WorldCat Identities

Kan, D. M. (Daniel Marinus)

Overview
Works: 4 works in 31 publications in 3 languages and 634 library holdings
Roles: Author, Contributor
Classifications: QA3, 510.8 S
Publication Timeline
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Most widely held works by D. M Kan
Homotopy limits, completions and localizations by A. K Bousfield( Book )

26 editions published between 1972 and 1987 in English and German and held by 439 WorldCat member libraries worldwide

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
Homotopy Limits, Completions and Localizatios by A. K Bousfield( )

1 edition published in 1972 in English and held by 29 WorldCat member libraries worldwide

Homotopy limit functors on model categories and homotopical categories by William G Dwyer( Book )

3 editions published between 2004 and 2014 in English and held by 2 WorldCat member libraries worldwide

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1 edition published in 1955 in Hebrew and held by 1 WorldCat member library worldwide

 
Audience Level
0
Audience Level
1
  Kids General Special  
Audience level: 0.70 (from 0.67 for Homotopy l ... to 0.93 for Homotopy L ...)

Homotopy limits, completions and localizations
Alternative Names
Daniel Kan mathematician

Daniel Marinus Kan Mathematiker, Homotopie-Theorie

Kan, D. M.

Kan, Dan

Kan, Daniel

Kan, Daniel M.

Kan, Daniel Marinus

דניאל קאן

דניאל קאן מתמטיקאי גרמני-ישראלי

קן, דניאל מרינוס

다니얼 칸

ダニエル・カン

丹尼尔·阚

Languages
English (29)

German (1)

Hebrew (1)

Covers
Homotopy limit functors on model categories and homotopical categories