Aya Oussaily scite author profile

<p style='text-indent:20px;'>In this work, we are dealing with a non-linear eikonal system in one dimensional space that describes the evolution of interfaces moving with non-signed strongly coupled velocities. We prove a global existence result in the framework of continuous viscosity solution. The approach is made by adding a viscosity term and passing to the limit for vanishing viscosity, relying on a new gradient entropy and <inline-formula><tex-math id="M1">\begin{document}$ BV $\end{document}</tex-math></inline-formula> estimates. A uniqueness result is also proved through a comparison principle property.</p>

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Convergence of an implicit scheme for diagonal non-conservative hyperbolic systems

Boudjerada

Hajj

Oussaily

2021

ESAIM: M2AN

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In this paper, we consider diagonal non-conservative hyperbolic systems in one space dimension with monotone and large Lipschitz continuous data. Under a certain nonnegativity condition on the Jacobian matrix of the velocity of the system, global existence and uniqueness results of a Lipschitz solution for this system, which is not necessarily strictly hyperbolic, was already proven. We propose a natural implicit scheme satisfiying a similar Lipschitz estimate at the discrete level. This property allows us to prove the convergence of the scheme without assuming it strictly hyperbolic.

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Aya Oussaily

Existence and Uniqueness of Continuous Solution for a Non-local Coupled System Modeling the Dynamics of Dislocation Densities

Continuous solution for a non-linear eikonal system

Convergence of an implicit scheme for diagonal non-conservative hyperbolic systems

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