Alberto Enciso, Michał Wrochna, Gunther Uhlmann
Published 2023-03-15Version 1
We prove that the Dirichlet-to-Neumann map of the linear wave equation determines the topological, differentiable and conformal structure of the underlying Lorentzian manifold, under mild technical assumptions. With more stringent geometric assumptions, the full Lorentzian structure of the manifold can be recovered as well. The key idea of the proof is to show that the singular support of the Schwartz kernel of the Dirichlet-to-Neumann map of a manifold completely determines the so-called boundary light observation set of the manifold together with its natural causal structure.
The Light Ray transform on Lorentzian manifolds
On the scattering for the $\bar{\partial}$- equation and reconstruction of convection terms
Commutator Estimates for the Dirichlet-to-Neumann Map of Stokes Systems in Lipschitz Domains
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