Boundary and scattering rigidity problems in the presence of a magnetic field and a potential

Abstract

In this paper, we consider a compact Riemannian manifold with boundary, endowed with a magnetic potential α and a potential U. For brevity, this type of systems are called -systems. On simple -systems, we consider both the boundary rigidity problem and scattering rigidity problem, see the introduction for details. We show that these two problems are equivalent on simple -systems. Unlike the cases of geodesic or magnetic systems, knowing boundary action functions or scattering relations for only one energy level is insufficient to uniquely determine a simple -system, even under the assumption that we know the restriction of the system on the boundary M, and we provide some counterexamples. These problems can only be solved up to an isometry and a gauge transformations of α and U. We prove rigidity results for metrics in a given conformal class, for simple real analytic -systems and for simple two-dimensional -systems.