The Grothendieck group of G-equivariant modules over coordinate rings of G-orbits

J. Klimek; W. Kraśkiewicz; J. Weyman

Displaying similar documents to “The Grothendieck group of G-equivariant modules over coordinate rings of G-orbits”

Algorithmic orbit classification for some Borel group actions

Hartmut Bürgstein, Wim H. Hesselink (1987)

Compositio Mathematica

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Asymptotics and characteristic cycles for representations of complex groups

Jen-Tseh Chang (1993)

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A third look at weight diagrams

Nikolai Vavilov (2000)

Rendiconti del Seminario Matematico della Università di Padova

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Classification of irreducible weight modules

Olivier Mathieu (2000)

Annales de l'institut Fourier

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Let $𝔤$ be a reductive Lie algebra and let $𝔥$ be a Cartan subalgebra. A $𝔤$ -module $M$ is called a if and only if $M = \oplus_{λ} M_{λ}$ , where each weight space $M_{λ}$ is finite dimensional. The main result of the paper is the classification of all simple weight $𝔤$ -modules. Further, we show that their characters can be deduced from characters of simple modules in category $𝒪$ .

Linear bounds for levels of stable rationality

Fedor Bogomolov, Christian Böhning, Hans-Christian Graf von Bothmer (2012)

Open Mathematics

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Let G be one of the groups SLn(ℂ), Sp2n (ℂ), SOm(ℂ), Om(ℂ), or G 2. For a generically free G-representation V, we say that N is a level of stable rationality for V/G if V/G × ℙN is rational. In this paper we improve known bounds for the levels of stable rationality for the quotients V/G. In particular, their growth as functions of the rank of the group is linear for G being one of the classical groups.

H*(C/B,L) for G of semi-simple rank 2

Walter Griffith (1983)

Fundamenta Mathematicae

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