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Cogent Mathematics & Statistics Volume 5, 2018 - Issue 1
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Research Article

A time-spectral method for initial-value problems using a novel spatial subdomain scheme

Kristoffer LindvallFusion Plasma Physics, Electrical Engineering and Computational Science, KTH Royal Institute of Technology, Stockholm, SwedenCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0003-0160-4060View further author information
ORCID Icon &
Jan ScheffelFusion Plasma Physics, Electrical Engineering and Computational Science, KTH Royal Institute of Technology, Stockholm, SwedenORCID Iconhttps://orcid.org/0000-0001-6379-1880View further author information
ORCID Icon |
Lutz AngermannMathematics, Clausthal University of Technology, GermanyView further author information
(Reviewing editor)
Article: 1529280 | Received 22 Mar 2018, Accepted 17 Sep 2018, Published online: 29 Oct 2018

References

  • Amdahl, G. M., Validity of the single processor approach to achieving large scale computing capabilities, in: AFIPS ‘67 (Spring) Proceedings of the April 18-20, 1967, spring joint computer conference, ACM, 1967, pp. 483–485. New Jersey, NJ.
  • Appadu, A. R. (2013). Numerical solution of the 1D advection-diffusion equation using standard and nonstandard finite difference schemes. Journal Applications Mathematical, (2013), 1–14.
  • Bar-Yoseph, P., Moses, E., Zrahia, U., & Yarin, A. (1995). Space-time spectral element methods for one-dimensional nonlinear advection-diffusion problems. Journal of Computation Physical, 119, 62. doi:10.1006/jcph.1995.1116
  • Bateman, G. (1978). MHD Instabilities. Cambridge, Mass: The MIT Press.
  • Bateman, G., Schneider, W., & Grossmann, W. (1974). MHD instabilities as an initial boundary-value problem. Nuclear Fusion, 14, 669–683. doi:10.1088/0029-5515/14/5/009
  • Boyd, J. P. (2000). Chebyshev and fourier spectral methods. New York, NY: Dover.
  • Canuto, C., Hussaini, M. Y., Quarteroni, A., & Tang, T. A. (2006). Spectral methods, fundamentals in single domains. Verlag Berlin Heidelberg: Springer.
  • Cao, J., & Cai, H. (2018). Resistive magnetohydrodynamics with toroidal rotation in toroidal plasmas. Physical Plasmas, 25, 1–8. doi:10.1063/1.5006715
  • Dutt, P. (1990). Spectral methods for initial boundary value problems - an alternative approach. SIAM Journal of Numerical Analysis, 27, 885. doi:10.1137/0727051
  • Fakhar-Izadi, F., & Dehghan, M. (2014). Space-time spectral method for a weakly singular parabolic partial integro-differential equation on irregular domains. Computation Mathematical Application, 67, 1884–1904.
  • Fakhar-Izadi, F., & Dehghan, M. (2018). Fully spectral collocation method for nonlinear parabolic partial integro-differential equations. Applications Numercial Mathematical, 123, 88–120. doi:10.1016/j.apnum.2017.08.007
  • Furth, H. P., Killeen, J., & Rosenbluth, M. N. (1963). Finite-resistivity instabilities of a sheet pinch. Physical Fluids, 6, 459–484. doi:10.1063/1.1706761
  • Giraldo, F. X., & Restelli, M. (2007). A study of spectral element and discontinuous Galerkin methods for the Navier-Stokes equations in nonhydrostatic mesoscale atmosphere modelling: Equation sets and test cases. Journal of Computational Physics, 227, 3849–3877. doi:10.1016/j.jcp.2007.12.009
  • Glasser, A. H., Greene, J. M., & Johnson, J. L. (1976). Resistive instabilities in a tokamak. Physical Fluids, 19, 567–574. doi:10.1063/1.861490
  • Gustafsson, B., & Hemmingsson, L. (2002). Deferred correction in space and time. Journal of Scientific Computing, 17, 541. doi:10.1023/A:1015114412222
  • Gustafsson, B., & Kress, W. (2001). Deferred correction methods for initial value problems. Bit Numerical Mathematics, 41, 986. doi:10.1023/A:1021937227950
  • Guyan, R. J. (1964). Reduction of stiffness and mass matrices. AIAA Journal, 3, 380. doi:10.2514/3.2874
