L2-rigidity in von Neumann algebras
Abstract
We introduce the notion of L2-rigidity for von Neumann algebras, a generalization of property (T) which can be viewed as an analogue for the vanishing of 1-cohomology into the left regular representation of a group. We show that L2-rigidity passes to normalizers and is satisfied by nonamenable II1 factors which are non-prime, have property , or are weakly rigid. As a consequence we obtain that if M is a free product of diffuse von Neumann algebras, or if M = L where is a finitely generated group with b1(2)() > 0, then any nonamenable regular subfactor of M is prime and does not have properties or (T). In particular this gives a new approach for showing primeness of all nonamenable subfactors of a free group factor thus recovering a well known recent result of N. Ozawa.
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