Strongly solid group factors which are not interpolated free group factors

Cyril Houdayer

arXiv:0901.3866·math.OA·July 17, 2025·2 cites

Strongly solid group factors which are not interpolated free group factors

Cyril Houdayer

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TL;DR

This paper constructs examples of non-amenable ICC groups with the Haagerup property and weak amenability, whose associated II_1 factors are strongly solid but not isomorphic to any interpolated free group factor.

Contribution

It provides new examples of strongly solid II_1 factors from groups with specific properties, distinct from interpolated free group factors.

Findings

01

Examples of non-amenable ICC groups with Haagerup property

02

Associated II_1 factors are strongly solid

03

These factors are not isomorphic to any interpolated free group factor

Abstract

We give examples of non-amenable ICC groups $Γ$ with the Haagerup property, weakly amenable with constant $Λ_{\cb} (Γ) = 1$ , for which we show that the associated $I I_{1}$ factors $L (Γ)$ are strongly solid, i.e. the normalizer of any diffuse amenable subalgebra $P \subset L (Γ)$ generates an amenable von Neumann algebra. Nevertheless, for these examples of groups $Γ$ , $L (Γ)$ is not isomorphic to any interpolated free group factor $L (\F_{t})$ , for $1 < t \leq \infty$ .

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Taxonomy

TopicsAdvanced Operator Algebra Research · Advanced Topics in Algebra · Algebraic structures and combinatorial models