Variational crack phase-field model for ductile fracture with elastic and plastic damage variables
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Publication:2083184
DOI10.1016/j.cma.2022.115577OpenAlexW4294988505MaRDI QIDQ2083184
Kenjiro Terada, Seishiro Matsubara, Jike Han, Shuji Moriguchi
Publication date: 10 October 2022
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cma.2022.115577
Brittle fracture (74R10) Small-strain, rate-independent theories of plasticity (including rigid-plastic and elasto-plastic materials) (74C05)
Related Items (4)
Extended B‐spline‐based implicit material point method enhanced by F‐bar projection method to suppress pressure oscillation ⋮ A transition scheme from diffusive to discrete crack topologies at finite strain during the course of a staggered iterative procedure ⋮ A concise review of small-strain phase-field modeling of ductile fracture ⋮ Crack phase‐field enhanced finite cover method for dynamic fracture at finite strain
Cites Work
- A phase-field model for ductile fracture at finite strains and its experimental verification
- A higher-order phase-field model for brittle fracture: formulation and analysis within the isogeometric analysis framework
- Gradient damage models coupled with plasticity and nucleation of cohesive cracks
- A phase field model for rate-independent crack propagation: robust algorithmic implementation based on operator splits
- A phase-field description of dynamic brittle fracture
- Variational gradient plasticity at finite strains. I: Mixed potentials for the evolution and update problems of gradient-extended dissipative solids
- Variational gradient plasticity at finite strains. II: Local-global updates and mixed finite elements for additive plasticity in the logarithmic strain space
- Regularized formulation of the variational brittle fracture with unilateral contact: numerical experiments
- Computational inelasticity
- Numerical experiments in revisited brittle fracture
- A modified Gurson-type plasticity model at finite strains: formulation, numerical analysis and phase-field coupling
- Plasticity. Mathematical theory and numerical analysis.
- Revisiting brittle fracture as an energy minimization problem
- Variational phase-field formulation of non-linear ductile fracture
- On penalization in variational phase-field models of brittle fracture
- A review on phase-field models of brittle fracture and a new fast hybrid formulation
- Phase-field modeling of fatigue coupled to cyclic plasticity in an energetic formulation
- Crack phase-field model equipped with plastic driving force and degrading fracture toughness for ductile fracture simulation
- Phase-field modeling of porous-ductile fracture in non-linear thermo-elasto-plastic solids
- A framework to model the fatigue behavior of brittle materials based on a variational phase-field approach
- A ductile phase-field model based on degrading the fracture toughness: theory and implementation at small strain
- Phase field modeling of ductile fracture at large plastic strains using adaptive isotropic remeshing
- A phase-field formulation for fracture in ductile materials: finite deformation balance law derivation, plastic degradation, and stress triaxiality effects
- A hybrid XFEM-phase field (\textit{Xfield}) method for crack propagation in brittle elastic materials
- Coupled phase-field and plasticity modeling of geological materials: from brittle fracture to ductile flow
- Phase-field modeling of ductile fracture
- A time-discrete model for dynamic fracture based on crack regularization
- Damage-plastic model for concrete failure
- Fracture models for elasto-plastic materials as limits of gradient damage models coupled with plasticity: the antiplane case
- Phase field modeling of fracture in multi-physics problems. II: Coupled brittle-to-ductile failure criteria and crack propagation in thermo-elastic-plastic solids
- A variational phase-field model for ductile fracture with coalescence dissipation
- Thermodynamically consistent algorithms for a finite-deformation phase-field approach to fracture
- Optimal approximations by piecewise smooth functions and associated variational problems
- Thermodynamically consistent phase-field models of fracture: Variational principles and multi-field FE implementations
- Approximation of functional depending on jumps by elliptic functional via t-convergence
- The Linear Complementarity Problem
- EXISTENCE OF SOLUTIONS TO A REGULARIZED MODEL OF DYNAMIC FRACTURE
- Isogeometric Analysis
- On phase field modeling of ductile fracture
- Comparison of Phase-Field Models of Fracture Coupled with Plasticity
- VI. The phenomena of rupture and flow in solids
- Nonlinear Continuum Mechanics for Finite Element Analysis
- The Linear Complementarity Problem
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