Determining electrical and heat transfer parameters using coupled boundary measurements

Abstract

Let ⊂n, n 3, be a smooth bounded domain and consider a coupled system in consisting of a conductivity equation ∇ · γ(x) ∇ u(t,x)=0 and an anisotropic heat equation -1(x)∂t(t,x)=∇· (A(x)∇ (t,x))+(γ∇ u(t,x))· ∇ u(t,x), t 0. It is shown that the coefficients γ, and A=(ajk) are uniquely determined from the knowledge of the boundary map u|∂ · A∇ |∂, where is the unit outer normal to ∂. The coupled system models the following physical phenomenon. Given a fixed voltage distribution, maintained on the boundary ∂, an electric current distribution appears inside . The current in turn acts as a source of heat inside , and the heat flows out of the body through the boundary. The boundary measurements above then correspond to the map taking a voltage distribution on the boundary to the resulting heat flow through the boundary. The presented mathematical results suggest a new hybrid diffuse imaging modality combining electrical prospecting and heat transfer-based probing.