The Fourier transform of thick distributions

Abstract

We first construct a space W( Rc n) whose elements are test functions defined in R cn=Rn\ ∞\ , the one point compactification of Rn, that have a thick expansion at infinity of special logarithmic type, and its dual space W ( Rcn) , the space of sl-thick distributions. We show that there is a canonical projection of W ( Rcn) onto S ( Rn) . We study several sl-thick distributions and consider operations in W( Rcn) . We define and study the Fourier transform of thick test functions of S( Rn) and thick tempered distributions of S( Rn) . We construct isomorphisms \[ F:S( Rn) ( Rcn) \,, \] \[ F:W( Rc n) ( R n) \,, \] that extend the Fourier transform of tempered distributions, namely, =F and =F, where are the canonical projections of S ( Rn) or W ( Rcn) onto S( Rn) . We determine the Fourier transform of several finite part regularizations and of general thick delta functions.