Asymptotics for steady‐state voltage potentials in a bidimensional highly contrasted medium with thin layer

Poignard, Clair

doi:10.1002/mma.923

Cited by 16 publications

(16 citation statements)

References 20 publications

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“…It might be seen as an extension of the hypothesis δω → c 0 > 0 of Lafitte [8]. Moreover if δω 1−γ/2 is bounded, we expect that the analysis performed by Ammari, Vogelius et al (see for example [1], [5], [3], [2] or [10]) could be applied. Actually, in this case δ might be replaced by c × ω −1+γ/2 , for an appropriate constant c > 0, and only one parameter appears in our problem.…”

Section: Introduction and Main Resultsmentioning

confidence: 99%

“…Approximated boundary conditions for domains with thin layer have been extensively studied for Helmholtz equation at given frequency during the last twenty years; see for instance [1], [5], [3] or [2], and [10] for highly contrasted domains. In these previous works a bounded domain O surrounded by a thin layer is considered.…”

Section: Introduction and Main Resultsmentioning

confidence: 99%

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Generalized impedance boundary condition at high frequency for a domain with thin layer: the circular case

Poignard

2007

Applicable Analysis

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Abstract. Consider a conducting disk surrounded by a thin dielectric layer submitted to an electric field at the pulsation ω. The conductivity of the layer grows like ω 1−γ , γ ∈ [0, 1], when the pulsation ω tends to infinity. Using a pseudodifferential approach on the torus, we build an equivalent boundary condition with the help of an appropriate factorization of Helmholtz operator in the layer. This generalized impedance condition approximates the thin membrane in the high frequency limit for small thickness of the layer. L 2 -error estimates are given and we illustrate our results with numerical simulations. This work extends, in the circular geometry, previous works of Lafitte and Lebeau [7], [8], in which γ identically equals zero.

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Section: Introduction and Main Resultsmentioning

confidence: 99%

Section: Introduction and Main Resultsmentioning

confidence: 99%

Generalized impedance boundary condition at high frequency for a domain with thin layer: the circular case

Poignard

2007

Applicable Analysis

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“…This method, which leads to precise a priori error estimates was extensively presented in previous papers [9][10][11] in a bidimensional domain. It is based on an appropriate change of variables in the thin layer in order to make appear the small parameter (the thickness of the membrane) in the equations satisfied by the electric potential.…”

Section: Psfrag Replacementsmentioning

confidence: 99%

“…The high frequency case, which corresponds to non-highly heterogeneous domains, was treated in [8][9][10], therefore we refer the reader to these papers for a precise description of the asymptotic method. We focus here on the low and mid-frequency approximations for a threedimensional cell.…”

Section: 3c High Frequency Approximationmentioning

confidence: 99%

About the transmembrane voltage potential of a biological cell in time-harmonic regime.

Poignard¹

2009

ESAIM: Proc.

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Abstract. The paper presents heuristics to reduce several difficulties related to the determination of the transmembrane voltage potential (TMP) on cells with arbitrary smooth shape. We show how the thin weakly conducting membrane can be replaced by asymptotically equivalent transmission conditions at the interface between the cell interior (the cytoplasm) and the extracellular medium. We describe our formal asymptotic method for constructing precise models of cells. This method is based on an appropriate change of variables in the thin membrane. Our frequency dependent models is helpfull to determine the TMP on cells on which experiment measurements are prohibited. We end the paper by presenting briefly the sketch of the proofs of the asymptotics and the a priori error estimates.Résumé. Dans cet artice, nous présentons une méthode de développement asymptotique de milieuà couche mince en dimension 3 permettant de réduire les difficultés numériques liées au calcul du potentiel transmembranaire d'une cellule biologique. Nous montrons comment la fine membrane faiblement conductrice de la cellule peutêtre remplacée par des conditions de transmission appropriées sur le bord du cytoplasme. Notre méthode est basée sur un changement de variables adéquat dans la couche mince. Nous obtenons trois différents modèles permettant de décrire le comportement du potentiel quasi-élecrostatique d'un cellule suivant trois types de fréquences: basse, moyenne ou haute fréquences. Ces modèles permettent le calcul du potentiel transmembranaire dans des cellules sur lesquelles des mesures expérimentales sont difficilesà réaliser. Nous concluons en présentant brièvement les principes de démonstration des résultats.

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“…By the uniqueness of the solution to (15) up to a constant, v(x) = c, ∀x ∈ Y. Then, we have ϕ 1 = 0 on ∂C and ϕ 2 = 0 on ∂B because they are equal to the jumps of v (resp.…”

Section: Theorem 4 We Have the Following Representation For V Pmentioning

confidence: 99%

Spectroscopic conductivity imaging of a cell culture

Ammari

Giovangigli

Kwon

et al. 2016

ASY

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Abstract. In this paper, we present a simplified electrical model for tissue culture. We derive a mathematical structure for overall electrical properties of the culture and study their dependence on the frequency of the current. We introduce a method for recovering the microscopic properties of the cell culture from the spectral measurements of the effective conductivity. Numerical examples are provided to illustrate the performance of our approach.

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Asymptotics for steady‐state voltage potentials in a bidimensional highly contrasted medium with thin layer

Cited by 16 publications

References 20 publications

Generalized impedance boundary condition at high frequency for a domain with thin layer: the circular case

Generalized impedance boundary condition at high frequency for a domain with thin layer: the circular case

About the transmembrane voltage potential of a biological cell in time-harmonic regime.

Spectroscopic conductivity imaging of a cell culture

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