Symmetric spectra
- 22 September 1999
- journal article
- Published by American Mathematical Society (AMS) in Journal of the American Mathematical Society
- Vol. 13 (1) , 149-208
- https://doi.org/10.1090/s0894-0347-99-00320-3
Abstract
The stable homotopy category, much studied by algebraic topologists, is a closed symmetric monoidal category. For many years, however, there has been no well-behaved closed symmetric monoidal category of spectra whose homotopy category is the stable homotopy category. In this paper, we present such a category of spectra; the category of symmetric spectra. Our method can be used more generally to invert a monoidal functor, up to homotopy, in a way that preserves monoidal structure. Symmetric spectra were discovered at about the same time as the category of S S -modules of Elmendorf, Kriz, Mandell, and May, a completely different symmetric monoidal category of spectra.Keywords
This publication has 9 references indexed in Scilit:
- Rings, Modules, and Algebras in Stable Homotopy TheoryPublished by American Mathematical Society (AMS) ,2007
- Voevodsky's proof of the Milnor ConjectureCurrent Developments in Mathematics, 1997
- Axiomatic stable homotopy theoryMemoirs of the American Mathematical Society, 1997
- Homotopy Theories and Model CategoriesPublished by Elsevier ,1995
- Is there a convenient category of spectra?Journal of Pure and Applied Algebra, 1991
- Algebraic K-theory of spacesPublished by Springer Nature ,1985
- Simplicial homotopy theoryAdvances in Mathematics, 1971
- Homotopical AlgebraLecture Notes in Mathematics, 1967
- Generalized Homology TheoriesTransactions of the American Mathematical Society, 1962