AbstractWe study holomorphically induced representations ρ of Lie groups G=expg from weak polarizations h at f∈g*. When G is a connected and simply connected Lie group whose Lie algebra is a normal j-algebra, we obtain a sufficient condition for non-vanishing of ρ and the decomposition of ρ into irreducible representations under the assumption that the coadjoint G-orbit Gċf is open and h is a positive weak polarization at f
Poguntke D. OPERATOR KERNELS FOR IRREDUCIBLE REPRESENTATIONS OF EXPONENTIAL LIE GROUPS. Bulletin of ...
We prove that a polar orthogonal representation of a real reductive algebraic group has the same clo...
This book is the first one that brings together recent results on the harmonic analysis of exponenti...
AbstractWe study holomorphically induced representations ρ of Lie groups G=expg from weak polarizati...
AbstractIf (b,j,ƒ0) is a normal j-algebra and b− = {X + ijX;X∈b} then b− is a positive polarization ...
Representations of solvable Lie groups are realized and classified by geometric quantization of coad...
AbstractWe present a slightly modified definition of the concept of holomorphically induced represen...
Let $G $ be a connected, simply connected nilpotent Lie group and $\mathfrak{g} $ be it $s $ Lie alg...
Introduction In this talk I shall explain some topics for unitary representations of solvable Lie gr...
AbstractThis paper concerns itself with the problem of generalizing to nilpotent Lie groups a weak f...
In this paper we prove the irreducibility of representations associated with higher-order polarizati...
This dissertation arose from efforts to prove the following conjecture, which generalizes to nilpote...
RésuméDans cet article, il s'agit de la méthode des orbites pour les groupes de Lie résolubles. On m...
Let G = exp g be a connected, simply connected, solv-able exponential Lie group. Let l ∈ g ∗ and let...
International audienceThe theory of unitary group representations began with finite groups, and blos...
Poguntke D. OPERATOR KERNELS FOR IRREDUCIBLE REPRESENTATIONS OF EXPONENTIAL LIE GROUPS. Bulletin of ...
We prove that a polar orthogonal representation of a real reductive algebraic group has the same clo...
This book is the first one that brings together recent results on the harmonic analysis of exponenti...
AbstractWe study holomorphically induced representations ρ of Lie groups G=expg from weak polarizati...
AbstractIf (b,j,ƒ0) is a normal j-algebra and b− = {X + ijX;X∈b} then b− is a positive polarization ...
Representations of solvable Lie groups are realized and classified by geometric quantization of coad...
AbstractWe present a slightly modified definition of the concept of holomorphically induced represen...
Let $G $ be a connected, simply connected nilpotent Lie group and $\mathfrak{g} $ be it $s $ Lie alg...
Introduction In this talk I shall explain some topics for unitary representations of solvable Lie gr...
AbstractThis paper concerns itself with the problem of generalizing to nilpotent Lie groups a weak f...
In this paper we prove the irreducibility of representations associated with higher-order polarizati...
This dissertation arose from efforts to prove the following conjecture, which generalizes to nilpote...
RésuméDans cet article, il s'agit de la méthode des orbites pour les groupes de Lie résolubles. On m...
Let G = exp g be a connected, simply connected, solv-able exponential Lie group. Let l ∈ g ∗ and let...
International audienceThe theory of unitary group representations began with finite groups, and blos...
Poguntke D. OPERATOR KERNELS FOR IRREDUCIBLE REPRESENTATIONS OF EXPONENTIAL LIE GROUPS. Bulletin of ...
We prove that a polar orthogonal representation of a real reductive algebraic group has the same clo...
This book is the first one that brings together recent results on the harmonic analysis of exponenti...
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