The semi-Lagrangian method on curvilinear grids

Adnane Hamiaz; Michel Mehrenberger; Hocine Sellama; Eric Sonnendrücker

doi:10.1515/caim-2016-0024

Abstract

We study the semi-Lagrangian method on curvilinear grids. The classical backward semi-Lagrangian method [1] preserves constant states but is not mass conservative. Natural reconstruction of the field permits nevertheless to have at least first order in time conservation of mass, even if the spatial error is large. Interpolation is performed with classical cubic splines and also cubic Hermite interpolation with arbitrary reconstruction order of the derivatives. High odd order reconstruction of the derivatives is shown to be a good ersatz of cubic splines which do not behave very well as time step tends to zero. A conservative semi-Lagrangian scheme along the lines of [2] is then described; here conservation of mass is automatically satisfied and constant states are shown to be preserved up to first order in time.

References

1. E. Sonnendrücker, J. Roche, P. Bertrand, and A. Ghizzo, The semilagrangian method for the numerical resolution of the vlasov equation, Journal of computational physics, vol. 149, no. 2, pp. 201-220, 1999.10.1006/jcph.1998.6148
Search in Google Scholar Back to article
2. J.-M. Qiu and C.-W. Shu, Conservative high order semi-lagrangian finite difference weno methods for advection in incompressible ow, Journal of Computational Physics, vol. 230, no. 4, pp. 863-889, 2011.10.1016/j.jcp.2010.04.037
Search in Google Scholar Back to article
3. C. K. Birdsall and A. B. Langdon, Plasma physics via computer simulation. CRC Press, 2004.
Search in Google Scholar Back to article
4. J. P. Verboncoeur, Particle simulation of plasmas: review and advances, Plasma Physics and Controlled Fusion, vol. 47, no. 5A, p. A231, 2005.10.1088/0741-3335/47/5A/017
Search in Google Scholar Back to article
5. C.-Z. Cheng and G. Knorr, The integration of the vlasov equation in configuration space, Journal of Computational Physics, vol. 22, no. 3, pp. 330-351, 1976.10.1016/0021-9991(76)90053-X
Search in Google Scholar Back to article
6. A. Staniforth and J. Côté, Semi-lagrangian integration schemes for atmospheric models-a review, Monthly weather review, vol. 119, no. 9, pp. 2206-2223, 1991.
Search in Google Scholar Back to article
7. N. Besse, Convergence of a semi-lagrangian scheme for the onedimensional vlasov-poisson system, SIAM Journal on Numerical Analysis, vol. 42, no. 1, pp. 350-382, 2004.10.1137/S0036142902410775
Search in Google Scholar Back to article
8. N. Besse and M. Mehrenberger, Convergence of classes of high-order semi-lagrangian schemes for the vlasov-poisson system, Mathematics of computation, vol. 77, no. 261, pp. 93-123, 2008.10.1090/S0025-5718-07-01912-6
Search in Google Scholar Back to article
9. F. Charles, B. Després, and M. Mehrenberger, Enhanced convergence estimates for semi-lagrangian schemes application to the vlasov-poisson equation, SIAM Journal on Numerical Analysis, vol. 51, no. 2, pp. 840-863, 2013.10.1137/110851511
Search in Google Scholar Back to article
10. N. Besse and E. Sonnendrücker, Semi-lagrangian schemes for the vlasov equation on an unstructured mesh of phase space, Journal of Computational Physics, vol. 191, no. 2, pp. 341-376, 2003.10.1016/S0021-9991(03)00318-8
Search in Google Scholar Back to article
11. T. Nakamura, R. Tanaka, T. Yabe, and K. Takizawa, Exactly conservative semi-lagrangian scheme for multi-dimensional hyperbolic equations with directional splitting technique, Journal of Computational Physics, vol. 174, no. 1, pp. 171-207, 2001.10.1006/jcph.2001.6888
