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dc.contributor.authorIsakov, Victor
dc.identifier.citationIsakov, Victor. 2007. On uniqueness in the inverse conductivity problem with local data. -- Inverse Problems and Imaging, v.1, no.1: 95 - 105.en_US
dc.descriptionClick on the DOI link to access the articleen_US
dc.description.abstractWe show that the Dirichlet-to-Neumann map given on an arbitrary part of the boundary of a three-dimensional domain with zero Dirichlet (or Neumann) data on the remaining (spherical or plane) part of the boundary uniquely determines conductivity or potential coefficients. This is the first uniqueness result for the Calderon problem with zero data on inaccessible part of the boundary. Proofs use some modification of the method of complex geometrical solutions due to Calderon-Sylvester-Uhlmann.en_US
dc.publisherAmerican Institute of Mathematical Sciencesen_US
dc.relation.ispartofseriesInverse Problems and Imaging;v.1 no.1
dc.subjectInverse problemsen_US
dc.subjectInverse scattering problemsen_US
dc.titleOn uniqueness in the inverse conductivity problem with local dataen_US
dc.description.versionPeer reviewed

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