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The group SU(1,d) acts naturally on the Hilbert space $L ² (B d μ_{α}) (α > - 1)$ , where B is the unit ball of $ℂ^{d}$ and $d μ_{α}$ the weighted measure ${(1 - | z | ²)}^{α} d m (z)$ . It is proved that the irreducible decomposition of the space has finitely many discrete parts and a continuous part. Each discrete part corresponds to a zero of the generalized Harish-Chandra c-function in the lower half plane. The discrete parts are studied via invariant Cauchy-Riemann operators. The representations on the discrete parts are equivalent to actions on some holomorphic...

A weighted Plancherel formula. III. The case of the hyperbolic matrix ball.

Jaak Peetre, Gen Kai Zhang (1992)

Collectanea Mathematica

Addendum to "Existence of Hermitian n-Symmetric Spaces and of Non-commutative Naturally Reductive Spaces".

J. Alfredo Jiménez (1988)

Mathematische Zeitschrift

Adjoint representation of $E_{8}$ and del Pezzo surfaces of degree $1$

Vera V. Serganova, Alexei N. Skorobogatov (2011)

Annales de l’institut Fourier

Let $X$ be a del Pezzo surface of degree $1$ , and let $G$ be the simple Lie group of type $E_{8}$ . We construct a locally closed embedding of a universal torsor over $X$ into the $G$ -orbit of the highest weight vector of the adjoint representation. This embedding is equivariant with respect to the action of the Néron-Severi torus $T$ of $X$ identified with a maximal torus of $G$ extended by the group of scalars. Moreover, the $T$ -invariant hyperplane sections of the torsor defined by the roots of $G$ are the inverse images...

Adjoint vector fields on the tangent space of semisimple symmetric spaces.

Levasseur, T., Ushirobira, R. (1999)

Journal of Lie Theory

Affine Actions of Higher Rank Lattices.

R. Feres (1993)

Geometric and functional analysis

Algebraic Hulls and the Folner Property.

A. Iozzi, A. Nevo (1996)

Geometric and functional analysis

Almost L2 matrix coefficients.

U. Haagerup, M. Cowling, R. Howe (1988)

Journal für die reine und angewandte Mathematik

Alternating Sum Formulas for Multiplicities in ...(...). II.

Roberto J. Miatello (1983)

Mathematische Zeitschrift

An algebraic proof of the PRV conjecture for very regular weights.

William M., McGovern (1990)

Journal für die reine und angewandte Mathematik

An application of the building to orbital integrals

Jonathan D. Rogawski (1980)

Compositio Mathematica

An endpoint estimate for the Kunze-Stein phenomenon and related maximal operators.

Ionescu, Alexandru D. (2000)

Annals of Mathematics. Second Series

An estimation of the controllability time for single-input systems on compact Lie Groups

Andrei Agrachev, Thomas Chambrion (2006)

ESAIM: Control, Optimisation and Calculus of Variations

Geometric control theory and Riemannian techniques are used to describe the reachable set at time t of left invariant single-input control systems on semi-simple compact Lie groups and to estimate the minimal time needed to reach any point from identity. This method provides an effective way to give an upper and a lower bound for the minimal time needed to transfer a controlled quantum system with a drift from a given initial position to a given final position. The bounds include diameters...

An example of unipotent representations associated with a nilpotent nonminimal orbit: The case of orbits of dimension 10 of $s o (4, 3)$ . (Un exemple de représentations unipotentes associées à une orbite nilpotente non minimale: le cas des orbites de dimension 10 de $s o (4, 3)$ .)

Sabourin, Hervé (2000)

Journal of Lie Theory

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