A characterization of the inverse Radon transform associated with the classical domain of type one
DOI10.1080/10652460902723580zbMath1182.43013OpenAlexW2149718054MaRDI QIDQ3391697
No author found.
Publication date: 12 August 2009
Published in: Integral Transforms and Special Functions (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/10652460902723580
Radon transformHeisenberg groupcontinuous wavelet transformSiegel domainnilpotent Lie group of step twoclassical domain of type one
Nontrigonometric harmonic analysis involving wavelets and other special systems (42C40) Special integral transforms (Legendre, Hilbert, etc.) (44A15) Harmonic analysis on homogeneous spaces (43A85) Radon transform (44A12) Representations of nilpotent and solvable Lie groups (special orbital integrals, non-type I representations, etc.) (22E27) Analysis on other specific Lie groups (43A80)
Cites Work
- Unnamed Item
- L\({}^ p\) harmonic analysis and Radon transforms on the Heisenberg group
- Higher-rank wavelet transforms, ridgelet transforms, and Radon transforms on the space of matrices
- Harmonic analysis of a nilpotent group and function theory on Siegel domains of type II
- The Calderón reproducing formula, windowed \(X\)-ray transforms, and Radon transforms in \(L^p\)-spaces
- The Radon transform.
- Inversion of the Radon transform on the Laguerre hypergroup by using generalized wavelets
- A characterization of inverse Radon transform on the Laguerre hypergroup
- Riesz potentials and integral geometry in the space of rectangular matrices
- METHOD OF MEAN VALUE OPERATORS FOR RADON TRANSFORMS IN THE SPACE OF MATRICES
- Transforms associated to square integrable group representations. I. General results
- Inverse Radon transforms through inverse wavelet transforms
- Wavelets from Square-Integrable Representations
- INVERSION OF THE RADON TRANSFORM ASSOCIATED WITH THE CLASSICAL DOMAIN OF TYPE ONE
This page was built for publication: A characterization of the inverse Radon transform associated with the classical domain of type one
