Giriraj Methi scite author profile

The aim of the paper is to obtain a numerical solution for linear and higher-order delay differential equations (DDEs) using the coded differential transform method (CDTM). The CDTM is developed and applied to delay problems to show the efficiency of the proposed method. The coded differential transform method is a combination of the differential transform method and Mathematica software. We construct recursive relations for a few delay problems, which results in simultaneous equations, and solve them to obtain various series solution terms using the coded differential transform method. The numerical solution obtained by CDTM is compared with an exact solution. Numerical results and error analysis are presented for delay differential equations to show that the proposed method is suitable for solving delay differential equations. It is established that the delay differential equations under discussion are solvable in a specific domain. The error between the CDTM solution and the exact solution becomes very small if more terms are included in the series solution. The coded differential transform method reduces complex calculations, avoids discretization, linearization, and saves calculation time. In addition, it is easy to implement and robust. Error analysis shows that CDTM is consistent and converges fast. We obtain more accurate results using the coded differential transform method as compared to other methods.

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Analysis of Homotopy Perturbation Method for Solution of Hyperbolic Equations with an Integral Condition

Sharma¹,

Methi²

2012

Asian J. of Applied Sciences

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Giriraj Methi

Applications of Homotopy Perturbation Method to Partial Differential Equations

Solution of Differential Equations Using Differential Transform Method

Solution of delay differential equations using iterative methods

Numerical Solution of Linear and Higher-order Delay Differential Equations using the Coded Differential Transform Method

Analysis of Homotopy Perturbation Method for Solution of Hyperbolic Equations with an Integral Condition

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