We construct minimal Eisenstein integrals for a reductive symmetric space G/H as matrix coefficients of the minimal principal series of G. The Eisenstein integrals thus obtained include those from the \sigma-minimal principal series. In addition, we obtain related Eisenstein integrals, but with different normalizations. Specialized to the case of the group, this wider class includes Harish-Chandra's minimal Eisenstein integrals
International audienceWe form wave packets in the Schwartz space of a reductive p-adic symmetric spa...
Motivated by string theory scattering amplitudes that are invariant under a discrete U-duality, we s...
Let $X=G/H $ be a semisimple symmetric space. We assume that $G $ is a con-nected reductive Lie grou...
We construct minimal Eisenstein integrals for a reductive symmetric space G/H as matrix coefficients...
In this paper we develop a theory of Eisenstein integrals related to the principal series for a redu...
A survey of joint work with Henrik Schlichtkrull on the induction of certain relations among (parti...
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...
We obtain the Plancherel decomposition for a reductive symmetric space in the sense of representati...
RésuméSharp majorations for the meromorphic continuation of Eisenstein integrals for reductive symme...
Posn(R) and Eisenstein Series provides an introduction, requiring minimal prerequisites, to the anal...
Let G be a connected semisimple Lie group with a finite center. There are two general methods to con...
In this paper we provide a new approach for the derivation of parameterizations for the Eisenstein s...
AbstractIn this paper we provide a new approach for the derivation of parameterizations for the Eise...
AbstractThis paper studies the asymptotic expansions of spherical functions on symmetric spaces and ...
International audienceWe form wave packets in the Schwartz space of a reductive p-adic symmetric spa...
Motivated by string theory scattering amplitudes that are invariant under a discrete U-duality, we s...
Let $X=G/H $ be a semisimple symmetric space. We assume that $G $ is a con-nected reductive Lie grou...
We construct minimal Eisenstein integrals for a reductive symmetric space G/H as matrix coefficients...
In this paper we develop a theory of Eisenstein integrals related to the principal series for a redu...
A survey of joint work with Henrik Schlichtkrull on the induction of certain relations among (parti...
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...
We obtain the Plancherel decomposition for a reductive symmetric space in the sense of representati...
RésuméSharp majorations for the meromorphic continuation of Eisenstein integrals for reductive symme...
Posn(R) and Eisenstein Series provides an introduction, requiring minimal prerequisites, to the anal...
Let G be a connected semisimple Lie group with a finite center. There are two general methods to con...
In this paper we provide a new approach for the derivation of parameterizations for the Eisenstein s...
AbstractIn this paper we provide a new approach for the derivation of parameterizations for the Eise...
AbstractThis paper studies the asymptotic expansions of spherical functions on symmetric spaces and ...
International audienceWe form wave packets in the Schwartz space of a reductive p-adic symmetric spa...
Motivated by string theory scattering amplitudes that are invariant under a discrete U-duality, we s...
Let $X=G/H $ be a semisimple symmetric space. We assume that $G $ is a con-nected reductive Lie grou...
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