In 2000, Ikehata introduced the enclosure method for Electrical Impedance Tomography which aims at finding information of anomalies inside an unknown body. In idealised setting, it was shown that a convex hull that contains all the anomalies can be recovered from the Dirichlet-to-Neumann map. In this talk, I will present a modified version of the enclosure method to reconstruct the convex hull from one measurement of the electrode data in more practical setting.

This presentation is part of Minisymposium “MS54 - Hybrid Approaches that Combine Deterministic and Statistical Regularization for Applied Inverse Problems (4 parts)”
organized by: Cristiana Sebu (University of Malta) , Taufiquar Khan (Clemson University) .

Authors:

Minh Mach (University of Helsinki)

Bastian Harrach (Goethe-Universität Frankfurt am Main)

Masaru Ikehata (Hiroshima University)

Vesa Kaarnioja (University of Helsinki)

Keywords: