Statics and dynamics of curved rods based on Bernoulli hypotheses and relations for a rectilinear rod

M. N. Serazutdinov
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引用次数: 0

Abstract

Method for calculating the statics and dynamics of curved rods, based on the equations for a rectilinear rod, is described and justified in detail. Bernoulli's hypotheses and the variational method are applied. The main advantage and special feature of these formulas is that the simplest formulas that are valid for rectilinear rods are used for the calculations of curved rods. These formulas do not contain parameters characterizing the curvatures of the longitudinal axis of the rod. This feature is an essential factor in the calculation of curved rods, where the information about their longitudinal axis is given discretely, since no special methods of approximation of discretely given data are required, which enable to obtain information about the radius-vector of the rod longitudinal axis and its derivatives with the required high accuracy. Solutions of test static and dynamic problems are provided. Bending of a rod with a longitudinal axis in the form of a circle, a naturally twisted rod, and a spring fluctuation are considered. Comparison of the calculation results with the data published in the literature illustrates the reliability and high accuracy of the solutions obtained.
基于Bernoulli假设的曲杆的静力学和动力学及直线杆的关系
以直线杆的方程为基础,详细介绍并论证了曲线杆的静力学和动力学计算方法。应用了伯努利假设和变分法。这些公式的主要优点和特殊之处在于,将适用于直线杆的最简单公式用于曲线杆的计算。这些公式不包含表征杆的纵轴曲率的参数。这一特征是弯曲杆计算中的一个重要因素,其中关于其纵轴的信息是离散给出的,因为不需要离散给定数据的特殊近似方法,这使得能够以所需的高精度获得关于杆纵轴的半径矢量及其导数的信息。提供了测试静态和动态问题的解决方案。考虑了纵轴为圆形的杆的弯曲、自然扭曲杆和弹簧波动。将计算结果与文献中公布的数据进行比较,说明了所获得的解的可靠性和高精度。
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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来源期刊
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发文量
26
审稿时长
18 weeks
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