用 GFMxP 和鬼影值的基本外推法求解不连续函数的泊松方程

IF 3.6 2区 工程技术 Q1 MECHANICS
Sandro Ianniello
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引用次数: 0

摘要

在最近的一篇论文中,针对具有不连续函数的变系数泊松方程,提出了一种新颖的幽灵流体法编码(名为 GFMxP)。通过大量的数值测试(所有需要的量都可以用解析形式表示),证明了新程序在模拟尖锐界面和检查解的精度阶次方面的能力。然而,在实际应用中,真正的困难在于估算所谓的 "幽灵值",即函数不仅未知,甚至没有定义的点上的值。这些值可以计算校正项,从而在出现奇异点和/或不连续性时使用标准有限差分公式,并且只能通过一些外推法程序来确定,而外推法程序的真实性对于获得可靠的结果至关重要。本文通过测试不同的数值策略来解决这一基本问题,并证明了所采用的拟合模型阶数、泊松方程求解方案阶数和最终求解精度之间的严格关系。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

The GFMxP and the basic extrapolation of the ghost values to solve the Poisson equation for discontinuous functions

The GFMxP and the basic extrapolation of the ghost values to solve the Poisson equation for discontinuous functions

In a recent paper, a novel coding of the Ghost Fluid Method for the variable coefficient Poisson equation with discontinuous functions (named GFMxP) was proposed. A lot of numerical tests, with all the required quantities available in a analytic form, were used to demonstrate the ability of the new procedure in modeling a sharp interface and to check the accuracy order of the solutions. In practical applications, however, the real difficulty stands in the estimation of the so-called “ghost values”, that is the values at points where the function is not only unknown, but even not defined. These values allow to compute the corrective terms enabling the use of standard finite difference formulas in presence of a singularity and/or a discontinuity, and can be only determined through some extrapolation procedure, whose truthfulness is essential to achieve a reliable result. The paper deals with such a basic issue, by testing different numerical strategies and demonstrating the strict relationship between the order of the adopted fit-model, the order of the solving scheme for the Poisson equation and the accuracy of the final solution.

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来源期刊
CiteScore
7.30
自引率
10.50%
发文量
244
审稿时长
4 months
期刊介绍: The International Journal of Multiphase Flow publishes analytical, numerical and experimental articles of lasting interest. The scope of the journal includes all aspects of mass, momentum and energy exchange phenomena among different phases such as occur in disperse flows, gas–liquid and liquid–liquid flows, flows in porous media, boiling, granular flows and others. The journal publishes full papers, brief communications and conference announcements.
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