Property (T) group factors whose Jones index set equals all positive integers

Abstract

Using a m\'elange of techniques at the rich intersection of deformation/rigidity theory, finite index subfactor theory, and geometric group theory, we prove the existence of a continuum of property (T) factors that are pairwise non-stably isomorphic and whose Jones index sets consist of all positive integers. These factors are realized as group von Neumann algebras L(G) associated with property (T) generalized wreath-like product groups G ∈ WR(A, B I) introduced in [CIOS23b], where A is abelian, B is a non-parabolic subgroup of a relatively hyperbolic group with residually finite peripheral structure, and B I is a faithful action with infinite orbits. Integer index subfactors of L(G) are constructed from extensions of G. This result advances an open question of P. de la Harpe [dlH95].

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