Bousfield, A. K.
Homotopy limits, completions and localizations - USA: Springer, [c1987] - 348 p
I Completions and localizations
1. The R-completion of a space
2. Fibre lemmas
3. Tower lemmas
4. An R-completion of groups and its relation to the R-completion of spaces
5. R-localizations of nilpotent spaces
6. p-completions of nilpotent spaces
7. A glimpse at the R-completion of non-nilpotent spaces
II Towers of fibrations, cosimplicial spaces and homotopy limits
8. Simplicial sets and topological spaces
9. Towers of fibrations
10. Cosimplicial spaces
11. Homotopy inverse limits
12. Homotopy direct limits
The main purpose of part I of these notes is to develop for a ring R a functional notion of R-completion of a space X. For R=Zp and X subject to usual finiteness condition, the R-completion coincides up to homotopy, with the p-profinite completion of Quillen and Sullivan; for R a subring of the rationals, the R-completion coincides up to homotopy, with the localizations of Quillen, Sullivan and others. In part II of these notes, the authors have assembled some results on towers of fibrations, cosimplicial spaces and homotopy limits which were needed in the discussions of part I, but which are of some interest in themselves.
9783540061052
QA3
Homotopy limits, completions and localizations - USA: Springer, [c1987] - 348 p
I Completions and localizations
1. The R-completion of a space
2. Fibre lemmas
3. Tower lemmas
4. An R-completion of groups and its relation to the R-completion of spaces
5. R-localizations of nilpotent spaces
6. p-completions of nilpotent spaces
7. A glimpse at the R-completion of non-nilpotent spaces
II Towers of fibrations, cosimplicial spaces and homotopy limits
8. Simplicial sets and topological spaces
9. Towers of fibrations
10. Cosimplicial spaces
11. Homotopy inverse limits
12. Homotopy direct limits
The main purpose of part I of these notes is to develop for a ring R a functional notion of R-completion of a space X. For R=Zp and X subject to usual finiteness condition, the R-completion coincides up to homotopy, with the p-profinite completion of Quillen and Sullivan; for R a subring of the rationals, the R-completion coincides up to homotopy, with the localizations of Quillen, Sullivan and others. In part II of these notes, the authors have assembled some results on towers of fibrations, cosimplicial spaces and homotopy limits which were needed in the discussions of part I, but which are of some interest in themselves.
9783540061052
QA3