Explicit mixed strain–displacement finite elements for compressible and quasi-incompressible elasticity and plasticity

Cervera, Miguel; Lafontaine, N. M.; Rossi, Riccardo; Chiumenti, Michele

doi:10.1007/s00466-016-1305-z

Cited by 10 publications

(8 citation statements)

References 49 publications

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“…More recently, Cervera et al pursued a mixed finite element implementation based on the OSS approach, with nodal finite element spaces for the displacements and strains, in both dynamic and static regimes, using Mohr‐Coulomb and Drucker‐Prager plasticity models. With the exception of the work of Cervera et al, all these works presented only static computations.…”

Section: Overview Of Recent Work On Tetrahedral Finite Elementsmentioning

confidence: 99%

“…It is important to note that the OSS approach requires storing an additional pressure gradient field, with an increase in computational cost with respect to the HFB approach . More recently, Cervera et al pursued a mixed finite element implementation based on the OSS approach, with nodal finite element spaces for the displacements and strains, in both dynamic and static regimes, using Mohr‐Coulomb and Drucker‐Prager plasticity models. With the exception of the work of Cervera et al, all these works presented only static computations.…”

Section: Overview Of Recent Work On Tetrahedral Finite Elementsmentioning

confidence: 99%

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Elastoplasticity with linear tetrahedral elements: A variational multiscale method

Abboud

Scovazzi

2018

Numerical Meth Engineering

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Summary We present a computational framework for the simulation of J2‐elastic/plastic materials in complex geometries based on simple piecewise linear finite elements on tetrahedral grids. We avoid spurious numerical instabilities by means of a specific stabilization method of the variational multiscale kind. Specifically, we introduce the concept of subgrid‐scale displacements, velocities, and pressures, approximated as functions of the governing equation residuals. The subgrid‐scale displacements/velocities are scaled using an effective (tangent) elastoplastic shear modulus, and we demonstrate the beneficial effects of introducing a subgrid‐scale pressure in the plastic regime. We provide proofs of stability and convergence of the proposed algorithms. These methods are initially presented in the context of static computations and then extended to the case of dynamics, where we demonstrate that, in general, naïve extensions of stabilized methods developed initially for static computations seem not effective. We conclude by proposing a dynamic version of the stabilizing mechanisms, which obviates this problematic issue. In its final form, the proposed approach is simple and efficient, as it requires only minimal additional computational and storage cost with respect to a standard finite element relying on a piecewise linear approximation of the displacement field.

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Section: Overview Of Recent Work On Tetrahedral Finite Elementsmentioning

confidence: 99%

Section: Overview Of Recent Work On Tetrahedral Finite Elementsmentioning

confidence: 99%

Elastoplasticity with linear tetrahedral elements: A variational multiscale method

Abboud

Scovazzi

2018

Numerical Meth Engineering

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“…Our first step is then to describe a general mixed form of the shifted boundary method that applies to the entire surrogate domain

{\tilde{Ω}}_{h}

. Note that other choices of mixed formulations are applicable for the same purpose, 39‐44,47,48,50‐53 and the discussion to follow in Section 3.4 is not confined to the specific mixed formulation considered here. Let

V_{u, h} ({\tilde{Ω}}_{h})

and

V_{ε, h} ({\tilde{Ω}}_{h})

be the discrete, globally continuous trial and test function spaces for the displacement

u

and strain

ε

.…”

Section: The Shifted Boundary Methodsmentioning

confidence: 99%

The shifted boundary method for solid mechanics

Atallah

Canuto

Scovazzi

2021

Numerical Meth Engineering

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“…Especially the strictness of the latter has motivated the twofold focus of researchers to modify mixed formulations in order to circumvent stability issues or to explore the stability of newly proposed elements. Among stabilization techniques proposed to achieve stable elements irrespective of the inf-sup condition, it is worth mentioning Galerkin least square stabilization [42], bubble enrichment of displacement field [4,53,19] and variational multi-scale formulations [21,22,23]. On the other hand, an analytical proof of mixed element stability would be an indisputable achievement.…”

Section: Consistent Tangent Stiffness Matrixmentioning

confidence: 99%

An Overview of Mixed Finite Elements for the Analysis of Inelastic Bidimensional Structures

Nodargi

2018

Arch Computat Methods Eng

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As inelastic structures are ubiquitous in many engineering fields, a central task in computational mechanics is to develop accurate, robust and efficient tools for their analysis. Motivated by the poor performances exhibited by standard displacement-based finite element formulations, attention is here focused on the use of mixed methods as approximation technique, within the small strain framework, for the mechanical problem of inelastic bidimensional structures. Despite a great flexibility characterizes mixed element formulations, several theoretical and numerical aspects have to be carefully taken into account in the design of a high-performance element. The present work aims at providing the basis for methodological analysis and comparison in such aspects, within the unified mathematical setting supplied by generalized standard material model and with special interest towards elastoplastic media. A critical review of the state-of-the-art computational methods is delivered in regard to variational formulations, selection of interpolation spaces, numerical solution strategies and numerical stability. Though those arguments are interrelated, a topic-oriented presentation is resorted to, for the very rich available literature to be properly examined. Finally, the performances of several significant mixed finite element formulations are investigated in numerical simulations.

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Explicit mixed strain–displacement finite elements for compressible and quasi-incompressible elasticity and plasticity

Cited by 10 publications

References 49 publications

Elastoplasticity with linear tetrahedral elements: A variational multiscale method

Elastoplasticity with linear tetrahedral elements: A variational multiscale method

The shifted boundary method for solid mechanics

An Overview of Mixed Finite Elements for the Analysis of Inelastic Bidimensional Structures

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