Single-logarithmic stability for the Calderón problem with local data

Details Single-logarithmic stability for the Calderón problem with local data Single-logarithmic stability for the Calderón problem with local data

2012-02-24

arxiv.org/abs/1202.5485v1

Mathematics

Analysis of PDEs

12 pages

Scientific paper

We prove an optimal stability estimate for Electrical Impedance Tomography with local data, in the case when the conductivity is precisely known on a neighborhood of the boundary. The main novelty here is that we provide a rather general method which enables to obtain the H\"older dependence of a global Dirichlet to Neumann map from a local one on a larger domain when, in the layer between the two boundaries, the coefficient is known.

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