DOIAbstract
We develop isometry and inversion formulas for the Segal–Bargmann transform on odd-dimensional hyperbolic spaces that are as parallel as possible to the dual case of odd-dimensional spheres
We develop isometry and inversion formulas for the Segal–Bargmann transform on odd-dimensional hyperbolic spaces that are as parallel as possible to the dual case of odd-dimensional spheres
Consider the Poincare unit disk model for the hyperbolic plane H 2. Let ξ be the set of all horocycl...
Consider the Poincare unit disk model for the hyperbolic plane H 2. Let ξ be the set of all horocycl...
AbstractThis paper develops necessary and sufficient conditions for pointwise inversion of Fourier t...
AbstractWe consider the Segal–Bargmann transform on a noncompact symmetric space of the complex type...
We prove analogs of the heat kernel transform inversion formulae of Golse, Leicht-nam and the author...
AbstractWe consider the Segal–Bargmann transform on a noncompact symmetric space of the complex type...
The Radon transform that integrates a function in ${open H}^n$, the $n$-dimensional hyperbolic space...
AbstractWe study the Segal–Bargmann transform on a symmetric space X of compact type, mapping L2(X) ...
Given a real-valued function on R-n we study the problem of recovering the function from its spher...
Given a real-valued function on R-n we study the problem of recovering the function from its spher...
AbstractIn this paper I give a new inversion formula (Theorem 1) for the generalized Segal–Bargmann ...
The Segal-Bargmann transform plays an important role in quan-tum theories of linear elds. Recently, ...
We derive explicit inversion formulae for the attenuated geodesic and horocyclic ray transforms of f...
AbstractWe consider the generalized Segal–Bargmann transform, defined in terms of the heat operator,...
Consider the Poincare unit disk model for the hyperbolic plane H-2. Let Xi be the set of all horocyc...
Consider the Poincare unit disk model for the hyperbolic plane H 2. Let ξ be the set of all horocycl...
Consider the Poincare unit disk model for the hyperbolic plane H 2. Let ξ be the set of all horocycl...
AbstractThis paper develops necessary and sufficient conditions for pointwise inversion of Fourier t...
AbstractWe consider the Segal–Bargmann transform on a noncompact symmetric space of the complex type...
We prove analogs of the heat kernel transform inversion formulae of Golse, Leicht-nam and the author...
AbstractWe consider the Segal–Bargmann transform on a noncompact symmetric space of the complex type...
The Radon transform that integrates a function in ${open H}^n$, the $n$-dimensional hyperbolic space...
AbstractWe study the Segal–Bargmann transform on a symmetric space X of compact type, mapping L2(X) ...
Given a real-valued function on R-n we study the problem of recovering the function from its spher...
Given a real-valued function on R-n we study the problem of recovering the function from its spher...
AbstractIn this paper I give a new inversion formula (Theorem 1) for the generalized Segal–Bargmann ...
The Segal-Bargmann transform plays an important role in quan-tum theories of linear elds. Recently, ...
We derive explicit inversion formulae for the attenuated geodesic and horocyclic ray transforms of f...
AbstractWe consider the generalized Segal–Bargmann transform, defined in terms of the heat operator,...
Consider the Poincare unit disk model for the hyperbolic plane H-2. Let Xi be the set of all horocyc...
Consider the Poincare unit disk model for the hyperbolic plane H 2. Let ξ be the set of all horocycl...
Consider the Poincare unit disk model for the hyperbolic plane H 2. Let ξ be the set of all horocycl...
AbstractThis paper develops necessary and sufficient conditions for pointwise inversion of Fourier t...
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