Pages that link to "Item:Q2310914"
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The following pages link to Rotation-free isogeometric analysis of an arbitrarily curved plane Bernoulli-Euler beam (Q2310914):
Displaying 27 items.
- Isogeometric rotation-free analysis of planar extensible-elastica for static and dynamic applications (Q327804) (← links)
- Isogeometric analysis for non-classical Bernoulli-Euler beam model incorporating microstructure and surface energy effects (Q822067) (← links)
- Linear static isogeometric analysis of an arbitrarily curved spatial Bernoulli-Euler beam (Q1986625) (← links)
- Rotation-free Bernstein-Bézier elements for thin plates and shells -- development and validation (Q1987912) (← links)
- On the analytical approach to the linear analysis of an arbitrarily curved spatial Bernoulli-Euler beam (Q1988799) (← links)
- Isogeometric analysis of 3D beams for arbitrarily large rotations: locking-free and path-independent solution without displacement DOFs inside the patch (Q2020719) (← links)
- Dynamic multi-patch isogeometric analysis of planar Euler-Bernoulli beams (Q2021066) (← links)
- An efficient isogeometric beam formulation for analysis of 2D non-prismatic beams (Q2049635) (← links)
- Leveraging spectral analysis to elucidate membrane locking and unlocking in isogeometric finite element formulations of the curved Euler-Bernoulli beam (Q2060151) (← links)
- Spatial arbitrarily curved microbeams with the modified couple stress theory: formulation of equations of motion (Q2063440) (← links)
- Geometrically exact static isogeometric analysis of an arbitrarily curved spatial Bernoulli-Euler beam (Q2072708) (← links)
- A 2D field-consistent beam element for large displacement analysis using a rational Bézier representation with varying weights (Q2109855) (← links)
- Static analysis of planar arbitrarily curved microbeams with the modified couple stress theory and Euler-Bernoulli beam model (Q2110779) (← links)
- Studies on knot placement techniques for the geometry construction and the accurate simulation of isogeometric spatial curved beams (Q2175268) (← links)
- Isogeometric Bernoulli beam element with an exact representation of concentrated loadings (Q2176932) (← links)
- Geometrically nonlinear multi-patch isogeometric analysis of planar curved Euler-Bernoulli beams (Q2184469) (← links)
- A total Lagrangian Timoshenko beam formulation for geometrically nonlinear isogeometric analysis of planar curved beams (Q2194368) (← links)
- A high-precision curvature constrained Bernoulli-Euler planar beam element for geometrically nonlinear analysis (Q2242086) (← links)
- A non-linear symmetric \(\mathrm{G}^1\)-conforming Bézier finite element formulation for the analysis of Kirchhoff beam assemblies (Q2246414) (← links)
- Free vibration analysis of spatial Bernoulli-Euler and Rayleigh curved beams using isogeometric approach (Q2310648) (← links)
- Geometrically exact isogeometric Bernoulli-Euler beam based on the Frenet-Serret frame (Q2683427) (← links)
- Constitutive models for strongly curved beams in the frame of isogeometric analysis (Q2795734) (← links)
- A new isogeometric Timoshenko beam model incorporating microstructures and surface energy effects (Q4971529) (← links)
- An updated Lagrangian Bézier finite element formulation for the analysis of slender beams (Q5048094) (← links)
- A <scp>two‐dimensional</scp> corotational curved beam element for dynamic analysis of curved viscoelastic beams with large deformations and rotations (Q6071401) (← links)
- Nurbs-based Timoshenko formulation of a geometrically nonlinear planar beam (Q6580599) (← links)
- A novel section-section potential for short-range interactions between plane beams (Q6588296) (← links)
