On Poisson transform for spinors

Abstract

Let (τ,Vτ) be a spinor representation of Spin(n) and let (σ,Vσ) be a spinor representation of Spin(n-1) that occurs in the restriction τ Spin(n-1). We consider the real hyperbolic space Hn( R) as the rank one homogeneous space Spin0(1,n)/Spin(n) and the spinor bundle Hn( R) over Hn( R) as the homogeneous bundle Spin0(1,n)×Spin(n) Vτ. Our aim is to characterize eigenspinors of the algebra of invariant differential operators acting on Hn( R) which can be written as the Poisson transform of Lp-sections of the bundle Spin(n)×Spin(n-1) Vσ over the boundary Sn-1 Spin(n)/Spin(n-1) of Hn( R), for 1<p<∞.