Invariant subalgebras of von Neumann algebras arising from negatively curved groups

Abstract: Using an interplay between geometric methods in group theory and soft von Neuman algebraic techniques we prove that for any icc, acylindrically hyperbolic group Γ its von Neumann algebra L(Γ) satisfies the so-called ISR property: any von Neumann subalgebra N ⊆ L(Γ) that is normalized by all group elements in Γ is of the form N = L(Σ) for a normal subgroup Σ ⊳ Γ. In particular, this applies to all groups Γ in each of the following classes: all icc (relatively) hyperbolic groups, most mapping class groups of sur… Show more

“…□ Remark 3.2. We can also deduce the coamenability of the 𝐶 * -algebra case by arguing similarly as in the proof of [9,Corollary 5.7]. We include the proof that was kindly provided to us by the anonymous reviewer.…”

Subalgebras, subgroups, and singularity

“…□ Remark 3.2. We can also deduce the coamenability of the 𝐶 * -algebra case by arguing similarly as in the proof of [9,Corollary 5.7]. We include the proof that was kindly provided to us by the anonymous reviewer.…”

Subalgebras, subgroups, and singularity

“…In [AJ22], the authors prove a similar result as our Theorem 1.1 for a large class of 'negatively curved' groups, including all torsion free non-amenable hyperbolic groups. Their result was then generalized to all acylindrically hyperbolic groups in [CDS22].…”

On invariant subalgebras of group and von Neumann algebras