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arxiv: 1707.07317 · v3 · pith:RH7HYHOFnew · submitted 2017-07-23 · 🧮 math.OA

Asymptotic orthogonalization of subalgebras in II₁ factors

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keywords omegafactorindexinfinitesubalgebraabelianasymptoticelement
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Let $M$ be a II$_1$ factor with a von Neumann subalgebra $Q\subset M$ that has infinite index under any projection in $Q'\cap M$ (e.g., $Q$ abelian; or $Q$ an irreducible subfactor with infinite Jones index). We prove that given any separable subalgebra $B$ of the ultrapower II$_1$ factor $M^\omega$, for a non-principal ultrafilter $\omega$ on $\Bbb N$, there exists a unitary element $u\in M^\omega$ such that $uBu^*$ is orthogonal to $Q^\omega$.

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