Laurent Monasse, Régis Monneau
Published 2014-01-06Version 1
In this paper, we consider diagonal hyperbolic systems with monotone continuous initial data. We propose a natural semi-explicit and upwind first order scheme. Under a certain non-negativity condition on the Jacobian matrix of the velocities of the system, there is a gradient entropy estimate for the hyperbolic system. We show that our scheme enjoys a similar gradient entropy estimate at the discrete level. This property allows us to prove the convergence of the scheme.
Convergence of a particle-in-cell scheme for the spherically symmetric Vlasov-Einstein system
Convergence of a fully discrete finite difference scheme for the Korteweg-de Vries equation
Convergence of a variational Lagrangian scheme for a nonlinear drift diffusion equation
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