Application of Multi-Step Differential Transform Method on Flow of a Second-Grade Fluid over a Stretching or Shrinking Sheet

Am. J. Comput. Math. Pub Date : 2011-06-30 DOI:10.4236/ajcm.2011.12012

Mohammad Mehdi Rashidi, Ali J. Chamkha, M. Keimanesh

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引用次数: 68

Abstract

In this study, a reliable algorithm to develop approximate solutions for the problem of fluid flow over a stretching or shrinking sheet is proposed. It is depicted that the differential transform method (DTM) solutions are only valid for small values of the independent variable. The DTM solutions diverge for some differential equations that extremely have nonlinear behaviors or have boundary-conditions at infinity. For this reason the governing boundary-layer equations are solved by the Multi-step Differential Transform Method (MDTM). The main advantage of this method is that it can be applied directly to nonlinear differential equations without requiring linearization, discretization, or perturbation. It is a semi analytical-numerical technique that formulizes Taylor series in a very different manner. By applying the MDTM the interval of convergence for the series solution is increased. The MDTM is treated as an algorithm in a sequence of intervals for finding accurate approximate solutions for systems of differential equations. It is predicted that the MDTM can be applied to a wide range of engineering applications.

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多步微分变换法在二级流体在拉伸或收缩薄片上流动中的应用

在这项研究中，提出了一种可靠的算法来开发流体在拉伸或收缩薄片上流动问题的近似解。说明了微分变换法(DTM)解仅对自变量的小值有效。对于一些极具非线性行为或在无穷远处具有边界条件的微分方程，DTM解是发散的。为此，采用多步微分变换法(MDTM)求解控制边界层方程。这种方法的主要优点是它可以直接应用于非线性微分方程，而不需要线性化、离散化或扰动。它是一种半解析-数值技术，以一种非常不同的方式将泰勒级数公式化。通过应用MDTM，增大了级数解的收敛区间。MDTM被看作是一种求微分方程组精确近似解的区间序列算法。预测MDTM具有广泛的工程应用前景。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Am. J. Comput. Math.

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