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Inverse boundary problems for polyharmonic operators with unbounded potentials

Abstract

We show that the knowledge of the Dirichlet-to-Neumann map on the boundary of a bounded open set in RnR^n for the perturbed polyharmonic operator (−Δ)m+q(-\Delta)^m +q with q∈Ln/2mq\in L^{n/2m}, n>2mn>2m, determines the potential qq in the set uniquely. In the course of the proof, we construct a special Green function for the polyharmonic operator and establish its mapping properties in suitable weighted L2L^2 and LpL^p spaces. The LpL^p estimates for the special Green function are derived from LpL^p Carleman estimates with linear weights for the polyharmonic operator

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