On an example by Poincar\'e and sums with Kronecker sequence
Abstract
This short and simple communication is motivated by recent papers by L. Colzani and A. Kochergin. We give a brief analysis of an example by Poincar\'e related to sums of the type Σk=0t-1 f(kα+x) where f is a continuous periodic function and α is irrationaland its recent generalisations. Most of the constructions under consideration are well-known. In this note, we just wanted to bring all the results together and give a general and improved multi-dimensional formulation of a recent result by A. Kochergin, prove non-existence of a universal continuous function and discuss some of the related results in terms of Diophantine Approximation. In particular, in our opinion smoothness results involving Diophantine exponents ω, ω and λ had never been documented before.
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