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Autores principales: Liu, Fei, Zhang, Yinghan
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2506.22883
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author Liu, Fei
Zhang, Yinghan
author_facet Liu, Fei
Zhang, Yinghan
contents In this paper, we investigate the problem of the existence of the bounded harmonic functions on a simply connected Riemannian manifold $\widetilde{M}$ without conjugate points, which can be compactified via the ideal boundary $\widetilde{M}(\infty)$. Let $\widetilde{M}$ be a uniform visibility manifold which satisfy the Axiom $2$, or a rank $1$ manifold without focal points, suppose that $Γ$ is a cocompact discrete subgroup of $Iso(\widetilde{M})$, we show that for a given continuous function on $\widetilde{M}(\infty)$, there exists a harmonic extension to $\widetilde{M}$. And furthermore, when $\widetilde{M}$ is a rank $1$ manifold without focal points, the Brownian motion defines a family of harmonic measures $ν_{\ast}$ on $\widetilde{M}(\infty)$, we show that $(\widetilde{M}(\infty),ν_{\ast})$ is isomorphic to the Poisson boundary of $Γ$.
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institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On the Dirichlet Problem at Infinity and Poisson Boundary for Certain Manifolds without Conjugate Points
Liu, Fei
Zhang, Yinghan
Differential Geometry
Probability
31C12, 58J32
In this paper, we investigate the problem of the existence of the bounded harmonic functions on a simply connected Riemannian manifold $\widetilde{M}$ without conjugate points, which can be compactified via the ideal boundary $\widetilde{M}(\infty)$. Let $\widetilde{M}$ be a uniform visibility manifold which satisfy the Axiom $2$, or a rank $1$ manifold without focal points, suppose that $Γ$ is a cocompact discrete subgroup of $Iso(\widetilde{M})$, we show that for a given continuous function on $\widetilde{M}(\infty)$, there exists a harmonic extension to $\widetilde{M}$. And furthermore, when $\widetilde{M}$ is a rank $1$ manifold without focal points, the Brownian motion defines a family of harmonic measures $ν_{\ast}$ on $\widetilde{M}(\infty)$, we show that $(\widetilde{M}(\infty),ν_{\ast})$ is isomorphic to the Poisson boundary of $Γ$.
title On the Dirichlet Problem at Infinity and Poisson Boundary for Certain Manifolds without Conjugate Points
topic Differential Geometry
Probability
31C12, 58J32
url https://arxiv.org/abs/2506.22883