Pages that link to "Item:Q1826407"

The following pages link to Description of elastic forces in absolute nodal coordinate formulation (Q1826407):

Displaying 47 items.

• A nonlinear approach for modeling rail flexibility using the absolute nodal coordinate formulation (Q331245) (← links)
• Dynamics of spatial rigid-flexible multibody systems with uncertain interval parameters (Q332777) (← links)
• State of the art of ANCF elements regarding geometric description, interpolation strategies, definition of elastic forces, validation and the locking phenomenon in comparison with proposed beam finite elements (Q333278) (← links)
• Three-dimensional finite rotations treatment based on a minimal set parameterization and vector space operations in beam elements (Q356836) (← links)
• A triangular plate element 2343 using second-order absolute-nodal-coordinate slopes: numerical computation of shape functions (Q394527) (← links)
• A new model for dry and lubricated cylindrical joints with clearance in spatial flexible multibody systems (Q395169) (← links)
• A quaternion-based formulation of Euler-Bernoulli beam without singularity (Q437342) (← links)
• Integration of absolute nodal elements into multibody system (Q547183) (← links)
• Curve-induced distortion of polynomial space curves, flat-mapped extension modeling, and their impact on ANCF thin-plate finite elements (Q655949) (← links)
• A new locking-free formulation for planar, shear deformable, linear and quadratic beam finite elements based on the absolute nodal coordinate formulation (Q655960) (← links)
• First order sensitivity analysis of flexible multibody systems using absolute nodal coordinate formulation (Q666585) (← links)
• Weak form quadrature elements based on absolute nodal coordinate formulation for planar beamlike structures (Q823903) (← links)
• Implicit and explicit integration in the solution of the absolute nodal coordinate differential/algebraic equations (Q840500) (← links)
• A new locking-free shear deformable finite element based on absolute nodal coordinates (Q842220) (← links)
• Three-dimensional formulation of rigid-flexible multibody systems with flexible beam elements (Q941677) (← links)
• A comparison of finite elements for nonlinear beams: the absolute nodal coordinate and geometrically exact formulations (Q941679) (← links)
• Simulation of planar flexible multibody systems with clearance and lubricated revolute joints (Q994778) (← links)
• Simulation of a viscoelastic flexible multibody system using absolute nodal coordinate and fractional derivative methods (Q1024011) (← links)
• A simple method to impose rotations and concentrated moments on ANC beams (Q1024018) (← links)
• Clamped end conditions and cross-section deformation in the finite element absolute nodal coordinate formulation (Q1024026) (← links)
• A geometrically exact beam element based on the absolute nodal coordinate formulation (Q1035422) (← links)
• On the integration of computer aided design and analysis using the finite element absolute nodal coordinate formulation (Q1035439) (← links)
• An immersed boundary method for fluid-structure interaction with compressible multiphase flows (Q1691868) (← links)
• Coupled thermo-structural analysis of a bimetallic strip using the absolute nodal coordinate formulation (Q1699587) (← links)
• A hybrid interpolation method for geometric nonlinear spatial beam elements with explicit nodal force (Q1793727) (← links)
• Locking alleviation in the large displacement analysis of beam elements: the strain split method (Q1794104) (← links)
• Simple formulations of imposing moments and evaluating joint reaction forces for rigid-flexible multibody systems (Q1928921) (← links)
• Experimental validation of rigid-flexible coupling dynamic formulation for hub-beam system (Q2014688) (← links)
• Transversally higher-order interpolating polynomials for the two-dimensional shear deformable ANCF beam elements based on common coefficients (Q2034114) (← links)
• A high-precision curvature constrained Bernoulli-Euler planar beam element for geometrically nonlinear analysis (Q2242086) (← links)
• Dynamic modeling for silicone beams using higher-order ANCF beam elements and experiment investigation (Q2321888) (← links)
• A finite element formulation for a geometrically exact Kirchhoff-Love beam based on constrained translation (Q2329620) (← links)
• The simplest 3-, 6- and 8-noded fully-parameterized ANCF plate elements using only transverse slopes (Q2347602) (← links)
• The finite element absolute nodal coordinate formulation incorporated with surface stress effect to model elastic bending nanowires in large deformation (Q2391220) (← links)
• Analysis of thin beams and cables using the absolute nodal co-ordinate formulation (Q2432385) (← links)
• A solid-beam finite element and non-linear constitutive modelling (Q2450030) (← links)
• Poisson modes and general nonlinear constitutive models in the large displacement analysis of beams (Q2458282) (← links)
• Three-dimensional beam element based on a cross-sectional coordinate system approach (Q2499015) (← links)
• An internal damping model for the absolute nodal coordinate formulation (Q2499512) (← links)
• Modeling and dynamics analysis of helical spring under compression using a curved beam element with consideration on contact between its coils (Q2510294) (← links)
• An overview of the ANCF approach, justifications for its use, implementation issues, and future research directions (Q6078032) (← links)
• A new higher-order plate/shell element for dynamic analysis of flexible plate and shell with variable thickness (Q6116882) (← links)
• Modelling and real-time dynamic simulation of flexible needles for prostate biopsy and brachytherapy (Q6161760) (← links)
• A new locking-free beam element based on absolute nodal coordinates (Q6181775) (← links)
• The improvements of new absolute nodal coordinate formulation based continuum beam elements in convergence, accuracy and efficiency (Q6540431) (← links)
• Nurbs-based Timoshenko formulation of a geometrically nonlinear planar beam (Q6580599) (← links)
• Analytical and numerical investigations of linear and nonlinear torsional strains using position gradients (Q6610225) (← links)