Stability and reconstruction of a special type of anisotropic conductivity in magneto-acoustic tomography with magnetic induction
Abstract
We consider the issues of stability and reconstruction of the electrical anisotropic conductivity of biological tissues in a domain ⊂R3 by means of the hybrid inverse problem of magneto-acoustic tomography with magnetic induction (MAT-MI). The class of anisotropic conductivities considered here is of type σ(·)=A(·,γ(·)) in , where [λ-1, λ] t A(·, t) is a one-parameter family of matrix-valued functions which are a-priori known to be C1,β, allowing us to stably reconstruct γ in in terms of an internal functional F(σ). Our results also extend previous results in MAT-MI where σ(·) = γ(·) D(·), with D an a-priori known matrix-valued function on to a more general anisotropic structure which depends non-linearly on the scalar function γ to be reconstructed.
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