Homotopical Algebraic Geometry I: Topos theory

TL;DR

This paper develops a homotopical and higher categorical framework for algebraic geometry using S-categories, establishing foundations for higher topos theory, stacks, and model topoi, with applications to etale K-theory of ring spectra.

Contribution

It introduces the notion of higher topoi via S-categories, constructs model categories of stacks, and relates these to existing theories, extending algebraic geometry into homotopical contexts.

Findings

Existence of model categories of stacks over S-categories

One-to-one correspondence between S-topologies and Bousfield localizations

Definition of etale K-theory for ring spectra

Abstract

This is the first of a series of papers devoted to lay the foundations of Algebraic Geometry in homotopical and higher categorical contexts (for part II, see math.AG/0404373). In this first part we investigate a notion of higher topos. For this, we use S-categories (i.e. simplicially enriched categories) as models for certain kind of \infty-categories, and we develop the notions of S-topologies, S-sites and stacks over them. We prove in particular, that for an S-category T endowed with an S-topology, there exists a model category of stacks over T, generalizing the model category structure on simplicial presheaves over a Grothendieck site of A. Joyal and R. Jardine. We also prove some analogs of the relations between topologies and localizing subcategories of the categories of presheaves, by proving that there exists a one-to-one correspondence between S-topologies on an S-category T, and certain left exact Bousfield localizations of the model category of pre-stacks on T. Based on the above results, we study the notion of model topos introduced by C. Rezk, and we relate it to our model categories of stacks over S-sites. In the second part of the paper, we present a parallel theory where S-categories, S-topologies and S-sites are replaced by model categories, model topologies and model sites. We prove that a canonical way to pass from the theory of stacks over model sites to the theory of stacks over S-sites is provided by the simplicial localization construction of Dwyer and Kan. We also prove a Giraud's style theorem characterizing model topoi internally. As an example of application, we propose a definition of etale K-theory of ring spectra, extending the etale K-theory of commutative rings.