Invariant distributions and X-ray transform for Anosov flows

Abstract

For Anosov flows preserving a smooth measure on a closed manifold M, we define a natural self-adjoint operator which maps into the space of invariant distributions in u<0 Hu(M) and whose kernel is made of coboundaries in s>0 Hs(M). We describe relations to Livsic theorem and recover regularity properties of cohomological equations using this operator. For Anosov geodesic flows on the unit tangent bundle M=SM of a compact manifold, we apply this theory to study questions related to X-ray transform on symmetric tensors on M: in particular we prove that injectivity implies surjectivity of X-ray transform, and we show injectivity for surfaces.