Von Neumann Algebras of Sofic Groups with β1(2)=0 are Strongly 1-Bounded
Abstract
We show that if is an infinite finitely generated finitely presented sofic group with zero first L2 Betti number then the von Neumann algebra L() is strongly 1-bounded in the sense of Jung. In particular, L() L() if is any group with free entropy dimension >1, for example a free group. The key technical result is a short proof of an estimate of Jung using non-microstates entropy techniques.
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