An energy-momentum conserving scheme for geometrically exact shells with drilling DOFs
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Publication:2033634
DOI10.1007/s00466-020-01936-9OpenAlexW3107462898WikidataQ113326808 ScholiaQ113326808MaRDI QIDQ2033634
Ilinca Stanciulescu, Hongzhi Zhong, Xiaohu Yao, Run Zhang
Publication date: 17 June 2021
Published in: Computational Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00466-020-01936-9
drilling degrees of freedomweak form quadrature element methodenergy-momentum conserving schemegeometrically exact shellmixed discrete derivatives
Related Items (2)
Unconditional stability in large deformation dynamic analysis of elastic structures with arbitrary nonlinear strain measure and multi-body coupling ⋮ A weak form quadrature element formulation of geometrically exact beams with strain gradient elasticity
Cites Work
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- On a stress resultant geometrically exact shell model. I: Formulation and optimal parametrization
- On the use of geometrically exact shells in a conserving framework for flexible multibody dynamics
- An exact conserving algorithm for nonlinear dynamics with rotational DOFs and general hyperelasticity. II: Shells
- The interpolation of rotations and its application to finite element models of geometrically exact rods
- A weak form quadrature element method for plane elasticity problems
- Flexural vibration analysis of an eccentric annular Mindlin plate
- The discrete energy-momentum method. Conserving algorithms for nonlinear elastodynamics
- Static analysis of structures by the quadrature element method (QEM)
- Nonlinear dynamics of shells: Theory, finite element formulation, and integration schemes
- On the stability of symplectic and energy-momentum algorithms for nonlinear Hamiltonian systems with symmetry
- Energy-preserving time integration for constrained multibody systems
- An energy decaying scheme for nonlinear dynamics of shells
- Mechanical systems subject to holonomic constraints: Differential-algebraic formulations and conservative integration
- Exact energy and momentum conserving algorithms for general models in nonlinear elasticity
- Energy-conserving integration of constrained Hamiltonian systems -- a comparison of approaches
- Dynamics of spatial beams in quaternion description based on the Newmark integration scheme
- An analysis of the stress formula for energy-momentum methods in nonlinear elastodynamics
- An energy-momentum time integration scheme based on a convex multi-variable framework for non-linear electro-elastodynamics
- Objective energy-momentum conserving integration for the constrained dynamics of geometrically exact beams
- A weak form quadrature element formulation of geometrically exact shells incorporating drilling degrees of freedom
- Energy-consistent numerical integration of mechanical systems with mixed holonomic and nonholonomic constraints
- Differential quadrature and longterm integration
- Time integration and discrete Hamiltonian systems
- Discrepancies of energy values in dynamics of three intersecting plates
- On a stress resultant geometrically exact shell model. Part VI: Conserving algorithms for non‐linear dynamics
- Symplectic-energy-momentum preserving variational integrators
- A new energy and momentum conserving algorithm for the non‐linear dynamics of shells
- Numerical integration of the stiff dynamics of geometrically exact shells: an energy-dissipative momentum-conserving scheme
- Spectral Methods
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