Stability and space/time convergence of Störmer-Verlet time integration of the mixed formulation of linear wave equations

J. Chabassier
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Abstract

This work focuses on the mixed formulation of linear wave equations. It provides a proof of stability and convergence of time discretisation of a semi discrete linear wave equation in mixed form with Störmer-Verlet time integration, that is uniform as the time step reaches its largest allowed value for stability (Courant-Friedrich-Levy condition), contrary to the proofs recalled here from the literature.
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线性波方程混合表述的 Störmer-Verlet 时间积分的稳定性和时空收敛性
这项工作的重点是线性波方程的混合形式。它证明了采用 Störmer-Verlet 时间积分混合形式的半离散线性波方程时间离散化的稳定性和收敛性,当时间步长达到稳定性所允许的最大值(Courant-Friedrich-Levy 条件)时,这种稳定性和收敛性是一致的,这与本文所回顾的文献证明相反。
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Optimization of two-level methods for DG discretizations of reaction-diffusion equations Convergence of lattice Boltzmann methods with overrelaxation   for a nonlinear conservation law Study of a degenerate non-elliptic equation to model plasma heating Stability and space/time convergence of Störmer-Verlet time integration of the mixed formulation of linear wave equations An exactly divergence-free hybridized discontinuous Galerkin method for the generalized Boussinesq equations with singular heat source
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