Failure of Wiener's property for positive definite periodic functions

Abstract

We say that Wiener's property holds for the exponent p>0 if we have that whenever a positive definite function f belongs to Lp(-ε,ε) for some ε>0, then f necessarily belongs to Lp(), too. This holds true for p∈ 2 by a classical result of Wiener. Recently various concentration results were proved for idempotents and positive definite functions on measurable sets on the torus. These new results enable us to prove a sharp version of the failure of Wiener's property for p 2. Thus we obtain strong extensions of results of Wainger and Shapiro, who proved the negative answer to Wiener's problem for p 2.