Add to ORKGWe adopt a defintion of distribution function that, although not new, is not common in the literature on probability; we introduce a new metric on the space of distribution functions and show that this space is both complete and compact
[EN] In this work we show how to define a probability measure with the help of a fractal structure....
The notion of distribution function with respect to a conditional expectation is defined and studied...
[EN] In this work we elaborate a theory of a cumulative distribution function on a Polish ultrametri...
The space of distribution functions endowed with the metric introduced in [5] is separable
We introduce a new family of metrics on the space of distribution functions, following consideration...
We study the problem of metrizing the space of distribution functions of finitely additive probabili...
A functional defined by means of entropy is considered. It is shown that it is a distance in the set...
A space of distributions E is local if, roughly, a distribution T belongs to E whenever T belongs to...
So, in the framework of this project we will introduce the "new distribution space", a distribution ...
"Most of this paper comprises the author's Columbia University thesis, 1953."Includes bibliography.I...
Weak convergence in the space of distribution functions can be metrized the metric of a symmetric sp...
AbstractIn this paper we present the complete description of surjective isometries of the space of a...
A metric on the space of mulivariate distribution functions is introduced and it is shown that the c...
Distributions and Their Applications in Physics is the introduction of the Theory of Distributions a...
AbstractIn 1937, Paul Lévy proved two theorems that characterize one-dimensional distribution functi...
[EN] In this work we show how to define a probability measure with the help of a fractal structure....
The notion of distribution function with respect to a conditional expectation is defined and studied...
[EN] In this work we elaborate a theory of a cumulative distribution function on a Polish ultrametri...
The space of distribution functions endowed with the metric introduced in [5] is separable
We introduce a new family of metrics on the space of distribution functions, following consideration...
We study the problem of metrizing the space of distribution functions of finitely additive probabili...
A functional defined by means of entropy is considered. It is shown that it is a distance in the set...
A space of distributions E is local if, roughly, a distribution T belongs to E whenever T belongs to...
So, in the framework of this project we will introduce the "new distribution space", a distribution ...
"Most of this paper comprises the author's Columbia University thesis, 1953."Includes bibliography.I...
Weak convergence in the space of distribution functions can be metrized the metric of a symmetric sp...
AbstractIn this paper we present the complete description of surjective isometries of the space of a...
A metric on the space of mulivariate distribution functions is introduced and it is shown that the c...
Distributions and Their Applications in Physics is the introduction of the Theory of Distributions a...
AbstractIn 1937, Paul Lévy proved two theorems that characterize one-dimensional distribution functi...
[EN] In this work we show how to define a probability measure with the help of a fractal structure....
The notion of distribution function with respect to a conditional expectation is defined and studied...
[EN] In this work we elaborate a theory of a cumulative distribution function on a Polish ultrametri...