THREE MODELS FOR THE HOMOTOPY THEORY OF HOMOTOPY THEORIES

Abstract Given any model category, or more generally any category with weak equivalences, its simplicial localization is a simplicial category which can rightfully be called the “homotopy theory” of the model category. There is a model category structure on the category of simplicial categories, so taking its simplicial localization yields a “homotopy theory of homotopy theories”. In this paper we show that there are two different categories of diagrams of simplicial sets, each equipped with an appropriate definition of weak equivalence, such that the resulting homotopy theories are each equivalent to the homotopy theory arising from the model category structure on simplicial categories. Thus, any of these three categories with the respective weak equivalences could be considered a model for the homotopy theory of homotopy theories. One of them in particular, Rezk’s complete Segal space model category structure on the category of simplicial spaces, is much more convenient from the perspective of making calculations and therefore obtaining information about a given homotopy theory.

[1]  Algebraic theories in homotopy theory , 2001, math/0110101.

[2]  J. Jardine,et al.  Simplicial Homotopy Theory: Progress in Mathematics 174 , 1999 .

[3]  Philip S. Hirschhorn Model categories and their localizations , 2003 .

[4]  S. Lane Categories for the Working Mathematician , 1971 .

[5]  Charles Rezk,et al.  A model for the homotopy theory of homotopy theory , 1998, math/9811037.

[6]  Bertrand Toen,et al.  Homotopical algebraic geometry. I. Topos theory. , 2002, math/0207028.

[7]  G. Segal,et al.  Categories and cohomology theories , 1974 .

[8]  N. Strickland,et al.  MODEL CATEGORIES (Mathematical Surveys and Monographs 63) , 2000 .

[9]  W. Dwyer,et al.  Function complexes in homotopical algebra , 1980 .

[10]  Simplicial monoids and Segal categories , 2005, math/0508416.

[11]  A CHARACTERIZATION OF FIBRANT SEGAL CATEGORIES , 2006, math/0603400.

[12]  Alan Weinstein,et al.  Progress in mathematics , 1979 .

[13]  K. Brown,et al.  Graduate Texts in Mathematics , 1982 .

[14]  Julia E. Bergner A model category structure on the category of simplicial categories , 2004 .

[15]  W. Dwyer,et al.  Simplicial localizations of categories , 1980 .

[16]  W. Dwyer,et al.  CHAPTER 2 – Homotopy Theories and Model Categories , 1995 .

[17]  Daniel Dugger Universal Homotopy Theories , 2000 .

[18]  Ioan Mackenzie James,et al.  Handbook of algebraic topology , 1995 .

[19]  Rigidification of algebras over multi-sorted theories , 2005, math/0508152.