Size-dependent axisymmetric buckling and free vibration of FGP-microplate using well-posed nonlocal integral polar models

IF 0.9 4区 材料科学 Q4 MATERIALS SCIENCE, MULTIDISCIPLINARY
Chang Li, Hai Qing
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引用次数: 0

Abstract

Softening and toughening size-dependent axisymmetric elastic buckling and free vibration of functionally graded porous (FGP) Kirchhoff microplates with two different porous distribution patterns are investigated through strain-driven (𝜀D) and stress-driven (σD) two-phase local/nonlocal integral polar models (TPNIPM), respectively. The Hamilton’s principle is used to derive the differential governing equation and boundary conditions. A few nominal variables are introduced to simplify the differential governing equation and boundary conditions, and equivalent differential constitutive relations and constitutive constraints are expressed in united nominal forms. The general differential quadrature method is applied to discretize differential governing equation and constitutive relations as well as boundary conditions and constitutive constraints. L’Hospital’s rule is applied to deal with the boundary conditions and constitutive constraints at center for circular microplate. A general eigenvalue problem is obtained in matrix form, from which one can determine buckling loads and vibration frequency for different boundary conditions. The effects of nonlocal parameters, FGP distribution patterns, geometrical dimensions and buckling/vibration order on the buckling load and vibration frequency are investigated numerically for different boundary conditions, and consistent size-effects are obtained for 𝜀D- and σD-TPNIPMs TPNIPMs, respectively.

利用拟态良好的非局部积分极性模型研究 FGP 微板的尺寸依赖性轴对称屈曲和自由振动
通过应变驱动(𝜀D)和应力驱动(σD)两相局部/非局部积分极性模型(TPNIPM),分别研究了具有两种不同多孔分布模式的功能分级多孔(FGP)基尔霍夫微板的软化和增韧尺寸依赖性轴对称弹性屈曲和自由振动。利用汉密尔顿原理推导出微分控制方程和边界条件。为了简化微分调控方程和边界条件,引入了一些名义变量,并以统一的名义形式表达等效微分构成关系和构成约束。应用一般微分正交法对微分控制方程和构成关系以及边界条件和构成约束进行离散化。应用 L'Hospital 规则处理圆形微板中心的边界条件和构成约束。以矩阵形式得到了一般特征值问题,由此可以确定不同边界条件下的屈曲载荷和振动频率。对不同边界条件下的非局部参数、FGP 分布模式、几何尺寸和屈曲/振动阶数对屈曲载荷和振动频率的影响进行了数值研究,并分别得到了 𝜀D- 和 σD-TPNIPMs TPNIPMs 的一致尺寸效应。
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来源期刊
Journal of Mechanics of Materials and Structures
Journal of Mechanics of Materials and Structures 工程技术-材料科学:综合
CiteScore
1.40
自引率
0.00%
发文量
8
审稿时长
3.5 months
期刊介绍: Drawing from all areas of engineering, materials, and biology, the mechanics of solids, materials, and structures is experiencing considerable growth in directions not anticipated a few years ago, which involve the development of new technology requiring multidisciplinary simulation. The journal stimulates this growth by emphasizing fundamental advances that are relevant in dealing with problems of all length scales. Of growing interest are the multiscale problems with an interaction between small and large scale phenomena.
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