On the Distribution of ap Modulo One

A famous inequality of Erdös and Turán estimates the discrepancy \(\Delta\) of a finite sequence of real numbers by the quantity \(B=\min _{K} K^{-1}+\sum_{k=1}^{K-1}\left|\alpha_{k}\right| / k\), where the \(\alpha_{k}\) are the Fourier coefficients. We investigate how bad this estimate can be. We

We show that the Bessel distribution attached by Gelfand and Kazhdan to an infinite-dimensional irreducible admissible representation of G=GL 2 (F ), where F is a non-Archimedean local field, is given by a locally integrable function which is locally constant on an open and dense set of G.

The aim of this paper is to provide detailed estimates for the discrepancy of the sequences ([: } s q (n)]) ([x] denotes the fractional part of x) and results concerning the uniform distribution and the discrepancy of the sequences ([: 1 } s q 1 (n)], ..., [: d } s q d (n)]), where :, : 1 , ..., : d