Model Theory of $mathrm {C}^*$-Algebras (Memoirs of the American Mathematical Society) - Tapa blanda

Sinopsis

"A number of significant properties of C-algebras can be expressed in continuous logic, or at least in terms of definable (in a model-theoretic sense) sets. Certain sets, such as the set of projections or the unitary group, are uniformly definable acrossall C-algebras. On the other hand, the definability of some other sets, such as the connected component of the identity in the unitary group of a unital C- algebra, or the set of elements that are Cuntz-Pedersen equivalent to 0, depends on structural properties of the C-algebra in question. Regularity properties required in the Elliott programme for classification of nuclear C-algebras imply the definability of some of these sets. In fact any known pair of separable, nuclear, unital and simple C-algebraswith the same Elliott invariant can be distinguished by their first-order theory. Although parts of the Elliott invariant of a classifiable (in the technical C-algebraic sense) C-algebra can be reconstructed from its model-theoretic imaginaries, the information provided by the theory is largely complementary to the information provided by the Elliott invariant. We prove that all standard invariants employed to verify non-isomorphism of pairs of C-algebras indistinguishable by their K-theoretic invariants(the divisibility properties of the Cuntz semigroup, the radius of comparison, and the existence of finite or infinite projections) are invariants of the theory of a C-algebra"--

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