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Published December 2016 | Published + Submitted
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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
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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.

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

Submitted - 1505.04701v2.pdf

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August 19, 2023
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October 24, 2023