On the existence of universal series by trigonometric system

Abstract

In this paper we prove the following: let ω(t) be a continuous function, increasing in [0,∞) and ω(+0)=0. Then there exists a series of the formΣk=-∞∞ Ckeikx with Σk=-∞∞ C2k ω(|Ck|)<∞, C-k=Ck, with the following property: for each ε>0 a weighted function μ(x), 0<μ(x) 1,| \x∈[0,2π]: μ(x) =1 \| <ε can be constructed, so that the series is universal in the weighted space Lμ1[0,2π] with respect to rearrangements.