Bohr Sets in Triple Products of Large Sets in Amenable Groups
Journal article, 2019
We answer a question of Hegyvári and Ruzsa concerning effective estimates of the Bohr-regularity of certain triple sums of sets with positive upper Banach densities in the integers. Our proof also works for any discrete amenable group, and it does not require all addends in the triple products we consider to have positive (left) upper Banach densities; one of the addends is allowed to only have positive upper asymptotic density with respect to a (possibly very sparse) ergodic sequence.
Densities
Measurable recurrence
Bohr sets
Author
Michael Björklund
Chalmers, Mathematical Sciences, Analysis and Probability Theory
John T. Griesmer
Colorado School of Mines
Journal of Fourier Analysis and Applications
1069-5869 (ISSN) 15315851 (eISSN)
Vol. 25 3 923-936Roots
Basic sciences
Subject Categories
Probability Theory and Statistics
Discrete Mathematics
Mathematical Analysis
DOI
10.1007/s00041-018-9615-5