Admissibility for quasiregular representations of exponential solvable Lie groups

Vignon Oussa

Displaying similar documents to “Admissibility for quasiregular representations of exponential solvable Lie groups”

Classification of connected unimodular Lie groups with discrete series

Anh Nguyen Huu (1980)

Annales de l'institut Fourier

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We introduce a new class of connected solvable Lie groups called $H$ -group. Namely a $H$ -group is a connected solvable Lie group with center $Z$ such that for some $ℓ$ in the Lie algebra $h$ of $H$ , the symplectic for $B_{ℓ}$ on $h / z$ given by $ℓ ([x, y])$ is nondegenerate. Moreover, apart form some technical requirements, it will be proved that a connected unimodular Lie group $G$ with center $Z$ , such that the center of $G / Rad G$ is finite, has discrete series if and only if $G$ may be written as $G = H S^{'}$ , $H \cap S = Z^{0}$ , where $H$ is a $H$ -group with...

Invariant orders in Lie groups

Neeb, Karl-Hermann

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[For the entire collection see Zbl 0742.00067.]The author formulates several theorems about invariant orders in Lie groups (without proofs). The main theorem: a simply connected Lie group $G$ admits a continuous invariant order if and only if its Lie algebra $L (G)$ contains a pointed invariant cone. V. M. Gichev has proved this theorem for solvable simply connected Lie groups (1989). If $G$ is solvable and simply connected then all pointed invariant cones $W$ in $L (G)$ are global in $G$ (a Lie wedge $W \subset L (G)$ ...

On holomorphically separable complex solv-manifolds

Alan T. Huckleberry, E. Oeljeklaus (1986)

Annales de l'institut Fourier

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Let $G$ be a solvable complex Lie group and $H$ a closed complex subgroup of $G$ . If the global holomorphic functions of the complex manifold $X : G / H$ locally separate points on $X$ , then $X$ is a Stein manifold. Moreover there is a subgroup $\hat{H}$ of finite index in $H$ with $π_{1} (G / \hat{H})$ nilpotent. In special situations (e.g. if $H$ is discrete) $H$ normalizes $\hat{H}$ and $H / \hat{H}$ is abelian.

Integrating central extensions of Lie algebras via Lie 2-groups

Christoph Wockel, Chenchang Zhu (2016)

Journal of the European Mathematical Society

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The purpose of this paper is to show how central extensions of (possibly infinite-dimensional) Lie algebras integrate to central extensions of étale Lie 2-groups in the sense of [Get09, Hen08]. In finite dimensions, central extensions of Lie algebras integrate to central extensions of Lie groups, a fact which is due to the vanishing of $π_{2}$ for each finite-dimensional Lie group. This fact was used by Cartan (in a slightly other guise) to construct the simply connected Lie group associated...

Transitive riemannian isometry groups with nilpotent radicals

C. Gordon (1981)

Annales de l'institut Fourier

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Given that a connected Lie group $G$ with nilpotent radical acts transitively by isometries on a connected Riemannian manifold $M$ , the structure of the full connected isometry group $A$ of $M$ and the imbedding of $G$ in $A$ are described. In particular, if $G$ equals its derived subgroup and its Levi factors are of noncompact type, then $G$ is normal in $A$ . In the special case of a simply transitive action of $G$ on $M$ , a transitive normal subgroup $G^{'}$ of $A$ is constructed with $dim G^{'} = dim G$ and a sufficient condition...

Spectrum for a solvable Lie algebra of operators

Daniel Beltiţă (1999)

Studia Mathematica

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A new concept of spectrum for a solvable Lie algebra of operators is introduced, extending the Taylor spectrum for commuting tuples. This spectrum has the projection property on any Lie subalgebra and, for algebras of compact operators, it may be computed by means of a variant of the classical Ringrose theorem.

Dual topology of a nilpotent Lie group

Ian D. Brown (1973)

Annales scientifiques de l'École Normale Supérieure

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