On Relative Invariant Subalgebra Rigidity Property

Abstract

A countable discrete group is said to have the relative ISR-property if for every non-trivial normal subgroup N and every von Neumann subalgebra M⊂eq L() invariant under conjugation by N, one has M=L(K) for some subgroup K. Similarly, has the relative C*-ISR-property if every N-invariant unital C*-subalgebra A ⊂eq Cr*() is of the form Cr*(K). We show that every torsion-free acylindrically hyperbolic group with trivial amenable radical satisfies the relative ISR property. Moreover, we also show that all torsion-free hyperbolic groups have the relative C*-ISR property. Furthermore, we establish an analogous relative ISR-property for irreducible lattices in higher-rank semisimple Lie groups, such as SLd(Z) (d ≥ 3), with trivial center.