Author:
BARNES DAVID,ROITZHEIM CONSTANZE
Abstract
AbstractWe study left and right Bousfield localisations of stable model categories which preserve stability. This follows the lead of the two key examples: localisations of spectra with respect to a homology theory and A-torsion modules over a ring R with A a perfect R-algebra. We exploit stability to see that the resulting model structures are technically far better behaved than the general case. We can give explicit sets of generating cofibrations, show that these localisations preserve properness and give a complete characterisation of when they preserve monoidal structures. We apply these results to obtain convenient assumptions under which a stable model category is spectral. We then use Morita theory to gain an insight into the nature of right localisation and its homotopy category. We finish with a correspondence between left and right localisation.
Publisher
Cambridge University Press (CUP)
Cited by
26 articles.
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1. Levels of algebraicity in stable homotopy theories;Journal of the London Mathematical Society;2023-05-14
2. Comparing localizations across adjunctions;Transactions of the American Mathematical Society;2021-08-18
3. The Left Localization Principle, completions, and cofree G-spectra;Journal of Pure and Applied Algebra;2020-11
4. References;Foundations of Stable Homotopy Theory;2020-03-26
5. Left Bousfield Localisation;Foundations of Stable Homotopy Theory;2020-03-26