The Algebraic K-Theory of Operator Algebras, by Jonathan Rosenberg

We the study the algebraic K-theory of C*-algebras, forgetting the topology. The main results include a proof that commutative C*-algebras are K-regular in all degrees (that is, all their NK-groups vanish, in all degrees) and extensions of the Fischer-Prasolov Theorem comparing algebraic and topological K-theory with finite coefficients.

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Jonathan Rosenberg <jmr@math.umd.edu>