On function spaces for radial functions

Abstract

This paper is concerned with complex Banach-space valued functions of the form fk(rθ,rθ,z)=ei k θfk(r,z), r ∈ [0,∞), θ ∈ T1, z ∈ R, for some k ∈ Z. It is demonstrated how classical and Sobolev spaces for the radial function fk can be constructed in a natural fashion from the corresponding standard function spaces for fk. A theory of radial distributions is derived in the same spirit. Finally, a new class of Hankel spaces for the case fk=fk(r) is introduced. These spaces are the radial counterparts of the familiar Bessel-potential spaces for functions defined on Rd. The paper concludes with an application of the theory to the Dirichlet boundary-value problem for Poisson's equation in a cylindrical domain.