Homotopy theory of modules over diagrams of rings
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- by J. P. C. Greenlees and B. Shipley HTML | PDF
- Proc. Amer. Math. Soc. Ser. B 1 (2014), 89-104
Abstract:
Given a diagram of rings, one may consider the category of modules over them. We are interested in the homotopy theory of categories of this type: given a suitable diagram of model categories $\mathcal {M}(s)$ (as $s$ runs through the diagram), we consider the category of diagrams where the object $X(s)$ at $s$ comes from $\mathcal {M}(s)$. We develop model structures on such categories of diagrams and Quillen adjunctions that relate categories based on different diagram shapes.
Under certain conditions, cellularizations (or right Bousfield localizations) of these adjunctions induce Quillen equivalences. As an application we show that a cellularization of a category of modules over a diagram of ring spectra (or differential graded rings) is Quillen equivalent to modules over the associated inverse limit of the rings. Another application of the general machinery here is given in work by the authors on algebraic models of rational equivariant spectra. Some of this material originally appeared in the preprint “An algebraic model for rational torus-equivariant stable homotopy theory”, arXiv:1101.2511, but has been generalized here.
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Additional Information
- J. P. C. Greenlees
- Affiliation: Department of Pure Mathematics, The Hicks Building, University of Sheffield, Sheffield, S3 7RH, United Kingdom
- MR Author ID: 223610
- Email: j.greenlees@sheffield.ac.uk
- B. Shipley
- Affiliation: Department of Mathematics, Statistics and Computer Science, University of Illinois at Chicago, 508 SEO m/c 249, 851 S. Morgan Street, Chicago, Illinois 60607-7045
- MR Author ID: 367857
- Email: bshipley@math.uic.edu
- Received by editor(s): September 26, 2013
- Received by editor(s) in revised form: November 10, 2013, and March 20, 2014
- Published electronically: September 3, 2014
- Additional Notes: The first author is grateful for support under EPSRC grant No. EP/H040692/1
This material is based upon work by the second author supported by the National Science Foundation under grant No. DMS-1104396 - Communicated by: Michael A. Mandell
- © Copyright 2014 by the authors under Creative Commons Attribution 3.0 License (CC BY 3.0)
- Journal: Proc. Amer. Math. Soc. Ser. B 1 (2014), 89-104
- MSC (2010): Primary 55U35, 55P60, 55P42, 55P91
- DOI: https://doi.org/10.1090/S2330-1511-2014-00012-2
- MathSciNet review: 3254575