Uniform convergence criterion for non-harmonic sine series

Abstract

We show that for a nonnegative monotone sequence \ck\ the condition ckk 0 is sufficient for uniform convergence of the series Σk=1∞ck kα x on any bounded set for α∈ (0,2), and for an odd natural α it is sufficient for uniform convergence on the whole R. Moreover, the latter assertion still holds if we replace kα by any polynomial in odd powers with rational coefficients. On the other hand, in the case of an even α it is necessary that Σk=1∞ck<∞ for convergence of the mentioned series at the point π/2 or at the point 2π/3. Consequently, we obtain uniform convergence criteria. Besides, the results for a natural α remain true for sequences from more general RBVS class.