中文

Differential Recursion Relations for Laguerre Functions on Hermitian Matrices

表示论 2007-05-23 v1 泛函分析

摘要

In our previous papers \cite{doz1,doz2} we studied Laguerre functions and polynomials on symmetric cones Ω=H/L\Omega=H/L. The Laguerre functions nν\ell^{\nu}_{\mathbf{n}}, nΛ\mathbf{n}\in\mathbf{\Lambda}, form an orthogonal basis in L2(Ω,dμν)LL^{2}(\Omega,d\mu_{\nu})^{L} and are related via the Laplace transform to an orthogonal set in the representation space of a highest weight representations (πν,Hν)(\pi_{\nu}, \mathcal{H}_{\nu}) of the automorphism group GG corresponding to a tube domain T(Ω)T(\Omega). In this article we consider the case where Ω\Omega is the space of positive definite Hermitian matrices and G=SU(n,n)G=\mathrm{SU}(n,n). We describe the Lie algebraic realization of πν\pi_{\nu} acting in L2(Ω,dμν)L^{2}(\Omega,d\mu_{\nu}) and use that to determine explicit differential equations and recurrence relations for the Laguerre functions.

引用

@article{arxiv.math/0304357,
  title  = {Differential Recursion Relations for Laguerre Functions on Hermitian Matrices},
  author = {Mark Davidson and Gestur Olafsson},
  journal= {arXiv preprint arXiv:math/0304357},
  year   = {2007}
}