Simultaneous recovery of a corroded boundary and admittance using the Kohn-Vogelius method

Abstract

We address the problem of identifying an unknown portion of the boundary of a d-dimensional (d ∈ \1, 2\) domain and its associated Robin admittance coefficient, using two sets of boundary Cauchy data (f, g)--representing boundary temperature and heat flux--measured on the accessible portion of the boundary. Identifiability results Bacchelli2009,PaganiPierotti2009 indicate that a single measurement on is insufficient to uniquely determine both and α, but two independent inputs yielding distinct solutions ensure the uniqueness of the pair and α. In this paper, we propose a cost function based on the energy-gap of two auxiliary problems. We derive the variational derivatives of this objective functional with respect to both the Robin boundary and the admittance coefficient α. These derivatives are utilized to develop a nonlinear gradient-based iterative scheme for the simultaneous numerical reconstruction of and α. Numerical experiments are presented to demonstrate the effectiveness and practicality of the proposed method.