Abstract
Bousfield localization is a technique that has been used extensively in algebraic topology, specifically in stable homotopy theory, over the last quarter century. Its name derives from the fundamental work of Bousfield [3], although this is based on earlier work of Brown [4] and Adams [1]. In abstract terms, Bousfield localization deals with the inclusion of a thick subcategory (i.e., a triangulated subcategory closed under direct summands) into a triangulated category and the existence of adjoint functors to such an inclusion. In the original topological setting, the triangulated category was typically the stable homotopy category, and the thick subcategory was defined by the vanishing of some homology theory, but the techniques involved work much more generally. In particular, the triangulated category can be one of interest to representation theorists, such as a stable module category or the derived category of a module category: since the techniques rely heavily on limiting procedures, however, one is forced to work with infinite dimensional modules.
This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
J. F. Adams, A variant of E. H.. Brown’s representability theorem, Topology 10 (1971), 185–198.
M. Bökstedt, A. Neeman, Homotopy limits in triangulated categories, Compositio Math. 86 (1993), 209–234.
A. K. Bousfield, The localization of spectra with respect to homology, Topology 18 (1979), 257–281.
E. H. Brown, Jr., Abstract homotopy theory, Trans. Amer. Math. Soc. 119 (1965), 79–85.
J. Chuang, Derived equivalence in SL 2(p 2), preprint.
M. Linckelmann, Stable equivalences of Morita type for self-injective algebras and p-groups. Math. Zeit. 223 (1996), 87–100.
A. Neeman, The Brown representability theorem and phantomless triangulated categories, J. Algebra 151 (1992), 118–155.
A. Neeman, The chromatic tower for D(R), Topology 31 (1992), 519–532.
A. Neeman, The connection between the K -theory localisation theorem of Thomason, Trobaugh and Yao, and the smashing subcategories of Bousfield and Ravenel, Ann. Scient. de l’ENS 25 (1992), 547–566.
A. Neeman, The Grothendieck duality theorem via Bousfield’s techniques and Brown representability, J. Amer. Math. Soc. 9 (1996), 205–236.
A. Neeman, On a theorem of Brown and Adams, Topology 36 (1997), 619–645.
T. Okuyama, Some examples of derived equivalent blocks of finite groups, Comm. Alg. (to appear).
J. Rickard, Morita theory for derived categories. J. London Math. Soc. (2) 39 (1989), 436–456.
J. Rickard, Constructing derived equivalences for symmetric algebras, in preparation.
Author information
Authors and Affiliations
Editor information
Editors and Affiliations
Rights and permissions
Copyright information
© 2000 Springer Basel AG
About this paper
Cite this paper
Rickard, J. (2000). Bousfield Localization for Representation Theorists. In: Krause, H., Ringel, C.M. (eds) Infinite Length Modules. Trends in Mathematics. Birkhäuser, Basel. https://doi.org/10.1007/978-3-0348-8426-6_13
Download citation
DOI: https://doi.org/10.1007/978-3-0348-8426-6_13
Publisher Name: Birkhäuser, Basel
Print ISBN: 978-3-0348-9562-0
Online ISBN: 978-3-0348-8426-6
eBook Packages: Springer Book Archive