W*-Rigidity for the von Neumann Algebras of Products of Hyperbolic Groups
Abstract
We show that if = 1×…b× n is a product of n≥ 2 non-elementary ICC hyperbolic groups then any discrete group which is W*-equivalent to decomposes as a k-fold direct sum exactly when k=n. This gives a group-level strengthening of Ozawa and Popa's unique prime decomposition theorem by removing all assumptions on the group . This result in combination with Margulis' normal subgroup theorem allows us to give examples of lattices in the same Lie group which do not generate stably equivalent II1 factors.
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