Validity of Pressure-Velocity Correction Algorithm (C-HSMAC method) for Incompressible Fluids with Passive Scalar Convection

IF 0.4 Q4 ENGINEERING, MULTIDISCIPLINARY

Journal of Advanced Simulation in Science and Engineering Pub Date : 2019-01-01 DOI:10.15748/JASSE.6.260

S. Ushijima, H. Tanaka, D. Toriu

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引用次数: 2

Abstract

. In the computations of incompressible fuids, it is essentially important to obtain accurately the velocity components that satisfy the incompressible condition ( ∇ · u = 0) as well as the pressure variables which are consistent with the velocity felds. For this purpose, a pressure-velocity correction method (C-HSMAC method) has been proposed by Ushijima et al. (2002) with a fnite volume method (FVM) for incompressible fuids. The purpose of this paper is to estimate the e ﬀ ects of the unsatisfed incompressible condition on the passive scalar convection and to confrm that the C-HSMAC method is able to suppress them. The C-HSMAC and usual SMAC methods were applied to the passive scalar convection in the cavity having an oscillating top wall. It was concluded that the unsatisfed incompressible condition may cause the unphysical scalar overshoots in the SMAC method. In contrast, the C-HSMAC method enables us to control |∇ · u | with the given threshold ϵ D and to suppress such overshoots. In addition, it was demonstrated that the C-HSMAC method allows us to obtain reasonable results without overshoots even in combination with a higher-order scheme for convection terms with fner cell divisions.

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被动标量对流不可压缩流体压力-速度校正算法(C-HSMAC法)的有效性

．在不可压缩流体的计算中，准确获得满足不可压缩条件(∇·u = 0)的速度分量以及与速度场一致的压力变量是至关重要的。为此，Ushijima et al.(2002)针对不可压缩流体采用有限体积法(FVM)提出了一种压力-速度校正方法(C-HSMAC法)。本文的目的是估计不可压缩条件不满足对被动标量对流的影响，并证实C-HSMAC方法能够抑制这些影响。将C-HSMAC和常用的SMAC方法应用于具有振荡顶壁腔的被动标量对流。结果表明，在SMAC方法中，不满足不可压缩条件可能导致非物理标量超调。相比之下，C-HSMAC方法使我们能够用给定的阈值λ D来控制|∇·u |，并抑制这种过调。此外，还证明了C-HSMAC方法即使与细胞分裂次数较少的对流项的高阶方案相结合，也可以获得合理的结果，而不会出现超调。

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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Journal of Advanced Simulation in Science and Engineering ENGINEERING, MULTIDISCIPLINARY-

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