Superconvergence analysis of spectral volume methods for one-dimensional diffusion and third-order wave equations

Pub Date : 2024-06-27 DOI:10.21136/am.2024.0235-23

Xu Yin, Waixiang Cao, Zhimin Zhang

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Abstract

We present a unified approach to studying the superconvergence property of the spectral volume (SV) method for high-order time-dependent partial differential equations using the local discontinuous Galerkin formulation. We choose the diffusion and third-order wave equations as our models to illustrate approach and the main idea. The SV scheme is designed with control volumes constructed using the Gauss points or Radau points in subintervals of the underlying meshes, which leads to two SV schemes referred to as GSV and RSV schemes, respectively. With a careful choice of numerical fluxes, we demonstrate that the schemes are stable and exhibit optimal error estimates. Furthermore, we establish superconvergence of the GSV and RSV for the solution itself and the auxiliary variables. To be more precise, we prove that the errors of numerical fluxes at nodes and for the cell averages are superconvergent with orders of \(\cal{O}(h^{2k+1})\) and \(\cal{O}(h^{2k})\) for RSV and GSV, respectively. Superconvergence for the function value and derivative value approximations is also studied and the superconvergence points are identified at Gauss points and Radau points. Numerical experiments are presented to illustrate theoretical findings.

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一维扩散方程和三阶波方程的谱体积法超收敛性分析

我们提出了一种统一的方法，利用局部不连续 Galerkin 公式研究高阶时变偏微分方程的谱体积（SV）方法的超收敛特性。我们选择扩散方程和三阶波方程作为模型来说明方法和主要思想。在设计 SV 方案时，使用底层网格子区间内的高斯点或拉道点构建控制体积，从而产生了两种 SV 方案，分别称为 GSV 和 RSV 方案。通过对数值通量的精心选择，我们证明了这些方案是稳定的，并表现出最佳误差估计。此外，我们还确定了 GSV 和 RSV 对于解本身和辅助变量的超收敛性。更准确地说，我们证明了 RSV 和 GSV 的节点数值通量误差和单元平均误差分别具有 \(\cal{O}(h^{2k+1})\) 和 \(\cal{O}(h^{2k})\) 的超收敛性。还研究了函数值和导数值近似的超收敛性，并在高斯点和拉道点确定了超收敛点。还给出了数值实验来说明理论发现。

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