Uniqueness in the inverse boundary value problem for piecewise homogeneous anisotropic elasticity

Abstract

Consider a three dimensional piecewise homogeneous anisotropic elastic medium which is a bounded domain consisting of a finite number of bounded subdomains Dα, with each Dα a homogeneous elastic medium. One typical example is a finite element model with elements with curvilinear interfaces for an ansiotropic elastic medium. Assuming the Dα are known and Lipschitz, we are concerned with the uniqueness in the inverse boundary value problem of identifying the anisotropic elasticity tensor on from a localized Dirichlet to Neumann map given on a part of the boundary ∂ Dα0∂ of ∂ for a single α0, where ∂ Dα0 denotes the boundary of Dα0. If we can connect each Dα to Dα0 by a chain of \Dαi\i=1n such that interfaces between adjacent regions contain a curved portion, we obtain global uniqueness for this inverse boundary value problem. If the Dα are not known but are subanalytic subsets of R3 with curved boundaries, then we also obtain global uniqueness.