Morita theory for dynamical von Neumann algebras

Abstract

Given a locally compact quantum group G and two G-W*-algebras α: A G and β: B G, we study the notion of equivariant W*-Morita equivalence (A, α)G (B, β), which is an equivariant version of Rieffel's notion of W*-Morita equivalence. We prove that important dynamical properties of G-W*-algebras, such as (inner) amenability, are preserved under equivariant Morita equivalence. For a coideal von Neumann algebra L∞(K G)⊂eq L∞(G) with dual coideal von Neumann algebra L∞(K)⊂eq L∞(G), we use a natural G-W*-Morita equivalence L∞(K G) G G L∞(K) to relate dynamical properties of L∞(K G) with dynamical properties of L∞(K). We use this to refine some recent results established by Anderson-Sackaney and Khosravi. This refinement allows us to answer a question of Kalantar, Kasprzak, Skalski and Vergnioux, namely that for H a closed quantum subgroup of the compact quantum group G, coamenability of H G and relative amenability of ∞(H) in ∞(G) are equivalent. Moreover, if G is compact, we study the relation between G-W*-Morita equivalence of (A, α) and (B, β) and G-C*-Morita equivalence of the associated G-C*-algebras (R(A), α) and (R(B), β) of regular elements.

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