27 pagesInternational audienceIn this paper, we investigate a continuous family of notions of independence which interpolates between the classical and free ones for non-commutative random variables. These notions are related to the liberation process introduced by D. Voiculescu. To each notion of independence correspond new convolutions of probability measures, for which we establish formulae and of which we compute simple examples. We prove that there exists no reasonable analogue of classical and free cumulants associated to these notions of independence
We investigate operator-valued monotone independence, a noncommutative version of independence for c...
AbstractWe show that the framework developed by Voiculescu for free random variables can be extended...
Chistyakov G, Götze F. The arithmetic of distributions in free probability theory. Central European ...
Abstract. In this paper, we investigate a continuous family of notions of independence which interpo...
27 pagesInternational audienceIn this paper, we investigate a continuous family of notions of indepe...
A continuous semigroup of notions of independence between the classical and the free on
Many kinds of independence have been defined in non-commutative probability theory. Natural independ...
In classical probability there are known many characterization of probability measures by independen...
Free probability is a noncommutative probability theory introduced by Voiculescu where the concept ...
In this paper we continue our studies, initiated in [BT1],[BT2] and [BT3], of the con-nections betwe...
AbstractIn earlier work it was shown that if two functions in the algebra of functions of single sem...
The notion of half independence arises in random matrices and quantum groups. This notion is availab...
As a first part of a rigorous mathematical theory of non-commutative probability we present, startin...
The aim of the bachelor's thesis was to explore the independence of random events in greater depth a...
We define a product of algebraic probability spaces equipped with two states. This product is called...
We investigate operator-valued monotone independence, a noncommutative version of independence for c...
AbstractWe show that the framework developed by Voiculescu for free random variables can be extended...
Chistyakov G, Götze F. The arithmetic of distributions in free probability theory. Central European ...
Abstract. In this paper, we investigate a continuous family of notions of independence which interpo...
27 pagesInternational audienceIn this paper, we investigate a continuous family of notions of indepe...
A continuous semigroup of notions of independence between the classical and the free on
Many kinds of independence have been defined in non-commutative probability theory. Natural independ...
In classical probability there are known many characterization of probability measures by independen...
Free probability is a noncommutative probability theory introduced by Voiculescu where the concept ...
In this paper we continue our studies, initiated in [BT1],[BT2] and [BT3], of the con-nections betwe...
AbstractIn earlier work it was shown that if two functions in the algebra of functions of single sem...
The notion of half independence arises in random matrices and quantum groups. This notion is availab...
As a first part of a rigorous mathematical theory of non-commutative probability we present, startin...
The aim of the bachelor's thesis was to explore the independence of random events in greater depth a...
We define a product of algebraic probability spaces equipped with two states. This product is called...
We investigate operator-valued monotone independence, a noncommutative version of independence for c...
AbstractWe show that the framework developed by Voiculescu for free random variables can be extended...
Chistyakov G, Götze F. The arithmetic of distributions in free probability theory. Central European ...