Constrained Large-Displacement Thermal Analysis

IF 1.9 4区 工程技术 Q3 ENGINEERING, MECHANICAL
A. Shabana, Mahmoud Elbakly, Dayu Zhang
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引用次数: 3

Abstract

Two different cases are encountered in the thermal analysis of solids. In the first case, continua are not subject to boundary and motion constraints and all material points experience same displacement-gradient changes as the result of application of thermal loads. In this case, referred to as unconstrained thermal expansion, the thermal load produces uniform stress-free motion within the continuum. In the second case, point displacements due to boundary and motion constraints are restricted, and therefore, continuum points do not move freely when thermal loads are applied. This second case, referred to as constrained thermal expansion, leads to thermal stresses and its study requires proper identification of the independent coordinates which represent expansion degrees-of-freedom. To have objective evaluation and comparison between the two cases of constrained and unconstrained thermal expansion, the reference-configuration geometry is accurately described using the absolute nodal coordinate formulation (ANCF) finite elements. ANCF position-gradient vectors have unique geometric meanings as tangent to coordinate lines, allowing systematic description of the two different cases of unconstrained and constrained thermal expansions using multiplicative decomposition of the matrix of position-gradient vectors. Furthermore, generality of the approach for large-displacement thermal analysis requires using the Lagrange–D'Alembert principle for proper treatment of algebraic constraint equations. Numerical results are presented to compare two different expansion cases, demonstrate use of the new approach, and verify its results by comparing with conventional finite element (FE) approaches.
约束大位移热分析
在固体的热分析中遇到两种不同的情况。在第一种情况下,连续体不受边界和运动约束,所有材料点由于热载荷的作用而经历相同的位移梯度变化。在这种情况下,称为无约束热膨胀,热载荷在连续体内产生均匀的无应力运动。在第二种情况下,由于边界和运动约束的点位移受到限制,因此,连续点在施加热载荷时不能自由移动。第二种情况,称为约束热膨胀,会导致热应力,研究它需要适当地确定代表膨胀自由度的独立坐标。为了对有约束和无约束热膨胀两种情况进行客观的评价和比较,采用绝对节点坐标法(ANCF)有限元精确地描述了参考构型几何。ANCF位置梯度向量作为坐标线的切线具有独特的几何意义,允许使用位置梯度向量矩阵的乘法分解系统地描述两种不同的无约束和约束热膨胀情况。此外,大位移热分析方法的通用性要求使用拉格朗日-达朗贝尔原理对代数约束方程进行适当处理。数值结果比较了两种不同的展开情况,说明了新方法的应用,并通过与传统有限元方法的比较验证了其结果。
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
CiteScore
4.00
自引率
10.00%
发文量
72
审稿时长
6-12 weeks
期刊介绍: The purpose of the Journal of Computational and Nonlinear Dynamics is to provide a medium for rapid dissemination of original research results in theoretical as well as applied computational and nonlinear dynamics. The journal serves as a forum for the exchange of new ideas and applications in computational, rigid and flexible multi-body system dynamics and all aspects (analytical, numerical, and experimental) of dynamics associated with nonlinear systems. The broad scope of the journal encompasses all computational and nonlinear problems occurring in aeronautical, biological, electrical, mechanical, physical, and structural systems.
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