Abstract
A local vortical cavitation (LVC) model for the computation of unsteady cavitation is proposed. The model is derived from the Rayleigh–Plesset equations, and takes into account the relations between the cavitation bubble radius and local vortical effects. Calculations of unsteady cloud cavitating flows around a Clark-Y hydrofoil are performed to assess the predictive capability of the LVC model using well-documented experimental data. Compared with the conventional Zwart’s model, better agreement is observed between the predictions of the LVC model and experimental data, including measurements of time-averaged flow structures, instantaneous cavity shapes and the frequency of the cloud cavity shedding process. Based on the predictions of the LVC model, it is demonstrated that the evaporation process largely concentrates in the core region of the leading edge vorticity in accordance with the growth in the attached cavity, and the condensation process concentrates in the core region of the trailing edge vorticity, which corresponds to the spread of the rear component of the attached cavity. When the attached cavity breaks up and moves downstream, the condensation area fully transports to the wake region, which is in accordance with the dissipation of the detached cavity. Furthermore, using vorticity transport equations, we also find that the periodic formation, breakup, and shedding of the sheet/cloud cavities, along with the associated baroclinic torque, are important mechanisms for vorticity production and modification. When the attached cavity grows, the liquid–vapour interface that moves towards the trailing edge enhances the vorticity in the attached cavity closure region. As the re-entrant jet moves upstream, the wavy/bubbly cavity interface enhances the vorticity near the trailing edge. At the end of the cycle, the break-up of the stable attached cavity is the main reason for the vorticity enhancement near the suction surface.
Graphic Abstract
A local vortical cavitation (LVC) model for the computation of unsteady cavitation is proposed. The model is derived from the Rayleigh–Plesset equations, and takes into account the relations between the cavitation bubble radius and local vortical effects. Compared with the conventional Zwart’s model, better agreement is observed between the predictions of the LVC model and experimental data, including measurements of time-averaged flow structures, instantaneous cavity shapes, and the frequency of the cloud cavity shedding process.
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References
Knapp, R.T., Daily, J.W., Hammitt, F.G.: Cavitation. McGraw-Hill, New York (1970)
Brennen, C.E.: Cavitation and Bubble Dynamics. Oxford University Press, Oxford (1995)
Arndt, R.E.A.: Cavitation in fluid machinery and hydraulic structures. Annu. Rev. Fluid Mech. 13, 273–326 (1981)
Joseph, D.: Cavitation in a flowing liquid. Phys. Rev. E 51, R1649–R1650 (1995)
Chen, Y., Heister, S.D.: A numerical treatment for attached cavitation. J. Fluids Eng. 116, 613–618 (1994)
Deshpande, M., Feng, J., Merkle, C.L.: Numerical modeling of the thermodynamic effects of cavitation. J. Fluids Eng. 119, 420 (1997)
Liu, L., Li, J., Feng, Z.: A numerical method for simulation of attached cavitation flows. Int. J. Numer. Methods Fluids 52, 639–658 (2006)
Goncalves, E., Patella, R.F.: Numerical simulation of cavitating flows with homogeneous models. Comput. Fluids 38, 1682–1696 (2009)
Deshpande, M., Feng, J., Merkle, C.L.: Cavity flow predictions based on the Euler equations. J. Fluids Eng. 116, 36 (1994)
Ventikos, Y., Tzabiras, G.: A numerical method for the simulation of steady and unsteady cavitating flows. Comput. Fluids 29, 63–88 (2000)
Edwards, J.R., Franklin, R.K., Liou, M.-S.: Low-diffusion flux-splitting methods for real fluid flows with phase transitions. AIAA J. 38, 1624–1633 (2000)
Qin, Q., Song, C.C.S., Arndt, R.E.A.: A Numerical Study of the Unsteady Turbulent Wake Behind a Cavitating Hydrofoil. Division of Fluid Dynamics 56th Annual Meeting. American Physical Society, East Rutherford (2003)
