Intrinsic modulus and strain coefficients in dilute composites with a Neo-Hookean elastic matrix

IF 2.2 Q2 ENGINEERING, MULTIDISCIPLINARY Applications in engineering science Pub Date : 2022-06-01 DOI:10.1016/j.apples.2022.100100

Dmytro Ivaneyko , Jan Domurath , Gert Heinrich , Marina Saphiannikova

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Abstract

A finite element modelling of dilute elastomer composites based on a Neo-Hookean elastic matrix and rigid spherical particles embedded within the matrix was performed. In particular, the deformation field in vicinity of a sphere was simulated and numerical homogenization has been used to obtain the effective modulus of the composite $μ_{eff}$ for different applied extension and compression ratios. At small deformations the well-known Smallwood result for the composite is reproduced: $μ_{eff} = (1 + [μ] φ) μ_{0}$ with the intrinsic modulus $[μ] = 2.500$ . Here $φ$ is the volume fraction of particles and $μ_{0}$ is the modulus of the matrix solid. However at larger deformations higher values of the intrinsic modulus $[μ]$ are obtained, which increase quadratically with the applied true strain. The homogenization procedure allowed to extract the intrinsic strain coefficients which are mirrored around the undeformed state for principle extension and compression axes. Utilizing the simulation results, stress and strain modifications of the Neo-Hookean strain energy function for dilute composites are proposed.

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具有Neo-Hookean弹性矩阵的稀复合材料的固有模量和应变系数

基于Neo-Hookean弹性矩阵和嵌入在基体中的刚性球粒，建立了稀弹性体复合材料的有限元模型。特别对球面附近的变形场进行了模拟，并采用数值均匀化方法得到了不同拉伸比和压缩比下复合材料μeff的有效模量。在小变形时，复合材料的著名的Smallwood结果重现:μeff=(1+[μ]φ)μ0，固有模量[μ]=2.500。其中φ为颗粒的体积分数，μ0为基体固体的模量。然而，在较大的变形下，本征模量[μ]得到较高的值，其随施加的真应变呈二次增长。均质化程序允许提取本征应变系数，这些本征应变系数反映在主拉伸和压缩轴的未变形状态周围。利用模拟结果，提出了稀复合材料的Neo-Hookean应变能函数的应力应变修正。

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