Comprehensive sensitivity analysis of repeated eigenvalues and eigenvectors for structures with viscoelastic elements

IF 2.3 3区 工程技术 Q2 MECHANICS
Magdalena Łasecka-Plura
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引用次数: 0

Abstract

The paper discusses systems with viscoelastic elements that exhibit repeated eigenvalues in the eigenvalue problem. The mechanical behavior of viscoelastic elements can be described using classical rheological models as well as models that involve fractional derivatives. Formulas have been derived to calculate first- and second-order sensitivities of repeated eigenvalues and their corresponding eigenvectors. A specific case was also examined, where the first derivatives of eigenvalues are repeated. Calculating derivatives of eigenvectors associated with repeated eigenvalues is complex because they are not unique. To compute their derivatives, it is necessary to identify appropriate adjacent eigenvectors to ensure stable control of eigenvector changes. The derivatives of eigenvectors are obtained by dividing them into particular and homogeneous solutions. Additionally, in the paper, a special factor in the coefficient matrix has been introduced to reduce its condition number. The provided examples validate the correctness of the derived formulas and offer a more detailed analysis of structural behavior for structures with viscoelastic elements when altering a single design parameter or simultaneously changing multiple parameters.

Abstract Image

带粘弹性元素结构的重复特征值和特征向量的综合敏感性分析
本文讨论了在特征值问题中表现出重复特征值的粘弹性元素系统。粘弹性元素的机械行为可以用经典流变模型以及涉及分数导数的模型来描述。推导出了计算重复特征值的一阶和二阶敏感性及其相应特征向量的公式。还研究了一个特殊情况,即重复特征值的一阶导数。计算与重复特征值相关的特征向量的导数非常复杂,因为它们并不是唯一的。要计算它们的导数,必须确定适当的相邻特征向量,以确保对特征向量变化的稳定控制。特征向量的导数是通过将其划分为特定的同质解来获得的。此外,本文还在系数矩阵中引入了一个特殊因子,以减少其条件数。所提供的示例验证了推导公式的正确性,并为改变单个设计参数或同时改变多个参数时的粘弹性元素结构行为提供了更详细的分析。
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来源期刊
Acta Mechanica
Acta Mechanica 物理-力学
CiteScore
4.30
自引率
14.80%
发文量
292
审稿时长
6.9 months
期刊介绍: Since 1965, the international journal Acta Mechanica has been among the leading journals in the field of theoretical and applied mechanics. In addition to the classical fields such as elasticity, plasticity, vibrations, rigid body dynamics, hydrodynamics, and gasdynamics, it also gives special attention to recently developed areas such as non-Newtonian fluid dynamics, micro/nano mechanics, smart materials and structures, and issues at the interface of mechanics and materials. The journal further publishes papers in such related fields as rheology, thermodynamics, and electromagnetic interactions with fluids and solids. In addition, articles in applied mathematics dealing with significant mechanics problems are also welcome.
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