http://orcid.org/0000-0001-9341-5739
References
- Taflove A. Review of the formulation and applications of the finite-difference time-domain method for numerical modeling of electromagnetic wave interactions with arbitrary structures. Wave Motion. 1988;10(6):547–582. doi: 10.1016/0165-2125(88)90012-1
- Shankar V, Hall WF, Mohammadian AH. A time-domain differential solver for electromagnetic scattering problems. Proc IEEE. 1989;77(5):709–721. doi: 10.1109/5.32061
- LeVeque RJ. Finite volume methods for hyperbolic problems. Cambridge: Cambridge University Press; 2002.
- LeVeque RJ. A large time step generalization of Godunov's method for system of conservation laws. SIAM J Numer Anal. 1985;22(6):1051–1073. doi: 10.1137/0722063
- LeVeque RJ. Convergence of a large time step generalization of Godunov's method for conservation laws. Commun Pure and Appl Math. 1984;37:463–477. doi: 10.1002/cpa.3160370405
- Harten A. On a large time step high resolution scheme. Math Comput. 1986;46:379–399. doi: 10.1090/S0025-5718-1986-0829615-4
- Qian Z, Lee C. A class of large time step Godunov schemes for hyperbolic conversation laws and applications. J Comput Phys. 2011;230:7418–7440. doi: 10.1016/j.jcp.2011.06.008
- Qian Z, Lee C. On large time step TVD scheme for hyperbolic conservation laws and its efficiency evolution. J Comput Phys. 2012;231:7415–7430. doi: 10.1016/j.jcp.2012.07.015
- Huang H, Lee C, Dong H, et al. Modification and applications of a large time step high resolution TVD scheme. 51st AIAA Aerospace Science Meeting including the New Horizons Forum and Aerospace Exposition; Grapevine (Dalls/Ft. Worth Region), TX; 2013 Jan.
- Hussain M, Haq I, Fatima N. Efficient and accurate scheme for hyperbolic conservation laws. Int J Math Models Methods Appl Sci. 2015;9:504–511.
- Lindqvist S, Aursand P, Flatten T, et al. Large time step TVD schemes for hyperbolic conservation laws. SIAM J Numer Anal. 2016;54:2775–2798. doi: 10.1137/15M104935X
- Prebeg M, Flatten T, Muller B. Large time step Roe scheme for a common 1D two-fluid model. Appl Math Model. 2017;44:124–142. doi: 10.1016/j.apm.2016.12.010
- Guinot V. The time-line interpolation method for large-time-step Godunov-type scheme. J Comput Phys. 2002;177:394–417. doi: 10.1006/jcph.2002.7013
- Murillo J, Garcia-Navarro P, Brufau P, et al. Extension of an explicit finite volume method tp large time steps (CFL): application to shallow water flows. Int J Numer Meth Fluids. 2006;50:63–102. doi: 10.1002/fld.1036
- Morales-Hernandez M, Garcia-Navarro P, Murillo J. A large time step 1D upwind explicit scheme (CFL > 1): application to shallow water equations. J Comput Phys. 2012;231:6532–6557. doi: 10.1016/j.jcp.2012.06.017
- Morales-Hernandez M, Hubbard ME, Garcia-Navarro P. A 2D extension of a large time step explicit scheme (CFL) for unsteady problems with wet/dry boundaries. J Comput Phys. 2014;263:303–327. doi: 10.1016/j.jcp.2014.01.019
- Xu R, Zhong D, Wu B, et al. A large time step Godunov scheme for free-surface shallow water equations. Chin Sci Bull. 2014;59:2534–2540. doi: 10.1007/s11434-014-0374-7
- Thompson RJ, Moeller T. A discontinuous wave-in-cell numerical scheme for hyperbolic conservation laws. J Comput Phys. 2015;299:404–428. doi: 10.1016/j.jcp.2015.06.047
- Xie Z, Chan C, Zhang B. An explicit fourth-order staggered finite-difference time-domain method for Maxwell's equations. J Comput Appl Math. 2002;147:75–98. doi: 10.1016/S0377-0427(02)00394-1
- Mur G. Absorbing boundary conditions for the finite-difference approximation of the time-domain electromagnetic-field equations. IEEE Trans Electromagn Compat. 1981;23:377–382. doi: 10.1109/TEMC.1981.303970
- Shi R, Yang H. Energy identities of ADI-FDTD method with periodic structure. Appl Math. 2015;6:265–273. doi: 10.4236/am.2015.62025
- Gao L, Zang B, Liang D. The splitting finite-difference time-domain methods for Maxwell's equations in two dimensions. J Comput Appl Math. 2007;205:207–230. doi: 10.1016/j.cam.2006.04.051