Lipschitz stability for the electrical impedance tomography problem: the complex case

Abstract

In this paper we investigate the boundary value problem div(γ∇ u)=0 in , u=f on ∂ where γ is a complex valued L∞ coefficient, satisfying a strong ellipticity condition. In Electrical Impedance Tomography, γ represents the admittance of a conducting body. An interesting issue is the one of determining γ uniquely and in a stable way from the knowledge of the Dirichlet-to-Neumann map γ. Under the above general assumptions this problem is an open issue. In this paper we prove that, if we assume a priori that γ is piecewise constant with a bounded known number of unknown values, then Lipschitz continuity of γ from γ holds.