Pointwise universal trigonometric series

Abstract

A series Sa=Σn=-∞∞ anzn is called a pointwise universal trigonometric series if for any f∈ C(), there exists a strictly increasing sequence \nk\k∈ of positive integers such that Σj=-nknk ajzj converges to f(z) pointwise on . We find growth conditions on coefficients allowing and forbidding the existence of a pointwise universal trigonometric series. For instance, if |an|=O(\,|n|-1-ε|n|) as |n|∞ for some ε>0, then the series Sa can not be pointwise universal. On the other hand, there exists a pointwise universal trigonometric series Sa with |an|=O(\,|n|-1|n|) as |n|∞.