Add to ORKGFor a real Hilbert space $H_{\mathbb{R}}$ and $-1 < q < 1$ Bozejko and Speicher introduced the C$^\ast$-algebra $A_q(H_{\mathbb{R}})$ and von Neumann algebra $M_q(H_{\mathbb{R}})$ of $q$-Gaussian variables. We prove that if $\dim(H_{\mathbb{R}}) = \infty$ and $-1 < q < 1, q \not = 0$ then $M_q(H_{\mathbb{R}})$ does not have the Akemann-Ostrand property with respect to $A_q(H_{\mathbb{R}})$. It follows that $A_q(H_{\mathbb{R}})$ is not isomorphic to $A_0(H_{\mathbb{R}})$. This gives an answer to the C$^\ast$-algebraic part of Question 1.1 and Question 1.2 in [NeZe18].Comment: Proceedings of the AMS, to appea
Let be a separable complex Hilbert space, and T a bounded linear operator on . We may form the ultra...
htmlabstractWe prove that the Banach algebra formed by the space of compact operators on a Hilbert s...
One approach to the study of multi-variate operator theory is through the study of Hilbert modules, ...
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Minor corrections of misprints and addition of an introductionWe prove a factorization of completely...
International audienceWe prove that the von Neumann algebras generated by $n$ $q$-Gaussian elements,...
The $q$-Gaussian von Neumann algebras were first defined and studied by Bo\.{z}ejko and Speicher in ...
We prove that the von Neumann algebra generated by q-gaussians is not injective as soon as the dimen...
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The heat semigroup on discrete hypercubes is well-known to be contractive over $L_p$-spaces for $1<p...
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We study (quasi-)cohomological properties through an analysis of quantum Markov semi-groups. We cons...
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Let be a separable complex Hilbert space, and T a bounded linear operator on . We may form the ultra...
htmlabstractWe prove that the Banach algebra formed by the space of compact operators on a Hilbert s...
One approach to the study of multi-variate operator theory is through the study of Hilbert modules, ...
This work is at the crossroads of operator algebra andnon-commutative probability theories. Some pro...
Minor corrections of misprints and addition of an introductionWe prove a factorization of completely...
International audienceWe prove that the von Neumann algebras generated by $n$ $q$-Gaussian elements,...
The $q$-Gaussian von Neumann algebras were first defined and studied by Bo\.{z}ejko and Speicher in ...
We prove that the von Neumann algebra generated by q-gaussians is not injective as soon as the dimen...
. In this paper the author proves that any two elements from one of the following classes of operato...
The heat semigroup on discrete hypercubes is well-known to be contractive over $L_p$-spaces for $1<p...
Given a real number q such that 0 \u3c q\u3c 1 , the natural setting for the mathematics of a q-osci...
Abstract. Let A be a separable unital C*-algebra and let pi: A → L(H) be a faithful representation o...
Let S be a densely defined and closed symmetric relation in a Hilbert space H with defect numbers (1...
We study (quasi-)cohomological properties through an analysis of quantum Markov semi-groups. We cons...
Let A be an abelian von Neumann algebra of operatorn on a Hilbcrt space H cmd let i b commutant A &a...
Let be a separable complex Hilbert space, and T a bounded linear operator on . We may form the ultra...
htmlabstractWe prove that the Banach algebra formed by the space of compact operators on a Hilbert s...
One approach to the study of multi-variate operator theory is through the study of Hilbert modules, ...