Electrical Conductivity Imaging via Boundary Value Problems for the 1-Laplacian

Veras, Johann

01 January 2014

We study an inverse problem which seeks to image the internal conductivity map of a body by one measurement of boundary and interior data. In our study the interior data is the magnitude of the current density induced by electrodes. Access to interior measurements has been made possible since the work of M. Joy et al. in early 1990s and couples two physical principles: electromagnetics and magnetic resonance. In 2007 Nachman et al. has shown that it is possible to recover the conductivity from the magnitude of one current density field inside. The method now known as Current Density Impedance Imaging is based on solving boundary value problems for the 1-Laplacian in an appropriate Riemann metric space. We consider two types of methods: the ones based on level sets and a variational approach, which aim to solve specific boundary value problem associated with the 1-Laplacian. We will address the Cauchy and Dirichlet problems with full and partial data, and also the Complete Electrode Model (CEM). The latter model is known to describe most accurately the voltage potential distribution in a conductive body, while taking into account the transition of current from the electrode to the body. For the CEM the problem is non-unique. We characterize the non-uniqueness, and explain which additional measurements fix the solution. Multiple numerical schemes for each of the methods are implemented to demonstrate the computational feasibility.

Current density impedance imaging

1-laplacian

inverse boundary value problems

complete electrode model

electrical impedance tomography

Mathematics

Resultados de existência de solução para problemas elípticos no espaço das funções de variação limitada / Existence of solution for elliptic problems in the space of bounded variation functions

Silva, Letícia dos Santos [UNESP]

15 February 2018

Submitted by Letícia dos Santos Silva null (leticiadstos@gmail.com) on 2018-03-04T13:10:40Z No. of bitstreams: 1 leticia_dissertacao.pdf: 941545 bytes, checksum: 75b9baf79f051810ab82bd9bb946dd83 (MD5) / Approved for entry into archive by Claudia Adriana Spindola null (claudia@fct.unesp.br) on 2018-03-05T11:45:13Z (GMT) No. of bitstreams: 1 silva_ls_me_prud.pdf: 941545 bytes, checksum: 75b9baf79f051810ab82bd9bb946dd83 (MD5) / Made available in DSpace on 2018-03-05T11:45:13Z (GMT). No. of bitstreams: 1 silva_ls_me_prud.pdf: 941545 bytes, checksum: 75b9baf79f051810ab82bd9bb946dd83 (MD5) Previous issue date: 2018-02-15 / Coordenação de Aperfeiçoamento de Pessoal de Nível Superior (CAPES) / Neste trabalho mostra-se a existência de solução de variação limitada para um problema envolvendo o operador 1− Laplaciano em um domínio exterior com condição de fronteira de Dirichlet. Para isso, será usada uma versão do Teorema do Passo da Montanha adequada a funcionais localmente lipschitzianos. As dificuldades na implementação de métodos variacionais no espaço das funções de variação limitada são múltiplas, entre elas, a falta de reflexividade, dificuldade de se usar condições de compacidade como a de Palais-Smale e ainda a falta de regularidade do funcional energia. / In this work we prove existence of bounded variation solution for a problem involving the 1-Laplacian operator in an exterior domain with Dirichlet boundary condition. For this, a version of the Mountain Pass Theorem to locally Lipschitz functionals is used. There are many difficulties in implementing variational methods in the space of limited variation functions, among them, lack of reflexivity, difficulty in using compactness conditions such as Palais-Smale and the lack of regularity of the functional energy.

1-Laplaciano

Teorema do Passo da Montanha

Domínio exterior

Equações elípticas quasilineares

Solução de variação limitada

1-Laplacian

Mountain Pass Theorem

Exterior domain

Quasilinear elliptic equation

Bounded variation solution