References
- M. Astorino, F. Chouly and A. Quarteroni, A time-parallel framework for coupling finite element and lattice Boltzmann methods, Appl. Math. Res. Express. 2016(1) (2016), pp. 24–67. doi: 10.1093/amrx/abv009
- G. Baker, Galerkin approximations for the Navier-Stokes equations, Report, Harvard University, 1976.
- G. Bal, On the convergence and the stability of the parareal algorithm to solve partial differential equations, Domain Decomposition Methods Sci. Eng. Berlin 40 (2005), pp. 426–432.
- M.A. Belenli, S. Kaya and L.G. Rebholz, An explicitly decoupled variational multiscale method for incompressible, non-isothermal flows, Comput. Methods Appl. Math. 15 (2015), pp. 1–20. doi: 10.1515/cmam-2014-0026
- J. Boland and W. Layton, An analysis of the finite element method for natural convection problems, Numer. Methods Partial Differ. Equ. 6 (1990), pp. 115–126. doi: 10.1002/num.1690060202
- J. Boland and W. Layton, Error analysis for finite element methods for steady natural convection problems, Numer. Funct. Anal. Optim. 11 (1990), pp. 449–483. doi: 10.1080/01630569008816383
- S. Brenner and L.R. Scott, The Mathematical Theory of Finite Element Methods, Springer-Verlag, New York, 1994.
- M. Case, V. Ervin, A. Linke and L. Rebholz, A connection between Scott-Vogelius elements and grad-div stabilization, SIAM J. Numer. Anal. 49 (2011), pp. 1461–1481. doi: 10.1137/100794250
- R. Croce, D. Ruprecht and R. Krause, Parallel-in-space-and-time simulation of the three-dimensional, unsteady Navier-Stokes equations for incompressible flow, Modeling, Simulation and Optimization of Complex Processes – HPSC 2012, H. G. Bock, X. P. Hoang, R. Rannacher, and J. P. Schlöder, eds. Springer International Publishing, 2014, pp. 13–23.
- P.F. Fischer, F. Hecht and Y. Maday, A “parareal” in time semi-implicit approximation of the Navier-Stokes equations, Domain Decomposition Methods Sci. Eng. 40 (2005), pp. 433–440. doi: 10.1007/3-540-26825-1_44
- M.J. Gander and E. Hairer, Nonlinear convergence analysis for the parareal algorithm, Domain Decomposition Methods Sci. Eng. 60 (2008), pp. 45–56.
- M.J. Gander and S. Vandewalle, Analysis of the parareal time-parallel time-integration method, SIAM. J. Sci. Comput. 29(2) (2007), pp. 556–578. doi: 10.1137/05064607X
- V. Girault and P.-A. Raviart, Finite Element Methods for Navier-Stokes Equations: Theory and Algorithms, Springer-Verlag, Berlin, 1986.
- P.M. Gresho, R.L. Lee, S.T. Chan and R.L. Sani, Solution of the time dependent incompressible Navier-Stokes and Boussinesq equations using the Galerkin finite element method, in Approximation Methods for Navier-Stokes Problems, Paderborn, 1979, Lecture Notes in Mathematics, Springer, Berlin, 1980, pp. 203–222.
- M. Gunzburger, Finite Element Methods for Incompressible Viscous Flows: A Guide to Theory, Practice and Algorithms, Academic Press, Boston, 1989.
- L.P. He, The reduced basis technique as a coarse solver for parareal in time simulations, J. Comput. Math. 28(5) (2010), pp. 676–692.
- J. Heywood and R. Rannacher, Finite element approximation of the nonstationary Navier-Stokes problem. Part IV: Error analysis for the second order time discretization, SIAM J. Numer. Anal. 27 (1990), pp. 353–384. doi: 10.1137/0727022
- P. Hood and C. Taylor, A numerical solution of the Navier-Stokes equations using the finite element technique, Comput. Fluids 1 (1973), pp. 73–100. doi: 10.1016/0045-7930(73)90027-3
- J. Jansson and J. Hoffman, Direct FEM parallel-in-time computation of turbulent flow, http://www.csc.kth.se/%7ejjan/publications/pit_preprint_2017-08-09.pdf, (2017).
- Q.X. Kong and Y.B. Yang, A new two grid variational multiscale method for steady-state natural convection problem, Math. Methods Appl. Sci. (2016) DOI: 10.1002/mma.3843.
- A. Labovschii, W. Layton, M. Manica, M. Neda and L. Rebholz, The stabilized extrapolated trapezoidal finite element method for the Navier-Stokes equations, Comput. Methods Appl. Mech. Eng. 198 (2009), pp. 958–974. doi: 10.1016/j.cma.2008.11.004
- J.L. Lions, Y. Maday and G. Turinici, A “parareal” in time discretization of PDEs, Comptes Rendus de l Acadmie des Sci. Series I-Mathematics 332 (2001), pp. 661–668.
- J.G. Liu, C. Wang and H. Johnston, A fourth order scheme for incompressible Boussinesq equations, J. Sci. Comput. 18 (2003), pp. 253–285. doi: 10.1023/A:1021168924020
- M.T. Manzari, An explicit finite element algorithm for convection heat transfer problems, Int. J. Numer. Meth. Heat Fluid Flow 9 (1999), pp. 860–877. doi: 10.1108/09615539910297932
- G.A. Staff and E.M. Rnquist, Stability of the parareal algorithm, Domain Decomposition Methods in Sci. Eng. Berlin 40 (2005), pp. 449–456. doi: 10.1007/3-540-26825-1_46
- J. Steiner, D. Ruprecht, R. Speck and R. Krause, Convergence of parareal for the Navier-stokes equations depending on the reynolds number, Numer. Math. Adv. Appl. ENUMATH 2013 (2015), pp. 195–202.
- R. Temam, Navier-Stokes Equations, Theory and Numerical Analysis, 3rd rev. ed., North-Holland, Amsterdam, 1984.
- J.M.F. Trindade and J.C.F. Pereira, Parallel-in-time simulation of the unsteady Navier–Stokes equations for incompressible flow, Int. J. Numer. Methods. Fluids. 45(10) (2004), pp. 1123–1136. doi: 10.1002/fld.732
- J.M.F. Trindade and J.C.F. Pereira, Parallel-in-time simulation of two-dimensional, unsteady, incompressible laminar flows, Numer. Heat Transfer Part B 50(1) (2006), pp. 25–40. doi: 10.1080/10407790500459379
- Y.B. Yang and Y.L. Jiang, Numerical analysis and computation of a type of IMEX method for the time-dependent natural convection problem, Comput. Methods Appl. Math. 16(2) (2016), pp. 321–344. doi: 10.1515/cmam-2016-0006