Voxel‐based finite elements with hourglass control in fast Fourier transform‐based computational homogenization

Schneider, Matti

doi:10.1002/nme.7114

Cited by 12 publications

(12 citation statements)

References 108 publications

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“…where we used the Lipschitz continuity (12) and the a priori estimate (24). Thus, the bound (28) shows that the effective stresses converge at least as fast as the H 1 0 -norm of the local displacement field.…”

Section: Background and Assumptionsmentioning

confidence: 99%

“…where we used the a priori estimate (24) and the definition (36) of the field 𝜉 h . This estimate has a few direct implications 1.…”

Section: Superconvergence Of Effective Stressesmentioning

confidence: 99%

“…Such a behavior does not come unexpected for the Moulinec-Suquet discretization, 7,48 as it is prone to the well-known ringing artifacts characteristic for Fourier-type discretizations. Please keep in mind that other popular discretizations in FFT-based computational micromechanics, see Schneider 24 for a recent overview, are also characterized by high errors at interfaces, essentially due to the jagged interfaces resulting from voxel discretizations.…”

Section: Planar Glass-fiber Reinforced Polyamidementioning

confidence: 99%

“…For a start, fully integrated finite elements on regular grids can be handled by FFT‐based methods, 21‐23 but do not give rise to the best compromise between accuracy and computational effort. Indeed, fully integrated elements require either a higher computational effort or an increased memory footprint, and computational experiments suggest their accuracy is not superior compared to more traditional discretizations (Reference 24, section 1.2). Thus, we decided to investigate the most popular discretizations employed in FFT‐based methods instead.…”

Section: Introductionmentioning

confidence: 99%

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Superconvergence of the effective Cauchy stress in computational homogenization of inelastic materials

Schneider

Wicht

2022

Numerical Meth Engineering

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We provide theoretical investigations and empirical evidence that the effective stresses in computational homogenization of inelastic materials converge with a higher rate than the local solution fields. Due to the complexity of industrial-scale microstructures, computational homogenization methods often utilize a rather crude approximation of the microstructure, favoring regular grids over accurate boundary representations. As the accuracy of such an approach has been under continuous verification for decades, it appears astonishing that this strategy is successful in homogenization, but is seldom used on component scale. A part of the puzzle has been solved recently, as it was shown that the effective elastic properties converge with twice the rate of the local strain and stress fields. Thus, although the local mechanical fields may be inaccurate, the averaging process leads to a cancellation of errors and improves the accuracy of the effective properties significantly. Unfortunately, the original argument is based on energetic considerations. The straightforward extension to the inelastic setting provides superconvergence of (pseudoelastic) potentials, but does not cover the primary quantity of interest: the effective stress tensor. The purpose of the work at hand is twofold. On the one hand, we provide extensive numerical experiments on the convergence rate of local and effective quantities for computational homogenization methods based on the fast Fourier transform. These indicate the superconvergence effect to be valid for effective stresses, as well. Moreover, we provide theoretical justification for such a superconvergence based on an argument that avoids energetic reasoning.

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Section: Background and Assumptionsmentioning

confidence: 99%

“…where we used the a priori estimate (24) and the definition (36) of the field 𝜉 h . This estimate has a few direct implications 1.…”

Section: Superconvergence Of Effective Stressesmentioning

confidence: 99%

Section: Planar Glass-fiber Reinforced Polyamidementioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Superconvergence of the effective Cauchy stress in computational homogenization of inelastic materials

Schneider

Wicht

2022

Numerical Meth Engineering

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“…The latter solves the discrete equations with a solver based on a suitable algorithm e.g conjugate gradient, minimal residual iterative schemes (see e.g Saad, 2003; Barrett et al, 1994, and the references therein). Depending on the discretization schemes, solvers can be constructed based on FFT techniques, e.g spectral Galerkin (Fata and Gray, 2009;Hu et al, 2022), finite difference (Feng and S., 2020;Costa, 2022;Ren et al, 2022;Willot et al, 2014), finite element (Schneider, 2022;Zeman et al, 2017), finite volume (Nunez et al, 2012), discrete element (Calvet et al, 2022),... Among the numerical methods, the class of Fourier Transform methods used in the present work has seen a fast development in the recent years, but with very few developments for problems involving cracks.…”

Section: Introductionmentioning

confidence: 99%

Fourier Transform approach to numerical homogenization of periodic media containing sharp insulating and superconductive cracks

Bonnet

2023

Computer Methods in Applied Mechanics and Engineering

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Adaptive material evaluation by stabilized octree and sandwich coarsening in FFT‐based computational micromechanics

Kabel,

Schneider

2023

Numerical Meth Engineering

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The computational efficiency of FFT‐based computational micromechanics is deeply rooted in the underlying regular, that is, Cartesian, discretization. The bottleneck for most industrial applications is evaluating the typically rather expensive constitutive law on the regular grid. In the work at hand, we exploit coarsening strategies to evaluate the material law with the intention of speeding up the overall computation time while retaining the level of achieved accuracy. Inspired by wavelet‐compression techniques, we form aggregates of voxels where the local strain tensors are close, and compute the stresses on these coarsened elements. If done naively, such a strategy will lead to intrinsic instabilities whose origin is apparent from a mathematical perspective. As a remedy, we introduce a stabilization technique which is inspired by hourglass control well‐known for underintegrated finite elements. We introduce octree as well as sandwich coarsening, discuss the handling of internal variables, report on the efficient implementation of the concepts and demonstrate the effectiveness of the developed technology on simple as well as industrial examples.

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Voxel‐based finite elements with hourglass control in fast Fourier transform‐based computational homogenization

Cited by 12 publications

References 108 publications

Superconvergence of the effective Cauchy stress in computational homogenization of inelastic materials

Superconvergence of the effective Cauchy stress in computational homogenization of inelastic materials

Fourier Transform approach to numerical homogenization of periodic media containing sharp insulating and superconductive cracks

Adaptive material evaluation by stabilized octree and sandwich coarsening in FFT‐based computational micromechanics

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