Generalised Modified Taylor Series Approach of Developing k-step Block Methods for Solving Second Order Ordinary Differential Equations

Oluwaseun Adeyeye,Zurni Omar

doi:10.13189/ms.2020.080618

Abstract

Various algorithms have been proposed for developing block methods where the most adopted approach is the numerical integration and collocation approaches. However, there is another conventional approach known as the Taylor series approach, although it was utilised at inception for the development of linear multistep methods for first order differential equations. Thus, this article explores the adoption of this approach through the modification of the aforementioned conventional Taylor series approach. A new methodology is then presented for developing block methods, which is a more accurate method for solving second order ordinary differential equations, coined as the Modified Taylor Series (MTS) Approach. A further step is taken by presenting a generalised form of the MTS Approach that produces any k-step block method for solving second order ordinary differential equations. The computational complexity of this approach after being generalised to develop k-step block method for second order ordinary differential equations is calculated and the result shows that the generalised algorithm involves less computational burden, and hence is suitable for adoption when developing block methods for solving second order ordinary differential equations. Specifically, an alternate and easy-to-adopt approach to developing k-step block methods for solving second order ODEs with fewer computations has been introduced in this article with the developed block methods being suitable for solving second order differential equations directly.

Highlights

Block methods for the numerical solution of second order ordinary differential equations came to light in a bid to bypass the disadvantages of wastage in computational time of previously existing conventional methods [1, 2]
It was stated that the derivation using integration approach is more complicated in comparison to interpolation approach, this approach is able to generalize the formulation of the integration coefficients while the interpolation approach fails in this regard. [11] mentioned another approach for developing linear multistep methods which is the derivation by Taylor series
Since Conjecture 2.2 holds, a step can be taken further to obtain an algorithm for the Modified Taylor Series (MTS) Approach for developing any k−step block method for second order ODEs

Summary

Introduction

Block methods for the numerical solution of second order ordinary differential equations came to light in a bid to bypass the disadvantages of wastage in computational time of previously existing conventional methods [1, 2]. [11] mentioned another approach for developing linear multistep methods which is the derivation by Taylor series This approach is less rigorous to be adopted as seen in studies by [12, 13]. Generalised Modified Taylor Series Approach of Developing k−step Block Methods for Solving Second Order Ordinary Differential Equations block method and the computational complexity of this generalised form is investigated.

Development of the Two-Step and Three-Step Block Methods Using MTS Approach

Conclusions