Numerical Methods for the Solution of Population Balance Equations Coupled with Computational Fluid Dynamics.

IF 7.6 2区 工程技术 Q1 CHEMISTRY, APPLIED
Mohsen Shiea, Antonio Buffo, Marco Vanni, Daniele Marchisio
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引用次数: 33

Abstract

This review article discusses the solution of population balance equations, for the simulation of disperse multiphase systems, tightly coupled with computational fluid dynamics. Although several methods are discussed, the focus is on quadrature-based moment methods (QBMMs) with particular attention to the quadrature method of moments, the conditional quadrature method of moments, and the direct quadrature method of moments. The relationship between the population balance equation, in its generalized form, and the Euler-Euler multiphase flow models, notably the two-fluid model, is thoroughly discussed. Then the closure problem and the use of Gaussian quadratures to overcome it are analyzed. The review concludes with the presentation of numerical issues and guidelines for users of these modeling approaches.

结合计算流体力学求解种群平衡方程的数值方法。
本文讨论了离散多相系统仿真中与计算流体力学紧密耦合的种群平衡方程的解法。虽然讨论了几种方法,但重点是基于正交的矩法(QBMMs),特别关注矩的正交法、条件正交法和直接正交法。本文深入讨论了人口平衡方程广义形式与欧拉-欧拉多相流模型,特别是双流体模型之间的关系。然后分析了闭包问题以及利用高斯正交克服闭包问题的方法。本文最后提出了数值问题,并为使用这些建模方法的用户提供了指导方针。
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
Annual review of chemical and biomolecular engineering
Annual review of chemical and biomolecular engineering CHEMISTRY, APPLIED-ENGINEERING, CHEMICAL
CiteScore
16.00
自引率
0.00%
发文量
25
期刊介绍: The Annual Review of Chemical and Biomolecular Engineering aims to provide a perspective on the broad field of chemical (and related) engineering. The journal draws from disciplines as diverse as biology, physics, and engineering, with development of chemical products and processes as the unifying theme.
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