Modal-based generalised quasilinear approximations for turbulent plane Couette flow

IF 2.2 3区 工程技术 Q2 MECHANICS
Igor A. Maia, André V. G. Cavalieri
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引用次数: 0

Abstract

We study generalised quasilinear (GQL) approximations applied to turbulent plane Couette flow. The GQL framework is explored in conjunction with a Galerkin reduced-order model (ROM) recently developed by Cavalieri and Nogueira (Phys Rev Fluids 7:102601, 2022), which considers controllability modes of the linearised Navier–Stokes system as basis functions, representing coherent structures in the flow. The velocity field is decomposed into two groups: one composed by high-controllability modes and the other by low-controllability modes. The former group is solved with the full nonlinear equations, whereas the equations for the latter are linearised. We also consider a new GQL framework wherein the linearised equations for the low-controllability modes are driven by nonlinear interactions of modes in the first group, which are characterised by large-scale coherent structures. It is shown that GQL-ROMs successfully recover the statistics of the full model with relatively high controllability thresholds and sparser nonlinear operators. Driven GQL-ROMs were found to converge more rapidly than standard GQL approximations, providing accurate description of the statistics with a larger number of linearised modes. This indicates that the forcing of linearised flow structures by large-scale coherent structures is an important feature of turbulence dynamics that should be considered in GQL models. The results presented here reveal that further model reductions are attainable with GQL-ROMs, which can be valuable to extend these models to larger Reynolds numbers.

Abstract Image

Abstract Image

基于模态的平面库埃特湍流广义准线性近似方法
摘要 我们研究了应用于湍流平面库埃特流的广义准线性(GQL)近似。GQL 框架与 Cavalieri 和 Nogueira 最近开发的 Galerkin 降阶模型(ROM)(Phys Rev Fluids 7:102601, 2022)相结合进行了探讨,后者将线性化 Navier-Stokes 系统的可控性模式视为基函数,代表了流动中的相干结构。速度场被分解成两组:一组由高可控性模式组成,另一组由低可控性模式组成。前一组用全非线性方程求解,而后一组的方程则是线性化的。我们还考虑了一个新的 GQL 框架,其中低可控性模式的线性化方程由第一组模式的非线性相互作用驱动,而第一组模式的特点是大尺度相干结构。研究表明,GQL-ROM 可以成功恢复具有相对较高可控性阈值和较稀疏非线性算子的完整模型的统计量。研究发现,驱动 GQL-ROM 比标准 GQL 近似收敛更快,能准确描述更多线性化模式的统计数据。这表明,大尺度相干结构对线性化流动结构的强迫是湍流动力学的一个重要特征,应在 GQL 模型中加以考虑。本文介绍的结果表明,GQL-ROM 可以进一步减少模型,这对于将这些模型扩展到更大的雷诺数非常有价值。
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来源期刊
CiteScore
5.80
自引率
2.90%
发文量
38
审稿时长
>12 weeks
期刊介绍: Theoretical and Computational Fluid Dynamics provides a forum for the cross fertilization of ideas, tools and techniques across all disciplines in which fluid flow plays a role. The focus is on aspects of fluid dynamics where theory and computation are used to provide insights and data upon which solid physical understanding is revealed. We seek research papers, invited review articles, brief communications, letters and comments addressing flow phenomena of relevance to aeronautical, geophysical, environmental, material, mechanical and life sciences. Papers of a purely algorithmic, experimental or engineering application nature, and papers without significant new physical insights, are outside the scope of this journal. For computational work, authors are responsible for ensuring that any artifacts of discretization and/or implementation are sufficiently controlled such that the numerical results unambiguously support the conclusions drawn. Where appropriate, and to the extent possible, such papers should either include or reference supporting documentation in the form of verification and validation studies.
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