Add to ORKGWe prove that, given an arbitrary spread out probability measure μ on an almost connected locally compact second countable group G, there exists a homogeneous space G/H, called the μ-boundary, such that the space of bounded μ-harmonic functions can be identified with L∞(G/H). The μ-boundary is an amenable contractive homogeneous space. We also establish that the canonical projection onto the μ-boundary of the right random walk of law μ always converges in probability and, when G is amenable, it converges almost surely. The μ-boundary can be characterised as the largest homogeneous space among those homogeneous spaces in which the canonical projection of the random walk converges in probability
We study the spatial behaviour of random walks on infinite graphs which are not necessarily invarian...
We begin by giving a new proof of the equivalence between the Liouville property and vanishing of th...
Let G be a locally compact group and μ a probability measure on G. Given a unitary representation μ ...
. A theory of random walks on the mapping class group and its non-elementary subgroups is developed....
We study random walks on relatively hyperbolic groups whose law is convergent, in the sense that the...
Soit G un groupe de Lie réel et Λ ⊆ G un sous-groupe discret. La donnée d'une mesure de probabilité ...
We study random walks on relatively hyperbolic groups whose law is convergent, in the sense that the...
We study the problem of convergence to the boundary in the setting of random walks on discrete quant...
Let $G$ be a connected semisimple real Lie group with finite center, and $\mu$ a probability measure...
v2: clarified some points, improved exposition, changed titleInternational audienceIt is proved that...
The paper studies the Hausdorff dimension of harmonic measures on various boundaries of a relatively...
In this paper we introduce a method for partial description of the Poisson boundary for a certain cl...
Abstract. We investigate various features of a quite new family of graphs, introduced as a possible ...
Let (G; ¯) be a symmetric random walk on a compact Lie group G. We will call (G; ¯) a Lagrangean ra...
Given a probability measure on a finitely generated group, its Martin boundary is a way to compactif...
We study the spatial behaviour of random walks on infinite graphs which are not necessarily invarian...
We begin by giving a new proof of the equivalence between the Liouville property and vanishing of th...
Let G be a locally compact group and μ a probability measure on G. Given a unitary representation μ ...
. A theory of random walks on the mapping class group and its non-elementary subgroups is developed....
We study random walks on relatively hyperbolic groups whose law is convergent, in the sense that the...
Soit G un groupe de Lie réel et Λ ⊆ G un sous-groupe discret. La donnée d'une mesure de probabilité ...
We study random walks on relatively hyperbolic groups whose law is convergent, in the sense that the...
We study the problem of convergence to the boundary in the setting of random walks on discrete quant...
Let $G$ be a connected semisimple real Lie group with finite center, and $\mu$ a probability measure...
v2: clarified some points, improved exposition, changed titleInternational audienceIt is proved that...
The paper studies the Hausdorff dimension of harmonic measures on various boundaries of a relatively...
In this paper we introduce a method for partial description of the Poisson boundary for a certain cl...
Abstract. We investigate various features of a quite new family of graphs, introduced as a possible ...
Let (G; ¯) be a symmetric random walk on a compact Lie group G. We will call (G; ¯) a Lagrangean ra...
Given a probability measure on a finitely generated group, its Martin boundary is a way to compactif...
We study the spatial behaviour of random walks on infinite graphs which are not necessarily invarian...
We begin by giving a new proof of the equivalence between the Liouville property and vanishing of th...
Let G be a locally compact group and μ a probability measure on G. Given a unitary representation μ ...