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Algebraic and topological K-theory, relations with topology, commutative algebra, and operator algebras

8 votes
Accepted

References for equivariant K-theory

I like the book by Chriss and Ginzburg (Representation Theory and Complex Geometry, https://doi.org/10.1007/978-0-8176-4938-8) very much, and I think it fits many of your requirements.
David Roberts's user avatar
  • 35.5k
19 votes

Book on Hochschild (co)homology

In addition to Kevin's excellent list: Formality The relation of Hochschild and cyclic homology with loop spaces (eg Jones' theorem) and the circle action on Hochschild homology operadic structure …
Tom Goodwillie's user avatar
12 votes

What are Picard categories, where can I learn more about them, and why should I care to?

Determinants are discussed (in a language relevant to this current question) in this MO question. One place Picard categories naturally appear is as fundamental (aka Poincare) groupoids -- specifical …
Community's user avatar
  • 1
43 votes
Accepted

What is the equivariant cohomology of a group acting on itself by conjugation?

I asked Dan Freed, who gave a very clean general solution to this problem (as expected). Here it is (all mistakes in the transcription are mine of course). The claim is that the equivariant cohomolog …
David Ben-Zvi's user avatar
7 votes

What is the equivariant cohomology of a group acting on itself by conjugation?

The cochains on G/G can be calculated as the Hochschild cochains of cochains on BG (this uses compactness of G - we'd get a kind of dual picture with Hochschild chains if we looked at free loops in a …
David Ben-Zvi's user avatar
12 votes
Accepted

Constructing Twisted K-theory

The answer is yes if you're working on the level of $\infty$-categories (and I'm pretty sure no if you're working on the level of homotopy categories). In other words, in the $\infty$-world there's no …
David Ben-Zvi's user avatar