一般函数空间的多维分部求和算子:理论与构造

IF 3.8 2区 物理与天体物理 Q2 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS Journal of Computational Physics Pub Date : 2023-10-15 DOI:10.1016/j.jcp.2023.112370
Jan Glaubitz , Simon-Christian Klein , Jan Nordström , Philipp Öffner
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引用次数: 1

摘要

分部求和算子允许我们系统地开发能量稳定和高阶精确的时变微分方程数值方法。直到最近,现有的SBP算子背后的主要思想是多项式可以精确地近似解,因此SBP算子应该是精确的。然而,多项式并不能为某些问题提供最佳逼近,其他逼近空间更合适。我们最近解决了这个问题,并基于一般函数空间开发了一维SBP算子的理论,称为函数空间SBP算子(FSBP)。本文将FSBP算子理论推广到多个维度。我们关注它们的存在,与正交的联系,结构和模仿特性。在以后的工作中,将对多维FSBP算子及其应用进行更详尽的数值演示。与一维情况类似,我们证明了基于多项式的多维SBP (MSBP)算子的大多数已建立的结果延续到更一般的MFSBP算子类。我们的研究结果表明,与目前的方法相比,收缩压操作器的概念可以应用于更大的方法类别。这可以提高数值解的准确性和/或为方法提供稳定性。
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Multi-dimensional summation-by-parts operators for general function spaces: Theory and construction

Summation-by-parts (SBP) operators allow us to systematically develop energy-stable and high-order accurate numerical methods for time-dependent differential equations. Until recently, the main idea behind existing SBP operators was that polynomials can accurately approximate the solution, and SBP operators should thus be exact for them. However, polynomials do not provide the best approximation for some problems, with other approximation spaces being more appropriate. We recently addressed this issue and developed a theory for one-dimensional SBP operators based on general function spaces, coined function-space SBP (FSBP) operators. In this paper, we extend the theory of FSBP operators to multiple dimensions. We focus on their existence, connection to quadratures, construction, and mimetic properties. A more exhaustive numerical demonstration of multi-dimensional FSBP (MFSBP) operators and their application will be provided in future works. Similar to the one-dimensional case, we demonstrate that most of the established results for polynomial-based multi-dimensional SBP (MSBP) operators carry over to the more general class of MFSBP operators. Our findings imply that the concept of SBP operators can be applied to a significantly larger class of methods than is currently done. This can increase the accuracy of the numerical solutions and/or provide stability to the methods.

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来源期刊
Journal of Computational Physics
Journal of Computational Physics 物理-计算机:跨学科应用
CiteScore
7.60
自引率
14.60%
发文量
763
审稿时长
5.8 months
期刊介绍: Journal of Computational Physics thoroughly treats the computational aspects of physical problems, presenting techniques for the numerical solution of mathematical equations arising in all areas of physics. The journal seeks to emphasize methods that cross disciplinary boundaries. The Journal of Computational Physics also publishes short notes of 4 pages or less (including figures, tables, and references but excluding title pages). Letters to the Editor commenting on articles already published in this Journal will also be considered. Neither notes nor letters should have an abstract.
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