切线刚度矩阵
刚度
切线
非线性系统
蜂巢
切线模量
蜂窝结构
材料科学
极限抗拉强度
有限元法
剪切(地质)
零(语言学)
结构工程
数学分析
数学
复合材料
几何学
作者
Yuchao Guo,Sen Ai,Changxing Zhang,Xiaohua NIE
标识
DOI:10.1088/1742-6596/3175/1/012034
摘要
Abstract For the zero Poisson’s ratio honeycomb structure of flexible skins, a detailed finite element model of typical honeycomb cells was constructed, and a nonlinear numerical analysis was carried out. The definition methods of the equivalent tangent stiffness and the non-dimensional equivalent tangent stiffness of the honeycomb structure were proposed. The influence of laws of geometric nonlinearity and material nonlinearity on the in-plane mechanical properties of the honeycomb structure was studied. The results show that geometric nonlinearity has a strengthening effect on the tensile and shear stiffness of the honeycomb structure, while material nonlinearity has a weakening effect on them. When only geometric nonlinearity is considered and the equivalent strain is greater than 40%, the tensile tangent stiffness of the honeycomb structure is about 40 times the initial value, and the shear tangent stiffness is about 3 times the initial value. When only material nonlinearity is considered and the equivalent strain is equal to 10%, the tangent stiffness value of the honeycomb structure is less than 5% of the initial tangent stiffness value.
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