An Inverse Problem for the Prescribed Mean Curvature

Abstract

We extend the recent study of inverse problems for minimal surfaces by considering the inverse source problem for the prescribed mean curvature equation equation* ∇ · [ ∇ u(1 + |∇ u|2)1/2 ] = H(x). equation* This work also represents the first treatment of inverse source problems for quasilinear equations. We prove that in two dimensions, the source function H is uniquely determined by the associated Dirichlet-to-Neumann map. A notable feature of this problem is that although the equation is posed on an Euclidean domain, its linearization yields an anisotropic conductivity equation where the coefficient matrix corresponds to a Riemannian metric g depending on the background solution. The main methodological contribution is the derivation of a coupled nonlinear system of algebraic and geometric partial differential equations from boundary measurements. Similar systems will naturally appear in other inverse problems for quasilinear equations. We solve the system using a Liouville type uniqueness result for conformal mappings, which recovers the source function uniquely.