References
- M. Abbas, A.A. Majid, and A. Rashid, Numerical method using cubic B-spline for a strongly coupled reaction-diffusion system, PLoS ONE 9(1) (2014), p. e83265.
- M. Abbas, A.A. Majid, A.I.M. Ismail, and A. Rashid, The application of cubic trigonometric B-spline to the numerical solution of the hyperbolic problems, Appl. Math. Comput. 239 (2014), pp. 74–88.
- R. Akbari and R. Mokhtari, A new compact finite difference method for solving the generalized long wave equation, Numer. Funct. Anal. Optim. 35(2) (2014), pp. 133–152.
- Q.M Al-Hassan, On some interesting properties of a special type of tridiagonal matrices, J. Discrete Math. Sci. Cryptogr. 20(2) (2017), pp. 493–502.
- R.E. Bellman and R.E. Kalaba, Quasilinearization and Nonlinear Boundary-Value Problems, Elsevier, New York, 1965.
- T.B. Benjamin, J.L. Bona, and J.J. Mahony, Model equations for long waves in nonlinear dispersive systems, Phil. Trans. R. Soc. Lond. A 272(1220) (1972), pp. 47–78.
- S.K. Bhowmik and S.B. Karakoc, Numerical approximation of the generalized regularized long wave equation using Petrov–Galerkin finite element method, Numer. Methods Partial Differ. Equ. 35(6) (2019), pp. 2236–2257.
- J. Cullum and R.A. Willoughby, A practical procedure for computing eigenvalues of large sparse nonsymmetric matrices, in North-Holland Mathematics Studies, Vol. 127, North-Holland, 1986, pp. 193–240.
- I. Dag and M.N. Ozer, Approximation of RLW equation by least square cubic B-spline finite element method, Appl. Math. Model. 25 (2001), pp. 221–231.
- J.W. Daniel and B.K. Swartz, Extrapolated collocation for two-point boundary-value problems using cubic splines, IMA J. Appl. Math. 16(2) (1975), pp. 161–174.
- Y. Dereli, Numerical solutions of the MRLW equation using meshless kernel based method of lines, Int. J. Nonlinear Sci. 13(1) (2012), pp. 28–38.
- A. Dogan, Numerical solution of RLW equation using linear finite elements within Galerkin's method, Appl. Math. Model. 26(7) (2002), pp. 771–783.
- L.W. Ehrlich, Eigenvalues of symmetric five-diagonal matrices, Johns Hopkins Univ Laurel Md Applied Physics Lab, 1971.
- F. Gao, F. Qiao, and H. Rui, Numerical simulation of the modified regularized long wave equation by split least-squares mixed finite element method, Math. Comput. Simul. 109 (2015), pp. 64–73.
- L.R.T. Gardner, G.A. Gardner, F.A. Ayoub, and N.K. Amein, Approximations of solitary waves of the MRLW equation by B-spline finite elements, Arab. J. Sci. Eng. 22(2) (1997), pp. 183–193.
- P.F. Guo, L.W. Zhang, and K.M. Liew, Numerical analysis of generalized regularized long wave equation using the element-free kp-Ritz method, Appl. Math. Comput. 240 (2014), pp. 91–101.
- S. Hamdi, W.H. Enright, W.E. Schiesser, and J.J. Gottlieb, Exact solutions and invariants of motion for general types of regularized long wave equations, Math. Comput. Simul. 65(4-5) (2004), pp. 535–545.
- D.A. Hammad and M.S. El-Azab, A 2N order compact finite difference method for solving the generalized regularized long wave (GRLW) equation, Appl. Math. Comput. 253 (2015), pp. 248–261.
- D.A. Hammad and M.S. El-Azab, Chebyshev–Chebyshev spectral collocation method for solving the generalized regularized long wave (GRLW) equation, Appl. Math. Comput. 285 (2016), pp. 228–240.
