The Calder\'on Problem for Quasilinear Conductivities of Conformally Transversally Anisotropic Media
Abstract
This paper investigates Calder\'on's problem on a conformally transversally anisotropic manifold (M,g) of dimension n ≥ 3, where the conductivity a(s,x,p) might depend on both the electric potential and the electric field. We establish that for all (t,x)∈ R× M and β ∈ N1+n the derivatives ∂(s,p)β a(s,x,p)|(s,p)=(t,0) are uniquely determined by the boundary voltage-current measurements. If a(s,x,p) is analytic in p , then a(s,x,p) can be uniquely recovered.
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