An inverse problem for the minimal surface equation
Abstract
We use the method of higher order linearization to study an inverse boundary value problem for the minimal surface equation on a Riemannian manifold (Rn,g), where the metric g is conformally Euclidean. In particular we show that with the knowledge of Dirichlet-to-Neumann map associated to the minimal surface equation, one can determine the Taylor series of the conformal factor c(x) at xn=0 up to a multiplicative constant. We show this both in the full data case and in some partial data cases.
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