English

Poisson transform and unipotent complex geometry

Representation Theory 2024-11-12 v2

Abstract

Our concern is with Riemannian symmetric spaces Z=G/KZ=G/K of the non-compact type and more precisely with the Poisson transform Pλ\mathcal{P}_\lambda which maps generalized functions on the boundary Z\partial Z to λ\lambda-eigenfunctions on ZZ. Special emphasis is given to a maximal unipotent group N<GN<G which naturally acts on both ZZ and Z\partial Z. The NN-orbits on ZZ are parametrized by a torus A=(R>0)r<GA=(\mathbb{R}_{>0})^r<G (Iwasawa) and letting the level aAa\in A tend to 00 on a ray we retrieve NN via lima0Na\lim_{a\to 0} Na as an open dense orbit in Z\partial Z (Bruhat). For positive parameters λ\lambda the Poisson transform Pλ\mathcal{P}_\lambda is defined an injective for functions fL2(N)f\in L^2(N) and we give a novel characterization of Pλ(L2(N))\mathcal{P}_\lambda(L^2(N)) in terms of complex analysis. For that we view eigenfunctions ϕ=Pλ(f)\phi = \mathcal{P}_\lambda(f) as families (ϕa)aA(\phi_a)_{a\in A} of functions on the NN-orbits, i.e. ϕa(n)=ϕ(na)\phi_a(n)= \phi(na) for nNn\in N. The general theory then tells us that there is a tube domain T=Nexp(iΛ)NC\mathcal{T}=N\exp(i\Lambda)\subset N_\mathbb{C} such that each ϕa\phi_a extends to a holomorphic function on the scaled tube Ta=Nexp(iAd(a)Λ)\mathcal{T}_a=N\exp(i\operatorname{Ad}(a)\Lambda). We define a class of NN-invariant weight functions wλ{\bf w}_\lambda on the tube T\mathcal{T}, rescale them for every aAa\in A to a weight wλ,a{\bf w}_{\lambda, a} on Ta\mathcal{T}_a, and show that each ϕa\phi_a lies in the L2L^2-weighted Bergman space B(Ta,wλ,a):=O(Ta)L2(Ta,wλ,a)\mathcal{B}(\mathcal{T}_a, {\bf w}_{\lambda, a}):=\mathcal{O}(\mathcal{T}_a)\cap L^2(\mathcal{T}_a, {\bf w}_{\lambda, a}). The main result of the article then describes Pλ(L2(N))\mathcal{P}_\lambda(L^2(N)) as those eigenfunctions ϕ\phi for which ϕaB(Ta,wλ,a)\phi_a\in \mathcal{B}(\mathcal{T}_a, {\bf w}_{\lambda, a}) and ϕ:=supaAaReλ2ρϕaBa,λ<\|\phi\|:=\sup_{a\in A} a^{\operatorname{Re}\lambda -2\rho} \|\phi_a\|_{\mathcal{B}_{a,\lambda}}<\infty holds.

Keywords

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

R2 v1 2026-06-24T12:07:08.474Z