An inverse problem for the minimal surface equation in the presence of a Riemannian metric

Abstract

In this work we study an inverse problem for the minimal surface equation on a Riemannian manifold (Rn,g) where the metric is of the form g(x)=c(x)(g e). Here g is a simple Riemannian metric on Rn-1, e is the Euclidean metric on R and c a smooth positive function. We show that if we know the associated Dirichlet-to-Neumann maps corresponding to metrics g and cg, then the Taylor series of the conformal factor c at xn=0 is equal to a positive constant. We also show a partial data result when n=3.