A micromechanical model with strong discontinuities for failure in nonwovens at finite deformations

Raina, Arun; Linder, Christian

doi:10.1016/j.ijsolstr.2015.08.018

Cited by 18 publications

(5 citation statements)

References 37 publications

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“…χ is a material‐specific and temperature‐dependent interaction parameter accounting for the disaffinity between polymer and fluid. Note that some newer models for gels account for phenomena such as the finite extensibility of the polymer chains, also used for modeling conventional rubber , and nonwoven materials , or chain entanglement . Because the main emphasis of this work is on the numerical treatment of mixed formulations, the constitutive modeling is presented in a simplified manner and identical to expressions in .…”

Section: Mixed Variational Principles For U/p‐c/e Formulationsmentioning

confidence: 99%

On the enhancement of low-order mixed finite element methods for the large deformation analysis of diffusion in solids

Krischok

Linder

2015

Int. J. Numer. Meth. Engng

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Summary A stabilized scheme is developed for mixed finite element methods for strongly coupled diffusion problems in solids capable of large deformations. Enhanced assumed strain techniques are employed to cure spurious oscillation patterns of low‐order displacement/pressure mixed formulations in the incompressible limit for quadrilateral elements and brick elements. A study is presented that shows how hourglass instabilities resulting from geometrically nonlinear enhanced assumed strain methods have to be distinguished from pressure oscillation patterns due to the violation of the inf‐sup condition. Moreover, an element formulation is proposed that provides stable results with respect to both types of instabilities. Comparisons are drawn between material models for incompressible solids of Mooney–Rivlin type and models for standard diffusion in solids with incompressible matrices such as polymeric gels. Representative numerical examples underline the ability of the proposed element formulation to cure instabilities of low‐order mixed formulations. Copyright © 2015 John Wiley & Sons, Ltd.

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Section: Mixed Variational Principles For U/p‐c/e Formulationsmentioning

confidence: 99%

On the enhancement of low-order mixed finite element methods for the large deformation analysis of diffusion in solids

Krischok

Linder

2015

Int. J. Numer. Meth. Engng

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“…To model the propagation of a crack in a failing material, several numerical tools exist. Successful approaches are the embedded finite element method [29][30][31][32][33][34][35][36][37][38][39] or the extended finite element method [40][41][42][43], both describing the crack as a discrete entity. Alternatively, diffusive phase field approaches to fracture [44][45][46][47][48] are currently experiencing a dramatic upsurge as those do not require the geometric information of a possible failure onset and perform well when complicated failure surfaces are expected for cases when multiple cracks are present or when cracks coalesce and branch.…”

Section: Introductionmentioning

confidence: 99%

A variational framework to model diffusion induced large plastic deformation and phase field fracture during initial two-phase lithiation of silicon electrodes

Zhang

Krischok

Linder

2016

Computer Methods in Applied Mechanics and Engineering

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Silicon (Si) is considered as a promising next-generation anode material for lithium-ion batteries. However, the large volume change during (de)lithiation processes causes fracture of Si electrodes, thereby limiting Si's practical application in lithium-ion batteries. In this work, we formulate a variational-based fully chemo-mechanical coupled computational framework to study diffusion induced large plastic deformation and phase field fracture in Si electrodes. Into this framework we incorporate a recently developed reaction-controlled diffusion model to predict two-phase lithiation for amorphous Si (a-Si) and crystalline Si (c-Si) as well as diffusion induced anisotropic deformation for c-Si. The variational formulation suggests to consider the deformation field, chemical potential, and the damage field as primary unknowns. The concentration field is considered as a local variable and is recovered from the chemical potential on the element level. We carry out several numerical simulations to show the performance of our computational model and point out the significance of accurately accounting for the presence of the reaction front when modeling diffusion induced fracture problems for both a-Si and c-Si electrodes. In addition, we investigate how the fracture energy release rate, diffusion coefficient, electrode geometry, and geometrical constraints affect the fracture behavior of Si electrodes.

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“…Constitutive models for soft materials are commonly proposed on a phenomenological [43] basis, which actually in [18] is shown to be related to a molecular statistic framework, or micromechanically justified [see [27,38,39,46,47,57] among many others]. Regardless of model origin, the response of those materials is prescribed by its free energy.…”

Section: Constitutive Behaviormentioning

confidence: 99%

Computational aspects of growth-induced instabilities through eigenvalue analysis

et al. 2015

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The objective of this contribution is to establish a computational framework to study growth-induced instabilities. The common approach towards growth-induced instabilities is to decompose the deformation multiplicatively into its growth and elastic part. Recently, this concept has been employed in computations of growing continua and has proven to be extremely useful to better understand the material behavior under growth. While finite element simulations seem to be capable of predicting the behavior of growing continua, they often cannot naturally capture the instabilities caused by growth. The accepted strategy to provoke growth-induced instabilities is therefore to perturb the solution of the problem, which indeed results in geometric instabilities in the form of wrinkles and folds. However, this strategy is intrinsically subjective as the user is prescribing the perturbations and the simulations are often highly perturbation-dependent. We propose a different strategy that is inherently suitable for this problem, namely eigenvalue analysis. The main advantages of eigenvalue analysis are that first, no arbitrary, artificial perturbations are needed and second, it is, in general, independent of the time step size. Therefore, the solution obtained by this methodology is not B C. Linder subjective and thus, is generic and reproducible. Equipped with eigenvalue analysis, we are able to compute precisely the critical growth to initiate instabilities. Furthermore, this strategy allows us to compare different finite elements for this family of problems. Our results demonstrate that linear elements perform strikingly poorly, as compared to quadratic elements.

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A micromechanical model with strong discontinuities for failure in nonwovens at finite deformations

Cited by 18 publications

References 37 publications

On the enhancement of low-order mixed finite element methods for the large deformation analysis of diffusion in solids

On the enhancement of low-order mixed finite element methods for the large deformation analysis of diffusion in solids

A variational framework to model diffusion induced large plastic deformation and phase field fracture during initial two-phase lithiation of silicon electrodes

Computational aspects of growth-induced instabilities through eigenvalue analysis

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