ABOUT ONE INNOVATION NUMERICAL METHOD FOR SOLVING ORDINARY DIFFERENTIAL EQUATIONS OF HIGHER ORDERS

Journal of Law and Sustainable Development Pub Date : 2024-08-09 DOI:10.55908/sdgs.v12i8.3827

M. Imanova, V. Ibrahimov

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Abstract

Objective: This study aims to explore the development of the Multistep Multiderivative Methods with constant coefficients and application that to solve. Theoretical Framework: The numerical solution of initial value problem for the ODEs of high order was taken as the solution of the initial-value problem for the ODEs of the first order, which has been illustrated by using a simple model problem. Here have, constructed the innovative method, which applies to solve some model problems for the illustration advantages of such methods. Here, basically made the connection between degree and order for the stable Multistep Multiderivative methods, which is usually called as the law for degree of the Multistep Methods with the constant coefficients. Method: This study used the multistep Multiderivative Methods with the constant coefficients Results and Discussion: Have investigated the Multistep Thirdderivativese Methods including Multistep second derivative methods. These methods have comparised in fully form and find a law to dermined the maximum accuracy for stable Multistep Multiderivative Methods.

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关于解决高阶常微分方程的一种创新数值方法

研究目的本研究旨在探索常数系数多阶多阶梯方法的发展及其在求解中的应用。理论框架：高阶 ODEs 初值问题的数值求解被当作一阶 ODEs 初值问题的求解，并用一个简单的模型问题进行了说明。在此，构建了创新方法，将其应用于解决一些模型问题，以说明此类方法的优势。在此，基本建立了稳定的多步多阶梯方法的阶数与阶数之间的联系，这通常被称为常数系数多步方法的阶数定律。研究方法结果与讨论：研究了包括多步二阶导数法在内的多步三阶导数法。对这些方法进行了全面的比较，并为稳定的多步多导法找到了确定最高精度的法则。

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Journal of Law and Sustainable Development

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