English

On Completely Singular von Neumann Subalgebras

Operator Algebras 2007-08-14 v3

Abstract

Let \M\M be a von Neumann algebra acting on a Hilbert space \H, and N\N be a singular von Neumann subalgebra of \M.\M. If N\tensor\B(\K)\N\tensor\B(\K) is singular in \M\tensor\B(\K)\M\tensor\B(\K) for any Hilbert space \K\K, we say N\N is \emph{completely singular} in \M\M. We prove that if N\N is a singular abelian von Neumann subalgebra or if N\N is a singular subfactor of a type II1II_1 factor \M\M, then N\N is completely singular in \M\M. For any type II1II_1 factor \M\M, we construct a singular von Neumann subalgebra N\N of \M\M (N\M\N\neq \M) such that N\tensor\B(l2(N))\N\tensor\B(l^2(\mathbb{N})) is regular (hence not singular) in \M\tensor\B(l2(N))\M\tensor \B(l^2(\mathbb{N})). If \H is separable, then N\N is completely singular in \M\M if and only if for any θAut(N)\theta\in Aut(\N') such that θ(X)=X\theta(X)=X for all X\MX\in\M', then θ(Y)=Y\theta(Y)=Y for all YNY\in\N'. As an application of this characterization of completely singularity, we prove that if \M\M is separable (with separable predual) and N\N is completely singular in \M\M, then N\tensor\L\N\tensor\L is completely singular in \M\tensor\L\M\tensor \L for any separable von Neumann algebra \L\L.

Keywords

Cite

@article{arxiv.math/0606649,
  title  = {On Completely Singular von Neumann Subalgebras},
  author = {Junsheng Fang},
  journal= {arXiv preprint arXiv:math/0606649},
  year   = {2007}
}

Comments

11 pages, introduction is rewritten