The anisotropic Calder\'on problem on 3-dimensional conformally St\"ackel manifolds

Abstract

Conformally St\"ackel manifolds can be characterized as the class of n-dimensional pseudo-Riemannian manifolds (M, G) on which the Hamilton-Jacobi equation G(∇u, ∇u) = 0 for null geodesics and the Laplace equation -- G = 0 are solvable by R-separation of variables. In the particular case in which the metric has Riemannian signature, they provide explicit examples of metrics admitting a set of n--1 commuting conformal symmetry operators for the Laplace-Beltrami operator G. In this paper, we solve the anisotropic Calder\'on problem on compact 3-dimensional Riemannian manifolds with boundary which are conformally St\"ackel, that is we show that the metric of such manifolds is uniquely determined by the Dirichlet-to-Neumann map measured on the boundary of the manifold, up to dieomorphims that preserve the boundary.