季莫申科模型中梁方程的不变性分析和闭式解法

IF 0.5 Q3 MATHEMATICS
S. M. Al-Omari,, Akhtar Hussain, Muhammad Usman, F. D. Zaman,
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引用次数: 0

摘要

我们的研究重点是梁的季莫申科模型中产生的四阶偏微分方程(PDE)。该偏微分方程适用于弹性模量保持恒定,并施加以 F 表示的外部载荷的情况。我们深入分析了李对称性,并对各种外力进行了分类。最初,主李代数是二维的,但在某些值得注意的情况下,它扩展到三维甚至更多维。对于每种特定情况,我们都会推导出最优系统,作为对称性还原的基础,将原始 PDE 转换为常微分方程。在某些情况下,我们利用这一还原过程成功找出了精确解。此外,我们还利用 Anco 提出的直接方法深入研究了守恒定律,并特别关注方程中的特定类别。我们在研究中提出的发现确实具有原创性和创新性。这项研究有力地证明了李对称方法的稳健性和有效性,展示了它在数学分析领域提供有价值的见解和解决方案的能力。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Invariance Analysis and Closed-form Solutions for The Beam Equation in Timoshenko Model
Our research focuses on a fourth-order partial differential equation (PDE) that arises from the Timoshenko model for beams. This PDE pertains to situations where the elastic moduli remain constant and an external load, represented as F, is applied. We thoroughly analyze Lie symmetries and categorize the various types of applied forces. Initially, the principal Lie algebra is two-dimensional, but in certain noteworthy cases, it extends to three dimensions or even more. For each specific case, we derive the optimal system, which serves as a foundation for symmetry reductions, transforming the original PDE into ordinary differential equations. In certain instances, we successfully identify exact solutions using this reduction process. Additionally, we delve into the conservation laws using a direct method proposed by Anco, with a particular focus on specific classes within the equation. The findings we have presented in our study are indeed original and innovative. This study serves as compelling evidence for the robustness and efficacy of the Lie symmetry method, showcasing its ability to provide valuable insights and solutions in the realm of mathematical analysis.
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来源期刊
CiteScore
1.10
自引率
20.00%
发文量
0
期刊介绍: The Research Bulletin of Institute for Mathematical Research (MathDigest) publishes light expository articles on mathematical sciences and research abstracts. It is published twice yearly by the Institute for Mathematical Research, Universiti Putra Malaysia. MathDigest is targeted at mathematically informed general readers on research of interest to the Institute. Articles are sought by invitation to the members, visitors and friends of the Institute. MathDigest also includes abstracts of thesis by postgraduate students of the Institute.
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