Poisson transform and unipotent complex geometry
Abstract
Our concern is with Riemannian symmetric spaces of the non-compact type and more precisely with the Poisson transform which maps generalized functions on the boundary to -eigenfunctions on . Special emphasis is given to a maximal unipotent group which naturally acts on both and . The -orbits on are parametrized by a torus (Iwasawa) and letting the level tend to on a ray we retrieve via as an open dense orbit in (Bruhat). For positive parameters the Poisson transform is defined an injective for functions and we give a novel characterization of in terms of complex analysis. For that we view eigenfunctions as families of functions on the -orbits, i.e. for . The general theory then tells us that there is a tube domain such that each extends to a holomorphic function on the scaled tube . We define a class of -invariant weight functions on the tube , rescale them for every to a weight on , and show that each lies in the -weighted Bergman space . The main result of the article then describes as those eigenfunctions for which and holds.
Cite
@article{arxiv.2206.14088,
title = {Poisson transform and unipotent complex geometry},
author = {Heiko Gimperlein and Bernhard Krötz and Luz Roncal and Sundaram Thangavelu},
journal= {arXiv preprint arXiv:2206.14088},
year = {2024}
}
Comments
27 pages, to appear in Journal of Functional Analysis