Summation rules for a fully nonlocal energy-based quasicontinuum method

Amelang, Jeffrey S.; Venturini, Gabriela; Kochmann, Dennis M.

doi:10.1016/j.jmps.2015.03.007

Cited by 44 publications

(53 citation statements)

References 56 publications

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“…Since A 0 (x) is typically not known for heterogeneous materials, the ansatz of FE-HMM is to approximate the virtual work expression at point x K l in the semidiscrete form (10) by another bilinear form using the known microheterogeneous elasticity tensor A , see (11). According to this approximation, the solution u h K δ is obtained on microsampling domains K δ = x K l + δ [−1/2, +1/2] d , δ ≥ , which are each centered at the quadrature points x K l of K, l = 1, .…”

Section: The Modified Macro Bilinear Form Of Fe-hmmmentioning

confidence: 99%

The heterogeneous multiscale finite element method FE‐HMM for the homogenization of linear elastic solids

Eidel

Fischer

2016

Proc Appl Math and Mech

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The objective of the present paper is a formulation of the Heterogeneous Multiscale Finite Element Method (FE-HMM) for the homogenization of linear elastic solids in a geometrical linear frame, and doing so, for the first time, of a vector-valued field problem. The macro stiffness is estimated by stiffness sampling on heterogeneous microdomains in terms of a modified quadrature formula, which implies an equivalence of energy densities of the microscale with the macroscale. Existing a-priori estimates are assessed and used for optimal micro-macro refinement strategies in the H 1 -norm and the L 2 -norm.

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Section: The Modified Macro Bilinear Form Of Fe-hmmmentioning

confidence: 99%

The heterogeneous multiscale finite element method FE‐HMM for the homogenization of linear elastic solids

Eidel

Fischer

2016

Proc Appl Math and Mech

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“…Dow and Baskes have proposed the EAM potential, which is a multibody potential [20–21]. In this study, the temperature used in the simulations was 0 K for all cases.…”

Section: Methodsmentioning

confidence: 99%

Fatigue crack growth characteristics of Fe and Ni under cyclic loading using a quasi-continuum method

Qiu¹,

Lin²,

Fang³

2018

Beilstein J. Nanotechnol.

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A quasi-continuum (QC) method based on the embedded atom method (EAM) potential was employed to investigate the fatigue crack growth and expansion characteristics of single-crystal Fe and Ni under cyclic loading modes I and II. In particular, the crack growth and expansion characteristics of Fe and Ni under cyclic loading were evaluated in terms of atomic stress fields and force–distance curves. The simulation results indicated that under cyclic loading, the initially damaged area of the crack will coalesce again after compression or shear to the initial geometry leading to a strengthening of the material. If no coalescence appears, the crack spreads rapidly and the material breaks. Moreover, under the cyclic loading of shear at any orientation, the slip dislocation observed in the materials considerably affects the release of stress.

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Section: The Modified Macro Bilinear Form Of Fe-hmmmentioning

confidence: 99%

The heterogeneous multiscale finite element method for the homogenization of linear elastic solids and a comparison with the FE2 method

Eidel

Fischer

2018

Computer Methods in Applied Mechanics and Engineering

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The Heterogeneous Multiscale Finite Element Method (FE-HMM) is a two-scale FEM based on asymptotic homogenization for solving multiscale partial differential equations. It was introduced in [W. E and B. Engquist, Commun. Math. Sci., 1 (2003), 87-132]. The objective of the present work is an FE-HMM formulation for the homogenization of linear elastic solids in a geometrical linear frame, and doing so, of a vector-valued field problem. A key ingredient of FE-HMM is that macrostiffness is estimated by stiffness sampling on heterogeneous microdomains in terms of a modified quadrature formula, which implies an equivalence of energy densities of the microscale with the macroscale. Beyond this coincidence with the Hill-Mandel condition, which is the cornerstone of the FE 2 method, we elaborate a conceptual comparison with the latter method. After developing an algorithmic framework we (i) assess the existing a priori convergence estimates for the micro-and macro-errors in various norms, (ii) verify optimal strategies in uniform micro-macro mesh refinements based on the estimates, (iii) analyze superconvergence properties of FE-HMM, and (iv) compare FE-HMM with FE 2 by numerical results.

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Summation rules for a fully nonlocal energy-based quasicontinuum method

Cited by 44 publications

References 56 publications

The heterogeneous multiscale finite element method FE‐HMM for the homogenization of linear elastic solids

The heterogeneous multiscale finite element method FE‐HMM for the homogenization of linear elastic solids

Fatigue crack growth characteristics of Fe and Ni under cyclic loading using a quasi-continuum method

The heterogeneous multiscale finite element method for the homogenization of linear elastic solids and a comparison with the FE2 method

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