More Concise Algebraic Topology
Localization, Completion, and Model Categories
More Concise Algebraic Topology
Localization, Completion, and Model Categories
Reviews
Table of Contents
Contents
Introduction
Some conventions and notations
Acknowledgements
Part 1. Preliminaries: basic homotopy theory and nilpotent spaces
Chapter 1. Cofibrations and fibrations
1.1. Relations between cofibrations and fibrations
1.2. The fill-in and Verdier lemmas
1.3. Based and free cofibrations and fibrations
1.4. Actions of fundamental groups on homotopy classes of maps
1.5. Actions of fundamental groups in fibration sequences
Chapter 2. Homotopy colimits and homotopy limits; lim1
2.1. Some basic homotopy colimits
2.2. Some basic homotopy limits
2.3. Algebraic properties of lim1
2.4. An example of nonvanishing lim1 terms
2.5. The homology of colimits and limits
2.6. A profinite universal coefficient theorem
Chapter 3. Nilpotent spaces and Postnikov towers
3.1. A -nilpotent groups and spaces
3.2. Nilpotent spaces and Postnikov towers
3.3. Cocellular spaces and the dual Whitehead theorem
3.4. Fibrations with fiber an Eilenberg–MacLane space
3.5. Postnikov A -towers
Chapter 4. Detecting nilpotent groups and spaces
4.1. Nilpotent Actions and Cohomology
4.2. Universal covers of nilpotent spaces
4.3. A -Maps of A -nilpotent groups and spaces
4.4. Nilpotency and fibrations
4.5. Nilpotent spaces and finite type conditions
Part 2. Localizations of spaces at sets of primes
Chapter 5. Localizations of nilpotent groups and spaces
5.1. Localizations of abelian groups
5.2. The definition of localizations of spaces
5.3. Localizations of nilpotent spaces
5.4. Localizations of nilpotent groups
5.5. Algebraic properties of localizations of nilpotent groups
5.6. Finitely generated T -local groups
Chapter 6. Characterizations and properties of localizations
6.1. Characterizations of localizations of nilpotent spaces
6.2. Localizations of limits and fiber sequences
6.3. Localizations of function spaces
6.4. Localizations of colimits and cofiber sequences
6.5. A cellular construction of localizations
6.6. Localizations of H-spaces and co-H-spaces
6.7. Rationalization and the finiteness of homotopy groups
6.8. The vanishing of rational phantom maps
Chapter 7. Fracture theorems for localization: groups
7.1. Global to local pullback diagrams
7.2. Global to local: abelian and nilpotent groups
7.3. Local to global pullback diagrams
7.4. Local to global: abelian and nilpotent groups
7.5. The genus of abelian and nilpotent groups
7.6. Exact sequences of groups and pullbacks
Chapter 8. Fracture theorems for localization: spaces
8.1. Statements of the main fracture theorems
8.2. Fracture theorems for maps into nilpotent spaces
8.3. Global to local fracture theorems: spaces
8.4. Local to global fracture theorems: spaces
8.5. The genus of nilpotent spaces
8.6. Alternative proofs of the fracture theorems
Chapter 9. Rational H-spaces and fracture theorems
9.1. The structure of rational H-spaces
9.2. The Samelson product and H?(X;Q)
9.3. The Whitehead product
9.4. Fracture theorems for H-spaces
Part 3. Completions of spaces at sets of primes
Chapter 10. Completions of nilpotent groups and spaces
10.1. Completions of abelian groups
10.2. The definition of completions of spaces at T
10.3. Completions of nilpotent spaces
10.4. Completions of nilpotent groups
Chapter 11. Characterizations and properties of completions
11.1. Characterizations of completions of nilpotent spaces
11.2. Completions of limits and fiber sequences
11.3. Completions of function spaces
11.4. Completions of colimits and cofiber sequences
11.5. Completions of H-spaces
11.6. The vanishing of p-adic phantom maps
Chapter 12. Fracture theorems for completion: Groups
