Add to ORKGThis book presents an exposition of spherical functions on compact symmetric spaces, from the viewpoint of Cartan-Selberg. Representation theory, invariant differential operators, and invariant integral operators play an important role in the exposition. The author treats compact symmetric pairs, spherical representations for compact symmetric pairs, the fundamental groups of compact symmetric spaces, and the radial part of an invariant differential operator. Also explored are the classical results for spheres and complex projective spaces and the relation between spherical functions and harmonic polynomials. This book is suitable as a graduate textbook
AbstractWe determine integral formulas for the meromorphic extension in the λ-parameter of the spher...
Let G be a simply connected complex Lie group with Lie algebra g, h a real form of g, and H the anal...
The idea of describing the eigenvalues of bosonic and fermionic fields in quantum field theory by c...
AbstractOl'shanskii spaces for semisimple groups are special cases of ordered symmetric spaces. The ...
AbstractWe study spherical functions on Euclidean spaces from the viewpoint of Riemannian symmetric ...
Spherical representations and functions are the building blocks for harmonic analysis on riemannian ...
AbstractThe spherical functions on a real semisimple Lie group (w.r.t. a maximal compact subgroup) a...
We study spherical functions on Euclidean spaces from the viewpoint of Riemannian symmetric spaces. ...
AbstractIn this paper we study spherical unitary highest weight representations associated to a comp...
In this article we compute the spherical functions which are associated to hyperbolically ordered sy...
When M is a compact symmetric space, the spherical mean value operator Lr(for a fixed r > 0) acting ...
Abstract. Let π be a generalized principal series representation with respect to the Jacobi paraboli...
AbstractWe study spherical functions on Euclidean spaces from the viewpoint of Riemannian symmetric ...
Abstract. Generalized spherical functions are defined to be joint eigenfunctions of some invariant d...
Abstract. By taking an appropriate zero-curvature limit, we obtain the spheri-cal functions on flat ...
AbstractWe determine integral formulas for the meromorphic extension in the λ-parameter of the spher...
Let G be a simply connected complex Lie group with Lie algebra g, h a real form of g, and H the anal...
The idea of describing the eigenvalues of bosonic and fermionic fields in quantum field theory by c...
AbstractOl'shanskii spaces for semisimple groups are special cases of ordered symmetric spaces. The ...
AbstractWe study spherical functions on Euclidean spaces from the viewpoint of Riemannian symmetric ...
Spherical representations and functions are the building blocks for harmonic analysis on riemannian ...
AbstractThe spherical functions on a real semisimple Lie group (w.r.t. a maximal compact subgroup) a...
We study spherical functions on Euclidean spaces from the viewpoint of Riemannian symmetric spaces. ...
AbstractIn this paper we study spherical unitary highest weight representations associated to a comp...
In this article we compute the spherical functions which are associated to hyperbolically ordered sy...
When M is a compact symmetric space, the spherical mean value operator Lr(for a fixed r > 0) acting ...
Abstract. Let π be a generalized principal series representation with respect to the Jacobi paraboli...
AbstractWe study spherical functions on Euclidean spaces from the viewpoint of Riemannian symmetric ...
Abstract. Generalized spherical functions are defined to be joint eigenfunctions of some invariant d...
Abstract. By taking an appropriate zero-curvature limit, we obtain the spheri-cal functions on flat ...
AbstractWe determine integral formulas for the meromorphic extension in the λ-parameter of the spher...
Let G be a simply connected complex Lie group with Lie algebra g, h a real form of g, and H the anal...
The idea of describing the eigenvalues of bosonic and fermionic fields in quantum field theory by c...