# On reconstruction in the inverse conductivity problem with one   measurement

**Authors:** Masaru Ikehata

arXiv: 1902.05182 · 2019-02-15

## TL;DR

This paper develops explicit reconstruction formulas for identifying a convex polygonal inclusion with constant conductivity inside a domain from boundary measurements in a 2D inverse conductivity problem.

## Contribution

It provides novel formulas to reconstruct the shape of a convex polygonal inclusion using boundary data, under specific geometric conditions.

## Key findings

- Reconstruction formulas for convex polygonal inclusions
- Support function calculation from Cauchy data
- Conditions ensuring unique reconstruction

## Abstract

We consider an inverse problem for electrically conductive material occupying a domain $\Omega$ in $\Bbb R^2$. Let $\gamma$ be the conductivity of $\Omega$, and $D$ a subdomain of $\Omega$. We assume that $\gamma$ is a positive constant $k$ on $D$, $k\not=1$ and is $1$ on $\Omega\setminus D$; both $D$ and $k$ are unknown. The problem is to find a reconstruction formula of $D$ from the Cauchy data on $\partial\Omega$ of a non-constant solution $u$ of the equation $\nabla\cdot\gamma\nabla u=0$ in $\Omega$. We prove that if $D$ is known to be a convex polygon such that $\text{diam}\,D<\text{dist}\,(D,\partial\Omega)$, there are two formulae for calculating the support function of $D$ from the Cauchy data.

## Full text

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## References

9 references — full list in the complete paper: https://tomesphere.com/paper/1902.05182/full.md

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Source: https://tomesphere.com/paper/1902.05182