- S.B.G. Karakoç and H. Zeybek, Solitary-wave solutions of the GRLW equation using septic B-spline collocation method, Appl. Math. Comput. 289 (2016), pp. 159–171.
- D. Kaya, A numerical simulation of solitary-wave solutions of the generalized regularized long-wave equation, Appl. Math. Comput. 149(3) (2004), pp. 833–841.
- A.K. Khalifa, K.R. Raslan, and H.M. Alzubaidi, A collocation method with cubic B-splines for solving the MRLW equation, J. Comput. Appl. Math. 212(2) (2008), pp. 406–418.
- A. Korkmaz and İ. Dağ, Numerical simulations of boundary-forced RLW equation with cubic B-spline-based differential quadrature methods, Arab. J. Sci. Eng. 38(5) (2013), pp. 1151–1160.
- S. Kutluay and A. Esen, A finite difference solution of the regularized long-wave equation, Math. Probl. Eng. 2006 (2006), Article ID 85743.
- S. Mat Zin, A. Abd Majid, A.I.M. Ismail, and M. Abbas, Application of hybrid cubic B-spline collocation approach for solving a generalized nonlinear Klein–Gordon equation, Math. Probl. Eng.2014 (2014), Article ID 108560.
- R.C. Mittal and A. Tripathi, Numerical solutions of generalized Burgers–Fisher and generalized Burgers–Huxley equations using collocation of cubic B-splines, Int. J. Comput. Math. 92(5) (2015), pp. 1053–1077.
- R. Mokhtari and M. Mohammadi, Numerical solution of GRLW equation using Sinc-collocation method, Comput. Phys. Commun. 181(7) (2010), pp. 1266–1274.
- T. Nazir, M. Abbas, A.I.M. Ismail, A.A. Majid, and A. Rashid, The numerical solution of advection–diffusion problems using new cubic trigonometric B-splines approach, Appl. Math. Model.40(7–8) (2016), pp. 4586–4611.
- A. Pereda, L.A. Vielva, A. Vegas, and A. Prieto, Analyzing the stability of the FDTD technique by combining the von Neumann method with the Routh–Hurwitz criterion, IEEE Trans. Microw. Theory Tech. 49(2) (2001), pp. 377–381.
- D.H. Peregrine, Calculations of the development of an undular bore, J. Fluid Mech. 25(2) (1966), pp. 321–330.
- D.H. Peregrine, Long waves on a beach, J. Fluid. Mech. 27(4) (1967), pp. 815–827.
- P.M. Prenter, Splines and Variational Methods, Wiley-Interscience Publication, New York, 1975.
- J.I. Ramos, Solitary wave interactions of the GRLW equation, Chaos Solitons Fractals 33(2) (2007), pp. 479–491.
- T. Roshan, A Petrov–Galerkin method for solving the generalized regularized long wave (GRLW) equation, Comput. Math. Appl. 63(5) (2012), pp. 943–956.
- Shallu and V.K. Kukreja, Analysis of RLW and MRLW equation using an improvised collocation technique with SSP-RK43 scheme, Wave Motion 105 (2021), p. 102761.
- Shallu and V.K. Kukreja, An improvised collocation algorithm with specific end conditions for solving modified burgers equation, Numer. Methods Partial Differ. Equ. 37(1) (2021), pp. 874–896.
- Shallu ., A. Kumari, and V.K. Kukreja, An efficient superconvergent spline collocation algorithm for solving fourth order singularly perturbed problems, Int. J. Appl. Comput. Math. 6(5) (2020), pp. 1–23.
- G.D. Smith, Numerical Solution of Partial Differential Equations: Finite Difference Methods, Oxford University Press, 1985.
- A.A. Soliman, Numerical simulation of the generalized regularized long wave equation by He's variational iteration method, Math. Comput. Simul. 70(2) (2005), pp. 119–124.
- R.J. Spiteri and S.J. Ruuth, A new class of optimal high-order strong-stability-preserving time discretization methods, SIAM J. Numer. Anal. 40(2) (2002), pp. 469–491.