International audienceIntroduction: The most used model in the elctrophysiology of the heart,known as the bidomain model, is the system of degenerate parabolic PDEs cou-pled with the non-linear ODE. Even though these equations provide quite ac-curate results, they are based on the fact that active cardiomyocytes are presenteverywhere in the heart, while it is known that non-small regions exist wherefibroblasts and other non-excitable cells or additional extracellular media takeplace. These regions, which play an important role in diseased hearts, are oftentaken into account through ad-hoc rough tuning of the tissue conductivities. Inthis work, we introduce a rigorous way to derive these conductivities from amicroscopic description of the he...
A two dimensional anomaly cancellation argument is used to construct the SO(32) heterotic and type I...
International audienceThis research is motivated by the numerical modelling of ultrasonic non-destru...
Two-scale simulations for multiscale modeling purposes require the solution of boundary value proble...
International audienceIntroduction: The most used model in the elctrophysiology of theheart, known a...
International audienceBidomain equations are the standard way to model the electric potential in car...
International audienceWe present a new mathematical model of the electric activity of the heart. In ...
Three axes are explored. 1) Derivation of mathematical models. Mathematical methods allow to derive ...
With the help of the conventional electrical method and the growing optogenetic technology, cardiac ...
Brain perfusion imaging techniques rely on the measurement of spatio-temporal concentration fields o...
International audienceEquivalent boundary Conditions have become a classic notion in the mathematica...
Aims Macrophages (MΦ), known for immunological roles, such as phagocytosis and antigen presentation,...
This thesis is concerned with the mathematical analysis and numerical simulation of cardiac electrop...
In cardiac physiology, electrical alternans is a phenomenon characterized by long-short alternations...
International audienceA characteristic pattern with sequences of alternating quiescent ('down') and ...
International audienceThe usual way to model the propagation of the action potential through the car...
A two dimensional anomaly cancellation argument is used to construct the SO(32) heterotic and type I...
International audienceThis research is motivated by the numerical modelling of ultrasonic non-destru...
Two-scale simulations for multiscale modeling purposes require the solution of boundary value proble...
International audienceIntroduction: The most used model in the elctrophysiology of theheart, known a...
International audienceBidomain equations are the standard way to model the electric potential in car...
International audienceWe present a new mathematical model of the electric activity of the heart. In ...
Three axes are explored. 1) Derivation of mathematical models. Mathematical methods allow to derive ...
With the help of the conventional electrical method and the growing optogenetic technology, cardiac ...
Brain perfusion imaging techniques rely on the measurement of spatio-temporal concentration fields o...
International audienceEquivalent boundary Conditions have become a classic notion in the mathematica...
Aims Macrophages (MΦ), known for immunological roles, such as phagocytosis and antigen presentation,...
This thesis is concerned with the mathematical analysis and numerical simulation of cardiac electrop...
In cardiac physiology, electrical alternans is a phenomenon characterized by long-short alternations...
International audienceA characteristic pattern with sequences of alternating quiescent ('down') and ...
International audienceThe usual way to model the propagation of the action potential through the car...
A two dimensional anomaly cancellation argument is used to construct the SO(32) heterotic and type I...
International audienceThis research is motivated by the numerical modelling of ultrasonic non-destru...
Two-scale simulations for multiscale modeling purposes require the solution of boundary value proble...