Klein–Gordon equation with advection on unbounded domains using spectral elements and high-order non-reflecting boundary conditions

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摘要

A reduced shallow water model under constant, non-zero advection in the infinite channel is considered. High-order (Givoli–Neta) non-reflecting boundary conditions are introduced in various configurations to create a finite computational space and solved using a spectral element formulation with high-order time integration. Numerical examples are used to demonstrate the synergy of using high-order spatial, time, and boundary discretization. We show that by balancing all numerical errors involved, high-order accuracy can be achieved for unbounded domain problems.

论文关键词:Klein–Gordon equation,Advection,High-order,Non-reflecting boundary condition,Spectral elements,Higdon,Givoli–Neta,Runge–Kutta

论文评审过程:Available online 7 August 2010.

论文官网地址:https://doi.org/10.1016/j.amc.2010.07.079