EuDML | Browse

Let $(G, V)$ be a regular prehomogeneous vector space (abbreviated to $P V$ ), where $G$ is a reductive algebraic group over $ℂ$ . If $V = \oplus_{i = 1}^{n} V_{i}$ is a decomposition of $V$ into irreducible representations, then, in general, the PV’s $(G, V_{i})$ are no longer regular. In this paper we introduce the notion of quasi-irreducible $P V$ (abbreviated to $Q$ -irreducible), and show first that for completely $Q$ -reducible $P V$ ’s, the $Q$ -isotypic components are intrinsically defined, as in ordinary representation theory. We also show that, in an appropriate...

Deligne-Lusztig restriction of a Gelfand-Graev module

Olivier Dudas (2009)

Annales scientifiques de l'École Normale Supérieure

Using Deodhar’s decomposition of a double Schubert cell, we study the regular representations of finite groups of Lie type arising in the cohomology of Deligne-Lusztig varieties associated to tori. We deduce that the Deligne-Lusztig restriction of a Gelfand-Graev module is a shifted Gelfand-Graev module.

Der Grad erzeugender Funktionen von Invariantenringen.

Friedrich Knop, Peter Littelmann (1987)

Mathematische Zeitschrift

Der Primidealraum der C*-Algebra und die unzerlegebaren Charaktere der Gruppe GI (...,q).

Wilfried Hauenschild (1986)

Mathematische Annalen

Détermination des caractères des groupes finis simples : travaux de Lusztig

Pierre Cartier (1985/1986)

Séminaire Bourbaki

Die irreduziblen Darstellungen der Gruppen SL...(Z...), insbesondere SL...(Z...). II. Teil

Jürgen Wolfart, Alexandre Nobs (1976)

Commentarii mathematici Helvetici

Die irreduziblen Darstellungen der Gruppen SL...(Z...), insbesondere SL...(Z...). I. Teil

Alexandre Nobs (1976)

Commentarii mathematici Helvetici

Die irreduziblen Darstellungen von GL2(Zp), insbesondere GL2(Z2).

Alexandre Nobs (1977)

Mathematische Annalen

Discrete series and the unipotent subgroup

G. I. Lehrer (1974)

Compositio Mathematica

Discrete series representations of unipotent $p$ -adic groups.

Adler, Jeffrey D., Roche, Alan (2005)

Journal of Lie Theory

Dual pair G... x PGL2 G... is the automorphism group of the Jordan algebra.

Gordan Savin (1994)

Inventiones mathematicae

Dual pairs and Kostant-Sekiguchi correspondence. II. Classification of nilpotent elements

Andrzej Daszkiewicz, Witold Kraśkiewicz, Tomasz Przebinda (2005)

Open Mathematics

We classify the homogeneous nilpotent orbits in certain Lie color algebras and specialize the results to the setting of a real reductive dual pair. For any member of a dual pair, we prove the bijectivity of the two Kostant-Sekiguchi maps by straightforward argument. For a dual pair we determine the correspondence of the real orbits, the correspondence of the complex orbits and explain how these two relations behave under the Kostant-Sekiguchi maps. In particular we prove that for a dual pair in...

Currently displaying 1 – 18 of 18

Page 1