Analytical solutions to buckling analysis of sandwich composite plates with uncertain material properties and dimensions

IF 0.9 4区 材料科学 Q4 MATERIALS SCIENCE, MULTIDISCIPLINARY
Onur Kaya, Ahmet Sinan Oktem, Sarp Adali
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引用次数: 0

Abstract

Structures that have thin cross-sections and are prone to compressive loads may buckle suddenly at critical load values. To calculate the critical buckling load, researchers have reported many analytical solutions which are related mainly to the deterministic approach. However, the important geometric and material parameters highly affect critical buckling loads of structures and they should be considered as uncertain in order to obtain realistic estimations. This is due to the fact that imperfections in the geometry and material properties may occur during the production stages of a component or under operational conditions. In the present study, which is based on first-order shear deformation theory (FSDT), in the first step the deterministic buckling equation of symmetric sandwich composite plates consisting of two identical carbon/epoxy skins and a foam core between the skins is formulated considering the uncertainties which can occur in the nondeterministic state. In the next step, closed-form analytical buckling equations including the geometric and material uncertainties are derived using the convex modeling and Lagrange multiplier method and based on the worst-case scenario leading to the lowest buckling loads. Sensitivity analysis is also conducted to understand which uncertain parameters have the most negative effect on the critical buckling load. Finite element analysis (FEA) is implemented to validate the derived equations. It is seen that even minor variations in the material properties and geometric dimensions lead to considerable variations in the critical buckling load. The significance of involving the uncertainty in the analysis is explained both qualitatively and quantitatively.

材料特性和尺寸不确定的夹层复合板屈曲分析的分析解决方案
横截面较薄且易受压载荷作用的结构可能会在临界载荷值时突然发生屈曲。为了计算临界屈曲载荷,研究人员报告了许多主要与确定性方法有关的分析解决方案。然而,重要的几何参数和材料参数会对结构的临界屈曲载荷产生很大影响,因此应将这些参数视为不确定参数,以便获得切合实际的估算结果。这是因为在部件的生产阶段或运行条件下,几何形状和材料特性可能会出现缺陷。本研究以一阶剪切变形理论(FSDT)为基础,考虑到非确定状态下可能出现的不确定性,首先制定了对称夹层复合板的确定性屈曲方程,该复合板由两个相同的碳/环氧表皮和表皮之间的泡沫夹芯组成。下一步,使用凸建模和拉格朗日乘法器方法,根据导致最低屈曲载荷的最坏情况,推导出包括几何和材料不确定性在内的闭式分析屈曲方程。还进行了敏感性分析,以了解哪些不确定参数对临界屈曲载荷的负面影响最大。采用有限元分析 (FEA) 验证推导出的方程。结果表明,即使是材料属性和几何尺寸的微小变化也会导致临界屈曲载荷发生相当大的变化。从定性和定量两方面解释了将不确定性纳入分析的意义。
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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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