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Classification of all connected subgroup schemes of a reductive group containing a split maximal torus

Published online by Cambridge University Press:  23 July 2008

Ekaterina Sopkina
Affiliation:
Department of Mathematics and Mechanics, St. Petersburg University and Fakultät für Mathematik, Universität Bielefeld, [email protected].
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Abstract

The main result of the paper is a classification of all connected subgroup schemes of a reductive group containing a split maximal torus, over an arbitrary field. The classification is expressed in terms of functions on the root system.

Type
Research Article
Copyright
Copyright © ISOPP 2009

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References

1.Borel, A.Tits, J.Groupes réductifs. – Inst. Hautes Études Sci. Publ. Math. 27 (1965), 55151CrossRefGoogle Scholar
2.Borewicz, Z.I., Vavilov, N.A.Subgroups of the general linear group over a semilocal ring containing the group of diagonal matrices. Proc. Steklov Inst. Math. 4 (1980), 4154Google Scholar
3.Jantzen, J.C.Representations of algebraic groups. – 2nd ed.Providence, RI: American Mathematical Society, 2003. - XIII, 576 pGoogle Scholar
4.Knop, F.Homogeneous varieties for semisimple groups of rank one. Compositio mathematica 98 (1995), 7789Google Scholar
5. Schemas en groupes (SGA 3) / Séminaire de Géométrie Algébrique du Bois Marie 1962/64, SGA 3. Dirigé par M. Demazure et A.Grothendieck. – Berlin: Springer, 1970. –T. 1-3Google Scholar
6.Sopkina, E.A.Classification of subgroup schemes in GLn that contain a split maximal torus. (Russian)Zap. Nauch. Sem. POMI, 321 (2005), 281296 (English transl. in J. Math. Sci.)Google Scholar
7.Springer, T.A.Linear algebraic groups. – 2nd ed.Boston: Birkhäuser, 1998 – X, 334 p.CrossRefGoogle Scholar
8.Vavilov, N.A.Bruhat decomposition for subgroups containing the group of diagonal matrices. II. J. Sov. Math. 27 (1984), 28652874CrossRefGoogle Scholar
9.Vavilov, N.Intermediate Subgroups in Chevalley Groups. – Groups of Lie type and their geometries (Como, 1993), 233280Google Scholar
10.Vavilov, N.A.Subgroups of Chevalley groups containing a maximal torus. – Proc. Leningrad Math. Soc. 1 (1990), 64109 (English transl. in Proc. Sanct-Petersburg Math. Soc.)Google Scholar
11.Vavilov, N.Plotkin, E.Chevalley groups over commutative rings I. Elementary calculations. Acta Appl. Math. 45 (1) (1996), 73113CrossRefGoogle Scholar
12.Waterhouse, W.C.Introduction to affine group schemes. – New York: Springer, 1979. - XI, 164 pCrossRefGoogle Scholar
13.Wenzel, C.Classification of all parabolic subgroup-schemes of a reductive linear algebraic group over an algebraically closed field. – Transactions of the American Mathematical Society 337 (1) (1993), 211218CrossRefGoogle Scholar
14.Wenzel, C.Rationality of G/P for a nonreduced parabolic subgroup-scheme P. – Proceedings of the American Mathematical Society 117 (4) (1993), 899904Google Scholar