Eva Sincich scite author profile

We are concerned with a problem arising in corrosion detection. We consider the stability issue for the inverse problem of determining a Robin coefficient on the inaccessible portion of the boundary by the electrostatic measurements performed on the accessible one. We provide a Lipschitz stability estimate under the further a priori assumption of a piecewise constant Robin coefficient. Furthermore, we prove that the Lipschitz constant of the above-mentioned estimate behaves exponentially with respect to the number of the portions considered.

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Lipschitz stability for a piecewise linear Schrödinger potential from local Cauchy data

Alessandrini

Hoop

Gaburro

et al. 2018

Asymptotic Analysis

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We consider the inverse boundary value problem of determining the potential q in the equation ∆u + qu = 0 in Ω ⊂ R n , from local Cauchy data. A result of global Lipschitz stability is obtained in dimension n ≥ 3 for potentials that are piecewise linear on a given partition of Ω. No sign, nor spectrum condition on q is assumed, hence our treatment encompasses the reduced wave equation ∆u + k 2 c −2 u = 0 at fixed frequency k.

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Detecting nonlinear corrosion by electrostatic measurements

Alessandrini

Sincich

2006

Applicable Analysis

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Lipschitz stability for the electrostatic inverse boundary value problem with piecewise linear conductivities

Alessandrini

Hoop

Gaburro

et al. 2017

Journal de Mathématiques Pures et Appliquées

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Eva Sincich

Lipschitz stability for the inverse Robin problem

Lipschitz stability for a piecewise linear Schrödinger potential from local Cauchy data

Detecting nonlinear corrosion by electrostatic measurements

Lipschitz stability for the electrostatic inverse boundary value problem with piecewise linear conductivities

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