Nonlocal operator method for dynamic brittle fracture based on an explicit phase field model

Research output: Contribution to journalArticleResearchpeer review

Authors

  • Xiaoying Zhuang
  • Huilong Ren
  • Timon Rabczuk

Research Organisations

External Research Organisations

  • Tongji University
  • Bauhaus-Universität Weimar
  • Ton Duc Thang University
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Details

Original languageEnglish
Article number104380
JournalEuropean Journal of Mechanics, A/Solids
Volume90
Early online date4 Aug 2021
Publication statusPublished - Nov 2021

Abstract

In this work, we present a nonlocal operator method (NOM) for dynamic fracture exploiting an explicit phase field model. The nonlocal strong forms of the phase field and the associated mechanical model are derived as integral forms by variational principle. The equations are decoupled and solved in time by an explicit scheme employing the Verlet-velocity algorithm for the mechanical field and an adaptive sub-step scheme for the phase field model. The sub-step scheme reduces phase field residual adaptively in a few substeps and thus achieves a rate-independent phase field model. The explicit scheme avoids the calculation of the anisotropic stiffness tensor in the implicit phase field model. One advantage of the NOM is its ease in implementation. The method does not require any shape functions and the associated matrices and vectors are obtained automatically after defining the energy of the system. Hence, the approach can be easily extended to more complex coupled problems. Several numerical examples are presented to demonstrate the performance of the current method.

Keywords

    Dual-horizon peridynamics, Explicit phase field, Integral form, Nonlocal operator, Nonlocal strong form

ASJC Scopus subject areas

Cite this

Nonlocal operator method for dynamic brittle fracture based on an explicit phase field model. / Zhuang, Xiaoying; Ren, Huilong; Rabczuk, Timon.
In: European Journal of Mechanics, A/Solids, Vol. 90, 104380, 11.2021.

Research output: Contribution to journalArticleResearchpeer review

Zhuang X, Ren H, Rabczuk T. Nonlocal operator method for dynamic brittle fracture based on an explicit phase field model. European Journal of Mechanics, A/Solids. 2021 Nov;90:104380. Epub 2021 Aug 4. doi: 10.1016/j.euromechsol.2021.104380
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abstract = "In this work, we present a nonlocal operator method (NOM) for dynamic fracture exploiting an explicit phase field model. The nonlocal strong forms of the phase field and the associated mechanical model are derived as integral forms by variational principle. The equations are decoupled and solved in time by an explicit scheme employing the Verlet-velocity algorithm for the mechanical field and an adaptive sub-step scheme for the phase field model. The sub-step scheme reduces phase field residual adaptively in a few substeps and thus achieves a rate-independent phase field model. The explicit scheme avoids the calculation of the anisotropic stiffness tensor in the implicit phase field model. One advantage of the NOM is its ease in implementation. The method does not require any shape functions and the associated matrices and vectors are obtained automatically after defining the energy of the system. Hence, the approach can be easily extended to more complex coupled problems. Several numerical examples are presented to demonstrate the performance of the current method.",
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N1 - Funding Information: The authors acknowledge the supports from the the National Basic Research Program of China (973 Program: 2011CB013800 ) and NSFC ( 51474157 ), the Ministry of Science and Technology of China (Grant No. SLDRCE14-B-28 , SLDRCE14-B-31 ). All authors approved the version of the manuscript to be published.

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N2 - In this work, we present a nonlocal operator method (NOM) for dynamic fracture exploiting an explicit phase field model. The nonlocal strong forms of the phase field and the associated mechanical model are derived as integral forms by variational principle. The equations are decoupled and solved in time by an explicit scheme employing the Verlet-velocity algorithm for the mechanical field and an adaptive sub-step scheme for the phase field model. The sub-step scheme reduces phase field residual adaptively in a few substeps and thus achieves a rate-independent phase field model. The explicit scheme avoids the calculation of the anisotropic stiffness tensor in the implicit phase field model. One advantage of the NOM is its ease in implementation. The method does not require any shape functions and the associated matrices and vectors are obtained automatically after defining the energy of the system. Hence, the approach can be easily extended to more complex coupled problems. Several numerical examples are presented to demonstrate the performance of the current method.

AB - In this work, we present a nonlocal operator method (NOM) for dynamic fracture exploiting an explicit phase field model. The nonlocal strong forms of the phase field and the associated mechanical model are derived as integral forms by variational principle. The equations are decoupled and solved in time by an explicit scheme employing the Verlet-velocity algorithm for the mechanical field and an adaptive sub-step scheme for the phase field model. The sub-step scheme reduces phase field residual adaptively in a few substeps and thus achieves a rate-independent phase field model. The explicit scheme avoids the calculation of the anisotropic stiffness tensor in the implicit phase field model. One advantage of the NOM is its ease in implementation. The method does not require any shape functions and the associated matrices and vectors are obtained automatically after defining the energy of the system. Hence, the approach can be easily extended to more complex coupled problems. Several numerical examples are presented to demonstrate the performance of the current method.

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