Factors of type II₁ without non-trivial finite index subfactors

Vaes, Stefaan

doi:10.1090/S0002-9947-08-04585-6

Factors of type II$_1$ without non-trivial finite index subfactors
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Trans. Amer. Math. Soc. 361 (2009), 2587-2606 Request permission

Abstract:

We call a subfactor $N \subset M$ trivial if it is isomorphic with the obvious inclusion of $N$ in $\operatorname {M}_n(\mathbb {C}) \otimes N$. We prove the existence of type II$_1$ factors $M$ without non-trivial finite index subfactors. Equivalently, every $M$-$M$-bimodule with finite coupling constant, both as a left and as a right $M$-module, is a multiple of $L^2(M)$. Our results rely on the recent work of Ioana, Peterson and Popa, who proved the existence of type II$_1$ factors without outer automorphisms.

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