Rigidity for von Neumann algebras of graph product groups. I. Structure of automorphisms

Abstract

In this paper we study various rigidity aspects of the von Neumann algebra L() where is a graph product group Gr90 whose underlying graph is a certain cycle of cliques and the vertex groups are the wreath-like product property (T) groups introduced recently in CIOS21. Using an approach that combines methods from Popa's deformation/rigidity theory with new techniques pertaining to graph product algebras, we describe all symmetries of these von Neumann algebras and reduced C*-algebras by establishing formulas in the spirit of Genevois and Martin's results on automorphisms of graph product groups GM19.