Some properties of Fourier integrals

Abstract

Let F(Rn) be the algebra of Fourier transforms of functions from L1(Rn), K(Rn) be the algebra of Fourier transforms of bounded complex Borel measures in Rn and W be Wiener algebra of continuous 2pi-periodic functions with absolutely convergent Fourier series. New properties of functions from these algebras are obtained. Some conditions which determine membership of f in F(R) are given. For many elementary functions f the problem of belonging f to F(R) can be resolved easily using these conditions. We prove that the Hilbert operator is a bijective isometric operator in the Banach spaces W0, F(R), K(R)-A1 (A1 is the one-dimension space of constant functions). We also consider the classes Mk, which are similar to the Bochner classes Fk, and obtain integral representation of the Carleman transform of measures of Mk by integrals of some specific form.