Comparison Problems for Radon Transforms
Abstract
Given two non-negative functions and such that the Radon transform of is pointwise smaller than the Radon transform of , does it follow that the -norm of is smaller than the -norm of for a given ? We consider this problem for the classical and spherical Radon transforms. In both cases we point out classes of functions for which the answer is affirmative, and show that in general the answer is negative if the functions do not belong to these classes. The results are in the spirit of the solution of the Busemann-Petty problem from convex geometry, and the classes of functions that we introduce generalize the class of intersection bodies introduced by Lutwak in 1988. We also deduce slicing inequalities that are related to the well-known Oberlin-Stein type estimates for the Radon transform.
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Cite
@article{arxiv.2305.17796,
title = {Comparison Problems for Radon Transforms},
author = {Alexander Koldobsky and Michael Roysdon and Artem Zvavitch},
journal= {arXiv preprint arXiv:2305.17796},
year = {2023}
}
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26 pages