A Galois Correspondence for Compact Groups of Automorphisms of von Neumann Algebras with a Generalization to Kac Algebras

Abstract

Let M be a factor with separable predual and G a compact group of automorphisms of M whose action is minimal, i.e. MG M = C, where MG denotes the G-fixed point subalgebra. Then every intemediate von Neumann algebra MG⊂ N⊂ M has the form N=MH for some closed subgroup H of G. An extension of this result to the case of actions of compact Kac algebras on factors is also presented. No assumptions are made on the existence of a normal conditional expectation onto N.

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