Volume 20 Issue 3
Apr 2015
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ZHANG Xue-Ying, ZHAO Ning, WANG Chun-Wu. Interface Treatment Method for Multi-Component Fluids Numerical Simulation[J]. Chinese Journal of High Pressure Physics, 2006, 20(3): 249-256 . doi: 10.11858/gywlxb.2006.03.005
Citation: ZHANG Xue-Ying, ZHAO Ning, WANG Chun-Wu. Interface Treatment Method for Multi-Component Fluids Numerical Simulation[J]. Chinese Journal of High Pressure Physics, 2006, 20(3): 249-256 . doi: 10.11858/gywlxb.2006.03.005

Interface Treatment Method for Multi-Component Fluids Numerical Simulation

doi: 10.11858/gywlxb.2006.03.005
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  • Corresponding author: ZHANG Xue-Ying
  • Received Date: 06 Jul 2005
  • Rev Recd Date: 02 Sep 2005
  • Publish Date: 05 Sep 2006
  • Two interface treatment methods are applied to simulate multi-component flows. A simple and robust algorithm is provided for solving Riemann problem in 2-D. At each node of a narrow strip of the interface, Riemann problems are solved using iterative numerical method. Predicted isobaric values and ghost fluid states are provided. Comparing original GFM, this method is robust and effective. Conservative Euler equations and interface capturing equations are solved respectively. Level-set equation is applied to capture interface. Numerical computations are performed with MWENO scheme and compared with the results by -model method, original GFM and modified GFM.

     

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  • Shu C W. Essentially Non-Oscillatory and Weighted Essentially Non-oscillatory Schemes for Hyperbolic Conservation Laws [R]. ICASE Report No. 97-65, NASA/CR-97-206253, 1997.
    Balsara D, Shu C W. Monotonicity Preserving Weighted Essentially Non-oscillatory Schemes with Increasingly High Order of Accuracy [J]. J Comput Phys, 2000, 160: 405-452.
    Karni S. Multicomponent Flow Calculations by a Consistent Primitive Algorithm [J]. J Comput Phys, 1994, 112: 31-43.
    Fedkiw R, AslamT, Merriman B, et al. A Non-oscillatory Eulerian Approach to Interfaces in Multimaterial Flows (the Ghost Fluid Method) [J]. J Comput Phys, 1999, 152: 457-492.
    Fedkiw R. Coupling an Eulerian Fluid Calculation to a Lagrangian Solid Calculation with the Ghost Fluid Method [J]. J Compt Phys, 2002, 175: 200-224.
    Caiden R, Fedkiw R, Anderson C. A Numerical Method for Two-Phase Flow Consisting of Separate Compressible and Incompressible Regions [J]. J Comput Phys, 2001, 166: 1-27.
    Fedkiw R, AslamT, Merriman B, et al. The Ghost Fluid Method for Deflagration and Detonation Discontinuities [J]. J Comput Phys, 1999, 154: 393-427.
    Shyue K M. An Efficient Shock-Capturing Algorithm for Compressible Multicomponent Problems [J]. J Comput Phys, 1998, 142: 208-242.
    Liu T G, Khoo B C, Yeo K S. Ghost Fluid Method for Strong Shock Impacting on Material Interface [J]. J Comput Phys, 2003, 190: 651-681.
    Marquina A, Mulet P. A Flux-Split Algorithm Applied to Conservative Models for Multicomponent Compressible Flows [J]. J Comput Phys, 2003, 185: 120-138.
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