Add to ORKGPreliminary version, 13 pages, LaTeX. Comments are most welcome.Motivated by recent work of Au, Cébron, Dahlqvist, Gabriel, and Male, we study regularity properties of the distribution of a sum of two selfad-joint random variables in a tracial noncommutative probability space which are free over a commutative algebra. We give a characterization of the invariant projections of such a sum in terms of the associated subordination functions
© 2015, Springer Science+Business Media New York. Noncommutative measure and probability theory deve...
Let (M, ϕ) be a von Neumann algebra with a faithful state: non-commutative probability space. Elemen...
AbstractWe use free probability techniques to compute borders of spectra of non-hermitian operators ...
Preliminary version, 13 pages, LaTeX. Comments are most welcome.Motivated by recent work of Au, Cébr...
In this paper, we construct a free semicircular family induced by ...
AbstractWe investigate some ways to obtain free families of random variables from an initial free fa...
Abstract: We consider a tracial state ϕ on a von Neumann algebra A and assume that projections P, Q ...
Basic notions for *-noncommutative probability spaces and B-valued *-noncommutative probability spac...
Chistyakov G, Götze F, Lehner F. Freeness of linear and quadratic forms in von Neumann algebras. Jou...
Abstract. We prove that if (a; b) is an R-diagonal pair in some non-commu-tative probability space (...
AbstractWe characterize the semicircular distribution by freeness of linear and quadratic forms in n...
We will investigate several related problems in Operator Theory and Free Probability. The notion of...
Free probability is a non-commutative analogue of probability theory. Recently, Voiculescu has intro...
AbstractThe algebra Mul〚B〛 of formal multilinear function series over an algebra B and its quotient ...
This study consists of two projects on bi-free probability. In the first project, a bi-free central ...
© 2015, Springer Science+Business Media New York. Noncommutative measure and probability theory deve...
Let (M, ϕ) be a von Neumann algebra with a faithful state: non-commutative probability space. Elemen...
AbstractWe use free probability techniques to compute borders of spectra of non-hermitian operators ...
Preliminary version, 13 pages, LaTeX. Comments are most welcome.Motivated by recent work of Au, Cébr...
In this paper, we construct a free semicircular family induced by ...
AbstractWe investigate some ways to obtain free families of random variables from an initial free fa...
Abstract: We consider a tracial state ϕ on a von Neumann algebra A and assume that projections P, Q ...
Basic notions for *-noncommutative probability spaces and B-valued *-noncommutative probability spac...
Chistyakov G, Götze F, Lehner F. Freeness of linear and quadratic forms in von Neumann algebras. Jou...
Abstract. We prove that if (a; b) is an R-diagonal pair in some non-commu-tative probability space (...
AbstractWe characterize the semicircular distribution by freeness of linear and quadratic forms in n...
We will investigate several related problems in Operator Theory and Free Probability. The notion of...
Free probability is a non-commutative analogue of probability theory. Recently, Voiculescu has intro...
AbstractThe algebra Mul〚B〛 of formal multilinear function series over an algebra B and its quotient ...
This study consists of two projects on bi-free probability. In the first project, a bi-free central ...
© 2015, Springer Science+Business Media New York. Noncommutative measure and probability theory deve...
Let (M, ϕ) be a von Neumann algebra with a faithful state: non-commutative probability space. Elemen...
AbstractWe use free probability techniques to compute borders of spectra of non-hermitian operators ...