在有限元法中应用各向同性和各向异性超弹性生物材料的总体框架

IF 2.8 3区 工程技术 Q2 MECHANICS
Yanjun Tang, Jingtian Kang
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引用次数: 0

摘要

超弹性模型被广泛应用于大变形条件下的生物组织模拟。虽然经典的超弹性模型已被纳入某些有限元软件包,但近年来针对各向同性和各向异性材料的新型超弹性模型也在各种软材料中不断涌现。幸运的是,大多数超弹性模型都是基于应变不变式制定的,这为将这些新开发的模型直接应用于数值模拟提供了可行的方法。本文提出了在有限元分析中采用基于应变不变式的超弹性模型的一般框架。我们推导了各向同性和各向异性材料的 Cauchy 应力和弹性张量的一般公式。通过将应变能量密度代入这些一般形式,我们能够在 ABAQUS 用户定义的材料子程序中直接实现各种超弹性模型,如各向同性材料的模型和模型,以及各向异性材料的模型、模型和模型,为实现内置材料模型无法实现的材料提供了一种数值方法。为了证明我们方法的可行性,我们利用这些子程序计算了几个与均质和非均质问题相关的经典示例。所获得的结果与分析或实验解之间的良好一致性证实了通过所建议的框架开发这些模型的有效性。本研究提出的总体框架和结果有助于快速实现新开发的超弹性模型,并有助于生物组织的有限元模拟。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
General framework to implement isotropic and anisotropic hyperelastic biomaterials into finite element method

Hyperelastic models are extensively employed in the simulation of biological tissues under large deformation. While classical hyperelastic models are incorporated into certain finite element packages, new hyperelastic models for both isotropic and anisotropic materials are emerging in recent years for various soft materials. Fortunately, most hyperelastic models are formulated based on strain invariants, which provides a feasible way to directly implement these newly developed models into the numerical simulation. In this paper, we present a general framework for employing strain-invariant-based hyperelastic models in finite element analysis. We derive the general formulation for the Cauchy stress and elasticity tensor of both isotropic and anisotropic materials. By substituting the strain–energy density into these general forms, we are able to directly implement various hyperelastic models, such as the Fung–Demiray model and the Lopez-Pamies model for isotropic materials, and the Gasser–Ogden–Holzapfel model, the Merodio-Ogden model, and the Horgan-Saccomandi model for anisotropic materials, within the ABAQUS user-defined material subroutine, offering a numerical approach to implement materials not available through the built-in material models. To demonstrate the feasibility of our approach, we utilize these subroutines to compute several classic examples related to both homogeneous and inhomogeneous problems. The good agreement between the obtained results and the analytical or experimental solutions confirms the validity of developing these models by the proposed framework. The general framework and results presented in this study are useful for fast implementing newly developed hyperelastic models and are helpful to the finite element simulation of biological tissues.

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来源期刊
CiteScore
5.50
自引率
9.40%
发文量
192
审稿时长
67 days
期刊介绍: The International Journal of Non-Linear Mechanics provides a specific medium for dissemination of high-quality research results in the various areas of theoretical, applied, and experimental mechanics of solids, fluids, structures, and systems where the phenomena are inherently non-linear. The journal brings together original results in non-linear problems in elasticity, plasticity, dynamics, vibrations, wave-propagation, rheology, fluid-structure interaction systems, stability, biomechanics, micro- and nano-structures, materials, metamaterials, and in other diverse areas. Papers may be analytical, computational or experimental in nature. Treatments of non-linear differential equations wherein solutions and properties of solutions are emphasized but physical aspects are not adequately relevant, will not be considered for possible publication. Both deterministic and stochastic approaches are fostered. Contributions pertaining to both established and emerging fields are encouraged.
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