English

A general framework for homotopic descent and codescent

Algebraic Topology 2010-05-31 v3 Category Theory Geometric Topology K-Theory and Homology

Abstract

In this paper we elaborate a general homotopy-theoretic framework in which to study problems of descent and completion and of their duals, codescent and cocompletion. Our approach to homotopic (co)descent and to derived (co)completion can be viewed as \infty-category-theoretic, as our framework is constructed in the universe of simplicially enriched categories, which are a model for (,1)(\infty, 1)-categories. We provide general criteria, reminiscent of Mandell's theorem on EE_{\infty}-algebra models of pp-complete spaces, under which homotopic (co)descent is satisfied. Furthermore, we construct general descent and codescent spectral sequences, which we interpret in terms of derived (co)completion and homotopic (co)descent. We show that a number of very well-known spectral sequences, such as the unstable and stable Adams spectral sequences, the Adams-Novikov spectral sequence and the descent spectral sequence of a map, are examples of general (co)descent spectral sequences. There is also a close relationship between the Lichtenbaum-Quillen conjecture and homotopic descent along the Dwyer-Friedlander map from algebraic K-theory to \'etale K-theory. Moreover, there are intriguing analogies between derived cocompletion (respectively, completion) and homotopy left (respectively, right) Kan extensions and their associated assembly (respectively, coassembly) maps.

Keywords

Cite

@article{arxiv.1001.1556,
  title  = {A general framework for homotopic descent and codescent},
  author = {Kathryn Hess},
  journal= {arXiv preprint arXiv:1001.1556},
  year   = {2010}
}

Comments

Discussion of completeness has been refined; statement of the theorem on assembly has been corrected; numerous small additions and minor corrections

R2 v1 2026-06-21T14:32:55.901Z