Hyperdescent and \'etale K-theory
K-Theory and Homology
2021-04-13 v3
Abstract
We study the \'etale sheafification of algebraic K-theory, called \'etale K-theory. Our main results show that \'etale K-theory is very close to a noncommutative invariant called Selmer K-theory, which is defined at the level of categories. Consequently, we show that \'etale K-theory has surprisingly well-behaved properties, integrally and without finiteness assumptions. A key theoretical ingredient is the distinction, which we investigate in detail, between sheaves and hypersheaves of spectra on \'etale sites.
Cite
@article{arxiv.1905.06611,
title = {Hyperdescent and \'etale K-theory},
author = {Dustin Clausen and Akhil Mathew},
journal= {arXiv preprint arXiv:1905.06611},
year = {2021}
}
Comments
89 pages, v3: various corrections and edits