Bernstein Collocation Approach for Solving Nonlinear Differential Equations with Delay and Anticipation

V. Appalanaidu$^1$; G.V.S.R. Deekshitulu$^2$

Discontinuity, Nonlinearity, and Complexity

Dimitry Volchenkov (editor), Dumitru Baleanu (editor)

Bernstein Collocation Approach for Solving Nonlinear Differential Equations with Delay and Anticipation

Discontinuity, Nonlinearity, and Complexity 11(3) (2022) 425--434 | DOI:10.5890/DNC.2022.09.006

V. Appalanaidu$^1$, G.V.S.R. Deekshitulu$^2$

$^1$ Department of Mathematics, Govt. college for Men(A), Kadapa, A.P., India

$^2$ Department of Mathematics, UCEK, JNTUK, Kakinada, A.P., India

Download Full Text PDF

Abstract

In this paper, the solutions of high-order nonlinear differential equations with delay and anticipation subject to mixed conditions are obtained by converting them into algebraic equations by using Bernstein polynomials and collocation points. Then the algebraic equations are solved by using Newton's method. Some examples are presented to illustrate the method proposed. In the problems involving delay and anticipation, the terms involving deviated arguments are converted into linear terms with the help of Taylor's series.

References

[1] Lorentz, G.G. (1953), Bernstein Polynomials, University of Toronto press, Toronto.
[2] Farin, G. (1993), Curves and Surfaces for Computer Aided Geometric Design, third ed, Academic Press, Boston.
[3] Ablowitz, M.J. and Ladik, J.F. (1976), A nonlinear difference scheme and inverse scattering, Studies in Applied Mathematics, 55, 213-229.
[4] Hu, X.B. and Ma, W.X. (2002), Application of Hirota's bilinear formalism to the Toeplitz lattice- some special soliton-like solutions, Phys. Lett. A, 293, 161-165.
[5] Fan, E. (2001), Soliton solutions for a generalized Hirota-Satsuma coupled KdV equation and a coupled MKdV equation, Phys. Lett. A, 282, 18-22.
[6] Dai, C. and Zhang, J. (2006), Jacobian elliptic function method for nonlinear differential-difference equations, Chaos, Solitons and Fractals., 27, 1042-1047.

[7]	Elmer, C.E. and van Vleck, E.S. (2002), A variant of Newton's method for solution of traveling wave solutions of bistable differential-difference equation, J. Dyn. Differen. Equat., 14, 493-517.

[8] Sezer, M. and Akyuz-Dascioglu, A. (2006), Taylor polynomial solutions of general linear differential-difference equations with variable coefficients, Appl. Math. Comput., 174, 753-765.
[9] Gulsu, M. and Sezer, M. (2006), A Taylor polynomial approach for solving differential-difference equations, J. Comput. Appl. Math., 186(2), 349-364.
[10] Arikoglu, A. and Ozkol, I. (2006), Solution of differential-difference equations by using differential transform method, Appl. Math. Comput., 181, 153-162.
[11] Zhang, Y., Hon, Y.C., and Mei, J. (2010), A systematic method for solving differential-difference equations, Commun. Nonlinear Sci. Numer. Simul., 15, 2791-2797.

[12]	Y\"{u}zba\c{S}{\i}, \c{S}. (2011), A numerical approach for solving the high-order linear singular differential-difference equations, Computers and Mathematics with Applications, 62, 2289-2303.

[13] Balci, M.A. and Sezer, M. (2016), Hybrid Euler-Taylor matrix method for solving of generalized linear Fredhlom integro-differential-difference equations, Appl. Math. Comput., 273, 33-41.
[14] Davaeifar, S. and Rashidinia, J. (2017), Solution of a system of delay differential equations of multi pantograph type, Journal of Taibah University for Science, 11, 1141-1157.

[15]	Dadkhah, M., Farahi, M.H., and Heydari, A. (2018), Numerical solution of time delay optimal control problems by hybrid of block-pulse functions and Bernstein polynomial, IMA Journal of Mathematical Control and Information, 35(2), 451-477.

[16]	Khataybeh, S.N., Hashim, I., and Alshbool, M. (2019), Solving directly third-order ODEs using operational matrices of Bernstein polynomials method with applications to fluid flow equations, Journal of King Saud University-Science , 31, 822-826.

[17]	I\c{s}ik, O.R., G\"{u}ney, Z., and Sezer, M. (2012), Bernstein series solutions of pantograph equations using polynomial interpolation, Journal of Difference Equations and Applications, 18(3), 357-374.

[18]	Chen, X. and Wang, L. (2010), The Variational iteration method for solving a neutral functional-differential equation with proportional delays, Computers and Mathematics with Applications, 59, 2696-2702.

[19]	Bellen, A. and Zennaro, M. (2003), Numerical methods for delay differential equations, in: Numerical Mathematics and Scientific Computation, The Clarendon Press Oxford University Press, New York.

[20] Khader, M.M. (2013), Numerical and theoretical treatment for solving linear and nonlinear delay differential equations using variational iteration method, Arab J Math Sci, 19(2), 243-256.
[21] Evans, D.J. and Raslan, K.R. (2004), The Adomian decomposition method for solving delay differential equation, International Journal of Computer Mathematics, 4, 1-6.