Inverse problems for nonlinear Helmholtz Schr\"odinger equations and time-harmonic Maxwell's equations with partial data

Abstract

We consider Calder\'on's inverse boundary value problems for a class of nonlinear Helmholtz Schr\"odinger equations and Maxwell's equations in a bounded domain in n. The main method is the higher-order linearization of the Dirichlet-to-Neumann map of the corresponding equations. The local uniqueness of the linearized partial data Calder\'on's inverse problem is obtained following DKSU. The Runge approximation properties and unique continuation principle allow us to extend to global situations. Simultaneous recovery of some unknown cavity/boundary and coefficients are given as some applications.