On Second Order Shape Optimization Methods for Electrical Impedance Tomography

Afraites, Lekbir; Dambrine, Marc; Kateb, Djalil

doi:10.1137/070687438

Cited by 38 publications

(36 citation statements)

References 19 publications

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“…While the derivative of the normal vector is obtained by a straightforward calculus, we have to transport from ∂Ω t to ∂Ω the Laplace-Beltrami operator and the tangential gradient in order to compute the other derivatives. We recall here facts proved in [2].…”

Section: Definition A2 the Tangential Divergence Of A Vector Fieldmentioning

confidence: 95%

“…In [1,2,14], more situations have been studied. The shape hessian at the global minimum is compact and the optimization procedures are severely ill-posed.…”

Section: To Take Advantagementioning

confidence: 99%

“…In the sequel, we will use some technical formulae given in [2]. Given a smooth vector field h, we denote…”

Section: Definition A2 the Tangential Divergence Of A Vector Fieldmentioning

confidence: 99%

See 2 more Smart Citations

On the ersatz material approximation in level-set methods

Dambrine

Kateb

2009

ESAIM: COCV

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Abstract. The level set method has become widely used in shape optimization where it allows a popular implementation of the steepest descent method. Once coupled with a ersatz material approximation [Allaire et al., J. Comput. Phys. 194 (2004) 363-393], a single mesh is only used leading to very efficient and cheap numerical schemes in optimization of structures. However, it has some limitations and cannot be applied in every situation. This work aims at exploring such a limitation. We estimate the systematic error committed by using the ersatz material approximation and, on a model case, explain that they amplifies instabilities by a second order analysis of the objective function.Mathematics Subject Classification. 49Q10, 34A55, 49Q12.

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Section: Definition A2 the Tangential Divergence Of A Vector Fieldmentioning

confidence: 95%

“…In [1,2,14], more situations have been studied. The shape hessian at the global minimum is compact and the optimization procedures are severely ill-posed.…”

Section: To Take Advantagementioning

confidence: 99%

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On the ersatz material approximation in level-set methods

Dambrine

Kateb

2009

ESAIM: COCV

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“…Due to their much higher complexity, shape Hessians are not so often applied and the literature about computations with second order shape derivatives is restricted (see, e.g., [11,12,14,23]). Nevertheless, the shape Hessian underlies the study of stability issues in shape optimization (see [1,3,4,6,7,8,13,21,25,28,31] for examples in imaging, tomography, fluid mechanics, aircraft construction, etc.). For the sake of readability, we present two academic but representative examples for which the expressions of the shape derivatives remains simple.…”

Section: Examples Of Shape Derivativesmentioning

confidence: 99%

Computing quantities of interest for random domains with second order shape sensitivity analysis

2015

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We consider random perturbations of a given domain. The characteristic amplitude of these perturbations is assumed to be small. We are interested in quantities of interest which depend on the random domain through a boundary value problem. We derive asymptotic expansions of the first moments of the distribution of this output function. A simple and efficient method is proposed to compute the coefficients of these expansions provided that the random perturbation admits a low-rank spectral representation. By numerical experiments, we compare our expansions with Monte-Carlo simulations.2000MSC: 60G35, 65N75, 65N99.

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“…This point is particularly crucial in order to make numerical simulations: if the problem is unstable, regularization is required in the numerical minimization of the functional (see for example [2,3]). The question of stability is addressed with the second order derivative of the functional at a critical point.…”

Section: Introductionmentioning

confidence: 99%

Stability of critical shapes for the drag minimization problem in Stokes flow

Caubet

Dambrine

2013

Journal de Mathématiques Pures et Appliquées

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We study the stability of some critical (or equilibrium) shapes in the minimization problem of the energy dissipated by a fluid (i.e. the drag minimization problem) governed by the Stokes equations. We first compute the shape derivative up to the second order, then provide a sufficient condition for the shape Hessian of the energy functional to be coercive at a critical shape. Under this condition, the existence of such a local strict minimum is then proved using a precise upper bound for the variations of the second order shape derivative of the functional with respect to the coercivity and differentiability norms. Finally, for smooth domains, a lower bound of the variations of the drag is obtained in terms of the measure of the symmetric difference of domains.

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On Second Order Shape Optimization Methods for Electrical Impedance Tomography

Cited by 38 publications

References 19 publications

On the ersatz material approximation in level-set methods

On the ersatz material approximation in level-set methods

Computing quantities of interest for random domains with second order shape sensitivity analysis

Stability of critical shapes for the drag minimization problem in Stokes flow

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