Two uniqueness results in the inverse boundary value problem for the weighted p-Laplace equation
Cătălin I. Cârstea, Ali Feizmohammadi
Published: 2024/5/7
Abstract
In this paper we prove a general uniqueness result in the inverse boundary value problem for the weighted p-Laplace equation in the plane, with smooth weights. We also prove a uniqueness result in dimension 3 and higher, for real analytic weights that are subject to a smallness condition on one of their directional derivatives. Both results are obtained by linearizing the equation at a solution without critical points. This unknown solution is then recovered, together with the unknown weight.