  • Hanert, E., & Piret, C. (2014). A Chebyshev pseudospectral method to solve the space-time tempered fractional diffusion equation. SIAM Journal of Sciences Computation, 36(2), A1797–A1812. doi:10.1137/130927292
  • Heath, M. T. (2005). Scientific computing: An introductory survery (2nd ed.). New York, NY: McGraw-Hill.
  • Kopriva, D. A. (2009). Implementing spectral methods for partial differential equations. Netherlands: Springer.
  • Lundin, D., Semi-analytical solution of initial-value problems, Report XR-EE-ALF-2006:001, KTH Royal Insitute of Technology, 2006.
  • Maerschalck, B. D., & Gerritsma, M. I. (2005). The use of Chebyshev polynomials in the space-time least-squares spectral element method. Numerical Algorithms, 38, 173.
  • Mittal, R. C., & Al-Kurdi, A. (2002). LU-decomposition and numerical structure for solving large sparse nonsymmetric linear systems. Computers & Mathematics with Applications, 43, 131–155. doi:10.1016/S0898-1221(01)00279-6
  • Morchoisne, Y. (1979). Solution of Navier-Stokes equations by a space-time pseudospectral method. Rech Aerospace, 5, 11-31.
  • Peraire, J., & Persson, P. (2010). High-order discontinuous galerkin methods for CFD. Computation Fluid Dynamics, 2, 119–152.
  • Peyret, R., & Taylor, T. D. (1983). Computational methods for fluid flow. New York, NY: Springer.
  • Qu, Z. (2004). Static condensation. In Model order reduction techniques. London: Springer.
  • Respondek, J. (2010). Numerical simulation in the partial differential equation controllability analysis with physically meaningful constraints. Mathematical Computation Simulation, 81, 120–132. doi:10.1016/j.matcom.2010.07.016
  • Scheffel, J. (2011). Time-spectral solution of initial-value problems. In Jang, C. L. (Eds.), Partial differential equations: Theory, analysis and applications (pp. 1–49). New York, NY: Nova Science Publishers, Inc.
  • Scheffel, J. (2012). A spectral method in time for initial-value problems. Amercian Journal of Computation Mathematical, 2, 173–193. doi:10.4236/ajcm.2012.23023
  • Scheffel, J., & Håkansson, C. (2009). Solution of systems of nonlinear equations, a semi-implicit approach. Applications Numercial Mathematical, 59. doi:10.1016/j.apnum.2009.05.002
  • Scheffel, J., Lindvall, K., & Yik, H. F. (2018). Time-Spectral Approach to numerical weather prediction. Computer Physics Communications, 226, 127–135. doi:10.1016/j.cpc.2018.01.010
  • Scheffel, J., & Mirza, A. A. (2012). Time-spectral solution of initial-value problems - Subdomain approach. Amercian Journal of Computation Mathematical, 02, 72–81. doi:10.4236/ajcm.2012.22010
  • Schiesser, W. (1991). The numerical method of lines: Integration of partial differential equations. San Diego: Academic Press.
  • Spagnoli, K. E., Humphrey, J. R., Price, D. K., & Kelmelis, E. J. (2011). Accelerating sparse linear algebra using graphics processing units. SPIE Defense, Security and Sensing Symposium, 8060, 1–9.
  • Speck, R., Ruprecht, D., Emmett, M., Minion, M., Bolten, M., Krause &, R. (2015). A multi-level spectral deferred correction method. BIT Num Mathematical, 55, 843–867. doi:10.1007/s10543-014-0517-x
  • Strauss, H. R. (1976). Nonlinear, three-dimensional magnetohydrodynamics of noncircular tokamaks. Physical Fluids, 19, 134–140. doi:10.1063/1.861310
  • Tal-Ezer, H. (1986). Spectral methods in time for hyperbolic equations. SIAM Journal of Numerical Analysis, 23, 11–26. doi:10.1137/0723002
  • Tal-Ezer, H. (1989). Spectral methods in time for parabolic problems. SIAM Journal of Numerical Analysis, 26, 1–11. doi:10.1137/0726001
  • Yang, S. X., Liu, Y. Q., Hao, G. Z., Wang, Z. X., He, Y. L., He, H. D., … Xu, M. (2018). Multiple branches of resistive wall mode instability in a resistive plasma. Physical Plasmas, 25, 1–10. doi:10.1063/1.5007819

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