On the imaginary part of the characteristic function

Abstract

Suppose that f is the characteristic function of a probability measure on the real line . In this paper, we deal with the following problem posed by N.G. Ushakov: Is it true that f is never determined by its imaginary part f? In other words, is it true that for any characteristic function f there exists a characteristic function g such that f g but f g? We study this question in the more general case of the characteristic function defined on an arbitrary locally compact abelian group. A characterization of what characteristic functions are uniquely determined by their imaginary parts are given. As a consequence of this characterization, we obtain that several frequently used characteristic functions on the classical locally compact abelian groups are uniquely determined by their imaginary parts.