The Sobolev Norm of Characteristic Functions with Applications to the Calderón Inverse Problem
نویسندگان
چکیده
We consider Calderón’s inverse problem on planar domains Ω with conductivities in fractional Sobolev spaces. When Ω is Lipschitz, the problem was shown to be stable in the L–sense in [18]. We remove the Lipschitz condition on the boundary. To this end, we analyse the Sobolev regularity of the characteristic function of Ω. For Ω a quasiball, we compute ‖χΩ‖W s,p(Rd) in terms of the δ–neighbourhoods of the boundary.
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