The Broken Ray Transform On The Square
Abstract
We study a particular broken ray transform on the Euclidean unit square and establish injectivity and stability for perturbations of the constant unit weight. Given an open subset of the boundary, we measure the attenuation of all broken rays starting and ending at with the standard optical reflection rule. Using the analytic microlocal approach of Frigyik, Stefanov, and Uhlmann for the X-ray transform on generic families of curves, we show injectivity via a path unfolding argument under suitable conditions on the available broken rays. Then we show that with a suitable decomposition of the measurement operator via smooth cutoff functions, the associated normal operator is a classical pseudo differential operator of order -1 plus a smoothing term with Schwartz kernel, which leads to the desired result.
Keywords
Cite
@article{arxiv.1302.6193,
title = {The Broken Ray Transform On The Square},
author = {Mark Hubenthal},
journal= {arXiv preprint arXiv:1302.6193},
year = {2013}
}
Comments
Submitted to Journal of Fourier Analysis and Applications 26 pages, 4 figures