Advancements in Phase-Field Modeling for Fracture in Nonlinear Elastic Solids under Finite Deformations

Zhang, Gang; Tang, Cheng; Chen, Peng; Long, Gongbo; Cao, Jiyin; Tang, Shan

doi:10.3390/math11153366

Cited by 2 publications

(3 citation statements)

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“…The phase field method (PFM) has become a popular numerical method for the analysis of the crack problems in recent years, since its implementation is free of crack tracking algorithms, enabling relatively easy simulation of complicated crack patterns, such as nucleation, branching, and coalescence [25][26][27][28]. The PFM, however, requires highly fine discretization due to the small length scale and becomes staggeringly computationalresource intensive as a result [29][30][31], severely limiting its application in actual industry. In addition, the PFM is usually incorporated with the finite element method (FEM) during implementation.…”

Section: Introductionmentioning

confidence: 99%

“…In addition, the PFM is usually incorporated with the finite element method (FEM) during implementation. Therefore, some computational issues of the FEM, such as sensitivity to geometry of the domain and size of discretization, also affect the PFM [31][32][33].…”

Section: Introductionmentioning

confidence: 99%

“…Among various numerical methods for the analysis of the crack problems to compute crack opening displacement, the boundary element method (BEM) is widely chosen, because it only discretizes boundaries of a domain of interest and consequently enables a more-efficient computation and a more-convenient implementation [34][35][36][37], while most of the other methods, such as the PFM or FEM, require discretization of the whole domain [31]. Furthermore, the BEM exploits existed analytical fundamental solutions, ensuring a potentially more accurate computation [38][39][40][41].…”

Section: Introductionmentioning

confidence: 99%

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A Boundary-Element Analysis of Crack Problems in Multilayered Elastic Media: A Review

Lan,

Zhou,

et al. 2023

Mathematics

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Crack problems in multilayered elastic media have attracted extensive attention for years due to their wide applications in both a theoretical analysis and practical industry. The boundary element method (BEM) is widely chosen among various numerical methods to solve the crack problems. Compared to other numerical methods, such as the phase field method (PFM) or the finite element method (FEM), the BEM ensures satisfying accuracy, broad applicability, and satisfactory efficiency. Therefore, this paper reviews the state-of-the-art progress in a boundary-element analysis of the crack problems in multilayered elastic media by concentrating on implementations of the two branches of the BEM: the displacement discontinuity method (DDM) and the direct method (DM). The review shows limitation of the DDM in applicability at first and subsequently reveals the inapplicability of the conventional DM for the crack problems. After that, the review outlines a pre-treatment that makes the DM applicable for the crack problems and presents a DM-based method that solves the crack problems more efficiently than the conventional DM but still more slowly than the DDM. Then, the review highlights a method that combines the DDM and the DM so that it shares both the efficiency of the DDM and broad applicability of the DM after the pre-treatment, making it a promising candidate for an analysis of the crack problems. In addition, the paper presents numerical examples to demonstrate an even faster approximation with the combined method for a thin layer, which is one of the challenges for hydraulic-fracturing simulation. Finally, the review concludes with a comprehensive summary and an outlook for future study.

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