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References
Antal SP et al (2000) Development of a next generation computer code for the prediction of multi-component multiphase flows, Int. Meeting on Trends in Numerical and Physical Modeling for Industrial Multiphase Flow, Cargese, France
Brackbill JU, Kothe DB and Zeinach C (1992) A continuum method for modelling surface tension, Journal of Computational Physics, vol 100, p 335
Gregor C, Petelin S and Tiselj I (2000) Upgrade of the VOF method for the simulation of the dispersed flow, Proc. of ASME 2000 Fluids Engineering Division Summer Meeting, Boston, Massachusetts, June 11–15
Harlow FH and Amsden AA (1975) Numerical calculation of multiphase flow, Journal of Computational Physics vol 17 pp 19–52
Hirt CW (1993) Volume-fraction techniques: powerful tools for wind engineering, J. Wind Engineering and Industrial Aerodynamics, vol 46–47, p 327
Hou S, Zou Q, Chen S, Doolen G and Cogley AC (1995) Simulation of cavity flow by the lattice Boltzmann method, J. Comput. Phys., vol 118, p 329
Jamet D, Lebaigue O, Courtis N and Delhaye (2001) The second gradient method for the direct numerical simulation of liquid-vapor flows with phase change, Jornal of Comp. Physics vol 169 pp 624–651
Kolev NI (1994) IVA4: Modeling of mass conservation in multi-phase multi-component flows in heterogeneous porous media. Kerntechnik, vol 59 no 4–5 pp 226–237
Kolev NI (1994) The code IVA4: Modelling of momentum conservation in multi-phase multi-component flows in heterogeneous porous media, Kerntechnik, vol 59 no 6 pp 249–258
Kolev NI (1995) The code IVA4: Second law of thermodynamics for multi phase flows in heterogeneous porous media, Kerntechnik, vol 60 no 1, pp 1–39
Kolev NI (1997) Comments on the entropy concept, Kerntechnik, vol 62 no 1 pp 67–70
Kolev NI (1998) On the variety of notation of the energy conservation principle for single phase flow, Kerntechnik, vol 63 no 3 pp 145–156
Kolev NI (2001) Conservation equations for multi-phase multi-component multi-velocity fields in general curvilinear coordinate systems, Keynote lecture, Proceedings of ASME FEDSM’01, ASME 2001 Fluids Engineering Division Summer Meeting, New Orleans, Louisiana, May 29–June 1, 2001
Kothe DB, Rider WJ, Mosso SJ, Brock JS and Hochstein JI (1996) Volume tracking of Interfaces having surface tension in two and three dimensions. AIAA 96-0859
Kumbaro A, Toumi I and Seignole V (April 14–18, 2002) Numerical modeling of two-phase flows using advanced two fluid system, Proc. of ICONE10, 10th Int. Conf. On Nuclear Engineering, Arlington, VA, USA
Lahey RT Jr and Drew D (October 3–8, 1999) The analysis of two-phase flow and heat transfer using a multidimensional, four field, two-fluid model, Ninth Int. Top. Meeting on Nuclear Reactor Thermal-Hydraulics (NURETH-9), San Francisco, California
Miettinen J and Schmidt H (April 14–18, 2002) CFD analyses for water-air flow with the Euler-Euler two-phase model in the FLUENT4 CFD code, Proc. of ICONE10, 10th Int. Conf. On Nuclear Engineering, Arlington, VA, USA
Nakamura T, Tanaka R, Yabe T and Takizawa K (2001) Exactly conservative semi-Lagrangian scheme for multi-dimensional hyperbolic equations with directional splitting technique, J. Comput. Phys., vol 147 p 171
Nourgaliev RR, Dinh TN and Sehgal BR (2002) On lattice Boltzmann modelling of phase transition in isothermal non-ideal fluid, Nuclear Engineering and Design, vol 211 pp 153–171
Osher S and Fredkiw R (2003) Level set methods and dynamic implicit surfaces, Springer-Verlag New York, Inc.
