Quantum Expanders and Quantifier Reduction for Tracial von Neumann Algebras
Abstract
We provide a complete characterization of theories of tracial von Neumann algebras that admit quantifier elimination. We also show that the theory of a separable tracial von Neumann algebra N is never model complete if its direct integral decomposition contains II1 factors M such that M2(M) embeds into an ultrapower of M. The proof in the case of II1 factors uses an explicit construction based on random matrices and quantum expanders.
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