The Bose-Chowla argument for Sidon sets
Number Theory
2022-12-14 v3
Abstract
Let and let be an -tuple of sets of integers. For nonzero integers , consider the linear form . The \emph{representation function} counts the number of -tuples such that . The -tuple is a \emph{-Sidon system of multiplicity } if for all . For every positive integer , let denote the largest integer such that there exists a -Sidon system of multiplicity with for all . It is proved that, for all linear forms , and, for linear forms whose coefficients satisfy a certain divisibility condition,
Cite
@article{arxiv.2104.12711,
title = {The Bose-Chowla argument for Sidon sets},
author = {Melvyn B. Nathanson},
journal= {arXiv preprint arXiv:2104.12711},
year = {2022}
}
Comments
Minor changes; 10 pages