Equidistribution results for sequences of polynomials
Abstract
Let (fn)n=1∞ be a sequence of polynomials and α>1. In this paper we study the distribution of the sequence (fn(α))n=1∞ modulo one. We give sufficient conditions for a sequence (fn)n=1∞ to ensure that for Lebesgue almost every α>1 the sequence (fn(α))n=1∞ has Poissonian pair correlations. In particular, this result implies that for Lebesgue almost every α>1, for any k≥ 2 the sequence (αnk)n=1∞ has Poissonian pair correlations.
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