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Published December 2016 | Published + Submitted
Journal Article Open

High density piecewise syndeticity of product sets in amenable groups

Di Nasso, Mauro
Goldbring, Isaac
Jin, Renling
Leth, Steven
Lupini, Martino ORCID icon
Mahlburg, Karl

Abstract

M. Beiglböck, V. Bergelson, and A. Fish proved that if G is a countable amenable group and A and B are subsets of G with positive Banach density, then the product set AB is piecewise syndetic. This means that there is a finite subset E of G such that EAB is thick, that is, EAB contains translates of any finite subset of G. When G = ℤ, this was first proven by R. Jin. We prove a quantitative version of the aforementioned result by providing a lower bound on the density (with respect to a Følner sequence) of the set of witnesses to the thickness of EAB. When G = ℤ^d, this result was first proven by the current set of authors using completely different techniques.

Additional Information

© 2016 The Association for Symbolic Logic. Received August 7, 2015. Published online: 12 August 2016. The authors were supported in part by the American Institute of Mathematics through its SQuaREs program. I. Goldbring was partially supported by NSF CAREER grant DMS-1349399. M. Lupini was supported by the York University Susan Mann Dissertation Scholarship and by the ERC Starting grant no. 259527 of Goulnara Arzhantseva. K. Mahlburg was supported by NSF Grant DMS-1201435. M. Di Nasso was supported by MIUR-PRIN Grant "Models and sets" and by the University of Pisa Grant PRA 2015/005.

Attached Files

Published - div-class-title-high-density-piecewise-syndeticity-of-product-sets-in-amenable-groups-div.pdf

Submitted - 1505.04701v2.pdf

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Identifiers Related works Funding Dates
Created:
August 19, 2023
Modified:
October 24, 2023