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Subcategories of singularity categories via tensor actions

Published online by Cambridge University Press:  22 November 2013

Greg Stevenson*
Affiliation:
Universität Bielefeld, Fakultät für Mathematik, BIREP Gruppe, Postfach 10 01 31, 33501 Bielefeld, Germany email gstevens@math.uni-bielefeld.de

Abstract

We obtain, via the formalism of tensor actions, a complete classification of the localizing subcategories of the stable derived category of any affine scheme that has hypersurface singularities or is a complete intersection in a regular scheme; in particular, this classifies the thick subcategories of the singularity categories of such rings. The analogous result is also proved for certain locally complete intersection schemes. It is also shown that from each of these classifications one can deduce the (relative) telescope conjecture.

Type
Research Article
Copyright
© The Author(s) 2013 

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References

Avramov, L. L., Modules with extremal resolutions, Math. Res. Lett. 3 (1996), 319328.CrossRefGoogle Scholar
Avramov, L. L., Infinite free resolutions, in Six lectures on commutative algebra, Progress in Mathematics, vol. 166 (Birkhäuser, Basel, 1998), 1118.Google Scholar
Avramov, L. L., Gasharov, V. N. and Peeva, I. V., Complete intersection dimension, Publ. Math. Inst. Hautes Études Sci. (1997), 67114; 1998.CrossRefGoogle Scholar
Avramov, L. L. and Sun, L.-C., Cohomology operators defined by a deformation, J. Algebra 204 (1998), 684710.CrossRefGoogle Scholar
Balmer, P., The spectrum of prime ideals in tensor triangulated categories, J. Reine Angew. Math. 588 (2005), 149168.CrossRefGoogle Scholar
Balmer, P., Spectra, spectra, spectra — Tensor triangular spectra versus Zariski spectra of endomorphism rings, Algebr. Geom. Topol. 10 (2010), 15211563.CrossRefGoogle Scholar
Balmer, P. and Favi, G., Generalized tensor idempotents and the telescope conjecture, Proc. Lond. Math. Soc. 102 (2011), 11611185.CrossRefGoogle Scholar
Beligiannis, A., Relative homological algebra and purity in triangulated categories, J. Algebra 227 (2000), 268361.CrossRefGoogle Scholar
Benson, D. J., Carlson, J. F. and Rickard, J., Thick subcategories of the stable module category, Fund. Math. 153 (1997), 5980.CrossRefGoogle Scholar
Benson, D. J., Iyengar, S. B. and Krause, H., Local cohomology and support for triangulated categories, Ann. Sci. Éc. Norm. Supér. (4) 41 (2008), 573619.Google Scholar
Benson, D., Iyengar, S. B. and Krause, H., Stratifying triangulated categories, J. Topol. 4 (2011), 641666.CrossRefGoogle Scholar
Benson, D. J., Iyengar, S. B. and Krause, H., Stratifying modular representations of finite groups, Ann. of Math. (2) 174 (2011), 16431684.CrossRefGoogle Scholar
Bökstedt, M. and Neeman, A., Homotopy limits in triangulated categories, Compositio Math. 86 (1993), 209234.Google Scholar
Buchweitz, R.-O., Maximal Cohen–Macaulay modules and Tate cohomology over Gorenstein rings, Preprint (1987), https://tspace.library.utoronto.ca/bitstream/1807/16682/1/maximal_cohen-macaulay_modules_1986.pdf.Google Scholar
Burke, J. and Walker, M., Matrix factorizations in higher codimension, Preprint (2012), arXiv:1205.2552 [math.AC].Google Scholar
Chen, X.-W. and Iyengar, S. B., Support and injective resolutions of complexes over commutative rings, Homology Homotopy Appl. 12 (2010), 3944.CrossRefGoogle Scholar
Conrad, B., Grothendieck duality and base change, Lecture Notes in Mathematics, vol. 1750 (Springer, Berlin, 2000).CrossRefGoogle Scholar
Devinatz, E. S., Hopkins, M. J. and Smith, J. H., Nilpotence and stable homotopy theory. I, Ann. of Math. (2) 128 (1988), 207241.CrossRefGoogle Scholar
Eisenbud, D., Homological algebra on a complete intersection, with an application to group representations, Trans. Amer. Math. Soc. 260 (1980), 3564.CrossRefGoogle Scholar
Enochs, E. E. and Jenda, O. M. G., Relative homological algebra, de Gruyter Expositions in Mathematics, vol. 30 (Walter de Gruyter, Berlin, 2000).CrossRefGoogle Scholar
