DOIAbstract
AbstractIn this paper we present the complete description of surjective isometries of the space of all probability distribution functions on R with respect to the Lévy metric
AbstractIn this paper we present the complete description of surjective isometries of the space of all probability distribution functions on R with respect to the Lévy metric
Metric and uniform spaces of probabilistic measures are investigated in the paper aiming at the indi...
Abstract In this paper we propose a method to construct probability measures on the space of convex ...
The construction of a distance function between probability distributions is of importance in mathem...
AbstractIn this paper we present the complete description of surjective isometries of the space of a...
AbstractIn 1937, Paul Lévy proved two theorems that characterize one-dimensional distribution functi...
Borel probability measures living on metric spaces are fundamental mathematical objects. There are s...
We study the problem of metrizing the space of distribution functions of finitely additive probabili...
We adopt a defintion of distribution function that, although not new, is not common in the literatur...
A functional defined by means of entropy is considered. It is shown that it is a distance in the set...
AbstractThe paper is devoted to metrization of probability spaces through the introduction of a quad...
Characterisations of surjective isometries with respect to the Kuiper distance on three classes of ...
AbstractThe probability measure of X = (x0,…, xr), where x0,…, xr are independent isotropic random p...
The paper is devoted to metrization of probability spaces through the introduction of a quadratic di...
According to the fundamental work of Yu.V. Prokhorov, the general theory of stochastic processes can...
AbstractWe define a natural metric on the space of all bounded frame functions on a given Hilbert sp...
Metric and uniform spaces of probabilistic measures are investigated in the paper aiming at the indi...
Abstract In this paper we propose a method to construct probability measures on the space of convex ...
The construction of a distance function between probability distributions is of importance in mathem...
AbstractIn this paper we present the complete description of surjective isometries of the space of a...
AbstractIn 1937, Paul Lévy proved two theorems that characterize one-dimensional distribution functi...
Borel probability measures living on metric spaces are fundamental mathematical objects. There are s...
We study the problem of metrizing the space of distribution functions of finitely additive probabili...
We adopt a defintion of distribution function that, although not new, is not common in the literatur...
A functional defined by means of entropy is considered. It is shown that it is a distance in the set...
AbstractThe paper is devoted to metrization of probability spaces through the introduction of a quad...
Characterisations of surjective isometries with respect to the Kuiper distance on three classes of ...
AbstractThe probability measure of X = (x0,…, xr), where x0,…, xr are independent isotropic random p...
The paper is devoted to metrization of probability spaces through the introduction of a quadratic di...
According to the fundamental work of Yu.V. Prokhorov, the general theory of stochastic processes can...
AbstractWe define a natural metric on the space of all bounded frame functions on a given Hilbert sp...
Metric and uniform spaces of probabilistic measures are investigated in the paper aiming at the indi...
Abstract In this paper we propose a method to construct probability measures on the space of convex ...
The construction of a distance function between probability distributions is of importance in mathem...
Add to ORKG