Consistently energy-stable decoupled method with second-order accuracy and lower density bounds for the incompressible fluid flows with variable density

IF 3.8 2区数学 Q1 MATHEMATICS, APPLIED

Communications in Nonlinear Science and Numerical Simulation Pub Date : 2025-09-16 DOI:10.1016/j.cnsns.2025.109303

Hanwen Zhang, Junxiang Yang

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引用次数: 0

Abstract

In this paper, we develop an energy-stable and linear numerical scheme for solving the incompressible fluid flows with variable density. To facilitate the construction of numerical method, two time-dependent auxiliary variables are introduced to recast the original governing equations into equivalent forms. Based on the equivalent equations, we present a semi-implicit time-marching scheme with second-order backward differentiation formula (BDF2), where the linear term and auxiliary variables are implicitly treated. Using a splitting technique, the proposed scheme can be easily solved in a totally decoupled manner. We analytically estimate the energy stability and the preservation of lower density bounds. In each time step, two simple correction steps are used to improve the energy consistency. Several numerical experiments are implemented to validate the accuracy, energy stability, and lower density bounds of the proposed method. Moreover, the Rayleigh–Taylor instability and incompressible flows with variable viscosity are simulated to further show the good capabilities.

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变密度不可压缩流体流动的二阶精度低密度界一致能量稳定解耦方法

本文提出了一种求解变密度不可压缩流体流动的能量稳定线性数值格式。为了便于数值方法的构造，引入了两个时变辅助变量，将原控制方程改写为等价形式。在等效方程的基础上，给出了一种具有二阶后向微分公式（BDF2）的半隐式时间推进格式，其中隐式处理线性项和辅助变量。利用分离技术，可以很容易地以完全解耦的方式解决所提出的方案。我们分析地估计了能量稳定性和低密度界的保持性。在每个时间步中，使用两个简单的校正步骤来提高能量一致性。数值实验验证了该方法的精度、能量稳定性和低密度边界。此外，还对变黏度的瑞利-泰勒不稳定性和不可压缩流动进行了模拟，进一步证明了该方法的良好性能。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Communications in Nonlinear Science and Numerical Simulation MATHEMATICS, APPLIED-MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

CiteScore

6.80

自引率

7.70%

发文量

378

审稿时长

78 days

期刊介绍： The journal publishes original research findings on experimental observation, mathematical modeling, theoretical analysis and numerical simulation, for more accurate description, better prediction or novel application, of nonlinear phenomena in science and engineering. It offers a venue for researchers to make rapid exchange of ideas and techniques in nonlinear science and complexity. The submission of manuscripts with cross-disciplinary approaches in nonlinear science and complexity is particularly encouraged. Topics of interest: Nonlinear differential or delay equations, Lie group analysis and asymptotic methods, Discontinuous systems, Fractals, Fractional calculus and dynamics, Nonlinear effects in quantum mechanics, Nonlinear stochastic processes, Experimental nonlinear science, Time-series and signal analysis, Computational methods and simulations in nonlinear science and engineering, Control of dynamical systems, Synchronization, Lyapunov analysis, High-dimensional chaos and turbulence, Chaos in Hamiltonian systems, Integrable systems and solitons, Collective behavior in many-body systems, Biological physics and networks, Nonlinear mechanical systems, Complex systems and complexity. No length limitation for contributions is set, but only concisely written manuscripts are published. Brief papers are published on the basis of Rapid Communications. Discussions of previously published papers are welcome.