Functions with isotropic sections
Abstract
We prove a local version of a recently established theorem by Myroshnychenko, Ryabogin and the second named author. More specifically, we show that if , is an even bounded measurable function, is an open subset of and the restriction (section) of onto any great sphere perpendicular to is isotropic, then and , for some fixed constants and for some fixed vector . Here, denotes the cosine transform and denotes the Funk transform of . However, we show that does not need to be equal to a constant almost everywhere in . For the needs of our proofs, we obtain a new generalization of a result from classical differential geometry, in the setting of convex hypersurfaces, that we believe is of independent interest.
Cite
@article{arxiv.1906.10439,
title = {Functions with isotropic sections},
author = {Ioannis Purnaras and Christos Saroglou},
journal= {arXiv preprint arXiv:1906.10439},
year = {2019}
}
Comments
The previous version contained an error in the statement of Theorem 1.2. Necessary changes have been made. 19 pages