Ellipsoidal and hyperbolic Radon transforms; microlocal properties and injectivity
Abstract
We present novel microlocal and injectivity analyses of ellipsoid and hyperboloid Radon transforms. We introduce a new Radon transform, , which defines the integrals of a compactly supported function, , over ellipsoids and hyperboloids with centers on a smooth connected surface, . is shown to be a Fourier Integral Operator (FIO) and in our main theorem we prove that satisfies the Bolker condition if the support of is connected and not intersected by any plane tangent to . Under certain conditions, this is an equivalence. We give examples where our theory can be applied. Focusing specifically on a cylindrical geometry of interest in Ultrasound Reflection Tomography (URT), we prove injectivity results and investigate the visible singularities. In addition, we present example reconstructions of image phantoms in two-dimensions, and validate our microlocal theory.
Keywords
Cite
@article{arxiv.2212.00243,
title = {Ellipsoidal and hyperbolic Radon transforms; microlocal properties and injectivity},
author = {James W. Webber and Sean Holman and Eric Todd Quinto},
journal= {arXiv preprint arXiv:2212.00243},
year = {2022}
}
Comments
26 pages, 11 figures