Algebraic and Hermitian K-theory of K-rings
Max Karoubi, Mariusz Wodzicki
TL;DR
This paper proves the real case of Karoubi's conjecture in algebraic K-theory, addressing additional challenges posed by real Banach algebras and extending results to Hermitian K-theory.
Contribution
It establishes the real case of Karoubi's conjecture in algebraic and Hermitian K-theory, providing new methods that simplify proofs and adapt to real algebra complexities.
Findings
Proved the real case of Karoubi's conjecture in algebraic K-theory.
Extended the conjecture to Hermitian K-theory.
Developed methods applicable to complex algebras for simplification.
Abstract
The main purpose of the present article is to establish the real case of "Karoubi's conjecture" in algebraic K-theory. The complex case was proved in 1990-91 by the second author and Andrei Suslin. Compared to the case of complex algebras, the real case poses additional difficulties. This is due to the fact that topological K-theory of real Banach algebras has period 8 instead of 2. The method we employ to overcome these difficulties can be used for complex algebras, and provides some simplifications to the original proofs. We also establish a natural analog of "Karoubi's conjecture" in Hermitian K-theory.
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Taxonomy
TopicsHomotopy and Cohomology in Algebraic Topology · Advanced Topics in Algebra · Algebraic structures and combinatorial models