Generalized $q$-Gaussian von Neumann algebras with coefficients, I. Relative strong solidity

TL;DR

This paper introduces a new class of generalized $q$-Gaussian von Neumann algebras with coefficients, proving their strong solidity relative to a subalgebra, and explores their structural properties and examples.

Contribution

It defines generalized $q$-Gaussian von Neumann algebras with coefficients and establishes their strong solidity relative to a subalgebra, including non-isomorphism results.

Findings

Proved strong solidity of the generalized $q$-Gaussian von Neumann algebras

Provided numerous examples of strongly solid algebras

Established non-isomorphism and non-embedability results

Abstract

We define $\Gamma_q(B,S \otimes H)$, the generalized $q$-gaussian von Neumann algebras associated to a sequence of symmetric independent copies $(\pi_j,B,A,D)$ and to a subset $1 \in S = S^* \subset A$ and, under certain assumptions, prove their strong solidity relative to $B$. We provide many examples of strongly solid generalized $q$-gaussian von Neumann algebras. We also obtain non-isomorphism and non-embedability results about some of these von Neumann algebras.