Ebook: Axiomatic stable homotopy theory
- Genre: Mathematics // Geometry and Topology
- Series: Memoirs of the American Mathematical Society
- Year: 1997
- Publisher: American Mathematical Society
- City: London
- Language: English
- djvu
Next, a number of examples of such categories are presented. Some of these arise in topology (the ordinary stable homotopy category of spectra, categories of equivariant spectra, and Bousfield localizations of these), and others in algebra (coming from the representation theory of groups or of Lie algebras, as well as the derived category of a commutative ring). Hence one can apply many of the tools of stable homotopy theory to these algebraic situations.
Features:
Provides a reference for standard results and constructions in stable homotopy theory.
Discusses applications of those results to algebraic settings, such as group theory and commutative algebra.
Provides a unified treatment of several different situations in stable homotopy, including equivariant stable homotopy and localizations of the stable homotopy category.
Provides a context for nilpotence and thick subcategory theorems, such as the nilpotence theorem of Devinatz-Hopkins-Smith and the thick subcategory theorem of Hopkins-Smith in stable homotopy theory, and the thick subcategory theorem of Benson-Carlson-Rickard in representation theory.
This book presents stable homotopy theory as a branch of mathematics in its own right with applications in other fields of mathematics. It is a first step toward making stable homotopy theory a tool useful in many disciplines of mathematics.