ABIDI, Yassine; BELLASSOUED, Mourad; MAHJOUB, Moncef; ZEMZEMI, Nejib

doi:10.1051/mmnp/2018060

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ABIDI, Yassine
Laboratoire de Modélisation Mathématique et Numérique dans les Sciences de l'Ingénieur [Tunis] [LR-LAMSIN-ENIT]

BELLASSOUED, Mourad
Laboratoire de Modélisation Mathématique et Numérique dans les Sciences de l'Ingénieur [Tunis] [LR-LAMSIN-ENIT]

MAHJOUB, Moncef
Laboratoire de Modélisation Mathématique et Numérique dans les Sciences de l'Ingénieur [Tunis] [LR-LAMSIN-ENIT]

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Mathematical Modelling of Natural Phenomena. 2019-02-15, vol. 14, n° 2

EDP Sciences

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In this paper, we consider an inverse problem of determining multiple ionic parameters of a 2 × 2 strongly coupled parabolic-elliptic reaction-diffusion system arising in cardiac electrophysiology modelling. We use the bidomain model coupled to an ODE system and we consider a general formalism of physiologicaly-detailed cellular membrane models to describe the ionic exchanges at the microscopic level. Our main result is the uniqueness and a Lipschitz stability estimate of the ion channels con-ductance parameters of the model using subboundary observations over an interval of time. The key ingredients are a global Carleman-type estimate with a suitable observations acting on a part of the boundary.Read less <

English Keywords

Bidomain system

Physiological ionic model

Ionic parameters

Cardiac electrophysiology

Carleman estimate

Lipschitz stability estimate

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Ionic parameters identification of an inverse problem of strongly coupled PDE's system in cardiac electrophysiology using Carleman estimates

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