New examples of complete sets, with connections to a Diophantine theorem of Furstenberg

Abstract

A set $A\subseteq\mathbb N$ is called $complete$ if every sufficiently large integer can be written as the sum of distinct elements of $A$. In this paper we present a new method for proving the completeness of a set, improving results of Cassels ('60), Zannier ('92), Burr, Erd\H{o}s, Graham, and Li ('96), and Hegyv\'ari ('00). We also introduce the somewhat philosophically related notion of a $dispersing$ set and refine a theorem of Furstenberg ('67).

Metadata

Item Type:	Article
Authors/Creators:	Bergelson, Vitaly Simmons, David https://orcid.org/0000-0002-9136-6635
Copyright, Publisher and Additional Information:	© Instytut Matematyczny PAN, 2017.This is an author-produced version of the published paper. Uploaded in accordance with the publisher’s self-archiving policy. Further copying may not be permitted; contact the publisher for details.
Keywords:	math.CO
Dates:	Accepted: 16 September 2016 Published (online): 28 December 2016
Institution:	The University of York
Academic Units:	The University of York > Faculty of Sciences (York) > Mathematics (York)
Funding Information:	Funder Grant number EPSRC EP/J018260/1
Depositing User:	Pure (York)
Date Deposited:	21 Feb 2017 12:00
Last Modified:	17 Sep 2025 00:18
Published Version:	https://doi.org/10.4064/aa8221-10-2016
Status:	Published online
Refereed:	Yes
Identification Number:	10.4064/aa8221-10-2016
Related URLs:	https://arxiv.org/abs/1507.02208 https://www.impan.pl/pl/wydawnictwa/czas...
Open Archives Initiative ID (OAI ID):	oai:eprints.whiterose.ac.uk:112598