Development of the discrete vortex method in combination with the fast multipole method in hydrodynamic problems
DOI:
https://doi.org/10.7242/1999-6691/2024.17.1.7Keywords:
non-viscous fluid, vortex structure, numerical methods, fast multipole method, discrete vorticesAbstract
In this paper, the flow of a non-viscous incompressible fluid is discussed in terms of vorticity. In the framework of the discrete vortex method, each material particle of the fluid is considered in Lagrange variables; in this case, the velocities are determined by the Biot-Savard law. Thus, the influence of vortices on each other is taken into account. The aim of the work is to construct a numerical method of different orders of accuracy in the problems of vortex dynamics. The fast multipole method used in combination with the standard midpoint and fourth order Runge-Kutta methods significantly reduces the algorithmic complexity. In the fast multipole method, any vortex system is represented by discrete vortices. The fluid domain, determined by the motion of vortices, is divided into several ring-type subdomains, in each of which the velocities are calculated sequentially. To verify the combinability of the numerical methods, three test cases are considered: the dynamics of the symmetric and asymmetric Lamb-Chaplygin dipoles, as well as the rotation of the fluid occupying a cylindrical region of finite radius. It is known that the latter example is rather complex for direct numerical calculations in contrast to the elementary representation of its analytical solution. In fact, the performed calculations confirm that, without the Fast Multipole Method, the numerical treatment for this test case is hardly possible at a sufficiently large number of discrete vortices within a reasonable amount of time. The results of the test calculations are presented in the form of graphs and tables. The application of the standard discrete vortex methods combined with the fast multipole method shows that, due to the optimal number of subdomains and discrete vortices, the time of calculations can be significantly reduced.
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Zienkiewicz O.C., Taylor R.L., Zhu J.Z. The Finite Element Method: Its Basis and Fundamentals (7th Ed.) Butterworth-Heinemann: Amsterdam, 2013. 756 p.
Samarskii A.A. The Theory of Difference Schemes. CRC Press: Boca Raton, Florida, 2001. 786 p.
Maukalled F., Mangani L., Darwish M. The Finite Volume Method in Computational Fluid Dynamics. Springer: New York, 2016. 816 p.
Loitsyanskii L.G. Mechanics of Liquids and Gases. London: Pergamon Press, 1973.
Lewis R.I. Surface Vorticity Modelling of Separated Flows from Two-Dimensional Bluff Bodies of Arbitrary Shape. Journal of Mechanical Engineering Science. 1981. Vol. 23. P 1-12. DOI: 10.1243/JMES_JOUR_1981_023_003_02.
Porthouse D.T.C., Lewis R.I. Simulation of Viscous Diffusion for Extension of the Surface Vorticity Method to Boundary Layer and Separated Flows. Journal of Mechanical Engineering Science. 1981. Vol. 23. P. 157-167. DOI: 10.1243/JMES_JOUR_1981_023_029_02.
Beale J.T., Majda A. Rates of convergence for viscous splitting of the Navier-Stokes equations. Mathematics of Computation. 1981. Vol. 37. P 243-259. DOI: 10.1090/S0025-5718-1981-0628693-0.
Cottet G.H., Koumoutsakos P.D. Vortex Methods: Theory and Practice. Cambridge: Cambridge University Press, 2000.
Kostecki S.IL. Numerical modelling of flow through moving water-control gates by vortex method. Part I - problem formulation. Archives of Civil and Mechanical Engineering. 2008. Vol. 8. P 73-89. DOI: 10.1016/S1644-9665(12)60164-2.
Kostecki S. Random Vortex Method in Numerical Analysis of 2D Flow Around Circular Cylinder. Studia Geotechnica et Mechanica. 2015. Vol. 36. P 57-63. DOI: 10.2478/sgem-2014-0036.
Govorukhin V.N., Filimonova A.M. Analysis of the structure of vortex planar flows and their changes with time. Computational Continuum Mechanics. 2021. Vol. 14, no. 4. P 367-376. DOI: 10.7242/1999-6691/2021.14.4.30.
Belotserkovsky C.M., Lifanov I.K. Method of Discrete Vortices. CRC Press: Boca Raton, Florida, 1992. 464 p.
Katz J., Plotkin A. Low-speed Aerodynamics. From Wing Theory to Panel Methods. N.Y.: McGraw-Hill, 1991. 632 p.
Saad Y. Iterative Methods for Sparse Linear Systems. SIAM: Philadelphia, 2003. 520 p.
Kotsur O.S. Mathematical Modelling of the Elliptical Vortex Ring in a Viscous Fluid with the Vortex Filament Method. Mathematics and Mathematical Modeling. 2021. P 46-61. (in Russian) DOI: 10.24108/mathm.0321.0000263.
Ibrahim K., Morgenthal G. Vortex particle method for aerodynamic analysis: Parallel scalability and efficiency. IV Intern. Conf. PARTICLES 2015. 2015. P 1052-1065.
Morgenthal G., Sanchez Corriols A., Bendig B. A GPU-accelerated pseudo-3D vortex method for aerodynamic analysis. Journal of Wind Engineering and Industrial Aerodynamics. 2014. Vol. 125. P 69-80. DOI: 10.1016/j.jweia.2013.12.002.
Greengard L., Rokhlin V. A fast algorithm for particle simulations. Journal of Computational Physics. 1987. Vol. 73. P 325-348. DOI: 10.1016/0021-9991(87)90140-9.
Ramachandran P., Rajan S.C., Ramakrishna M. A Fast Multipole Method for Higher Order Vortex Panels in Two Dimensions. SIAM Journal on Scientific Computing. 2005. Vol. 26. P. 1620-1642. DOI: 10.1137/s1064827502420719.
Ricciardi T.R., Wolf W.R., Bimbato A.M. Fast multipole method applied to Lagrangian simulations of vortical flows. Communications in Nonlinear Science and Numerical Simulation. 2017. Vol. 51. P. 180-197. DOI: 10.1016/j.cnsns.2017.04.005.
Salloum S., Lakkis I. An adaptive error-controlled hybrid fast solver for regularized vortex methods. Journal of Computational Physics. 2022. Vol. 468.111504. DOI: 10.1016/j.jcp.2022.111504.
Marchevsky I., Ryatina E., Kolganova A. Fast Barnes-Hut-based algorithm in 2D vortex method of computational hydrodynamics. Computers and Fluids. 2023. Vol. 266.106018. DOI: 10.1016/j.compfluid.2023.106018.
Hairer E., N0rsett S.P., Wanner G. Solving Ordinary Differential Equations: Nonstiff Problems. Berlin, Heidelberg: Springer-Verlag, 1987.
Liang H., Zong Z., Zou L., Zhou L., Sun L. Vortex shedding from a two-dimensional cylinder beneath a rigid wall and a free surface according to the discrete vortex method. European Journal of Mechanics - B/Fluids. 2014. Vol. 43. P. 110-119. DOI: 10.1016/J.EUROMECHFLU.2013.08.004.
Meleshko V.V., Heijst G.J.F. van. On Chaplygin’s investigations of two-dimensional vortex structures in an inviscid fluid. Journal of Fluid Mechanics. 1994. Vol. 272. P. 157-182. DOI: 10.1017/S0022112094004428.
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