The bad and rough rotation is Poissonian

Abstract

Motivated by the Berry-Tabor Conjecture and the seminal work of Rudnick-Sarnak, the fine-scale properties of sequences (anα)n ∈ N 1 with (an)n ∈ N ⊂eq N and α irrational have been extensively studied in the last decades. In this article, we prove that for (an)n ∈ N arising from the set of rough numbers with explicit roughness parameters and any badly approximable α, (anα)n ∈ N 1 has Poissonian correlations of all orders, and consequently, Poissonian gaps. This is the first known explicit sequence (anα)n ∈ N 1 with these properties. Further, we show that this result is false for Lebesgue almost every α, thereby disproving a conjecture of Larcher and Stockinger [Math. Proc. Camb. Phil. Soc. 2020]. The method of proof makes use of an equidistribution result mod d in diophantine Bohr sets which might be of independent interest.