Free Probability Theory ( Fields Institute Communications )

Publication series :Fields Institute Communications

Author: Dan-Virgil Voiculescu  

Publisher: American Mathematical Society‎

Publication year: 1996

E-ISBN: 9781470429805

P-ISBN(Hardback):  9780821806753

Subject: O211 probability (probability theory, probability theory)

Keyword: 暂无分类

Language: ENG

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Free Probability Theory

Description

Free probability theory is a highly noncommutative probability theory, with independence based on free products instead of tensor products. The theory models random matrices in the large $N$ limit and operator algebra free products. It has led to a surge of new results on the von Neumann algebras of free groups. This is a volume of papers from a workshop on Random Matrices and Operator Algebra Free Products, held at The Fields Institute for Research in the Mathematical Sciences in March 1995. Over the last few years, there has been much progress on the operator algebra and noncommutative probability sides of the subject. New links with the physics of masterfields and the combinatorics of noncrossing partitions have emerged. Moreover there is a growing free entropy theory. The idea of this workshop was to bring together people working in all these directions and from an even broader free products area where future developments might lead.

Chapter

Cover

Title page

Contents

Preface

Free Brownian motion, free stochastic calculus, and random matrices

Large 𝑁 quantum field theory and matrix models

Free products of finite dimensional and other von Neumann algebras with respect to non-tracial states

Amalgamated free product 𝐶*-algebras and 𝐾𝐾-theory

Connexion coefficients for the symmetric group, free products in operator algebras, and random matrices

On Voiculescu’s 𝑅- and 𝑆-transforms for free noncommuting random variables

𝑅-diagonal pairs—A common approach to Haar unitaries and circular elements

A class of 𝐶*-algebras generalizing both Cuntz-Krieger algebras and crossed products by ℤ

An invariant for subfactors in the von Neumann algebra of a free group

Limit distributions of matrices with bosonic and fermionic entries

𝑅-transform of certain joint distributions

On universal products

Boolean convolution

States and shifts on infinite free products of 𝐶*-algebras

The analogues of entropy and of Fisher’s information measure in free probability theory. IV: Maximum entropy and freeness

Universal correlation in random matrix theory: A brief introduction for mathematicians

Back Cover

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