Microlocal analysis of the X-ray transform in non-smooth geometry

Abstract

We prove that the geodesic X-ray transform is injective on L2 when the Riemannian metric is simple but the metric tensor is only finitely differentiable. The number of derivatives needed depends explicitly on dimension, and in dimension 2 we assume g∈ C10. Our proof is based on microlocal analysis of the normal operator: we establish ellipticity and a smoothing property in a suitable sense and then use a recent injectivity result on Lipschitz functions. When the metric tensor is Ck, the Schwartz kernel is not smooth but Ck-2 off the diagonal, which makes standard smooth microlocal analysis inapplicable.