Add to ORKGIn this paper we develop a theory of Eisenstein integrals related to the principal series for a reductive symmetric space G=H: Here G is a real reductive group of Harish-Chandra's class, ? an involution of G and H an open subgroup of the group G ? of xed points for ?: The group G itself is a symmetric space for the left right action of G G : we refer to this setting as the group case. Up to a normalization, our Eisenstein integrals generalize those of Harish-Chandra [18] associated with a minimal parabolic subgroup in the group case
AbstractTo each discrete series representation of a connected semisimple Lie group G with finite cen...
AbstractWe introduce a filtration of a (g,K)-module of some space of functions on a reductive symmet...
Let G=H be a semisimple symmetric space, that is, G is a connected semisimple real Lie group with an...
In this paper we develop a theory of Eisenstein integrals related to the principal series for a redu...
We construct minimal Eisenstein integrals for a reductive symmetric space G/H as matrix coefficients...
In harmonic analysis on a reductive symmetric space X an important role is played by families of gen...
AbstractWe study the action of standard intertwining operators on H-fixed generalized vectors in the...
AbstractLet G be the group of real points of a reductive algebraic group defined over R, σ an involu...
A survey of joint work with Henrik Schlichtkrull on the induction of certain relations among (parti...
Let $X=G/H $ be a semisimple symmetric space. We assume that $G $ is a con-nected reductive Lie grou...
We obtain the Plancherel decomposition for a reductive symmetric space in the sense of representati...
Let G be a connected semisimple Lie group with a finite center. There are two general methods to con...
In this thesis we introduce a class of Radon transforms for reductive symmetric spaces, including th...
This paper will formulate and offer evidence for a conjecture on the analytical behaviour of residua...
RésuméSharp majorations for the meromorphic continuation of Eisenstein integrals for reductive symme...
AbstractTo each discrete series representation of a connected semisimple Lie group G with finite cen...
AbstractWe introduce a filtration of a (g,K)-module of some space of functions on a reductive symmet...
Let G=H be a semisimple symmetric space, that is, G is a connected semisimple real Lie group with an...
In this paper we develop a theory of Eisenstein integrals related to the principal series for a redu...
We construct minimal Eisenstein integrals for a reductive symmetric space G/H as matrix coefficients...
In harmonic analysis on a reductive symmetric space X an important role is played by families of gen...
AbstractWe study the action of standard intertwining operators on H-fixed generalized vectors in the...
AbstractLet G be the group of real points of a reductive algebraic group defined over R, σ an involu...
A survey of joint work with Henrik Schlichtkrull on the induction of certain relations among (parti...
Let $X=G/H $ be a semisimple symmetric space. We assume that $G $ is a con-nected reductive Lie grou...
We obtain the Plancherel decomposition for a reductive symmetric space in the sense of representati...
Let G be a connected semisimple Lie group with a finite center. There are two general methods to con...
In this thesis we introduce a class of Radon transforms for reductive symmetric spaces, including th...
This paper will formulate and offer evidence for a conjecture on the analytical behaviour of residua...
RésuméSharp majorations for the meromorphic continuation of Eisenstein integrals for reductive symme...
AbstractTo each discrete series representation of a connected semisimple Lie group G with finite cen...
AbstractWe introduce a filtration of a (g,K)-module of some space of functions on a reductive symmet...
Let G=H be a semisimple symmetric space, that is, G is a connected semisimple real Lie group with an...