Ateshian Gerard A, Ellis Benjamin J, Weiss Jeffrey A
Department of Mechanical Engineering, Columbia University, New York, NY 10027, USA.
J Biomech Eng. 2007 Jun;129(3):405-12. doi: 10.1115/1.2720918.
Porous-permeable tissues have often been modeled using porous media theories such as the biphasic theory. This study examines the equivalence of the short-time biphasic and incompressible elastic responses for arbitrary deformations and constitutive relations from first principles. This equivalence is illustrated in problems of unconfined compression of a disk, and of articular contact under finite deformation, using two different constitutive relations for the solid matrix of cartilage, one of which accounts for the large disparity observed between the tensile and compressive moduli in this tissue. Demonstrating this equivalence under general conditions provides a rationale for using available finite element codes for incompressible elastic materials as a practical substitute for biphasic analyses, so long as only the short-time biphasic response is sought. In practice, an incompressible elastic analysis is representative of a biphasic analysis over the short-term response deltat<<Delta(2) / //parallelC(4)//K//, where Delta is a characteristic dimension, C(4) is the elasticity tensor, and K is the hydraulic permeability tensor of the solid matrix. Certain notes of caution are provided with regard to implementation issues, particularly when finite element formulations of incompressible elasticity employ an uncoupled strain energy function consisting of additive deviatoric and volumetric components.
多孔渗透组织通常使用诸如双相理论等多孔介质理论进行建模。本研究从第一原理出发,研究了任意变形和本构关系下短时双相响应与不可压缩弹性响应的等效性。利用软骨固体基质的两种不同本构关系,在圆盘的无侧限压缩问题和有限变形下的关节接触问题中说明了这种等效性,其中一种本构关系考虑了该组织中拉伸模量和压缩模量之间观察到的巨大差异。在一般条件下证明这种等效性为使用现有的不可压缩弹性材料有限元代码作为双相分析的实际替代方法提供了理论依据,只要只寻求短时双相响应。在实际应用中,不可压缩弹性分析代表了在短期响应δt<<Δ(2)/∥C(4)∥K∥内的双相分析,其中Δ是特征尺寸,C(4)是弹性张量,K是固体基质的水力渗透张量。对于实现问题给出了一些注意事项,特别是当不可压缩弹性的有限元公式采用由附加偏量和体积分量组成的非耦合应变能函数时。
