An inverse source problem for the Monge--Ampere equation from large boundary data
Abstract
We study an inverse source problem for the Monge--Ampere equation \[ D2u=f(x) \] on a bounded smooth uniformly convex domain. In the smooth classical regime, we prove that the Dirichlet-to-Neumann map associated with convex solutions determines the positive source uniquely. The proof uses a family of large boundary values and reduces the inverse source problem to the injectivity of the Euclidean X-ray transform.
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