mathcal{R} \}. When R\mathcal{R} is taken as the equality relation, determining the minimum value of A+RB|A +_{\mathcal{R}} B| is the famous Erd\H{o}s--Heilbronn problem, which was solved separately by Dias da Silva, Hamidoune and Alon, Nathanson and Ruzsa. Lev later conjectured that if A,BFpA, B \subseteq \mathbb{F}_p with A+Bp|A| + |B| \le p and R\mathcal{R} is a matching between subsets of AA and BB, then A+RBA+B3|A +_{\mathcal{R}} B| \ge |A| + |B| - 3. We confirm this conjecture in the case where A+B(1ε)p|A| + |B| \le (1-\varepsilon)p for any ε>0\varepsilon > 0, provided that p>p0p > p_0 for some sufficiently large p0p_0 depending only on ε\varepsilon. Our proof builds on a recent work by Bollob\'as, Leader, and Tiba, and a rectifiability argument developed by Green and Ruzsa. Furthermore, our method extends to cases when R\mathcal{R} is a degree-bounded relation, either on both sides AA and BB or solely on the smaller set. In addition, we construct subsets AFpA \subseteq \mathbb{F}_p with A=6p11O(1)|A| = \frac{6p}{11} - O(1) such that A+RA=p3|A +_{\mathcal{R}} A| = p-3 for any prime number pp, where R\mathcal{R} is a matching on AA. This extends an earlier construction by Lev and highlights a distinction between the combinatorial notion of the restricted sumset and the classcial Erd\H{o}s--Heilbronn problem, where A+RAp|A +_{\mathcal{R}} A| \ge p holds given R={(a,a) ⁣:aA}\mathcal{R} = \{(a,a) \colon a \in A\} is the equality relation on AA and Ap+32|A| \ge \frac{p+3}{2}.

Keywords

Cite

@article{arxiv.2503.09121,
  title  = {On restricted sumsets with bounded degree relations},
  author = {Minghui Ouyang},
  journal= {arXiv preprint arXiv:2503.09121},
  year   = {2025}
}

Comments

14 pages; revised according to referee comments

R2 v1 2026-06-28T22:17:12.106Z