P-Amenable Locally Compact Groups.
Pointwise estimates for densities of stable semigroups of measures
Let be a symmetric α-stable semigroup of probability measures on a homogeneous group N, where 0 < α < 2. Assume that are absolutely continuous with respect to Haar measure and denote by the corresponding densities. We show that the estimate , x≠0, holds true with some integrable function Ω on the unit sphere Σ if and only if the density of the Lévy measure of the semigroup belongs locally to the Zygmund class LlogL(N╲e). The problem turns out to be related to the properties of the maximal...
Positive vector measures with given marginals
Suppose is an ordered locally convex space, and Hausdorff completely regular spaces and a uniformly bounded, convex and closed subset of . For , let . Then, under some topological and order conditions on , necessary and sufficient conditions are established for the existence of an element in , having marginals and .
Précisions sur la mesure de Föllmer
Prescribing harmonic measure on convex domains.
Pre-supports of linear probability measures and linear Lusin measurable functionals [Book]
Primitive d'une mesure sur les compacts d'un espace métrique
Probabilistic representations of operator semigroups - A unifying approach.
Probabilités cylindriques, type et ordre. Applications radonifiantes
Probability measure functors preserving infinite-dimensional spaces
Probability measures on compact semitopological semigroups
Processus canoniquement mesurables (ou : Doob avait raison)
Produits semi-directs et application aux nilvariétés et aux tores en théorie ergodique
Produits tensoriels et , applications -sommantes, applications -radonifiantes