English

Laguerre semigroup and Dunkl operators

Representation Theory 2019-02-20 v4 Mathematical Physics Classical Analysis and ODEs math.MP Quantum Algebra

Abstract

We construct a two-parameter family of actions \omega_{k,a} of the Lie algebra sl(2,R) by differential-difference operators on R^N \setminus {0}. Here, k is a multiplicity-function for the Dunkl operators, and a>0 arises from the interpolation of the Weil representation of Mp(N,R) and the minimal unitary representation of O(N+1,2) keeping smaller symmetries. We prove that this action \omega_{k,a} lifts to a unitary representation of the universal covering of SL(2,R), and can even be extended to a holomorphic semigroup \Omega_{k,a}. In the k\equiv 0 case, our semigroup generalizes the Hermite semigroup studied by R. Howe (a=2) and the Laguerre semigroup by the second author with G. Mano (a=1). One boundary value of our semigroup \Omega_{k,a} provides us with (k,a)-generalized Fourier transforms F_{k,a}, which includes the Dunkl transform D_k (a=2) and a new unitary operator H_k (a=1), namely a Dunkl-Hankel transform. We establish the inversion formula, and a generalization of the Plancherel theorem, the Hecke identity, the Bochner identity, and a Heisenberg uncertainty inequality for F_{k,a}. We also find kernel functions for \Omega_{k,a} and F_{k,a} for a=1,2 in terms of Bessel functions and the Dunkl intertwining operator.

Keywords

Cite

@article{arxiv.0907.3749,
  title  = {Laguerre semigroup and Dunkl operators},
  author = {Salem Ben Said and Toshiyuki Kobayashi and Bent Orsted},
  journal= {arXiv preprint arXiv:0907.3749},
  year   = {2019}
}

Comments

final version (some few typos, updated references)

R2 v1 2026-06-21T13:27:36.643Z