Contraction of the sl2-Triple Associated to the (k,a)-Generalized Fourier Transform

Abstract

Ben Sa\"d-Kobayashi-Orsted introduced a family of sl2 -triples of differential-difference operators Hk,a , E+k,a and E-k,a on RN \0\ indexed by a Dunkl parameter k and a deformation parameter a ≠ 0 . In the present paper, we study the behavior as the parameter a approaches 0 . In this limit, the Lie algebra gk,a = spanR \Hk,a, E+k,a, E-k,a\ sl(2, R) contracts to a three-dimensional commutative Lie algebra gk,0, and its spectral properties change. We describe the joint spectral decomposition for gk,0, and discuss formulas for operator semigroups with infinitesimal generators in gk,0. In particular, we describe the integral kernel of (z |x|2 k) as an infinite series, which, in some low-dimensional cases, can be expressed in a closed form using the theta function.