English

Bessel convolutions on matrix cones

Classical Analysis and ODEs 2014-05-14 v1 Representation Theory

Abstract

In this paper we introduce probability-preserving convolution algebras on cones of positive semidefinite matrices over one of the division algebras \bF=\bR,\bC\b F = \b R, \b C or \bH\b H which interpolate the convolution algebras of radial bounded Borel measures on a matrix space Mp,q(\bF)M_{p,q}(\b F) with pqp\geq q. Radiality in this context means invariance under the action of the unitary group Up(\bF)U_p(\b F) from the left. We obtain a continuous series of commutative hypergroups whose characters are given by Bessel functions of matrix argument. Our results generalize well-known structures in the rank one case, namely the Bessel-Kingman hypergroups on the positive real line, to a higher rank setting. In a second part of the paper, we study structures depending only on the matrix spectra. Under the mapping rspec(r)r\mapsto \text{spec}(r), the convolutions on the underlying matrix cone induce a continuous series of hypergroup convolutions on a Weyl chamber of type BqB_q. The characters are now Dunkl-type Bessel functions. These convolution algebras on the Weyl chamber naturally extend the harmonic analysis for Cartan motion groups associated with the Grassmann manifolds U(p,q)/(Up×Uq)U(p,q)/(U_p\times U_q) over \bF\b F.

Keywords

Cite

@article{arxiv.math/0512474,
  title  = {Bessel convolutions on matrix cones},
  author = {Margit Rösler},
  journal= {arXiv preprint arXiv:math/0512474},
  year   = {2014}
}

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33 pages