Abstract
We present a novel microlocal analysis of a non-linear ray transform, R , arising in Compton scattering tomography (CST). Due to attenuation effects in CST, the integral weights depend on the reconstruction target, f, which has singularities. Thus, standard linear Fourier integral operator (FIO) theory does not apply as the weights are non-smooth. The V-line (or broken ray) transform, V , can be used to model the attenuation of incoming and outgoing rays. Through novel analysis of V , we characterize the location and strength of the singularities of the ray transform weights. In conjunction, we provide new results which quantify the strength of the singularities of distributional products based on the Sobolev order of the individual components. By combining this new theory, our analysis of V , and classical linear FIO theory, we determine the Sobolev order of the singularities of Rf . The strongest (lowest Sobolev order) singularities of Rf are shown to correspond to the wavefront set elements of the classical Radon transform applied to f, and we use this idea and known results on the Radon transform to prove injectivity results for R . In addition, we present novel reconstruction methods based on our theory, and we validate our results using simulated image reconstructions.