An inverse problem for general minimal surfaces
Abstract
In this paper we consider an inverse problem of determining a minimal surface embedded in a Riemannian manifold. We show under a topological condition that if is a 2-dimensional embedded minimal surface, then the knowledge of the Dirichlet-to-Neumann map associated to the minimal surface equation determines up to an isometry. Without the topological condition, we show that a conformal factor of a general minimal surface can be recovered. We develop a semiclassical nonlinear calculus for complex geometric optics solutions, which allows an efficient error analysis for multiplication of the correction terms of the solutions. The calculus is independent of the application to the minimal surface equation and we expect it to have applications in various inverse problems for nonlinear equations in dimension 2, in both R2 and geometric settings. Other applications of the results include generalized boundary rigidity problem and the AdS/CFT correspondence in physics.
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