Shiqi Ma, Mikko Salo
Published 2020-08-17Version 1
We consider a fixed angle inverse scattering problem in the presence of a known Riemannian metric. First, assuming a no caustics condition, we study the direct problem by utilizing the progressing wave expansion. Under a symmetry assumption on the metric, we obtain uniqueness and stability results in the inverse scattering problem for a potential with data generated by two incident waves from opposite directions. Further, similar results are given using one measurement provided the potential also satisfies a symmetry assumption. This work extends the results of [23,24] from the Euclidean case to certain Riemannian metrics.
Two dimensional compact simple Riemannian manifolds are boundary distance rigid
Boundary determination of the Riemannian metric from Cauchy data for the Stokes equations
Conformal deformation of a Riemannian metric via an Einstein-Dirac parabolic flow
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