A Note on the Transport Method for Hybrid Inverse Problems

Abstract

There are several hybrid inverse problems for equations of the form ∇ · D ∇ u - σ u = 0 in which we want to obtain the coefficients D and σ on a domain when the solutions u are known. One approach is to use two solutions u1 and u2 to obtain a transport equation for the coefficient D, and then solve this equation inward from the boundary along the integral curves of a vector field X defined by u1 and u2. It follows from an argument of Guillaume Bal and Kui Ren that for any nontrivial choices of u1 and u2, this method suffices to recover the coefficients on a dense set in . This short note presents an alternate proof of the same result from a dynamical systems point of view.