Adjacent comparison bounds and extremal sets for Ruzsa numbers

Abstract

Let m be a positive integer and Zm the residue class ring modulo m. The Ruzsa number Rm is defined to be the least integer r such that there is a subset A of Zm satisfying 1 σA(n) r for any n∈ Zm, where σA(n) =\#\(a,a')∈ A2: a+a' nm\. Motivated by a 2024 conjecture of Ding and Zhao, we prove | Rm+1-Rm| 144. Let A be a subset of Zm satisfying 1 σA(n) Rm for any n∈ Zm. We also give nontrivial bounds for the size of A. Additionally, we provide exact values of Rm for all m 100, which substantially extends the table of values given by Sándor and Yang in 2017. Finally, we pose several related problems and prove some partial results.