Add to ORKGThis article is on the research of Wilhelm von Waldenfels in the mathematical field of quantum (or non-commutative) probability theory. Wilhelm von Waldenfels was one of the pioneers, even one of the founders, of quantum probability. We concentrate on a small part of his scientific work. The aspects of physics are practically not mentioned at all. There is nothing on his results in classical probability on groups (Waldenfels operators). This is an attempt to show how the concepts of non-commutative notions of independence and of L\'evy processes on structures like Hopf algebras developed from the ideas of Wilhelm von Waldenfels.Comment: This article is my contribution to the special volume of IDAQP in memory of Robin L. Hudson and Wilhelm...
We analyze general aspects of exchangeable quantum stochastic processes, as well as some concrete ca...
We describe the Schwinger–Dyson equation related with the free difference quotient. Such an equation...
We present a new description of the known large deviation function of the classical symmetric simple...
In this report we discuss some results of non--commutative (quantum) probability theory relating the...
This is a summary of the paper [FHS20]. The main result is the construction of bijections of the thr...
This is a summary of the paper [FHS20]. The main result is the construction of bijections of the thr...
As a first part of a rigorous mathematical theory of non-commutative probability we present, startin...
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
Noncommutative mathematics is a significant new trend of mathematics. Initially motivated by the dev...
We deal with the general structure of the stochastic processes by using the standard techniques of O...
Stochastic processes are families of random variables; Lévy processes are families indexed by the po...
AbstractConsidering a random variable as a multiplication operator by a measurable function, a natur...
Elements in a noncommutative operator algebra can be regarded as noncommutative random variables fro...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer...
The role of coalgebras as well as algebraic groups in non-commutative probability has long been advo...
We analyze general aspects of exchangeable quantum stochastic processes, as well as some concrete ca...
We describe the Schwinger–Dyson equation related with the free difference quotient. Such an equation...
We present a new description of the known large deviation function of the classical symmetric simple...
In this report we discuss some results of non--commutative (quantum) probability theory relating the...
This is a summary of the paper [FHS20]. The main result is the construction of bijections of the thr...
This is a summary of the paper [FHS20]. The main result is the construction of bijections of the thr...
As a first part of a rigorous mathematical theory of non-commutative probability we present, startin...
International audiencehis monograph is a progressive introduction to non-commutativity in probabilit...
Noncommutative mathematics is a significant new trend of mathematics. Initially motivated by the dev...
We deal with the general structure of the stochastic processes by using the standard techniques of O...
Stochastic processes are families of random variables; Lévy processes are families indexed by the po...
AbstractConsidering a random variable as a multiplication operator by a measurable function, a natur...
Elements in a noncommutative operator algebra can be regarded as noncommutative random variables fro...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer...
The role of coalgebras as well as algebraic groups in non-commutative probability has long been advo...
We analyze general aspects of exchangeable quantum stochastic processes, as well as some concrete ca...
We describe the Schwinger–Dyson equation related with the free difference quotient. Such an equation...
We present a new description of the known large deviation function of the classical symmetric simple...