A variational differential quadrature solution to finite deformation problems of hyperelastic shell-type structures: a two-point formulation in Cartesian coordinates
From MaRDI portal
Publication:2164519
DOI10.1007/s10483-022-2887-9zbMath1492.74107OpenAlexW4288535466MaRDI QIDQ2164519
Publication date: 15 August 2022
Published in: AMM. Applied Mathematics and Mechanics. (English Edition) (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10483-022-2887-9
large deformationshellfirst Piola Kirchhoff stress tensor and deformation gradient tensor (\(\boldsymbol{P}\)-\(\boldsymbol{F}\)) formulationseven-parameter shell theoryvariational differential quadrature (VDQ) technique
Cites Work
- On a stress resultant geometrically exact shell model. I: Formulation and optimal parametrization
- Stability and asymmetric vibrations of pressurized compressible hyperelastic cylindrical shells
- Plane strain bending of strain-stiffening rubber-like rectangular beams
- Dynamical response of hyper-elastic cylindrical shells under periodic load
- Nonlinear shell formulations for complete three-dimensional constitutive laws including composites and laminates
- On the physical significance of higher-order kinematic and static variables in a three-dimensional shell formulation
- Isogeometric Kirchhoff-Love shell formulations for general hyperelastic materials
- Nonlinear vibrations of a rectangular hyperelastic membrane resting on a nonlinear elastic foundation
- A theory and finite element formulation of shells at finite deformations involving thickness change: Circumventing the use of a rotation tensor
- Finite element concepts for finite elastoplastic strains and isotropic stress response in shells: Theoretical and computational analysis
- Families of 4-node and 9-node finite elements for a finite deformation shell theory. An assessment of hybrid stress, hybrid strain and enhanced strain elements
- Variational differential quadrature: a technique to simplify numerical analysis of structures
- Nonlinear vibration analysis of graphene sheets resting on Winkler-Pasternak elastic foundation using an atomistic-continuum multiscale model
- Hyperelastic constitutive modeling under finite strain
- Nonlinear bending analysis of hyperelastic Mindlin plates: a numerical approach
- A general high‐order finite element formulation for shells at large strains and finite rotations
- Finite element analysis of hyperelastic thin shells with large strains
This page was built for publication: A variational differential quadrature solution to finite deformation problems of hyperelastic shell-type structures: a two-point formulation in Cartesian coordinates
