Title:Simplicial Homotopy Theory
Authors: P.G. Goerss and J.F. Jardine
E-mail: pgoerss@math.washington.edu, jardine@uwo.ca

This book is a modern presentation of the homotopy theory of
simplicial sets.  The manuscript is complete and online, in the form
of dvi and postscript files which can be found
<a href=http://www.math.uwo.ca/~jardine/papers/simp-sets/>here</a>. 
(This book is now published, but the errata can be found at the above link).

Table of Contents

<li> Chapter 1: Simplicial Sets 
<p>
 <OL>
 <li> Basic definitions
 <li> Realization
 <li> Kan complexes
 <li> Anodyne extensions
 <li> Function complexes
 <li> Simplicial homotopy
 <li> Simplicial homotopy groups
 <li> Fundamental groupoid
 <li> Categories of fibrant objects
 <li> Minimal fibrations
 <li> The closed model structure
 </OL> 
<p>
<li> Chapter 2: Model Categories 
<p>
 <OL>
 <li> Homotopical algebra
 <li> Simplicial categories
 <li> Simplicial model categories
 <li> Detecting weak equivalences
 <li> The existence of simplicial model category structures
 <li> Examples of simplicial model categories
 <li> A generalization of Theorem 4.1
 <li> Quillen's total derived functor theorem
 <li> Homotopy cartesian diagrams
 </OL>
<p>
<li> Chapter 3: Classical Results and Constructions
<p>
 <OL>
 <li> The fundamental groupoid, revisited
 <li> Simplicial abelian groups: the Dold-Kan correspondence
 <li> The Hurewicz map
 <li> The $Ex^{\infty}$-functor
 <li> The Kan suspension
 </OL> 
<p>
<li> Chapter 4: Bisimplicial Sets 
<p>
 <OL>
 <li> Bisimplicial sets: first properties
 <li> Bisimplicial abelian groups
 <li> Closed model structures for bisimplicial sets
 <li> The Bousfield-Friedlander theorem
 <li> Theorem B and group completion
 </OL>
<p>
<li> Chapter 5: Simplicial Groups 
<p>
 <OL>
 <li> Skeleta
 <li> Principal fibrations I: simplicial G-spaces
 <li> Principal fibrations II: classifications
 <li> Universal cocycles and $\overline{W}G$
 <li> The loop group construction
 <li> Reduced simplicial sets, Milnor's FK construction
 <li> Simplicial groupoids
 </OL>
<p>
<li> Chapter 6: The Homotopy Theory of Towers 
<p>
 <OL>
 <li> A model category structure for towers of spaces
 <li> Postnikov towers
 <li> Local coefficients and equivariant cohomology
 <li> Generalities: equivariant cohomology
 <li> On k-invariants
 <li> Nilpotent spaces
 </OL>
<p>
<li> Chapter 7: Cosimplicial Spaces
<p>
 <OL>
 <li> Decomposition of simplicial objects
 <li> Reedy model category structures
 <li> Geometric realization
 <li> Cosimplicial spaces
 <li> The total space of a cosimplicial space
 <li> The homotopy spectral sequence of a tower of fibrations
 <li> The homotopy spectral sequence of a cosimplicial space
 <li> Obstruction theory
 </OL>
<p>
<li> Chapter 8: Simplicial Functors and Homotopy Coherence 
<p>
 <OL>
 <li> Simplicial functors
 <li> The Dwyer-Kan theorem
 <li> Homotopy coherence
 <li> Realization theorems
 </OL>
<p>
<li> Chapter 9: Localization
<p>
 <OL>
 <li> Localization with respect to a map
 <li> The closed model category structure
 <li> Bousfield localization
 <li> Localization in simplicial model categories
 <li> Localization in diagram categories
 <li> A model for the stable homotopy category
 </OL>

</UL>