H\"older stability estimates for the determination of time-independent potentials in a relativistic wave equation in an infinite waveguide

Abstract

The main goal of this article is to establish H\"older stability estimates for the Calder\'on problem related to a relativistic wave equation. The principal novelty of this article is that the partial differential equation (PDE) under consideration depends on three unknown potentials, namely a temporal dissipative potential A0, a spatial vector potential A and an external potential . Moreover, the PDE is posed in an infinite waveguide geometry =ω×R and not on a bounded domain. For our proof it is essential that the potentials are time-independent as a key tool in this work are pointwise estimates for the Radon transform of the vector potential A=(A0,i A) and external potential . Furthermore, the demonstrated stability estimates hold for a wide range of Hs Sobolev scales and a main contribution is to explicitly determine the dependence of the involved constants and the H\"older exponent on the Sobolev exponents of the potentials A0,A and .