Random integral mappings give isomorphism between the subsemigroups of the classical (I D, *) and the free-infinite divisible (I D, ⊞) probability measures. This allows us to introduce new examples of such measures, more precisely their corresponding characteristic functionals
This paper introduces and studies a family of new classes of infinitely divisible distributions on R...
We prove that the convolution of a selfdecomposable distribution with its background driving law is ...
We consider the problem of characterizing the finitely additive probability measures on the definabl...
Free probability is a noncommutative probability theory introduced by Voiculescu where the concept ...
Free probability is a noncommutative probability theory introduced by Voiculescu where the concept ...
AbstractIn this paper we introduce and study a regularizing one-to-one mapping ϒ0 from the class of ...
In this paper we continue our studies, initiated in [BT1],[BT2] and [BT3], of the con-nections betwe...
We study the freely infinitely divisible distributions that appear as the laws of free subordinators...
AbstractSubclasses Uβ(E), −2 < β ≤ −1, of the Lévy class L of self-decomposable measures on a Banach...
In classical probability there are known many characterization of probability measures by independen...
In classical probability there are known many characterization of probability measures by independen...
There is a one-to-one correspondence between classical one-dimensional infi-nitely divisible distrib...
The class of R-diagonal *-distributions is fairly well understood in free probability. In this class...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
This paper introduces and studies a family of new classes of infinitely divisible distributions on R...
We prove that the convolution of a selfdecomposable distribution with its background driving law is ...
We consider the problem of characterizing the finitely additive probability measures on the definabl...
Free probability is a noncommutative probability theory introduced by Voiculescu where the concept ...
Free probability is a noncommutative probability theory introduced by Voiculescu where the concept ...
AbstractIn this paper we introduce and study a regularizing one-to-one mapping ϒ0 from the class of ...
In this paper we continue our studies, initiated in [BT1],[BT2] and [BT3], of the con-nections betwe...
We study the freely infinitely divisible distributions that appear as the laws of free subordinators...
AbstractSubclasses Uβ(E), −2 < β ≤ −1, of the Lévy class L of self-decomposable measures on a Banach...
In classical probability there are known many characterization of probability measures by independen...
In classical probability there are known many characterization of probability measures by independen...
There is a one-to-one correspondence between classical one-dimensional infi-nitely divisible distrib...
The class of R-diagonal *-distributions is fairly well understood in free probability. In this class...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
A metric measure space is a complete, separable metric space equipped with a probability measure tha...
This paper introduces and studies a family of new classes of infinitely divisible distributions on R...
We prove that the convolution of a selfdecomposable distribution with its background driving law is ...
We consider the problem of characterizing the finitely additive probability measures on the definabl...
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