在欧拉 SPH 框架中纳入相关 FVM 边界条件的算法

IF 7.2 2区 物理与天体物理 Q1 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS
Zhentong Wang, Oskar J. Haidn, Xiangyu Hu
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引用次数: 0

摘要

有限体积法(FVM)被公认为是一种计算效率高、基于网格的精确技术。然而,它也有明显的局限性,尤其是在网格生成和处理复杂边界界面或条件方面。相比之下,平滑粒子流体力学(SPH)方法是一种流行的无网格替代方法,它从本质上规避了网格生成的挑战,并能产生更平滑的数值结果。然而,这种方法的代价是计算效率的降低。因此,研究人员战略性地结合了这两种方法的优势来研究复杂的流动现象,从而得出精确且计算效率高的结果。然而,涉及这两种方法弱耦合的算法往往错综复杂,在通用性、实施以及与硬件和编码结构的相互适应方面面临挑战。因此,在统一框架内实现 FVM 和 SPH 的强耦合至关重要。基于网格的 FVM 最近被集成到了基于 SPH 的 SPHinXsys 库中。然而,由于这两种方法的边界算法不同,在统一的 SPH 框架内建立这两种方法的强耦合的关键步骤是将 FVM 边界算法纳入欧拉 SPH 方法。在本文中,我们在欧拉 SPH 方法中提出了一种直接算法,该算法在算法上等同于 FVM 算法,并基于零阶一致性原则。此外,几个数值示例(包括欧拉 SPH 方法中各种边界条件下的可压缩和不可压缩流)证明了所提算法的稳定性和准确性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

An algorithm for the incorporation of relevant FVM boundary conditions in the Eulerian SPH framework

An algorithm for the incorporation of relevant FVM boundary conditions in the Eulerian SPH framework
The finite volume method (FVM) is widely recognized as a computationally efficient and accurate mesh-based technique. However, it has notable limitations, particularly in mesh generation and handling complex boundary interfaces or conditions. In contrast, the smoothed particle hydrodynamics (SPH) method, a popular meshless alternative, inherently circumvents the challenges of mesh generation and yields smoother numerical outcomes. Nevertheless, this approach comes at the cost of reduced computational efficiency. Consequently, researchers have strategically combined the strengths of both methods to investigate complex flow phenomena, producing precise and computationally efficient outcomes. However, algorithms involving the weak coupling of these two methods tend to be intricate and face challenges regarding versatility, implementation, and mutual adaptation to hardware and coding structures. Thus, achieving a robust and strong coupling of FVM and SPH within a unified framework is essential. A mesh-based FVM has recently been integrated into the SPH-based library SPHinXsys. However, due to the differing boundary algorithms between these methods, the crucial step for establishing a strong coupling of both methods within a unified SPH framework is to incorporate the FVM boundary algorithm into the Eulerian SPH method. In this paper, we propose a straightforward algorithm within the Eulerian SPH method, which is algorithmically equivalent to that in FVM and based on the principle of zero-order consistency. Moreover, several numerical examples, including compressible and incompressible flows with various boundary conditions in the Eulerian SPH method, demonstrate the stability and accuracy of the proposed algorithm.
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来源期刊
Computer Physics Communications
Computer Physics Communications 物理-计算机:跨学科应用
CiteScore
12.10
自引率
3.20%
发文量
287
审稿时长
5.3 months
期刊介绍: The focus of CPC is on contemporary computational methods and techniques and their implementation, the effectiveness of which will normally be evidenced by the author(s) within the context of a substantive problem in physics. Within this setting CPC publishes two types of paper. Computer Programs in Physics (CPiP) These papers describe significant computer programs to be archived in the CPC Program Library which is held in the Mendeley Data repository. The submitted software must be covered by an approved open source licence. Papers and associated computer programs that address a problem of contemporary interest in physics that cannot be solved by current software are particularly encouraged. Computational Physics Papers (CP) These are research papers in, but are not limited to, the following themes across computational physics and related disciplines. mathematical and numerical methods and algorithms; computational models including those associated with the design, control and analysis of experiments; and algebraic computation. Each will normally include software implementation and performance details. The software implementation should, ideally, be available via GitHub, Zenodo or an institutional repository.In addition, research papers on the impact of advanced computer architecture and special purpose computers on computing in the physical sciences and software topics related to, and of importance in, the physical sciences may be considered.
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