Combinatorial foundation of homology and homotopy : applications to spaces, diagrams, transformation groups, compactifications, differential algebras, algebraic theories, simplicial objects, and resolutions

Bibliographic Information

Combinatorial foundation of homology and homotopy : applications to spaces, diagrams, transformation groups, compactifications, differential algebras, algebraic theories, simplicial objects, and resolutions

Hans-Joachim Baues

(Springer monographs in mathematics)

Springer, c1999

  • : [pbk.]

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Note

Includes index

Errata inserted

[pbk.]: errata (4 p.) inserted at end

Description and Table of Contents

Description

A new combinatorial foundation of the two concepts, based on a consideration of deep and classical results of homotopy theory, and an axiomatic characterization of the assumptions under which results in this field hold. Includes numerous explicit examples and applications in various fields of topology and algebra.

Table of Contents

I. Examples and Applications.- A: Examples and Applications in Topological Categories.- B: Examples and Applications in Algebraic Homotopy Theories.- C: Applications and Examples in Delicate Homotopy Theories of Simplicial Objects.- D: Resolutions in Model Categories.- II. Combinatorial Homology and Homotopy.- I: Theories of Coactions and Homology.- II: Twisted Chain Complexes and Twisted Homology.- III: Basic Concepts of Homotopy Theory.- IV: Complexes in Cofibration Categories.- V: Homology of Complexes.- V: Homology of Complexes.- VII: Finiteness Obstructions.- VIII: Non-Reduced Complexes and Whitehead Torsion.- List of Notations.

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