On conjugacy and perturbation of subalgebras
Abstract
We study conjugacy orbits of certain types of subalgebras in tracial von Neumann algebras. For any separable II1 factor N0 we construct a highly indecomposable non Gamma II1 factor N such that N0 ⊂ N and moreover every von Neumann subalgebra of N with Haagerup's property admits a unique embedding up to unitary conjugation. Such a factor necessarily has to be non separable, but we show that it can be taken of density character 20. On the other hand we are able to construct for any separable II1 factor M0, a separable II1 factor M containing M0 such that every property (T) subfactor admits a unique embedding into M up to uniformly approximate unitary equivalence; i.e., any pair of embeddings can be conjugated up to a small uniform 2-norm perturbation.
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