Localized potentials in electrical impedance tomography

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Abstract

In this work we study localized electric potentials that have an arbitrarily high energy on some given subset of a domain and low energy on another. We show that such potentials exist for general L+ -conductivities in almost arbitrarily shaped subregions of a domain, as long as these regions are connected to the boundary and a unique continuation principle is satisfied. From this we deduce a simple, but new, theoretical identifiability result for the famous Calderón problem with partial data. We also show how to construct such potentials numerically and use a connection with the factorization method to derive a new non-iterative algorithm for the detection of inclusions in electrical impedance tomography.

Original languageEnglish
Pages (from-to)251-269
Number of pages19
JournalInverse Problems and Imaging
Volume2
Issue number2
DOIs
StatePublished - 2008
Externally publishedYes

Keywords

  • Calderon problem
  • Electrical impedance tomography
  • Factorization method

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