Exact free vibration analysis of generalized multi-step Timoshenko beams coupled with spring-supported rigid bodies

IF 1.9 3区 工程技术 Q3 MECHANICS Meccanica Pub Date : 2024-08-23 DOI:10.1007/s11012-024-01871-6
Zhengquan Liu, Guoping Wang, Xiaoting Rui, Jianshu Zhang, Lilin Gu
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Abstract

This paper presents a linear version of the reduced multibody system transfer matrix method, specifically designed for the exact analysis of free vibrations in hybrid models composed of Timoshenko beams, rigid bodies, and springs. The method is flexible, designed to handle various boundary conditions and any combination of beams, rigid bodies, and springs. We treat each beam segment and spring-supported rigid body as independent elements. Thus, viewing the overall model as a chain system simplifies the analysis. The essence of this method is the recursive transfer of mechanical information between elements, which is contained in the reduced transfer equations. The reduced transfer equations for the spring-supported rigid bodies and Timoshenko beams are derived in detail. The accuracy, high precision, and higher-order modal analysis capabilities of this method are validated through numerical examples. Furthermore, the improvement of the numerical stability by the segmentation strategy is analyzed, and the orthogonality between the augmented eigenvectors is proved mathematically and numerically. The concise, structured and highly programmable greatly simplifies the process of handling complex hybrid systems containing any number of Timoshenko beams and rigid bodies.

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与弹簧支撑刚体耦合的广义多阶季莫申科梁的精确自由振动分析
本文介绍了还原多体系统传递矩阵法的线性版本,专门设计用于精确分析由 Timoshenko 梁、刚体和弹簧组成的混合模型的自由振动。该方法设计灵活,可处理各种边界条件以及梁、刚体和弹簧的任意组合。我们将每个梁段和弹簧支撑刚体视为独立元素。因此,将整体模型视为一个链式系统简化了分析。这种方法的精髓在于元素之间机械信息的递归传递,这些信息包含在简化传递方程中。本文详细推导了弹簧支撑刚体和季莫申科梁的简化传递方程。通过数值实例验证了该方法的准确性、高精度和高阶模态分析能力。此外,还分析了分段策略对数值稳定性的改善,并从数学和数值上证明了增强特征向量之间的正交性。这种简洁、结构化和高度可编程的方法大大简化了处理包含任意数量季莫申科梁和刚体的复杂混合系统的过程。
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来源期刊
Meccanica
Meccanica 物理-力学
CiteScore
4.70
自引率
3.70%
发文量
151
审稿时长
7 months
期刊介绍: Meccanica focuses on the methodological framework shared by mechanical scientists when addressing theoretical or applied problems. Original papers address various aspects of mechanical and mathematical modeling, of solution, as well as of analysis of system behavior. The journal explores fundamental and applications issues in established areas of mechanics research as well as in emerging fields; contemporary research on general mechanics, solid and structural mechanics, fluid mechanics, and mechanics of machines; interdisciplinary fields between mechanics and other mathematical and engineering sciences; interaction of mechanics with dynamical systems, advanced materials, control and computation; electromechanics; biomechanics. Articles include full length papers; topical overviews; brief notes; discussions and comments on published papers; book reviews; and an international calendar of conferences. Meccanica, the official journal of the Italian Association of Theoretical and Applied Mechanics, was established in 1966.
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