English

Harmonic functions on hyperbolic graphs

Metric Geometry 2013-03-12 v2 Probability
Authors: Camille Petit
View on arXiv PDF DOI

Abstract

We consider admissible random walks on hyperbolic graphs. For a given harmonic function on such a graph, we prove that asymptotic properties of non-tangential boundedness and non-tangential convergence are almost everywhere equivalent. The proof is inspired by the works of F. Mouton in the cases of Riemannian manifolds of pinched negative curvature and infinite trees. It involves geometric and probabilitistic methods.

Keywords

harmonic functions asymptotic analysis hyperbolic groups

Cite

@article{arxiv.0905.4118,
  title  = {Harmonic functions on hyperbolic graphs},
  author = {Camille Petit},
  journal= {arXiv preprint arXiv:0905.4118},
  year   = {2013}
}

Comments

14 pages

Related papers

View all related →
Metric Geometry · Mathematics
Non-tangential, radial and stochastic asymptotic properties of harmonic functions on trees
Frédéric Mouton
2010-04-27
dg-ga · Mathematics
Asymptotic properties of energy of harmonic maps on asymptotically hyperbolic manifolds
Man Chun Leung
2008-02-03
Metric Geometry · Mathematics
Boundary behaviour of harmonic functions on hyperbolic manifolds
Camille Petit
2013-02-26
Probability · Mathematics
The Liouville and the intersection properties are equivalent for planar graphs
Itai Benjamini, Nicolas Curien, Agelos Georgakopoulos
2012-10-08
Differential Geometry · Mathematics
Brownian motion and the parabolicity of minimal graphs
Robert W. Neel
2008-10-06
Geometric Topology · Mathematics
Random walks on Convergence Groups
Aitor Azemar
2020-06-16
Representation Theory · Mathematics
Semifinite harmonic functions on branching graphs
Nikita Safonkin
2022-02-18
Probability · Mathematics
Asymptotic Capacity of the Range of Random Walks on Free Products of Graphs
Lorenz A. Gilch
2024-02-05
Functional Analysis · Mathematics
Recurrent and (strongly) resolvable graphs
Daniel Lenz, Simon Puchert, Marcel Schmidt
2023-01-06
Differential Geometry · Mathematics
Harmonic maps and the topology of conformally compact Einstein manifolds
Naichung Conan Leung, Tom Yau-heng Wan
2007-05-23
Differential Geometry · Mathematics
On asymptotically harmonic manifolds of negative curvature
Philippe Castillon, Andrea Sambusetti
2019-07-25
Combinatorics · Mathematics
Harmonic analysis invariants for infinite graphs via operators and algorithms
Sergey Bezuglyi, Palle E. T. Jorgensen
2020-10-26
Probability · Mathematics
Remarks on random walks on graphs and the Floyd boundary
Panagiotis Spanos
2021-04-29
Analysis of PDEs · Mathematics
Minimal Graphs in the Hyperbolic Space with Singular Asymptotic Boundaries
Qing Han, Weiming Shen, Yue Wang
2016-03-15
Group Theory · Mathematics
Characterisations of algebraic properties of groups in terms of harmonic functions
Matthew Tointon
2016-09-22
Dynamical Systems · Mathematics
Random walks in negative curvature and boundary representations
Kevin Boucher
2020-01-14
Differential Geometry · Mathematics
Noncompact asymptotically harmonic manifolds
Gerhard Knieper, Norbert Peyerimhoff
2014-01-08
Probability · Mathematics
Convergence of the structure function of a Multifractal Random Walk in a mixed asymptotic setting
Laurent Duvernet
2009-05-22
Probability · Mathematics
Existence of the harmonic measure for random walks on graphs and in random environments
Daniel Boivin, Clément Rau
2012-02-16
Dynamical Systems · Mathematics
Hyperbolicity and Quasi-hyperbolicity in Polynomial Diffeomorphisms of ${\Bbb C}^2$
Eric Bedford, Lorenzo Guerini, John Smillie
2020-06-02
Mathematical Physics · Physics
Asymptotics of the number of possible endpoints of a random walk on a directed Hamiltonian metric graph
Daniil Pyatko, Vsevolod Chernyshev
2021-12-28
Probability · Mathematics
On the inclusion of bounded harmonic functions of random walks
Yair Hartman, Aranka Hrušková, Omer Segev
2026-01-27
Metric Geometry · Mathematics
On Hyperbolic graphs induced by iterated function systems
Ka-Sing Lau, Xiang-Yang Wang
2016-10-13
Geometric Topology · Mathematics
Random walks on weakly hyperbolic groups
Joseph Maher, Giulio Tiozzo
2015-01-05
Analysis of PDEs · Mathematics
A Note on Harmonic Functions on surfaces
Jean C. Cortissoz
2014-08-15
R2 v1 2026-06-21T13:05:55.126Z