On Katznelson’s Question for skew-product systems

Glasscock, Daniel; Koutsogiannis, Andreas; Richter, Florian

doi:10.1090/bull/1764

On Katznelson’s Question for skew-product systems
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by Daniel Glasscock, Andreas Koutsogiannis and Florian K. Richter HTML | PDF

Bull. Amer. Math. Soc. 59 (2022), 569-606 Request permission

Abstract:

Katznelson’s Question is a long-standing open question concerning recurrence in topological dynamics with strong historical and mathematical ties to open problems in combinatorics and harmonic analysis. In this article, we give a positive answer to Katznelson’s Question for certain towers of skew-product extensions of equicontinuous systems, including systems of the form $(x,t) \mapsto (x + \alpha , t + h(x))$. We describe which frequencies must be controlled for in order to ensure recurrence in such systems, and we derive combinatorial corollaries concerning the difference sets of syndetic subsets of the natural numbers.

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