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THE MULTIPLICATIVE K-THEORY TYPE OF QUANTUM CW-COMPLEXES
- Speaker(s)
- TOMASZ MASZCZYK
- Affiliation
- Uniwersytet Warszawski
- Date
- Jan. 26, 2022, 5:15 p.m.
- Information about the event
- ZOOM
- Seminar
- North Atlantic Noncommutative Geometry Seminar
We enhance current noncommutative methods in topology to distinguish some very different classical homotopy types (e.g., a disconnected and a connected one) of finite CW-complexes, which cannot be distinguished using the Kasparov KK-theory. We achieve this by constructing a noncommutative counterpart of the cup product in K-theory, which is equivalent to its standard version in the classical case. Noting that all vector bundles are associated with compact principal bundles and their tensor product leads to the cup product in K-theory, we introduce the notion of k-topology, a noncommutative version of Grothendieck topology with covering families given by compact principal bundles and bases related by continuous maps. By the universal property of the pullback of compact principal bundles, this does not change the topology of compact Hausdorff spaces. As for noncommutative topology, it goes beyond the plain C*-algebraic setting. Combining this with cofibration-weakening-
