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Autori principali: Biswas, Kingshook, Dewan, Utsav, Choudhury, Arkajit Pal
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2408.06098
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author Biswas, Kingshook
Dewan, Utsav
Choudhury, Arkajit Pal
author_facet Biswas, Kingshook
Dewan, Utsav
Choudhury, Arkajit Pal
contents Let $M$ be an $n$-dimensional Hadamard manifold of pinched negative curvature $-b^2 \leq K_M \leq -a^2$. The solution of the Dirichlet problem at infinity for $M$ leads to the construction of a family of mutually absolutely continuous probability measures $\{μ_x\}_{x \in M}$ called the harmonic measures. Fixing a basepoint $o \in M$, the Poisson kernel of $M$ is the function $P : M \times \partial M \to (0, \infty)$ defined by \begin{equation*} P(x, ξ) = \frac{dμ_x}{dμ_o}(ξ) \ , \ x \in M, ξ\in \partial M. \end{equation*} We prove the following global upper and lower bounds for the Poisson kernel: \begin{equation*} \frac{1}{C}\: e^{-2K{(o|ξ)}_x}\: e^{a d(x, o)} \le P(x,ξ) \le C\: e^{2K{(x|ξ)}_o}\: e^{-a d(x,o)} \:, \end{equation*} for some positive constants $C \geq 1, K > 0$ depending solely on $a, b$ and $n$. The above estimates may be viewed as a generalization of the well-known formula for the Poisson kernel in terms of Busemann functions for the special case of Gromov hyperbolic harmonic manifolds. These estimates do not follow directly from known estimates on Green's functions or harmonic measures. Instead we use techniques due to Anderson-Schoen for estimating positive harmonic functions in cones. As applications, we obtain quantitative estimates for the convergence $μ_x \to δ_ξ$ as $x \in M \to ξ\in \partial M$, and for the convergence of harmonic measures on finite spheres to the harmonic measures on the boundary at infinity as the radius of the spheres tends to infinity.
format Preprint
id arxiv_https___arxiv_org_abs_2408_06098
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Estimates of the Poisson kernel on negatively curved Hadamard manifolds
Biswas, Kingshook
Dewan, Utsav
Choudhury, Arkajit Pal
Differential Geometry
Classical Analysis and ODEs
53C20, 31C05
Let $M$ be an $n$-dimensional Hadamard manifold of pinched negative curvature $-b^2 \leq K_M \leq -a^2$. The solution of the Dirichlet problem at infinity for $M$ leads to the construction of a family of mutually absolutely continuous probability measures $\{μ_x\}_{x \in M}$ called the harmonic measures. Fixing a basepoint $o \in M$, the Poisson kernel of $M$ is the function $P : M \times \partial M \to (0, \infty)$ defined by \begin{equation*} P(x, ξ) = \frac{dμ_x}{dμ_o}(ξ) \ , \ x \in M, ξ\in \partial M. \end{equation*} We prove the following global upper and lower bounds for the Poisson kernel: \begin{equation*} \frac{1}{C}\: e^{-2K{(o|ξ)}_x}\: e^{a d(x, o)} \le P(x,ξ) \le C\: e^{2K{(x|ξ)}_o}\: e^{-a d(x,o)} \:, \end{equation*} for some positive constants $C \geq 1, K > 0$ depending solely on $a, b$ and $n$. The above estimates may be viewed as a generalization of the well-known formula for the Poisson kernel in terms of Busemann functions for the special case of Gromov hyperbolic harmonic manifolds. These estimates do not follow directly from known estimates on Green's functions or harmonic measures. Instead we use techniques due to Anderson-Schoen for estimating positive harmonic functions in cones. As applications, we obtain quantitative estimates for the convergence $μ_x \to δ_ξ$ as $x \in M \to ξ\in \partial M$, and for the convergence of harmonic measures on finite spheres to the harmonic measures on the boundary at infinity as the radius of the spheres tends to infinity.
title Estimates of the Poisson kernel on negatively curved Hadamard manifolds
topic Differential Geometry
Classical Analysis and ODEs
53C20, 31C05
url https://arxiv.org/abs/2408.06098