The Funk–Radon transform for hyperplane sections through a common point

Media type: E-Article
Title: The Funk–Radon transform for hyperplane sections through a common point
Contributor: Quellmalz, Michael
imprint: Springer Science and Business Media LLC, 2020
Published in: Analysis and Mathematical Physics
Language: English
DOI: 10.1007/s13324-020-00383-2
ISSN: 1664-2368; 1664-235X
Keywords: Mathematical Physics ; Algebra and Number Theory ; Analysis
Origination:
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Description: <jats:title>Abstract</jats:title><jats:p>The Funk–Radon transform, also known as the spherical Radon transform, assigns to a function on the sphere its mean values along all great circles. Since its invention by Paul Funk in 1911, the Funk–Radon transform has been generalized to other families of circles as well as to higher dimensions. We are particularly interested in the following generalization: we consider the intersections of the sphere with hyperplanes containing a common point inside the sphere. If this point is the origin, this is the same as the aforementioned Funk–Radon transform. We give an injectivity result and a range characterization of this generalized Radon transform by finding a relation with the classical Funk–Radon transform.</jats:p>

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