Modelling and stability analysis of the nonlinear system

IF 0.7 Q4 MECHANICS Theoretical and Applied Mechanics Pub Date : 2022-01-01 DOI:10.2298/tam211101003v
Mitra Vesović, R. Radulović
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引用次数: 0

Abstract

The production industries have repeatedly combated the problem of system modelling. Successful control of a system depends mainly on the exactness of the mathematical model that predicts its dynamic. Different types of studies are very common in the complicated challenges involving the estimations and approximations in describing nonlinear machines are based on a variety of studies. This article examines the behaviour and stability of holonomic mechanical system in the arbitrary parameter sets and functional configuration of forces. Differential equations of the behaviour are obtained for the proposed system on the ground of general mechanical theorems, kinetic and potential energies of the system. Lagrange?s equations of the first and second kind are introduced, as well as the representation of the system in the generalized coordinates and in Hamilton?s equations. In addition to the numerical calculations applied the system, the theoretical structures and clarifications on which all of the methods rely on are also presented. Furthermore, static equilibriums are found via two different approaches: graphical and numerical. Above all, stability of motion of undisturbed system and, later, the system that works under the action of an external disturbance was inspected. Finally, the stability of motion is reviewed through Lagrange-Dirichlet theorem, and Routh and Hurwitz criteria. Linearized equations are obtained from the nonlinear ones, and previous conclusions for the stability were proved.
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非线性系统的建模与稳定性分析
生产行业一再与系统建模问题作斗争。系统的成功控制主要取决于预测其动态的数学模型的准确性。在涉及到描述非线性机器的估计和近似的复杂挑战中,不同类型的研究是非常常见的,这些研究是基于各种各样的研究。本文研究了在任意参数集和力的功能配置下完整机械系统的行为和稳定性。根据系统的一般力学定理和系统的动能和势能,得到了系统的微分方程。拉格朗日吗?介绍了第一类和第二类方程,以及系统在广义坐标系和Hamilton坐标系中的表示。s方程。除了应用该系统的数值计算外,还介绍了所有方法所依赖的理论结构和说明。此外,静态平衡是通过两种不同的方法:图形和数值。首先考察了未受扰动系统的运动稳定性,然后考察了在外部扰动作用下工作的系统。最后,通过拉格朗日-狄利克雷定理、劳斯准则和赫维茨准则对运动的稳定性进行了评述。由非线性方程得到了线性化方程,并证明了先前关于稳定性的结论。
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来源期刊
CiteScore
0.90
自引率
0.00%
发文量
4
审稿时长
32 weeks
期刊介绍: Theoretical and Applied Mechanics (TAM) invites submission of original scholarly work in all fields of theoretical and applied mechanics. TAM features selected high quality research articles that represent the broad spectrum of interest in mechanics.
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