Huang, D., Zhuang, Y., Cai, R.: A computational method for cavitational flows based on energy conservation. Proc. Inst. Mech. Eng. Part C J. Mech. Eng. Sci. 221, 1333–1338 (2007)
Barre, S., Rolland, J., Boitel, G., et al.: Experiments and modeling of cavitating flows in venturi: attached sheet cavitation. Eur. J. Mech.—B/Fluids 28, 444–464 (2009)
Gopalan, S., Katz, J.: Flow structure and modeling issues in the closure region of attached cavitation. Phys. Fluids 12, 895–911 (2000)
Kubota, A., Kato, H., Yamaguchi, H.: A new modelling of cavitating flows: a numerical study of unsteady cavitation on a hydrofoil section. J. Fluid Mech. 240, 59–96 (1992)
Zwart, P., Gerber, A., Belamri, T.: A Two-Phase Flow Model for Predicting Cavitation Dynamics. Fifth International Conference on Multiphase Flow, Yokohama (2004)
Singhal, A.K., Athavale, M.M., Li, H., et al.: Mathematical basis and validation of the full cavitation model. J. Fluids Eng. 124, 617–624 (2002)
Merkle, C.L., Feng, J., Buelow, P.E.: Computational Modeling of the Dynamics of Sheet Cavitation. In: Proceedings of the 3rd International Symposium on Cavitation, Grenoble (1998)
Kunz, R.F., Boger, D.A., Stinebring, D.R., et al.: A preconditioned Navier–Stokes method for two-phase flows with application to cavitation prediction. Comput. Fluids 29, 849–875 (2000)
Senocak, I., Shyy, W.: Interfacial dynamics-based modelling of turbulent cavitating flows, Part-1: Model development and steady-state computations. Int. J. Numer. Methods Fluids 44, 975–995 (2004)
Senocak, I., Shyy, W.: Interfacial dynamics-based modelling of turbulent cavitating flows, Part-2: Time-dependent computations. Int. J. Numer. Methods Fluids 44, 997–1016 (2004)
Kubota, A., Kato, H., Yamaguchi, H., et al.: Unsteady structure measurement of cloud cavitation on a foil section using conditional sampling technique. J. Fluids Eng. 111, 204–210 (1989)
Arndt, R.E.A.: Cavitation in vortical flows. Annu. Rev. Fluid Mech. 34, 143–175 (2002)
Iyer, C.O., Ceccio, S.L.: The influence of developed cavitation on the flow of a turbulent shear layer. Phys. Fluids 14, 3414 (2002)
Laberteaux, K.R., Ceccio, S.L., Mastrocola, V.J., et al.: High speed digital imaging of cavitating vortices. Exp. Fluids 24, 489–498 (1998)
Huang, B., Young, Y.L., Wang, G., et al.: Combined experimental and computational investigation of unsteady structure of sheet/cloud cavitation. J. Fluids Eng. 135, 071301 (2013)
Launder, B.E., Spalding, D.B.: The numerical computation of turbulent flows. Comput. Methods Appl. Mech. Eng. 3, 269–289 (1974)
Tseng, C.-C., Wei, Y., Wang, G., et al.: Modeling of turbulent, isothermal and cryogenic cavitation under attached conditions. Acta Mech. Sin. 26, 325–353 (2010)
Utturkar, Y., Wu, J., Wang, G., et al.: Recent progress in modeling of cryogenic cavitation for liquid rocket propulsion. Prog. Aerosp. Sci. 41, 558–608 (2005)
Wu, J., Wang, G., Shyy, W.: Time-dependent turbulent cavitating flow computations with interfacial transport and filter-based models. Int. J. Numer. Methods Fluids 49, 739–761 (2005)
Johansen, S.T., Wu, J., Shyy, W.: Filter-based unsteady RANS computations. Int. J. Heat Fluid Flow 25, 10–21 (2004)
Huang, B.: Physical and numerical investigation of unsteady cavitating flows. Sci. China Technol. Sci. 56, 2207–2218 (2013)
Wang, G., Senocak, I., Shyy, et al.: Dynamics of attached turbulent cavitating flows. Prog. Aerosp. Sci. 37, 551–581 (2001)
Huang, B., Zhao, Y., Wang, G.: Large Eddy Simulation of turbulent vortex-cavitation interactions in transient sheet/cloud cavitating flows. Comput. Fluids 92, 113–124 (2014)
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The project was supported by the National Natural Science Foundation of China (Grants 11172040, 51239005)
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Zhao, Y., Wang, G. & Huang, B. A cavitation model for computations of unsteady cavitating flows. Acta Mech. Sin. 32, 273–283 (2016). https://doi.org/10.1007/s10409-015-0455-0
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DOI: https://doi.org/10.1007/s10409-015-0455-0