This article refers to:
Article title: A second-order difference scheme for the singularly perturbed Sobolev problems with third type boundary conditions on Bakhvalov mesh
Authors: B. Gunes and Hakki Duru
Journal: Journal of Difference Equations and Applications
Bibliometrics: Volume 28, Number 3, pages 385-405
DOI: https://doi.org/10.1080/10236198.2022.2043289
The corresponding author revised the “Introduction” section by including two new paragraphs and eight new references.
Also, this article has been corrected with other few minor changes. These changes do not impact the academic content of the article.
The following is the revised references list:
References
- E. Abreu and A. Duran, Spectral discretizations analysis with time strong stability preserving properties for pseudoparabolic models. Comput. Math. with Appl. 102 (2021), pp. 15-44.
- G.M. Amiraliyev and Y.D. Mamedov, Difference schemes on the uniform mesh for singularly perturbed pseudo-parabolic equations, Turk. J. Math. 19 (1995), pp. 207–222.
- G.M. Amiraliyev, E. Cimen, I. Amirali, and M. Cakir, Higher-order finite difference technique for delay pseudo-parabolic equations, J. Comput. Appl. Math. 321 (2017), pp. 1–7.
- I.G. Amiraliyev, S. Cati, and G.M. Amiraliyev, Stability inequalities for the delay pseudoparabolic equations, Int. J. Appl. Math. 32(2) (2019), pp. 289–294.
- N.S. Bakhvalov, Towards optimization of methods for solving boundary value problems in the presence of boundary layers. Zh. Vychisl. Mat. i Mat. Fiz. 9 (1969), pp. 841-859. In Russian.
- I.P. Boglaev, Approximate solution of a nonlinear boundary value problem with a small parameter for the highest-order differential, USSR Comput. Math. Math. Phys. 24(6) (1984), pp. 30–35.
- Y. Cao and C. Liu, Initial boundary value problem for a mixed pseudo-parabolic p-Laplacian type equation with logarithmic nonlinearity, Electron. J. Differ. Equ. 116 (2018), pp. 1–19.
- H. Chen and H. Xu, Global existence and blow-up of solutions for infinitely degenerate semilinear pseudo-parabolic equations with logarithmic nonlinearity, Discrete Contin. Dyn. Syst. 39(2) (2019), pp. 1185–1203.
- A.B. Chinayeh and H. Duru, On adaptive mesh for the initial boundary value singularly perturbed delay Sobolev problems, Numer. Methods Partial Differ. Equ. 36 (2019), pp. 228–248.
- A.B. Chinayeh and H. Duru, Uniform difference method for singularly perturbed delay Sobolev problems, Quaestiones Math. 43 (2020), pp. 1713–1736.
- C. Clavero and J.C. Jorge, Another uniform convergence analysis technique of some numerical methods for parabolic singularly perturbed problems, IMA J. Numer. Anal. 70(3) (2015), pp. 222–235.
- P. Das, A higher order difference method for singularly perturbed parabolic partial differential equations, J. Differ. Equ. Appl. 24(3) (2017), pp. 452–477.
- E.P. Doolan, J.J.H. Miller, and W.H.A. Schilders, Uniform Numerical Methods for Problems with Initial and Boundary Layers, Boole Press, Dublin, 1980.
- H. Duru, Difference schemes for the singularly perturbed Sobolev periodic boundary problem, Appl. Math. Comput. 149 (2004), pp. 187–201.
- P.A. Farrel, A.F. Hegarty, J.J.H. Miller, E. O’Riordan, and G.I. Shishkin, Robust Computational Techniques for Boundary Layers, Chapman Hall/CRC, New York, 2000.
- L. Govindarao and J. Mohapatra, A second order numerical method for singularly perturbed delay parabolic partial differential equation, Eng. Comput. 36(2) (2019), pp. 420–444.
- L. Govindarao and J. Mohapatra, A second order weighted numerical scheme on nonuniform meshes for convection diffusion parabolic problems, Eur. J. Comput. Mech. 28(5) (2019), pp. 467–498.
- L. Govindarao and J. Mohapatra, Numerical analysis and simulation of delay parabolic partial differential equation involving a small parameter, Eng. Comput. 37(1) (2019), pp. 289–312.
- L. Govindarao, J. Mohapatra, and A. Das, A fourth-order numerical scheme for singularly perturbed delay parabolic problems arising in population dynamics, J. Appl. Math. Comput. 63 (2020), pp. 171–195.
- L. Govindarao, S.R. Sahu, and J. Mohapatra, Uniformly convergent numerical method for singularly perturbed time delay parabolic problem with two small parameters, Iran. J. Sci. Technol. Trans. A: Sci. 43 (2019), pp. 2373–2383.
- S. Gowrisankar and S. Natesan, ϵ-uniformly convergent numerical scheme for singularly perturbed delay parabolic partial differential equations, Int. J. Comput. Math. 94(5) (2017), pp. 902–921.
- O.A. Ilhan, A. Esen, H. Bulut, and H.M. Baskonus, Singular solitons in the pseudo-parabolic model arising in nonlinear surface waves, Res. Phys. 12 (2019), pp. 1712–1715.
- E. M. de Jager, and J. F. Furu, The theory of singular perturbations. Elsevier. 1996.
