Trace methods for stable categories I: The linear approximation of algebraic K-theory
Harpaz Y; Nikolaus T; Saunier V
Research article in digital collection | Preprint | Peer reviewedAbstract
We study algebraic K-theory and topological Hochschild homology in the setting of bimodules over a stable category, a datum we refer to as a laced category. We show that in this setting both K-theory and THH carry universal properties, the former defined in terms of additivity and the latter via trace invariance. We then use these universal properties in order to construct a trace map from laced K-theory to THH, and show that it exhibits THH as the first Goodwillie derivative of laced K-theory in the bimodule direction, generalizing the celebrated identification of stable K-theory by Dundas-McCarthy, a result which is the entryway to trace methods.
Details about the publication
Name of the repository: arxiv.org
Article number: https://arxiv.org/abs/2411.04743
Status: submitted / under review
Release year: 2024
Language in which the publication is written: English
Link to the full text: https://arxiv.org/abs/2411.04743
Keywords: K-theory; topological Hochschild homology;
Authors from the University of Münster
| Nikolaus, Thomas | Professorship for theoretical mathematics (Prof. Nikolaus) |