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22-XX Topological groups, Lie groups

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Displaying 1441 – 1460 of 3843

Intersections in hyperbolic manifolds.

Belegradek, Igor (1998)

Geometry & Topology

Intertwined mappings

Jean Ecalle, Bruno Vallet (2004)

Annales de la Faculté des sciences de Toulouse : Mathématiques

Intertwining differential operators and reducibility of generalized Verma modules.

Jing-song Huang (1993)

Mathematische Annalen

Intertwining operators and residues. II. Invariant distributions

James Arthur (1989)

Compositio Mathematica

Intertwining Operators for Semisimple Groups, II.

A.W. Knapp, E.M Stein (1980)

Inventiones mathematicae

Intertwining operators over L1 (G) for G ? [PG] ? [SIN].

Volker Runde (1996)

Mathematische Zeitschrift

Introduction to the theory of group representations

Stephen Gelbart (1971/1973)

Séminaire Choquet. Initiation à l'analyse

Invariance of Covariance Structures Under Groups of Transformations.

A. Shapiro, M.W. Browne (1991)

Metrika

Invariant Analytic Hypersurfaces.

G.A. Margulis, A.T. Huckleberry (1983)

Inventiones mathematicae

Invariant Complex Structures on Four-Dimensional Solvable Real Lie Groups.

Joanne Erdman Snow (1990)

Manuscripta mathematica

Invariant complex structures on reductive Lie groups.

Dennis M. Snow (1986)

Journal für die reine und angewandte Mathematik

Invariant cones in Lie algebras.

Karl H. Hofmann, Joachim Hilgert (1988)

Semigroup forum

Invariant cones in solvable Lie algebras.

Detlev Poguntke (1992)

Mathematische Zeitschrift

Invariant control sets on flag manifolds and ideal boundaries of symmetric spaces.

Firer, M., do Rocio, O.G. (2003)

Journal of Lie Theory

Invariant convex sets and functions in Lie algebras.

K.H. Neeb (1996)

Semigroup forum

Invariant Differential Operators and Polynomials of Lie Transformation Groups.

Arne Hole (1974)

Mathematica Scandinavica

Invariant differential operators and the range of the radon D-plane transform.

Fulton B. Gonzalez (1990)

Mathematische Annalen

Invariant differential operators are linear combinations of symmetric positive ones.

Anton Deitmar (1993)

Mathematische Annalen

Invariant differential operators on the tangent space of some symmetric spaces

Thierry Levasseur, J. Toby Stafford (1999)

Annales de l'institut Fourier

Let $𝔤$ be a complex, semisimple Lie algebra, with an involutive automorphism $ϑ$ and set $𝔨 = Ker (ϑ - I)$ , $𝔭 = Ker (ϑ + I)$ . We consider the differential operators, $𝒟 (𝔭)^{K}$ , on $𝔭$ that are invariant under the action of the adjoint group $K$ of $𝔨$ . Write $τ : 𝔨 \to Der 𝒪 (𝔭)$ for the differential of this action. Then we prove, for the class of symmetric pairs $(𝔤, 𝔨)$ considered by Sekiguchi, that $\{d \in 𝒟 (𝔭) : d (𝒪 (𝔭)^{K}) = 0\} = 𝒟 (𝔭) τ (𝔨)$ . An immediate consequence of this equality is the following result of Sekiguchi: Let $(𝔤_{0}, 𝔨_{0})$ be a real form of one of these symmetric pairs $(𝔤, 𝔨)$ , and suppose that $T$ is a $K_{0}$ -invariant...

Invariant Distributions on the n-Fold Metapletic Covers of GL(r, F), F p-Adic.

David Joyner (2001)

The journal of Fourier analysis and applications [[Elektronische Ressource]]

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