Direct Systems of Spherical Functions and Representations

Abstract

Spherical representations and functions are the building blocks for harmonic analysis on riemannian symmetric spaces. In this paper we consider spherical functions and spherical representations related to certain infinite dimensional symmetric spaces G∞/K∞ = Gn/Kn. We use the representation theoretic construction φ (x) = <e, π(x)e> where e is a K∞--fixed unit vector for π. Specifically, we look at representations π∞ = πn of G∞ where πn is Kn--spherical, so the spherical representations πn and the corresponding spherical functions φn are related by φn(x) = <en, πn(x)en> where en is a Kn--fixed unit vector for πn, and we consider the possibility of constructing a K∞--spherical function φ∞ = φn. We settle that matter by proving the equivalence of condtions (i) \en\ converges to a nonzero K∞--fixed vector e, and (ii) G∞/K∞ has finite symmetric space rank (equivalently, it is the Grassmann manifold of p--planes in ∞ where p < ∞ and is , or ). In that finite rank case we also prove the functional equation φ(x)φ(y) = n ∞ ∫Knφ(xky)dk of Faraut and Olshanskii, which is their definition of spherical functions.