Wreath-like products of groups and their von Neumann algebras I: W^∗-superrigidity
Ionuţ Chifan, Adrian Ioana, Denis Osin, Bin Sun
Abstract
We introduce a new class of groups called wreath-like products. These groups are close relatives of the classical wreath products and arise naturally in the context of group theoretic Dehn filling. Unlike ordinary wreath products, many wreath-like products have Kazhdan's property (T). In this paper, we prove that any group $G$ in a natural family of wreath-like products with property (T) is $\mathrm{W}^\ast$-superrigid: the group von Neumann algebra $\mathrm{L}(G)$ remembers the isomorphism class of $G$. This allows us to provide the first examples (in fact, $2^{\aleph_0}$ pairwise non-isomorphic examples) of $\mathrm{W}^\ast$-superrigid groups with property (T).
Topics & Concepts
MathematicsVon Neumann architectureWreath productPure mathematicsVon Neumann algebraAbelian von Neumann algebraAlgebra over a fieldJordan algebraGeometryProduct (mathematics)Current algebraRings, Modules, and AlgebrasAdvanced Operator Algebra ResearchAdvanced Topics in Algebra