New examples of W* and C*-superrigid groups

Abstract

A group G is called W*-superrigid (resp. C*-superrigid) if it is completely recognizable from its von Neumann algebra L(G) (resp. reduced C*-algebra Cr*(G)). Developing new technical aspects in Popa's deformation/rigidity theory we introduce several new classes of W*-superrigid groups which appear as direct products, semidirect products with non-amenable core and iterations of amalgamated free products and HNN-extensions. As a byproduct we obtain new rigidity results in C*-algebra theory including additional examples of C*-superrigid groups and explicit computations of symmetries of reduced group C*-algebras.