Fixed-point permanence under actions by finite quantum groups

Abstract

Given an action by a finite quantum group G on a von Neumann algebra M, we prove that a number of familiar W* properties are equivalent for M and the fixed-point algebra MG (i.e. hold or not simultaneously for the two algebras); these include being hyperfinite, atomic, diffuse and of type I, II or III. Moreover, in all cases the canonical central projections of M and MG cutting out the summand with the respective property coincide. The result generalizes its classical-G analogue due to Jones-Takesaki.

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