Search in Google Scholar Back to article
12. N. Crouseilles, M. Mehrenberger, and E. Sonnendrücker, Conservative semi-lagrangian schemes for vlasov equations, Journal of Computational Physics, vol. 229, no. 6, pp. 1927-1953, 2010.
Search in Google Scholar Back to article
13. T. Umeda, Y. Nariyuki, and D. Kariya, A non-oscillatory and conservative semi-lagrangian scheme with fourth-degree polynomial interpolation for solving the vlasov equation, Computer Physics Communications, vol. 183, no. 5, pp. 1094-1100, 2012.
Search in Google Scholar Back to article
14. N. Crouseilles, T. Respaud, and E. Sonnendrücker, A forward semilagrangian method for the numerical solution of the vlasov equation, Computer Physics Communications, vol. 180, no. 10, pp. 1730-1745, 2009.
Search in Google Scholar Back to article
15. J.-M. Qiu and C.-W. Shu, Positivity preserving semi-lagrangian discontinuous galerkin formulation: theoretical analysis and application to the vlasov-poisson system, Journal of Computational Physics, vol. 230, no. 23, pp. 8386-8409, 2011.
Search in Google Scholar Back to article
16. J. A. Rossmanith and D. C. Seal, A positivity-preserving high-order semi-lagrangian discontinuous galerkin scheme for the vlasov-poisson equations, Journal of Computational Physics, vol. 230, no. 16, pp. 6203-6232, 2011.
Search in Google Scholar Back to article
17. M. Gutnic, M. Haefele, I. Paun, and E. Sonnendrücker, Vlasov simulations on an adaptive phase-space grid, Computer Physics Communications, vol. 164, no. 1, pp. 214-219, 2004.10.1016/j.cpc.2004.06.073
Search in Google Scholar Back to article
18. N. Besse, G. Latu, A. Ghizzo, E. Sonnendrücker, and P. Bertrand, A wavelet-mra-based adaptive semi-lagrangian method for the relativistic vlasov-maxwell system, Journal of Computational Physics, vol. 227, no. 16, pp. 7889-7916, 2008.
Search in Google Scholar Back to article
19. M. C. Pinto and M. Mehrenberger, Convergence of an adaptive semilagrangian scheme for the vlasov-poisson system, Numerische Mathematik, vol. 108, no. 3, pp. 407-444, 2008.10.1007/s00211-007-0120-z
Search in Google Scholar Back to article
20. W. Guo and J.-M. Qiu, Hybrid semi-lagrangian finite element-finite difference methods for the vlasov equation, Journal of Computational Physics, vol. 234, pp. 108-132, 2013.10.1016/j.jcp.2012.09.014
Search in Google Scholar Back to article
21. J.-M. Qiu and C.-W. Shu, Conservative semi-lagrangian finite difference weno formulations with applications to the vlasov equation, Communications in Computational Physics, vol. 10, no. 4, p. 979, 2011.10.4208/cicp.180210.251110a
Search in Google Scholar Back to article
22. T. Arber and R. Vann, A critical comparison of eulerian-grid-based vlasov solvers, Journal of computational physics, vol. 180, no. 1, pp. 339 357, 2002.10.1006/jcph.2002.7098
Search in Google Scholar Back to article
23. F. Filbet and E. Sonnendrücker, Comparison of eulerian vlasov solvers, Computer Physics Communications, vol. 150, no. 3, pp. 247-266, 2003.10.1016/S0010-4655(02)00694-X
Search in Google Scholar Back to article
24. V. Grandgirard, M. Brunetti, P. Bertrand, N. Besse, X. Garbet, P. Ghendrih, G. Manfredi, Y. Sarazin, O. Sauter, E. Sonnendrücker, et al., A drift-kinetic semi-lagrangian 4d code for ion turbulence simulation, Journal of Computational Physics, vol. 217, no. 2, pp. 395-423, 2006.10.1016/j.jcp.2006.01.023
Search in Google Scholar Back to article