Friedlander, E. M. and Pevtsova, J., $\Pi $ -supports for modules for finite group schemes, Duke Math. J. 139 (2007), 317368.CrossRefGoogle Scholar
Greenlees, J. P. C., Tate cohomology in axiomatic stable homotopy theory, in Cohomological methods in homotopy theory (Bellaterra, 1998), Progress in Mathematics, vol. 196 (Birkhäuser, Basel, 2001), 149176.CrossRefGoogle Scholar
Gulliksen, T. H., A change of ring theorem with applications to Poincaré series and intersection multiplicity, Math. Scand. 34 (1974), 167183.CrossRefGoogle Scholar
Gulliksen, T. H., On the deviations of a local ring, Math. Scand. 47 (1980), 520.CrossRefGoogle Scholar
Happel, D., Triangulated categories in the representation theory of finite-dimensional algebras, London Mathematical Society Lecture Note Series, vol. 119 (Cambridge University Press, Cambridge, 1988).CrossRefGoogle Scholar
Hartshorne, R., Local cohomology (Springer, Berlin, 1967).CrossRefGoogle Scholar
Hochster, M., Prime ideal structure in commutative rings, Trans. Amer. Math. Soc. 142 (1969), 4360.CrossRefGoogle Scholar
Hovey, M., Palmieri, J. H. and Strickland, N. P., Axiomatic stable homotopy theory, Mem. Amer. Math. Soc. 128 (1997).Google Scholar
Huisgen-Zimmermann, B., Purity, algebraic compactness, direct sum decompositions, and representation type, in Infinite length modules (Bielefeld, 1998), Trends in Mathematics (Birkhäuser, Basel, 2000), 331367.CrossRefGoogle Scholar
Iyengar, S., Stratifying derived categories associated to finite groups and commutative rings. Available athttp://www.mi.s.osakafu-u.ac.jp/~kiriko/seminar/09JulRIMS/lectures/iyengar.pdf.Google Scholar
Krause, H., The stable derived category of a Noetherian scheme, Compositio Math. 141 (2005), 11281162.CrossRefGoogle Scholar
Matsumura, H., Commutative algebra, Mathematics Lecture Note Series, vol. 56, second edition (Benjamin/Cummings, Reading, MA, 1980).Google Scholar
Matsumura, H., Commutative ring theory, Cambridge Studies in Advanced Mathematics, vol. 8, second edition (Cambridge University Press, Cambridge, 1989), translated from the Japanese by M. Reid.Google Scholar
Murfet, D., The mock homotopy category of projectives and Grothendieck duality, PhD thesis, Australian National University (2007), available from: http://www.therisingsea.org/thesis.pdf.Google Scholar
Murfet, D. and Salarian, S., Totally acyclic complexes over Noetherian schemes, Adv. Math. 226 (2011), 10961133.CrossRefGoogle Scholar
Neeman, A., The chromatic tower for $D(R)$ , Topology 31 (1992), 519532; with an appendix by Marcel Bökstedt.CrossRefGoogle Scholar
Neeman, A., The Grothendieck duality theorem via Bousfield’s techniques and Brown representability, J. Amer. Math. Soc. 9 (1996), 205236.CrossRefGoogle Scholar
Neeman, A., Triangulated categories, Annals of Mathematics Studies, vol. 148 (Princeton University Press, Princeton, NJ, 2001).CrossRefGoogle Scholar
Neeman, A., The homotopy category of flat modules, and Grothendieck duality, Invent. Math. 174 (2008), 255308.CrossRefGoogle Scholar
Orlov, D., Triangulated categories of singularities and D-branes in Landau–Ginzburg models, Tr. Mat. Inst. Steklova 246 (2004), no. Algebr. Geom. Metody, Svyazi i Prilozh. 240–262.Google Scholar
Orlov, D., Triangulated categories of singularities, and equivalences between Landau-Ginzburg models, Mat. Sb. 197 (2006), 117132.Google Scholar
Rouquier, R., Dimensions of triangulated categories, J. K-Theory 1 (2008), 193256.CrossRefGoogle Scholar
Stevenson, G., Support theory via actions of tensor triangulated categories, J. Reine Angew. Math. 681 (2013), 219254.Google Scholar
Takahashi, R., Classifying thick subcategories of the stable category of Cohen-Macaulay modules, Adv. Math. 225 (2010), 20762116.CrossRefGoogle Scholar
Thomason, R. W., The classification of triangulated subcategories, Compositio Math. 105 (1997), 127.CrossRefGoogle Scholar
Weibel, C., An introduction to homological algebra, Cambridge Studies in Advanced Mathematics, vol. 38 (Cambridge University Press, Cambridge, 1994).CrossRefGoogle Scholar