A Schwartz-type Space for the (k,2n)-Generalized Fourier Transform

Abstract

The Schwartz space S(RN) is not invariant under the (k,a)-generalized Fourier transform Fk,a unless a=2, and in general no such adapted space is known. For N=1 and a=2n, n∈N, we construct a tailored Schwartz-type space Sk,n(R) defined via seminorms built from natural second-order operators associated with the one-dimensional Dunkl Laplacian k. We prove that Sk,n(R) recovers the two basic features of the classical Schwartz space: invariance under the corresponding Fourier-type operator and density in the relevant weighted Lp-spaces. To establish these results, we introduce the space Dk,n(R) of compactly supported smooth functions, which embeds continuously into Sk,n(R) and is dense in the weighted spaces Lp(dμk,n), 1 p<∞. These results provide the first Schwartz-type space for Fk,a that simultaneously ensures invariance and Lp-density, and admits an sl(2,R)-based description of the underlying operator structure.