Abstract
Abstract
We show that every countable group with infinite finite conjugacy (FC)-center has the Schmidt property, that is, admits a free, ergodic, measure-preserving action on a standard probability space such that the full group of the associated orbit equivalence relation contains a non-trivial central sequence. As a consequence, every countable, inner amenable group with property (T) has the Schmidt property.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,General Mathematics
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