Energy evolution of multi-symplectic methods for Maxwell equations with perfectly matched layer boundary
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🧮 math.NA
keywords
multi-symplecticenergyequationsevolutionmaxwellmethodsboundarylayer
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In this paper, we consider the energy evolution of multi-symplectic methods for three-dimensional (3D) Maxwell equations with perfectly matched layer boundary, and present the energy evolution laws of Maxwell equations under the discretization of multi-symplectic Yee method and general multi-symplectic Runge-Kutta methods.
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