25. V. Grandgirard, Y. Sarazin, X. Garbet, G. Dif-Pradalier, P. Ghendrih, N. Crouseilles, G. Latu, E. Sonnendrücker, N. Besse, and P. Bertrand, Computing itg turbulence with a full-f semi-lagrangian code, Communications in Nonlinear Science and Numerical Simulation, vol. 13, no. 1, pp. 81-87, 2008.10.1016/j.cnsns.2007.05.016
Search in Google Scholar Back to article
26. G. Latu, N. Crouseilles, V. Grandgirard, and E. Sonnendrücker, Gyrokinetic semi-lagrangian parallel simulation using a hybrid openmp/mpi programming, in Recent Advances in Parallel Virtual Machine and Message Passing Interface, pp. 356-364, Springer, 2007.10.1007/978-3-540-75416-9_48
Search in Google Scholar Back to article
27. P. Colella, M. R. Dorr, J. A. Hittinger, and D. F. Martin, High-order, finite-volume methods in mapped coordinates, Journal of Computational Physics, vol. 230, no. 8, pp. 2952-2976, 2011.
Search in Google Scholar Back to article
28. P.-O. Persson, J. Bonet, and J. Peraire, Discontinuous galerkin solution of the navier-stokes equations on deformable domains, Computer Methods in Applied Mechanics and Engineering, vol. 198, no. 17, pp. 1585- 1595, 2009.
Search in Google Scholar Back to article
29. J.-P. Braeunig, N. Crouseilles, V. Grandgirard, G. Latu, M. Mehrenberger, and E. Sonnendrücker, Some numerical aspects of the conservative psm scheme in a 4d drift-kinetic code, arXiv preprint arXiv:1303.2238, 2013.
Search in Google Scholar Back to article
30. F. Huot, A. Ghizzo, P. Bertrand, E. Sonnendrücker, and O. Coulaud, Instability of the time splitting scheme for the one-dimensional and relativistic vlasov-maxwell system, Journal of Computational Physics, vol. 185, no. 2, pp. 512-531, 2003.10.1016/S0021-9991(02)00079-7
Search in Google Scholar Back to article
31. B. Afeyan, F. Casas, N. Crouseilles, D. A., E. Faou, M. Mehrenberger, and E. Sonnendrücker, Simulations of kinetic electrostatic electron nonlinear (keen) waves with two-grid, variable velocity resolution and highorder time-splitting, The European Physical Journal D, vol. 68:295, pp. 1-21, 2014.10.1140/epjd/e2014-50212-6
Search in Google Scholar Back to article
32. Y. S. Volkov, On complete interpolation spline finding via b-splines, Sibirskie Èlektronnye Matematicheskie Izvestiya [Siberian Electronic Mathematical Reports], vol. 5, pp. 334-338, 2008.
Search in Google Scholar Back to article
33. M. Mehrenberger, C. Steiner., L. Marradi, M. Mehrenberger, N. Crouseilles, E. Sonnendrücker, and B. Afeyan, Vlasov on gpu (vog project), ESAIM: PROCEEDINGS, vol. 43, pp. 37-58, 2013.10.1051/proc/201343003
Search in Google Scholar Back to article
34. C. Steiner., Numerical computation of the gyroaverage operator and cou pling with the Vlasov gyrokinetic equations. PhD thesis, IRMA, University of Strasbourg, France, December 2014.
Search in Google Scholar Back to article
35. C.-W. Shu, High-order finite difference and finite volume weno schemes and discontinuous galerkin methods for cfd, International Journal of Computational Fluid Dynamics, vol. 17, no. 2, pp. 107-118, 2003.10.1080/1061856031000104851
Search in Google Scholar Back to article
36. A. Hamiaz, M. Mehrenberger, and A. Back, “Guiding center simulations on curvilinear grids.” https://hal.archives-ouvertes.fr/hal-00908500, Dec. 2014.
Search in Google Scholar Back to article
37. “Mudpack.” https://www2.cisl.ucar.edu/resources/legacy/mudpack.
Search in Google Scholar Back to article

The semi-Lagrangian method on curvilinear grids

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