A continuum and computational framework for viscoelastodynamics. III: A nonlinear theory
From MaRDI portal
Publication:6595913
DOI10.1016/j.cma.2024.117248MaRDI QIDQ6595913
Jia-wei Luo, Ju Liu, Chongran Zhao, Jiashen Guan
Publication date: 30 August 2024
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
continuum mechanicsviscoelasticityconstitutive modelinggeneralized strainsGreen-Naghdi plasticityhyperelasticity of Hill's class
Cites Work
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Title not available (Why is that?)
- Geometry of logarithmic strain measures in solid mechanics
- Modeling viscoelastic dielectrics
- Anisotropic finite strain viscoelasticity based on the Sidoroff multiplicative decomposition and logarithmic strains
- On the kinematics of finite strain plasticity
- A thermoviscoelastic model for amorphous shape memory polymers: incorporating structural and stress relaxation
- A critical review of the state of finite plasticity
- Allgemeine Kontinuumstheorie der Versetzungen und Eigenspannungen
- Finite deformation constitutive equations and a time integration procedure for isotropic, hyperelastic-viscoplastic solids
- Modeling the anisotropic finite-deformation viscoelastic behavior of soft fiber-reinforced composites
- The exponentiated Hencky-logarithmic strain energy. I: Constitutive issues and rank-one convexity
- A unified approach to finite deformation elastoplastic analysis based on the use of hyperelastic constitutive equations
- On a fully three-dimensional finite-strain viscoelastic damage model: Formulation and computational aspects
- Issues on the constitutive formulation at large elastoplastic deformations. I: Kinematics
- A prescription for the identification of finite plastic strain
- Mullins' effect and the strain amplitude dependence of the storage modulus
- Algorithms for static and dynamic multiplicative plasticity that preserve the classical return mapping schemes of the infinitesimal theory
- Associative coupled thermoplasticity at finite strains: Formulation, numerical analysis and implementation
- A theory of finite viscoelasticity and numerical aspects
- A constitutive frame of elastoplasticity at large strains based on the notion of a plastic metric
- Energy consistent algorithms for dynamic finite deformation plasticity
- An extension of Herrmann's principle to nonlinear elasticity
- A new viscoelastic constitutive model for continuous media at finite thermomechanical changes
- A simple orthotropic finite elasto-plasticity model based on generalized stress-strain measures
- Superimposed finite elastic-viscoelastic-plastoelastic stress response with damage in filled rubbery polymers. Experiments, modelling and algorithmic implementation
- A generalized-\(\alpha\) method for integrating the filtered Navier-Stokes equations with a stabilized finite element method
- Kinematics and kinetics modeling of thermoelastic continua based on the multiplicative decomposition of the deformation gradient
- Hencky's elasticity model and linear stress-strain relations in isotropic finite hyperelasticity
- A general framework for the numerical solution of problems in finite elasto-plasticity
- A formulation of finite elastoplasticity based on dual co- and contra-variant eigenvector triads normalized with respect to a plastic metric
- Anisotropic additive plasticity in the logarithmic strain space: Modular kinematic formulation and implementation based on incremental minimization principles for standard materials.
- Three-dimensional incompressible viscoelasticity in large strains: Formulation and numerical approximation
- Constitutive modeling of the large strain time-dependent behavior of elastomers.
- Plastic spin: Necessity or redundancy?
- A unified continuum and variational multiscale formulation for fluids, solids, and fluid-structure interaction
- A computationally efficient locking free numerical framework for modeling visco-hyperelastic dielectric elastomers
- Derivation of \(\mathbf{F} = \mathbf{F}^{\operatorname{e}} \mathbf{F}^{\operatorname{p}}\) as the continuum limit of crystalline slip
- Viscoelastic up-scaling rank-one effects in in-silico modelling of electro-active polymers
- A continuum and computational framework for viscoelastodynamics. I: Finite deformation linear models
- Objective symmetrically physical strain tensors, conjugate stress tensors, and Hill's linear isotropic hyperelastic material models
- Hyperelastic energy densities for soft biological tissues: a review
- A general theory of an elastic-plastic continuum
- Hill's class of compressible elastic materials and finite bending problems: exact solutions in unified form
- Fitting hyperelastic models to experimental data
- An explicit solution for implicit time stepping in multiplicative finite strain viscoelasticity
- A family of metric strains and conjugate stresses, prolonging usual material laws from small to large transformations
- The decomposition \(\mathbf F = \mathbf F^{\text e}\mathbf F^{\text b}\), material symmetry, and plastic irrotationality for solids that are isotropic-viscoplastic or amorphous
- Relations between material, intermediate and spatial generalized strain measures for anisotropic multiplicative inelasticity
- Elastoplasticity beyond small deformations
- On constitutive inequalities for simple materials. I
- Some remarks on elastic-plastic deformation at finite strain
- A theorem of tensor calculus and its application to isotropic elasticity
- On the application of the additive decomposition of generalized strain measures in large strain plasticity
- A new two-point deformation tensor and its relation to the classical kinematical framework and the stress concept
- A robust algorithm for finding the eigenvalues and eigenvectors of \(3 \times 3\) symmetric matrices
- Anisotropic finite strain viscoelasticity: constitutive modeling and finite element implementation
- Nonlinear solid mechanics. A continuum approach for engineering
- Algorithms for computation of stresses and elasticity moduli in terms of Seth-Hill's family of generalized strain tensors
- On a Variational Principle for Elastic Displacements and Pressure
- Non-polyconvexity of the stored energy function of a Saint Venant-Kirchhoff material
- A Remark on the Use of the Decomposition F = FeFp in Plasticity
- Aspects of Invariance in Solid Mechanics
- On the origins of the idea of the multiplicative decomposition of the deformation gradient
- Elastic-Plastic Deformation at Finite Strains
- The Thermodynamics of Irreversible Processes. IV. The Theory of Elasticity and Anelasticity
- On the formulation and numerical solution of problems in anisotropic finite plasticity
- Variational schemes and mixed finite elements for large strain isotropic elasticity in principal stretches: Closed‐form tangent eigensystems, convexity conditions, and stabilised elasticity
- Multifield finite strain plasticity: theory and numerics
- A structure-preserving integrator for incompressible finite elastodynamics based on a Grad-div stabilized mixed formulation with particular emphasis on stretch-based material models
- A continuum and computational framework for viscoelastodynamics. II: Strain-driven and energy-momentum consistent schemes
- An energy-stable mixed formulation for isogeometric analysis of incompressible hyperelastodynamics
This page was built for publication: A continuum and computational framework for viscoelastodynamics. III: A nonlinear theory
Report a bug (only for logged in users!)Click here to report a bug for this page (MaRDI item Q6595913)
