The Connes embedding property for quantum group von Neumann algebras

Brannan, Michael; Collins, Benoît; Vergnioux, Roland

doi:10.1090/tran/6752

The Connes embedding property for quantum group von Neumann algebras
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by Michael Brannan, Benoît Collins and Roland Vergnioux PDF

Trans. Amer. Math. Soc. 369 (2017), 3799-3819 Request permission

Abstract:

For a compact quantum group $\mathbb {G}$ of Kac type, we study the existence of a Haar trace-preserving embedding of the von Neumann algebra $L^\infty (\mathbb {G})$ into an ultrapower of the hyperfinite II$_1$-factor (the Connes embedding property for $L^\infty (\mathbb {G})$). We establish a connection between the Connes embedding property for $L^\infty (\mathbb {G})$ and the structure of certain quantum subgroups of $\mathbb {G}$ and use this to prove that the II$_1$-factors $L^\infty (O_N^+)$ and $L^\infty (U_N^+)$ associated to the free orthogonal and free unitary quantum groups have the Connes embedding property for all $N \ge 4$. As an application, we deduce that the free entropy dimension of the standard generators of $L^\infty (O_N^+)$ equals $1$ for all $N \ge 4$. We also mention an application of our work to the problem of classifying the quantum subgroups of $O_N^+$.

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