On a family of differential-reflection operators: intertwining operators and Fourier transform of rapidly decreasing functions

Abstract

We introduce a family of differential-reflection operators A, acting on smooth functions defined on R. Here A is a Strum-Liouville function with additional hypotheses and ∈ R. For special pairs (A,), we recover Dunkl's, Heckman's and Cherednik's operators (in one dimension). The spectral problem for the operators A, is studied. In particular, we obtain suitable growth estimates for the eigenfunctions of A, . As the operators A, are mixture of d/dx and reflection operators, we prove the existence of an intertwining operator VA, between A, and the usual derivative. The positivity of VA, is also established. Via the eigenfunctions of A,, we introduce a generalized Fourier transform FA,. An Lp-harmonic analysis for FA, is developed when 0<p≤ 21+1-2 and -1≤ ≤ 1. In particular, an Lp-Schwartz space isomorphism theorem for FA, is proved.