参数化CFD-DEM数值模拟的非侵入式数据驱动降阶模型

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.2023.112355
Arash Hajisharifi , Francesco Romanò , Michele Girfoglio , Andrea Beccari , Domenico Bonanni , Gianluigi Rozza
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引用次数: 2

摘要

流固系统的研究在许多工业过程中都是非常重要的。从计算的角度来看,这种系统的仿真是非常昂贵的,特别是当需要研究大量的参数配置时。在此背景下,我们开发了一种非侵入式数据驱动的降阶模型(ROM),该模型使用适当的正交分解插值(PODI)方法构建,用于计算流体动力学(CFD) -离散元法(DEM)模拟。所提出方法的主要新颖之处在于:(i) ROM和FV方法的结合,(ii) ROM精度相对于POD模式数量和训练集基数的数值敏感性分析,以及(iii)关于Stokes数的参数研究。我们在流化床基准问题上测试了我们的ROM。ROM的准确性是根据FOM获得的欧拉(流体体积分数)和拉格朗日(粒子的位置和速度)量的结果来评估的。我们还讨论了ROM方法的效率。
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A non-intrusive data-driven reduced order model for parametrized CFD-DEM numerical simulations

The investigation of fluid-solid systems is very important in a lot of industrial processes. From a computational point of view, the simulation of such systems is very expensive, especially when a huge number of parametric configurations needs to be studied. In this context, we develop a non-intrusive data-driven reduced order model (ROM) built using the proper orthogonal decomposition with interpolation (PODI) method for Computational Fluid Dynamics (CFD) - Discrete Element Method (DEM) simulations. The main novelties of the proposed approach rely in (i) the combination of ROM and FV methods, (ii) a numerical sensitivity analysis of the ROM accuracy with respect to the number of POD modes and to the cardinality of the training set and (iii) a parametric study with respect to the Stokes number. We test our ROM on the fluidized bed benchmark problem. The accuracy of the ROM is assessed against results obtained with the FOM both for Eulerian (the fluid volume fraction) and Lagrangian (position and velocity of the particles) quantities. We also discuss the efficiency of our ROM approach.

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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.
期刊最新文献
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