- H. Jahanshahi, K. Shanazari, M. Mesrizadeh, S. Soradi-Zeid, and J.F. Gomez-Aguilar, Numerical analysis of Galerkin meshless method for parabolic equations of tumor angionesis problem, Eur. Phys. J. Plus 135 (2020), pp. 957.
- S. Ji, J. Yin, and Y. Cao, Instability of positive periodic solutions for semilinear pseudo-parabolic equations with logarithmic nonlinearity, J. Differ. Equ. 261 (2016), pp. 5446–5464.
- M.K. Kadalbajoo and A. Awasthi, A parameter uniform difference scheme for singularly perturbed parabolic problem in one space dimension, Appl. Math. Comput. 183(1) (2006), pp. 42–60.
- J. Kevorkian, and J. D. Cole, Perturbation methods in applied mathematics. Springer Science & Business Media, 2013.
- J.L. Lagnese, General boundary-value problems for differential equations of Sobolev type, SIAM J. Math. Anal. 3 (1972), pp. 105–119.
- M. Liao, Non-global existence of solutions to pseudo-parabolic equations with variable exponents and positive initial energy, C.R. Mec. 347 (2019), pp. 710–715.
- T. Linß, Layer-adapted Meshes for Reaction-Convection-Diffusion Problems. Springer, 2010.
- N.A. Mbroh, S.C.O. Noutchime, and R.Y.M. Massoukou, A robust method of lines solution for singularly perturbed delay parabolic problem, Alexandria Eng. J. 59 (2020), pp. 2543–2554.
- Y.C. Memmedov, Theorems on Inequalities, Ilim, Aşkabad, 1980. (Russian).
- J.J.H. Miller, E. O’Riordan, and G.I. Shishkin, Fitted Numerical Methods for Singular Perturbation Problems, World Scientific, Singapore, 1996.
- J. Mohapatra and D. Shakti, Numerical treatment for the solution of singularly perturbed pseudo-parabolic problem on an equidistributed grid, Nonlinear Eng. 9 (2020), pp. 169–174.
- A.H. Nayfeh, Introduction to Perturbation Techniques, Wiley, New York, 1993.
- P. Okcu and G.M. Amiraliyev, Error estimates for differential difference schemes to pseudoparabolic initial-boundary value problem with delay, Math. Comput. Appl. 18(3) (2013), pp. 283–292.
- C.V. Pao, Boundary value problems of a degenerate Sobolev-type differential equation, Can. Math. Bull. 20(2) (1977), pp. 221–228.
- R.N. Rao and P.P. Chakravarthy, A fitted Numerov method for singularly perturbed parabolic partial differential equation with a small negative shift arising in control theory, Numer. Math.: Theor. Methods Appl. 7(1) (2019), pp. 23–40.
- S.R. Sahu and J. Mohapatra, Numerical investigation of time delay parabolic differential equation involving two small parameters, Eng. Comput. 38(6) (2021), pp. 2882–2899.
- A.A. Salama and H.Z. Zidan, Fourth-order schemes of exponential type for singularly perturbed parabolic partial differential equations, Rocky Mt. J. Math. 36(3) (2006), pp. 1049–1068.
- A.A. Samarski, The Theory of Difference Schemes, M.V. Lomonosov State University, Moscow, Russia, 2001.
- D. Shakti and J. Mohapatra, Numerical simulation and convergence analysis for a system of nonlinear singularly perturbed differential equations arising in population dynamics, J. Differ. Equ. Appl. 24(7) (2018), pp. 1185–1196.
- D. Shakti and J. Mohapatra, Uniformly convergent second order numerical method for a class of parameterized singular perturbation problems, Differ. Equ. Dyn. Syst. 28 (2020), pp. 1033–1043.
- R.E. Showalter, The Sobolev equation II, Appl. Anal.: Int. J. 5(2) (1975), pp. 81–99.
- S.L. Sobolev, About new problems in mathematical physics, Izv. Acad. Sci. USSR Math. 18(1) (1954), pp. 3–50.
- F. Sun, F. Liu, and Y. Wu, Finite time blow-up for a class of parabolic or pseudo-parabolic equations, Comput. Math. Appl. 75 (2018), pp. 3685–3701.
- Y. Wang, D. Tian, and Z. Li, Numerical method for singularly perturbed delay parabolic partial differential equations, Therm. Sci. 21(4) (2017), pp. 1595–1599.
- M.M. Woldaregay and G.F. Duressa, Parameter uniform numerical method for singularly perturbed parabolic differential difference equations, J. Niger. Math. Soc. 38(2) (2019), pp. 223–245.
- S. Yadav and P. Rai, A higher order scheme for singularly perturbed delay parabolic turning point problem, Eng. Comput. 38 (2020), pp. 819–851.
- K. Zennir and T. Miyasita, Lifespan of solutions for a class of pseudo-parabolic equation with weak-memory, Alexandria Eng. J. 59 (2020), pp. 957–964.
- C. Zhang and Z. Tan, Linearized compact difference methods combined with Richardson extrapolation for nonlinear delay Sobolev equations, Commun. Nonlinear Sci. Numer. Simul. 91 (2020), pp. 105461.