The concentration function problem for locally compact groups is concerned with the structure of groups admitting adapted nondissipating random walks. It is closely related to discrete relatively compact M- or skew convolution semigroups and corresponding space-time random walks, and to -decomposable laws, respectively, where denotes an automorphism. Analogous results are obtained in the case of continuous time: nondissipating Lévy processes are related to relatively compact distributions of generalized Ornstein-Uhlenbeck processes and corresponding space-time processes and to -decomposable laws, respectively with denoting a continuous group of automorphisms acting as contracting mod. a compact subgroup
AbstractWe establish Lamperti representations for semi-stable Markov processes in locally compact gr...
This thesis presents two applications of representation theory of locally compact groups. The first...
62 pages, 1 figure, 2 tablesInternational audienceWe study some spectral properties of random walks ...
The concentration function problem for locally compact groups, i.e., the structure of groups admitt...
72 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2000.Given an adapted probability m...
Given a locally compact group G and a probability measure [mu] on G it is of interest to know, in va...
We consider a locally compact, noncompact, totally disconnected, nondis-crete, metrizable abelian gr...
We give general conditions for the central limit theorem and weak convergence to Brownian motion (th...
We study the behavior of the Gaussian concentration bound (GCB) under stochastic time evolution.More...
AbstractIn this paper we study some properties of the convolution powers K(n)=K∗K∗⋯∗K of a probabili...
Unifying and generalizing previous investigations for vector spaces and for locally compact groups, ...
AbstractWe consider an ultrametric space with sufficiently many isometries and we construct a class ...
International audienceWe study the behavior of the Gaussian concentration bound (GCB) under stochast...
Abstract. It is shown that every Lévy process on a locally compact group G is determined by a seque...
We present a general approach to derive sampling theorems on locally compact groups from oscillation...
AbstractWe establish Lamperti representations for semi-stable Markov processes in locally compact gr...
This thesis presents two applications of representation theory of locally compact groups. The first...
62 pages, 1 figure, 2 tablesInternational audienceWe study some spectral properties of random walks ...
The concentration function problem for locally compact groups, i.e., the structure of groups admitt...
72 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2000.Given an adapted probability m...
Given a locally compact group G and a probability measure [mu] on G it is of interest to know, in va...
We consider a locally compact, noncompact, totally disconnected, nondis-crete, metrizable abelian gr...
We give general conditions for the central limit theorem and weak convergence to Brownian motion (th...
We study the behavior of the Gaussian concentration bound (GCB) under stochastic time evolution.More...
AbstractIn this paper we study some properties of the convolution powers K(n)=K∗K∗⋯∗K of a probabili...
Unifying and generalizing previous investigations for vector spaces and for locally compact groups, ...
AbstractWe consider an ultrametric space with sufficiently many isometries and we construct a class ...
International audienceWe study the behavior of the Gaussian concentration bound (GCB) under stochast...
Abstract. It is shown that every Lévy process on a locally compact group G is determined by a seque...
We present a general approach to derive sampling theorems on locally compact groups from oscillation...
AbstractWe establish Lamperti representations for semi-stable Markov processes in locally compact gr...
This thesis presents two applications of representation theory of locally compact groups. The first...
62 pages, 1 figure, 2 tablesInternational audienceWe study some spectral properties of random walks ...