On Transitive Algebras Containing a Standard Finite von Neumann Subalgebra
arXiv:math/0611290
Abstract
Let $\M$ be a finite von Neumann algebra acting on a Hilbert space $\H$ and $Ã $ be a transitive algebra containing $\M'$. In this paper we prove that if $Ã $ is 2-fold transitive, then $Ã $ is strongly dense in $\B(\H)$. This implies that if a transitive algebra containing a standard finite von Neumann algebra (in the sense of [Ha1]) is 2-fold transitive, then $Ã $ is strongly dense in $\B(\H)$. Non-selfadjoint algebras related to free products of finite von Neumann algebras, e.g., $Å{\mathbb{F}_n}$ and $(M_2(\cc), {1/2}Tr)*(M_2(\cc), {1/2}Tr)$, are studied. Brown measures of certain operators in $(M_2(\cc), {1/2}Tr)*(M_2(\cc), {1/2}Tr)$ are explicitly computed.
24 pages, to appear on Journal of Functional Analysis