Rosenberg's conjecture for the first negative $K$-group

Rosenberg's conjecture for the first negative $K$-group

Based on his claims in 1990, Rosenberg conjectured in 1997 that the negative algebraic $K$-groups of C*-algebras are invariant under continuous homotopy. Contrary to his expectation, we prove that such invariance holds for $K_{-1}$ of arbitrary Banach rings by establishing a certain continuity resul...

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1. Verfasser: Aoki, Ko
Format: Artikel
Sprache:eng
Schlagworte:
Mathematics - Complex Variables
Mathematics - K-Theory and Homology
Mathematics - Operator Algebras
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Zusammenfassung:Based on his claims in 1990, Rosenberg conjectured in 1997 that the negative algebraic $K$-groups of C*-algebras are invariant under continuous homotopy. Contrary to his expectation, we prove that such invariance holds for $K_{-1}$ of arbitrary Banach rings by establishing a certain continuity result. We also construct examples demonstrating that similar continuity results do not hold for lower $K$-groups.
DOI:10.48550/arxiv.2409.09651