English

On The Dunkl Intertwining Opereator

Functional Analysis 2016-05-12 v2

Abstract

Dunkl operators are differential-difference operators parametrized by a finite reflection group and a weight function. The commutative algebra generated by these operators generalizes the algebra of standard differential operators and intertwines with this latter by the so-called intertwining operator. In this paper, we give an integral representation for the operator VkeΔ/2V_k\circ e^{\Delta/2} for an arbitrary Weyl group and a large class of regular weights kk containing those of non negative real parts. Our representing measures are absolute continuous with respect the Lebesgue measure in \Rd\Rd, which allows us to derive out new results about the intertwining operator VkV_k and the Dunkl kernel EkE_k. We show in particular that the operator VkeΔ/2V_k\circ e^{\Delta/2} extends uniquely as a bounded operator to a large class of functions which are not necessarily differentiables. In the case of non negative weights, this operator is shown to be positivity-preserving.

Keywords

Cite

@article{arxiv.1605.02280,
  title  = {On The Dunkl Intertwining Opereator},
  author = {Mostafa Maslouhi},
  journal= {arXiv preprint arXiv:1605.02280},
  year   = {2016}
}
R2 v1 2026-06-22T13:55:41.137Z