A simple geometrically exact finite element for thin shells. I: Statics
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Publication:6145115
DOI10.1007/s00466-023-02339-2MaRDI QIDQ6145115
Adnan Ibrahimbegović, Paulo M. Pimenta, Matheus L. Sanchez
Publication date: 30 January 2024
Published in: Computational Mechanics (Search for Journal in Brave)
Cites Work
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- On a stress resultant geometrically exact shell model. I: Formulation and optimal parametrization
- An exact conserving algorithm for nonlinear dynamics with rotational DOFs and general hyperelasticity. II: Shells
- A fully nonlinear multi-parameter shell model with thickness variation and a triangular shell finite element
- An exact conserving algorithm for nonlinear dynamics with rotational DOFs and general hyperelasticity. I: Rods
- The treatment of shell normals in finite element analysis
- A triangular finite shell element based on a fully nonlinear shell formulation
- Invariant formulation of hyperelastic transverse isotropy based on polyconvex free energy functions.
- On a stress resultant geometrically exact shell model. III: Computational aspects of the nonlinear theory
- An excursion into large rotations
- Stress resultant geometrically nonlinear shell theory with drilling rotations. II: Computational aspects
- On the simultaneous use of simple geometrically exact shear-rigid rod and shell finite elements
- A simple finite element for the geometrically exact analysis of Bernoulli-Euler rods
- A novel mixed finite element for finite anisotropic elasticity: the SKA-element simplified kinematics for anisotropy
- A simple triangular finite element for nonlinear thin shells: statics, dynamics and anisotropy
- Structural analysis of composite laminates using a mixed hybrid shell element
- Generalization of the \(C^1\) TUBA plate finite elements to the geometrically exact Kirchhoff-Love shell model
- Hybrid-mixed shell quadrilateral that allows for large solution steps and is low-sensitive to mesh distortion
- Automation of Finite Element Methods
- A Fully Nonlinear Thin Shell Model of Kirchhoff-Love Type
- The Finite Element Analysis of Shells - Fundamentals
- A robust non-linear mixed hybrid quadrilateral shell element
- Shell curvature as an initial deformation: A geometrically exact finite element approach
- Shell theory versus degeneration—a comparison in large rotation finite element analysis
- Thin shells with finite rotations formulated in biot stresses: Theory and finite element formulation
- Raasch Challenge for Shell Elements
- Meshless implementation of the geometrically exact Kirchhoff–Love shell theory
- Robust flat‐facet triangular shell finite element
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