Dynamic stability analysis of porous functionally graded beams under hygro-thermal loading using nonlocal strain gradient integral model

IF 4.5 2区 工程技术 Q1 MATHEMATICS, APPLIED
Pei Zhang, P. Schiavone, Hai Qing
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引用次数: 0

Abstract

We present a study on the dynamic stability of porous functionally graded (PFG) beams under hygro-thermal loading. The variations of the properties of the beams across the beam thicknesses are described by the power-law model. Unlike most studies on this topic, we consider both the bending deformation of the beams and the hygro-thermal load as size-dependent, simultaneously, by adopting the equivalent differential forms of the well-posed nonlocal strain gradient integral theory (NSGIT) which are strictly equipped with a set of constitutive boundary conditions (CBCs), and through which both the stiffness-hardening and stiffness-softening effects of the structures can be observed with the length-scale parameters changed. All the variables presented in the differential problem formulation are discretized. The numerical solution of the dynamic instability region (DIR) of various bounded beams is then developed via the generalized differential quadrature method (GDQM). After verifying the present formulation and results, we examine the effects of different parameters such as the nonlocal/gradient length-scale parameters, the static force factor, the functionally graded (FG) parameter, and the porosity parameter on the DIR. Furthermore, the influence of considering the size-dependent hygro-thermal load is also presented.

用非局部应变梯度积分模型分析热湿荷载作用下多孔功能梯度梁的动力稳定性
本文研究了多孔功能梯度(PFG)梁在湿热载荷作用下的动态稳定性。用幂律模型描述了梁的特性随梁厚的变化。与本课题的大多数研究不同,我们同时考虑梁的弯曲变形和湿热载荷是尺寸相关的,采用了严格配备一组本构边界条件(CBCs)的适定非局部应变梯度积分理论(NSGIT)的等效微分形式。通过该模型,可以观察到随着长度尺度参数的变化,结构的刚度硬化和刚度软化效应。微分问题公式中的所有变量都是离散化的。然后利用广义微分正交法(GDQM)建立了各种有界梁的动力失稳区(DIR)的数值解。在验证了目前的公式和结果之后,我们研究了不同参数,如非局部/梯度长度尺度参数、静力因子、功能梯度(FG)参数和孔隙率参数对DIR的影响。此外,还分析了考虑尺寸相关湿热负荷的影响。
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
6.70
自引率
9.10%
发文量
106
审稿时长
2.0 months
期刊介绍: Applied Mathematics and Mechanics is the English version of a journal on applied mathematics and mechanics published in the People''s Republic of China. Our Editorial Committee, headed by Professor Chien Weizang, Ph.D., President of Shanghai University, consists of scientists in the fields of applied mathematics and mechanics from all over China. Founded by Professor Chien Weizang in 1980, Applied Mathematics and Mechanics became a bimonthly in 1981 and then a monthly in 1985. It is a comprehensive journal presenting original research papers on mechanics, mathematical methods and modeling in mechanics as well as applied mathematics relevant to neoteric mechanics.
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