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Subcategories of Fixed Points of Mutations by Exceptional Objects in Triangulated Categories

Subcategories of Fixed Points of Mutations by Exceptional Objects in Triangulated Categories
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摘要 We first prove that the subcategory of fixed points of mutation determined by an excep- tional object E in a triangulated category coincide with the perpendicular category of E. Based on this characterisation, we prove that the subcategory of fixed points of mutation in the derived category of the coherent sheaves on weighted projective line with genus one is equivalent to the derived category of a hereditary algebra. Meanwhile, we induce two new recollements by left and right mutations from a given recollement. We first prove that the subcategory of fixed points of mutation determined by an excep- tional object E in a triangulated category coincide with the perpendicular category of E. Based on this characterisation, we prove that the subcategory of fixed points of mutation in the derived category of the coherent sheaves on weighted projective line with genus one is equivalent to the derived category of a hereditary algebra. Meanwhile, we induce two new recollements by left and right mutations from a given recollement.
作者 Li Dan TANG
机构地区 College of Mathematics and Computer Science
出处 《Acta Mathematica Sinica,English Series》 SCIE CSCD 2016年第2期187-198,共12页 数学学报(英文版)
基金 Supported by National Natural Science Foundation of China(Grant Nos.11126268,11071040) Science and Technology Development Fund of Fuzhou University(Grant No.2011-xq-22)
关键词 Subcategory of fixed points exceptional object RECOLLEMENT Subcategory of fixed points, exceptional object, recollement
分类号 O154.1 [理学—基础数学]
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  • 1Beilinson, A. A., Bernstein, J., Deligne, P.: Faisceaux pervers. Astdrisque, 100, 5-172 (1982).
  • 2Bondal, A. I.: Representations of associative algebras an0 coherent sheaves. Izv. Akad. Nauk SSSR, Ser Mat., 53(1), 25-44(1989); English translation: Math. USSR, Izv., 34, 23-42 (1990).
  • 3Drezet, J. M., Le Potier, J.: Fibres stables et fibres exceptionnels sur P2. Ann. Sci. Ec. Norm. Sup., 18(4) 193 243 (1985).
  • 4Geigle, W., Lenzing, H.: A class of weighted projective curves arising in representation theory of finite dimensional algebras. In: Singularities, Representations of Algebras, and Vector Bundles, Springer Lecture Notes Math. 1273, Springer, Berlin-Heidelberg, 1987, 265-297.
  • 5Geigle, W., Lenzing, H.: Perpendicular categories with applications to representations and sheaves. J. Algebra, 144, 273-343 (1991).
  • 6Gorodentsev, A. L.: Exceptional bundles on surfaces with a moving anticanonical class. Izv. Akad. Nauk SSSR Set. Mat., 52(4), 740-757 (1988); English translation: Math. USSR Izv., 1, 67-83 (1989).
  • 7Gorodentsev, A. L., Rudakov, A. N.: Exceptional vector bundles on projective space. Duke Math. J., 54, 115-130 (1987).
  • 8Lenzing, H., Meltzer, H.: Sheaves on a weighted projective line of genus one, and representations of a tubular algebra. In: Representation Theory of Algebras, Sixth International Conference, Ottawa 1992, CMS Conf. Proc. 14, 1993, 313-337.
  • 9Meltzer, H.: Exceptional Vector Bundles, Tilting Sheaves and Tilting Complexes for Weighted Projective Lines, Mem. Amer. Math. Soc. 171 (808), American Mathematical Society, Providence, 2004.
  • 10Meltzer, H.: Tubular mutations. Colloqu. Math., 74, 267-274 (1997).
Acta Mathematica Sinica,English Series
2016年 第2期

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