Pages that link to "Item:Q2176970"

The following pages link to A large rotation finite element analysis of 3D beams by incremental rotation vector and exact strain measure with all the desirable features (Q2176970):

Displaying 19 items.

• A frame-invariant scheme for the geometrically exact beam using rotation vector parametrization (Q1021175) (← links)
• Rotation manifold \(\mathrm{SO}(3)\) and its tangential vectors (Q1026495) (← links)
• Isogeometric analysis of 3D beams for arbitrarily large rotations: locking-free and path-independent solution without displacement DOFs inside the patch (Q2020719) (← links)
• Geometrically exact static isogeometric analysis of an arbitrarily curved spatial Bernoulli-Euler beam (Q2072708) (← links)
• Unconditional stability in large deformation dynamic analysis of elastic structures with arbitrary nonlinear strain measure and multi-body coupling (Q2138798) (← links)
• A geometrically exact beam finite element for curved thin-walled bars with deformable cross-section (Q2236956) (← links)
• Geometrically exact isogeometric Bernoulli-Euler beam based on the Frenet-Serret frame (Q2683427) (← links)
• Analysis of large displacements and large rotations of three-dimensional beams by using small strains and unit vectors (Q4381966) (← links)
• A Koiter reduction technique for the nonlinear thermoelastic analysis of shell structures prone to buckling (Q6061745) (← links)
• Efficient formulation of a two‐noded geometrically exact curved beam element (Q6071411) (← links)
• A geometrically nonlinear Cosserat shell model for orientable and non-orientable surfaces: discretization with geometric finite elements (Q6084443) (← links)
• Large deformation Kirchhoff-Love shell hierarchically enriched with warping: isogeometric formulation and modeling of alternating stiff/soft layups (Q6118613) (← links)
• A variationally consistent contact formulation based on a mixed interpolation point method and isogeometric discretization (Q6147051) (← links)
• An efficient displacement-based isogeometric formulation for geometrically exact viscoelastic beams (Q6153867) (← links)
• Improving efficiency and robustness of enhanced assumed strain elements for nonlinear problems (Q6553333) (← links)
• A geometrically exact beam finite element for non-prismatic strip beams: the spatial case (Q6565638) (← links)
• Finite difference technique for the evaluation of the transverse displacements in force-based beam finite elements (Q6566035) (← links)
• Unconditionally stable time stepping scheme for large deformation dynamics of elastic beams and shells (Q6610829) (← links)
• New formula of geometrically exact shell element undergoing large deformation and finite rotation (Q6610855) (← links)