A definition of composite effective elastic moduli is presented based on the energy equivalence principle and its basis and premise are pointed out.

基于能量等效原理提出了复合材料有效弹性模量的定义，并指出了该定义的基础及前提条件。

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To predict macroscopic effective elastic moduli of composites, a computational method is established based on micro mechanics finite element method.

为从理论上计算复合材料宏观有效弹性模量，建立了通过细观力学有限元法计算复合材料有效弹性模量的方法。

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Considering the crack-closing and friction between crack-surface under compression, the damage tensor, damage strain and effective elastic moduli are formulated.

在考虑裂纹受压闭合与滑动摩擦的基础上，给出了损伤张量、损伤应变及有效弹性常数。

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