https://orcid.org/0000-0002-6825-9321
References
- B.S. Attili, Numerical treatment of singularly perturbed two point boundary value problems exhibiting boundary layers, Commun. Nonlinear Sci. Numer. Simul. 16 (9) (2011), pp. 3504–3511.
- I. Boglaev, Domain decomposition in boundary layers for singularly perturbed problems, Appl. Numer. Math. 34 (2-3) (2000), pp. 145–166.
- I. Boglaev, Robust monotone iterates for nonlinear singularly perturbed boundary value problems, Bound. Value Probl. 2009 (2009), pp. 1–17.
- I. Boglayev, Numerical solution of a quasilinear parabolic equation with a boundary layer, USSR Comput. Math. Math. Phys. 30 (3) (1990), pp. 55–63.
- T.A. Bullo, G.F. Duressa, and G.A. Degla, Robust finite difference method for singularly perturbed two-parameter parabolic convection-diffusion problems, Int. J. Comput. Methods. 18 (02) (2021), pp. 2050034.
- D.S. Daoud, Overlapping Schwarz waveform relaxation method for the solution of the forward–backward heat equation, J. Comput. Appl. Math. 208 (2) (2007), pp. 380–390.
- M. Dehghan and F. Shakeri, Application of He's variational iteration method for solving the cauchy reaction-diffusion problem, J. Comput. Appl. Math. 214 (2) (2008), pp. 435–446.
- P.C. Fife and G. Gill, Phase-transition mechanisms for the phase-field model under internal heating, Phys. Rev. A. 43 (2) (1991), pp. 843–851.
- M.J. Gander and C. Rohde, Overlapping Schwarz waveform relaxation for convection dominated nonlinear conservation laws, SIAM J. Sci. Comput. 27 (2) (2005), pp. 415–439.
- M.J. Gander and A.M. Stuart, Space-time continuous analysis of waveform relaxation for the heat equation, SIAM J. Sci. Comput. 19 (6) (1998), pp. 2014–2031.
- E. Giladi and H.B. Keller, Space time domain decomposition for parabolic problems, Numer. Math.93 (2) (2002), pp. 279–313.
- V. Gupta and M.K. Kadalbajoo, A layer adaptive B-spline collocation method for singularly perturbed one-dimensional parabolic problem with a boundary turning point, Numer. Methods Partial Differ. Equ. 27 (5) (2011), pp. 1143–1164.
- V. Gupta and M.K. Kadalbajoo, A singular perturbation approach to solve Burgers–Huxley equation via monotone finite difference scheme on layer-adaptive mesh, Commun. Nonlinear Sci. Numer. Simul.16 (4) (2011), pp. 1825–1844.
- V. Gupta, S.K. Sahoo, and R.K. Dubey, Robust higher order finite difference scheme for singularly perturbed turning point problem with two outflow boundary layers, Comput. Appl. Math. 40 (5) (2021), pp. 1–23.
- C. Hirsch, Numerical Computation of Internal and External Flows, Wiley, Chichester, 1988.
- M. Jacob, Heat Transfer, Wiley, New York, 1959.
- M.K. Kadalbajoo and V. Gupta, A brief survey on numerical methods for solving singularly perturbed problems, Appl. Math. Comput. 217 (2010), pp. 3641–3716.
- M. Kamranian, M. Dehghan, and M. Tatari, An image denoising approach based on a meshfree method and the domain decomposition technique, Eng. Anal. Bound. Elem. 39 (2014), pp. 101–110.
- N. Kopteva and T. Linß, Improved maximum-norm a posteriori error estimates for linear and semilinear parabolic equations, Adv. Comput. Math. 43 (5) (2017), pp. 999–1022.
- N. Kopteva and T. Linss, Maximum norm a posteriori error estimation for parabolic problems using elliptic reconstructions, SIAM J. Numer. Anal. 51 (3) (2013), pp. 1494–1524.
- S. Kumar and S.C.S. Rao, A robust overlapping Schwarz domain decomposition algorithm for time-dependent singularly perturbed reaction–diffusion problems, J. Comput. Appl. Math. 261 (2014), pp. 127–138.
- S. Kumar, J. Singh, and M. Kumar, A robust domain decomposition method for singularly perturbed parabolic reaction-diffusion systems, J. Math. Chem. 57 (5) (2019), pp. 1557–1578.
- K. Kumar, P.P. Chakravarthy, H. Ramos, and J. Vigo-Aguiar, A stable finite difference scheme and error estimates for parabolic singularly perturbed PDES with shift parameters, J. Comput. Appl. Math.405 (2020), pp. 113050.
- O.A. Ladyzhenskaia, V.A. Solonnikov, and N.N. Ural'ceva, Linear and Quasi-linear Equations of Parabolic Type, Academic Press, New York, 1968.
- J. Liu and Y. Jiang, Waveform relaxation for reaction–diffusion equations, J. Comput. Appl. Math.235 (17) (2011), pp. 5040–5055.
- J.J.H. Miller, E. O'Riordan, and G.I. Shishkin, Fitted Numerical Methods for Singular Perturbation Problems, World Scientific, Singapore, 1996.
- J.B. Munyakazi, A uniformly convergent nonstandard finite difference scheme for a system of convection–diffusion equations, Comput. Appl. Math. 34 (3) (2015), pp. 1153–1165.
- J.B. Munyakazi and K.C. Patidar, A new fitted operator finite difference method to solve systems of evolutionary reaction–diffusion equations, Quaest. Math. 38 (1) (2015), pp. 121–138.
- H. Ramos, J. Vigo-Aguiar, S. Natesan, R. Garcia-Rubio, and M.A. Queiruga, Numerical solution of nonlinear singularly perturbed problems on nonuniform meshes by using a non-standard algorithm, J. Math. Chem. 48 (1) (2010), pp. 38–54.
- J. Singh, S. Kumar, and M. Kumar, A domain decomposition method for solving singularly perturbed parabolic reaction–diffusion problems with time delay, Numer. Methods Partial Differ. Equ. 34 (5) (2018), pp. 1849–1866.
- A.M. Soane, M.K. Gobbert, and T.I. Seidman, Numerical exploration of a system of reaction–diffusion equations with internal and transient layers, Nonlinear Anal. Real World Appl. 6 (5) (2005), pp. 914–934.
- A. Taleei and M. Dehghan, A pseudo-spectral method that uses an overlapping multidomain technique for the numerical solution of sine-Gordon equation in one and two spatial dimensions, Math. Methods Appl. Sci. 37 (13) (2014), pp. 1909–1923.
- A. Taleei and M. Dehghan, Time-splitting pseudo-spectral domain decomposition method for the soliton solutions of the one- and multi-dimensional nonlinear Schrödinger equations, Comput. Phys. Commun. 185 (6) (2014), pp. 1515–1528.
- A.T. Winfree and W. Jahnke, Three-dimensional scroll ring dynamics in the Belousov–Zhabotinskii reagent and in the two-variable oregonator model, J. Phys. Chem. 93 (7) (1989), pp. 2823–2832.