On Rellich-type asymptotics for eigenfunctions on rank one symmetric spaces of noncompact type

Abstract

We study eigenfunctions of the Laplace--Beltrami operator \(ΔX\) in exterior domains \(Ω\) of rank-one Riemannian symmetric spaces of noncompact type \(X\), a class that includes all hyperbolic spaces. Extending the classical \(L2\) Rellich theorem for the Euclidean Laplacian, we analyze the asymptotic behaviour and \(Lp\)-integrability of solutions to the Helmholtz equation \[ ΔX f + (λ2 + ρ2) f = 0 in Ω, \] where \(λ∈ C iZ\) and \(ρ\) denotes the half-sum of positive roots. We establish sharp Rellich-type quantitative \(Lp\)-growth estimates in geodesic annuli, which yield the nonexistence of nontrivial \(Lp(Ω)\)-solutions in the optimal range \(1 ≤ p ≤ 2\) for spectral parameters satisfying \(|(λ)| ≤ (2/p - 1)ρ\). For non-real spectral parameters, we further obtain refined Rellich-type uniqueness results under weak \(Lp\)-assumptions. As a by-product, we also prove a Rellich-type uniqueness theorem in terms of Hardy-type norms. Our results provide a geometric extension of the Euclidean Rellich theorem, highlighting the role of exponential volume growth and the \(p\)-dependence of the \(Lp\)-spectrum of \(ΔX\) in producing genuinely non-Euclidean spectral phenomena.