On the weighted Wiener-L\'evy theorem: analogue on Euclidean space, strong converse on LCA group and applications to modulation spaces

Abstract

We consider the space (weighted Fourier algebra) of Banach algebra valued functions Aqω(,), which consists of all Fourier transforms of functions in Lqω(G,). Here ω is a Beurling-Domar type weight on a discrete abelian group G, is the dual of G, and is a unital commutative Banach algebra. We shall prove a strong converse of the Wiener-L\'evy theorem in vector valued weighted setting. Specifically, we proved that if F is a -valued function defined on C such that the composition F f: is in Aq(,) (1≤ q <2) for all f∈ A1ω(,C), then F must be real analytic on R2. Here the range of q is sharp. Further, its multivariate analogue and analogue for locally compact abelian G are also established. This is the first result which generalizes the classic theorems of Helson, Kahane, Katznelson and Rudin helson,rud in the presence of proposed weight. On the other hand, we established the analogue of Wiener-L\'evy theorem in Euclidean Fourier algebra Aωq( Rd) for a weight ω of regular growth. As an application, we establish similar results for weighted modulation, Wiener amalgam and Fourier amalgam spaces. This complements the work of Bhimani-Ratnakumar bhimani2016functions and Feichtinger-Kobayashi-Sato HGWL1, HGWL2; and enables us to shed light on nonlinearity while understanding the dynamics of dispersive PDE in these spaces.