Clustered generalized finite element methods for mesh unrefinement, non‐matching and invalid meshes

Duarte, C. Armando; Liszka, Tad J.; Tworzydlo, W. W.

doi:10.1002/nme.1862

Cited by 15 publications

(10 citation statements)

References 73 publications

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“…stress singularities, strong and weak discontinuities). To do so, new functions are added to the conventional basis functions that contain information regarding the local behavior 17, 24–31.…”

Section: Basics Of the Extended Finite Element Methods (Xfem)mentioning

confidence: 99%

On the performance of strain smoothing for quadratic and enriched finite element approximations (XFEM/GFEM/PUFEM)

Bordas

Kerfriden

Augarde

et al. 2011

Numerical Meth Engineering

153

103

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To date, the SFEM has only been investigated for bilinear and Wachspress approximations and is limited to linear reproducing conditions. The goal of this paper is to extend the strain smoothing to higher order elements and to investigate numerically in which condition strain smoothing is beneficial to accuracy and convergence of enriched finite element approximations. We focus on three widely used enrichment schemes, namely: (a) weak discontinuities; (b) strong discontinuities; (c) near-tip linear elastic fracture mechanics functions. The main conclusion is that strain smoothing in enriched approximation is only beneficial when the enrichment functions are polynomial (cases (a) and (b)), but that non-polynomial enrichment of type (c) lead to inferior methods compared to the standard enriched FEM (e.g. XFEM).

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Section: Basics Of the Extended Finite Element Methods (Xfem)mentioning

confidence: 99%

On the performance of strain smoothing for quadratic and enriched finite element approximations (XFEM/GFEM/PUFEM)

Bordas

Kerfriden

Augarde

et al. 2011

Numerical Meth Engineering

153

103

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“…Fig. 22 Construction of IGFEM enrichment function from X/GFEM formulation By clustering DOFs, i.e.,Û 1 =Û 2 = α, we reduce the number of enriched DOFs (Duarte et al 2006). The enrichment term is then given by:…”

Section: Discussionmentioning

confidence: 99%

“…It is worth noting, however, that IGFEM is not only closely related to X/GFEM, it can actually be derived from it by means of a proper choice of enrichment functions E ij and by clustering enriched DOFs (Duarte et al 2006). Appendix A shows this with a simple 1-D example.…”

Section: Relation To X/gfemmentioning

confidence: 99%

An interface-enriched generalized finite element method for level set-based topology optimization

Boom

Zhang

Keulen

et al. 2020

Struct Multidisc Optim

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During design optimization, a smooth description of the geometry is important, especially for problems that are sensitive to the way interfaces are resolved, e.g., wave propagation or fluid-structure interaction. A level set description of the boundary, when combined with an enriched finite element formulation, offers a smoother description of the design than traditional density-based methods. However, existing enriched methods have drawbacks, including ill-conditioning and difficulties in prescribing essential boundary conditions. In this work, we introduce a new enriched topology optimization methodology that overcomes the aforementioned drawbacks; boundaries are resolved accurately by means of the Interface-enriched Generalized Finite Element Method (IGFEM), coupled to a level set function constructed by radial basis functions. The enriched method used in this new approach to topology optimization has the same level of accuracy in the analysis as the standard finite element method with matching meshes, but without the need for remeshing. We derive the analytical sensitivities and we discuss the behavior of the optimization process in detail. We establish that IGFEM-based level set topology optimization generates correct topologies for well-known compliance minimization problems.

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“…Due to its generic applicability, clustering is used in a broad range of applications, e.g. in materials modeling, material discovery, general finite element simulations and other fields of engineering [5,6,7,8,9]. The fundamental assumption in this paper is that similar micro-structural state variables in neighboring integration points subjected to a similar deformation history would evolve along nearly identical trajectories in state space.…”

Section: Spatial Clustering In the Hms Softwarementioning

confidence: 99%

Spatial clustering strategies for hierarchical multi-scale modelling of metal plasticity

Khairullah

Gawąd

Roose

et al. 2017

Modelling Simul. Mater. Sci. Eng.

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Abstract. In multi-scale simulations of material forming processes, macroscopic zones of nearly homogeneous strain response occur. In such zones the evolution of plastic anisotropy at each finite element integration point can be approximated from the properties at a representative point. We show how these zones can be identified by a clustering algorithm and can be utilized to reduce the computational cost of the simulation.1

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Clustered generalized finite element methods for mesh unrefinement, non‐matching and invalid meshes

Cited by 15 publications

References 73 publications

On the performance of strain smoothing for quadratic and enriched finite element approximations (XFEM/GFEM/PUFEM)

On the performance of strain smoothing for quadratic and enriched finite element approximations (XFEM/GFEM/PUFEM)

An interface-enriched generalized finite element method for level set-based topology optimization

Spatial clustering strategies for hierarchical multi-scale modelling of metal plasticity

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