On sets with small sumset in the circle
Abstract
We prove results on the structure of a subset of the circle group having positive inner Haar measure and doubling constant close to the minimum. These results go toward a continuous analogue in the circle of Freiman's theorem from the integer setting. An analogue of this theorem in has been pursued extensively, and we use some recent results in this direction. For instance, obtaining a continuous analogue of a result of Serra and Z\'emor, we prove that if a subset of the circle is not too large and has doubling constant at most with , then for some integer the dilate is included in an interval in which it has density at least . Our arguments yield other variants of this result as well, notably a version for two sets which makes progress toward a conjecture of Bilu. We include two applications of these results. The first is a new upper bound on the size of -sum-free sets in the circle and in . The second gives structural information on subsets of of doubling constant at most .
Cite
@article{arxiv.1709.04501,
title = {On sets with small sumset in the circle},
author = {Pablo Candela and Anne de Roton},
journal= {arXiv preprint arXiv:1709.04501},
year = {2018}
}
Comments
22 pages. Minor corrections and changes in notation. To appear in The Quarterly Journal of Mathematics