Lipschitz stability in the determination of the principal part of a parabolic equation
Let be one solution towith a non-homogeneous term , and , where is a bounded domain. We discuss an inverse problem of determining unknown functions by , after selecting input sources suitably, where is an arbitrary subboundary, denotes the normal derivative, and . In the case of , we prove the Lipschitz stability in the inverse problem if we choose from a set with an arbitrarily fixed subdomain . Moreover we can take by making special choices for , . The proof is...