12.1. Preliminaries on pullbacks and isomorphisms
12.2. Global to local: abelian and nilpotent groups
12.3. Local to global: abelian and nilpotent groups
12.4. Formal completions and the ad`elic genus
Chapter 13. Fracture theorems for completion: Spaces
13.1. Statements of the main fracture theorems
13.2. Global to local fracture theorems: spaces
13.3. Local to global fracture theorems: spaces
13.4. The tensor product of a space and a ring
13.5. Sullivan’s formal completion
13.6. Formal completions and the ad`elic genus
Part 4. An introduction to model category theory
Chapter 14. An introduction to model category theory
14.1. Preliminary definitions and weak factorization systems
14.2. The definition and first properties of model categories
14.3. The notion of homotopy in a model category
14.4. The homotopy category of a model category
Chapter 15. Cofibrantly generated and proper model categories
15.1. The small object argument for the construction of WFS’s
15.2. Compactly and cofibrantly generated model categories
15.3. Over and under model structures
15.4. Left and right proper model categories
" 15.5. Left properness, lifting properties, and the sets [X, Y ] "
Chapter 16. Categorical perspectives on model categories
16.1. Derived functors and derived natural transformations
16.2. Quillen adjunctions and Quillen equivalences
16.3. Symmetric monoidal categories and enriched categories
16.4. Symmetric monoidal and enriched model categories
16.5. A glimpse at higher categorical structures
Chapter 17. Model structures on the category of spaces
17.1. The Hurewicz or h-model structure on spaces
17.2. The Quillen or q-model structure on spaces
17.3. Mixed model structures in general
17.4. The mixed model structure on spaces
17.5. The model structure on simplicial sets
17.6. The proof of the model axioms
Chapter 18. Model structures on categories of chain complexes
18.1. The algebraic framework and the analogy with topology
18.2. h-cofibrations and h-fibrations in ChR
18.3. The h-model structure on ChR
18.4. The q-model structure on ChR
18.5. Proofs and the characterization of q-cofibrations
18.6. The m-model structure on ChR
Chapter 19. Resolution and localization model structures
19.1. Resolution and mixed model structures
19.2. The general context of Bousfield localization
19.3. Localizations with respect to homology theories
19.4. Bousfield localization at sets and classes of maps
19.5. Bousfield localization in enriched model categories
Part 5. Bialgebras and Hopf algebras
Chapter 20. Bialgebras and Hopf algebras
20.1. Preliminaries
"20.2. Algebras, coalgebras, and bialgebras "
20.3. Antipodes and Hopf algebras
"20.4. Modules, comodules, and related concepts "
Chapter 21. Connected and component Hopf algebras
"21.1. Connected algebras, coalgebras, and Hopf algebras "
21.2. Splitting theorems
21.3. Component coalgebras and the existence of antipodes
21.4. Self-dual Hopf algebras
21.5. The homotopy groups of MO and other Thom spectra
21.6. A proof of the Bott periodicity theorem
Chapter 22. Lie algebras and Hopf algebras in characteristic zero
22.1. Graded Lie algebras
22.2. The Poincar´e-Birkhoff-Witt theorem
22.3. Primitively generated Hopf algebras in characteristic zero
22.4. Commutative Hopf algebras in characteristic zero
Chapter 23. Restricted Lie algebras and Hopf algebras in characteristic p
23.1. Restricted Lie algebras
23.2. The restricted Poincar´e-Birkhoff-Witt theorem
23.3. Primitively generated Hopf algebras in characteristic p
23.4. Commutative Hopf algebras in characteristic p
Chapter 24. A primer on spectral sequences
24.1. Definitions
24.2. Exact Couples
24.3. Filtered Complexes
24.4. Products
24.5. The Serre spectral sequence
24.6. Comparison theorems
24.7. Convergence proofs
Bibliography
Index