Wiener algebras and trigonometric series in a coordinated fashion

Abstract

Let W0( R) be the Wiener Banach algebra of functions representable by the Fourier integrals of Lebesgue integrable functions. It is proven in the paper that, in particular, a trigonometric series Σk=-∞∞ ck eikt is the Fourier series of an integrable function if and only if there exists a φ∈ W0( R) such that φ(k)=ck, k∈ Z. If f∈ W0( R), then the piecewise linear continuous function f defined by f(k)=f(k), k∈ Z, belongs to W0( R) as well. Moreover, \|f\|W0 \|f\|W0. Similar relations are established for more advanced Wiener algebras. These results are supplemented by numerous applications. In particular, new necessary and sufficient conditions are proved for a trigonometric series to be a Fourier series and new properties of W0 are established.