Rider WJ and Kothe DB (1998) Reconstructing volume tracking. Journal of Computational Physics, vol 141 p 112
Staedke H, Franchello G and Worth B (June 8–12, 1998) Towards a high resolution numerical simulation of transient two-phase flow, Third International Conference on Multi-Phase, ICMF’98
Sussman M, Smereka P and Oslier S ( 1994) A level set approach for computing solutions to incompressible two-phase flow, Journal of Computational Physics, vol 114 p 146
Swthian JA (1996) Level set methods, Cambridge University Press
Takewaki H, Nishiguchi A and Yabe T, (1985) The Cubic-Interpolated Pseudo Particle (CIP) Method for Solving Hyperbolic-Type Equations, J. Comput. Phys., vol 61 p 261
Takewaki H and Yabe Y (1987) Cubic-Interpolated Pseudo Particle (CIP) Method — Application to Nonlinear Multi-Dimensional Problems, J. Cornput. Phys., vol 70 p 355
Tomiyama A et al. (2000) (N+2)-Field modelling of dispersed multiphase flow, Proc. of ASME 2000 Fluids Engineering Division Summer Meeting, Boston, Massachusetts, June 11–15
Toumi I at al (April 2–6, 2000) Development of a multi-dimensional upwind solver for two-phase water/steam flows, Proc. of ICONE 8, 8th Int. Conf. On Nuclear Engineering, Baltimore, MD USA
Tryggavson G at al. (2001) A front tracking method for the computations of multiphase flows, Journal of Comp. Physics vol 169 pp 708–759
Verschueren M (1999) A difuse-interface model for structure development in flow, PhD Thesis, Technische Universitteit Eindhoven
Wijngaarden L (1976) Hydrodynamic interaction between gas bubbles in liquid, J. Fluid Mech., vol 77 pp 27–44
Yabe T and Takei E (1988) A New Higher-Order Godunov Method for General Hyperbolic Equations. J.Phys. Soc. Japan, vol 57 p 2598
Xiao F and Yabe T (2001) Completely conservative and oscillation-less semi-Lagrangian schemes for advection transportation, J. Comput. Phys., vol 170 p 498
Xiao F, Yabe T, Peng X and Kobayashi H, (2002) Conservation and oscillation-less transport schemes based an rational functions, J. Geophys. Res., vol 107, p 4609
Xiao F (2003) Profile-modifiable conservative transport schemes and a simple multi integrated moment formulation for hydrodynamics, in Computational Fluid Dynamics 2002, Amfield S, Morgan P and Srinivas K, eds, Springer, p 106
Xiao F and Ikebata A (2003) An efficient method for capturing free boundary in multifluid simulations, Int. J. Numer. Method in Fluid. vol 42 pp 187–210
Yabe T and Wang PY (1991) Unified Numerical Procedure for Compressible and Incompressible Fluid, J. Phys. Soc. Japan vol 60 pp 2105–2108
Yabe T and Aoki A (1991) A Universal Solver for Hyperbolic-Equations by Cubic Polynomial Interpolation. I. One-Dimensional Solver, Comput. Phys. Commun., vol 66 p 219
Yabe T, Ishikawa T, Wang PY, Aoki T, Kadota Y and Ikeda F (1991) A universal solver for hyperbolic-equations by cubic-polynomial interpolation. II. 2-dimensional and 3-dimensional solvers. Comput. Phys. Commun., vol 66 p 233
Yabe T, Xiao F and Utsumi T (2001) Constrained Interpolation Profile Method for Multiphase Analysis, J. Comput. Phys., vol 169 pp 556–593
Yabe T, Tanaka R, Nakamura T and Xiao F (2001) Exactly conservative semi-Lagrangian scheme (CIP-CSL) in one dimension. Mon. Wea. Rev., vol. 129 p 332
Yabe T, Xiao F and Utsumi T (2001) The constrained interpolation profile method for multiphase analysis, J. Comput. Phys., vol 169 p 556
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(2005). Numerical methods for multi-phase flow in curvilinear coordinate systems. In: Multiphase Flow Dynamics 1. Springer, Berlin, Heidelberg. https://doi.org/10.1007/3-540-26829-4_13
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