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Decidability and godel incompleteness in af c*-algebras
Manuscrito 28 (2):547-558 (2005)
Abstract
In the algebraic treatment of quantum statistical systems, the claim “Nature does not have ideals” is sometimes used to convey the idea that the C*-algebras describing natural systems are simple, i.e., they do not have nontrivial homomorphic images. Using our interpretation of AF C*-algebras as algebras of Lukasiewicz calculus, in a previous paper the claim was shown to be incompatible with the existence of a G¨odel incomplete AF C*-algebra for a quantum physical system existing in nature. In this note we survey recent developments on G¨odel incompleteness and decidability issues for AF C*-algebrasLinks
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