Affiliation:
1. Department of Mathematics , Jamia Millia Islamia , New Delhi 110025 , India
Abstract
Abstract
In this paper, we proposed wavelet based collocation methods for solving neutral delay differential equations. We use Legendre wavelet, Hermite wavelet, Chebyshev wavelet and Laguerre wavelet to solve the neutral delay differential equations numerically. We solved five linear and one nonlinear problem to demonstrate the accuracy of wavelet series solution. Wavelet series solution converges fast and gives more accurate results in comparison to other methods present in literature. We compare our results with Runge–Kutta-type methods by Wang et al. (Stability of continuous Runge–Kutta-type methods for nonlinear neutral delay-differential equations,” Appl. Math. Model, vol. 33, no. 8, pp. 3319–3329, 2009) and one-leg θ methods by Wang et al. (Stability of one-leg θ method for nonlinear neutral differential equations with proportional delay,” Appl. Math. Comput., vol. 213, no. 1, pp. 177–183, 2009) and observe that our results are more accurate.
Subject
Applied Mathematics,General Physics and Astronomy,Mechanics of Materials,Engineering (miscellaneous),Modeling and Simulation,Computational Mechanics,Statistical and Nonlinear Physics
Reference54 articles.
1. S. K. Vanani and A. Aminataei, “On the numerical solution of neutral delay differential equations using multiquadric approximation scheme,” Bull. Korean Math. Soc., vol. 45, pp. 663–670, 2008. https://doi.org/10.4134/bkms.2008.45.4.663.
2. R. D. Driver, “A two-body problem of classical electrodynamics: the one-dimensional case,” Ann. Phys., vol. 21, no. 1, pp. 122–142, 1963. https://doi.org/10.1016/0003-4916(63)90227-6.
3. R. D. Driver, “A functional-differential system of neutral type arising in a two-body problem of classical electrodynamics,” in International Symp. on Nonlinear Differential Equations and Nonlinear Mechanics, Academic Press, 1963, pp. 474–484.
4. Z. Jackiewicz, “Existence and uniqueness of solutions of neutral delay-differential equations with state dependent delays,” Funkc. Ekvacioj, vol. 30, no 1, pp. 9–17, 1987.
5. K. Gopalsamy, Stability and Oscillations in Delay Differential Equations of Population Dynamics, Mathematics and its Applications, vol. 74, Dordrecht, Kluwer Acad. Pub. Group, 1992, pp. 394–461.
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