Dynamical McDuff-type properties for group actions on von Neumann algebras
From MaRDI portal
Publication:6508588
arXiv2301.11748MaRDI QIDQ6508588
Abstract: We consider the notion of strong self-absorption for continuous actions of locally compact groups on the hyperfinite II-factor and characterize when such an action is tensorially absorbed by another given action on any separably acting von Neumann algebra. This extends the well-known McDuff property for von Neumann algebras and is analogous to the core theorems around strongly self-absorbing C-dynamics. Given a countable discrete group and an amenable action on any separably acting semi-finite von Neumann algebra, we establish a type of measurable local-to-global principle: If a given strongly self-absorbing -action is suitably absorbed at the level of each fibre in the direct integral decomposition of , then it is tensorially absorbed by the action on . As a direct application of Ocneanu's theorem, we deduce that if has the McDuff property, then every amenable -action on has the equivariant McDuff property, regardless whether is assumed to be injective or not. By employing Tomita-Takesaki theory, we can extend the latter result to the general case where is not assumed to be semi-finite.
This page was built for publication: Dynamical McDuff-type properties for group actions on von Neumann algebras
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q6508588)