Global counterexamples to uniqueness for a Calder\'on problem with Ck conductivities
Abstract
Let ⊂ Rn, n ≥ 3, be a fixed smooth bounded domain, and let γ be a smooth conductivity in . Consider a non-zero frequency λ0 which does not belong to the Dirichlet spectrum of Lγ = - div (γ ∇ ·). Then, for all k ≥ 1, there exists an infinite number of pairs of non-isometric Ck conductivities (γ1, γ2) on , which are close to γ such that the associated DN maps at frequency λ0 satisfy equation* γ1,λ0 = γ2,λ0. equation*
0
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