A dichotomy for the Mackey Borel structure
Abstract
We prove that the equivalence of pure states of a separable C*-algebra is either smooth or it continuously reduces [0,1]/2 and it therefore cannot be classified by countable structures. The latter was independently proved by Kerr--Li--Pichot by using different methods. We also give some remarks on a 1967 problem of Dixmier.
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