Dispersion and limit theorems for random walks associated with hypergeometric functions of type BC

Abstract

The spherical functions of the noncompact Grassmann manifolds Gp,q( F)=G/K over the (skew-)fields F= R, C, H with rank q1 and dimension parameter p>q can be described as Heckman-Opdam hypergeometric functions of type BC, where the double coset space G//K is identified with the Weyl chamber CqB⊂ Rq of type B. The corresponding product formulas and Harish-Chandra integral representations were recently written down by M. R\"osler and the author in an explicit way such that both formulas can be extended analytically to all real parameters p∈[2q-1,∞[, and that associated commutative convolution structures *p on CqB exist. In this paper we introduce moment functions and the dispersion of probability measures on CqB depending on *p and study these functions with the aid of this generalized integral representation. Moreover, we derive strong laws of large numbers and central limit theorems for associated time-homogeneous random walks on (CqB, *p) where the moment functions and the dispersion appear in order to determine drift vectors and covariance matrices of these limit laws explicitely. For integers p, all results have interpretations for G-invariant random walks on the Grassmannians G/K. Besides the BC-cases we also study the spaces GL(q, F)/U(q, F), which are related to Weyl chambers of type A, and for which corresponding results hold. For the rank-one-case q=1, the results of this paper are well-known in the context of Jacobi-type hypergroups on [0,∞[.