Add to ORKGFor a countable product of complete separable metric spaces, with a topology induced by a uniform metric, the σ-algebra generated by the open balls, which was introduced by Dudley (1966), coincides with the product σ-algebra. Any probability measure on the product space with this σ-algebra is quasi-separable in the sense that, for any union of open balls that has full measure, there is a countable sub-union that also has full measure. With suitably adapted definitions, the topology of weak convergence on the space of such measures is equivalent to the topology induced by the Prohorov metric...
AbstractLet X1, X2 be topological spaces and Y their product. Denote by Mτ(X1), Mτ(X2), and Mτ(Y) th...
Title: Probability distributions on metric groups Author: Josef Ondřej Department: Department of Pro...
AbstractThe Choquet capacity T of a random closed set X on a metric space E is regarded as or relate...
For a countable product of complete separable metric spaces with a topology induced by a uniform met...
Metric and uniform spaces of probabilistic measures are investigated in the paper aiming at the indi...
Let 5 and T denote complete separable metric spaces. Let P(S) denote the collection of probability m...
In this book, the author gives a cohesive account of the theory of probability measures on complete ...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
In this paper we consider probability measures on a complete separable metric space $ T $ (or on a t...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
Completeness, separability, and characterization of the precompact subsets are important for doing p...
Completeness, separability, and characterization of the precompact subsets are important for doing p...
SUMMARY. Let Cb(X) denote the Banach space consisting of all real-valued, bounded, and continuous fu...
A new metric is introduced on the set of all sub-σ-algebras of a complete probability space from fun...
Let X be a complete metric space, and S the union of a finite number of strict contractions on it. I...
AbstractLet X1, X2 be topological spaces and Y their product. Denote by Mτ(X1), Mτ(X2), and Mτ(Y) th...
Title: Probability distributions on metric groups Author: Josef Ondřej Department: Department of Pro...
AbstractThe Choquet capacity T of a random closed set X on a metric space E is regarded as or relate...
For a countable product of complete separable metric spaces with a topology induced by a uniform met...
Metric and uniform spaces of probabilistic measures are investigated in the paper aiming at the indi...
Let 5 and T denote complete separable metric spaces. Let P(S) denote the collection of probability m...
In this book, the author gives a cohesive account of the theory of probability measures on complete ...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
In this paper we consider probability measures on a complete separable metric space $ T $ (or on a t...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
Completeness, separability, and characterization of the precompact subsets are important for doing p...
Completeness, separability, and characterization of the precompact subsets are important for doing p...
SUMMARY. Let Cb(X) denote the Banach space consisting of all real-valued, bounded, and continuous fu...
A new metric is introduced on the set of all sub-σ-algebras of a complete probability space from fun...
Let X be a complete metric space, and S the union of a finite number of strict contractions on it. I...
AbstractLet X1, X2 be topological spaces and Y their product. Denote by Mτ(X1), Mτ(X2), and Mτ(Y) th...
Title: Probability distributions on metric groups Author: Josef Ondřej Department: Department of Pro...
AbstractThe Choquet capacity T of a random closed set X on a metric space E is regarded as or relate...