Asymptotic homogenization of phase-field fracture model: an efficient multiscale finite element framework for anisotropic fracture
DOI10.1002/nme.7489zbMATH Open1546.74074MaRDI QIDQ6592354
Xue-Ling Luo, L. W. Zhang, Pu-Song Ma, Shaofan Li, Xingcheng Liu
Publication date: 26 August 2024
Published in: International Journal for Numerical Methods in Engineering (Search for Journal in Brave)
heterogeneous materialcrack deflection anglematerial parameter equationtwo-field coupled boundary value problem
Anisotropy in solid mechanics (74E10) Brittle fracture (74R10) Analytic approximation of solutions (perturbation methods, asymptotic methods, series, etc.) of equilibrium problems in solid mechanics (74G10) Finite element methods applied to problems in solid mechanics (74S05) Homogenization in equilibrium problems of solid mechanics (74Q05)
Cites Work
- Unnamed Item
- A phase field model for rate-independent crack propagation: robust algorithmic implementation based on operator splits
- Damage and size effects in elastic solids: a homogenization approach
- Regularized formulation of the variational brittle fracture with unilateral contact: numerical experiments
- Revisiting brittle fracture as an energy minimization problem
- Computational chemo-thermo-mechanical coupling phase-field model for complex fracture induced by early-age shrinkage and hydration heat in cement-based materials
- Data-driven variational multiscale reduced order models
- Damage evolution of polymer-matrix multiphase composites under coupled moisture effects
- Temporal scale-bridging of chemistry in a multiscale model: application to reactivity of an energetic material
- Fracture phase field modeling of 3D stitched composite with optimized suture design
- A concurrent multiscale study of dynamic fracture
- An assessment of multiscale asymptotic expansion method for linear static problems of periodic composite structures
- An adaptive multiscale phase field method for brittle fracture
- Asymptotic expansion homogenization of discrete fine-scale models with rotational degrees of freedom for the simulation of quasi-brittle materials
- A concurrent multiscale method based on smoothed molecular dynamics for large-scale parallel computation at finite temperature
- Thermodynamically consistent algorithms for a finite-deformation phase-field approach to fracture
- Thermodynamically consistent phase-field models of fracture: Variational principles and multi-field FE implementations
- Homogenization and damage for composite structures
- A nonlinear and rate-dependent fracture phase field framework for multiple cracking of polymer
- A second-order strain gradient fracture model for the brittle materials with micro-cracks by a multiscale asymptotic homogenization
- A phase‐field porous media fracture model based on homogenization theory
- A generalized phase field multiscale finite element method for brittle fracture
- An optimization-based phase-field method for continuous-discontinuous crack propagation
Related Items (1)
This page was built for publication: Asymptotic homogenization of phase-field fracture model: an efficient multiscale finite element framework for anisotropic fracture
