Nonlinear isogeometric spatial Bernoulli beam

A total Lagrangian Timoshenko beam formulation for geometrically nonlinear isogeometric analysis of spatial beam structures ⋮ Modeling of three-dimensional beam nonlinear vibrations generalizing Hencky’s ideas ⋮ An updated Lagrangian Bézier finite element formulation for the analysis of slender beams ⋮ A geometrically exact discrete elastic rod model based on improved discrete curvature ⋮ Importance and effectiveness of representing the shapes of Cosserat rods and framed curves as paths in the special Euclidean algebra ⋮ Isogeometric configuration design sensitivity analysis of geometrically exact shear-deformable beam structures ⋮ Two new triangular \(\operatorname{G}^1\)-conforming finite elements with cubic edge rotation for the analysis of Kirchhoff plates ⋮ Studies on knot placement techniques for the geometry construction and the accurate simulation of isogeometric spatial curved beams ⋮ Isogeometric Bernoulli beam element with an exact representation of concentrated loadings ⋮ Weak coupling of nonlinear isogeometric spatial Bernoulli beams ⋮ Immersogeometric fluid-structure interaction modeling and simulation of transcatheter aortic valve replacement ⋮ Invariant isogeometric formulations for three-dimensional Kirchhoff rods ⋮ Geometrically nonlinear multi-patch isogeometric analysis of planar curved Euler-Bernoulli beams ⋮ Integrated design and analysis of structural membranes using the isogeometric B-rep analysis ⋮ Simulation of viscoelastic Cosserat rods based on the geometrically exact dynamics of special Euclidean strands ⋮ Efficient formulation of a two‐noded geometrically exact curved beam element ⋮ A novel four-field mixed FE approximation for Kirchhoff rods using Cartan's moving frames ⋮ Extending CAS elements to remove shear and membrane locking from quadratic NURBS‐based discretizations of linear plane Timoshenko rods ⋮ Computational modeling and data‐driven homogenization of knitted membranes ⋮ Geometrically exact isogeometric Bernoulli-Euler beam based on the Frenet-Serret frame ⋮ A total Lagrangian Timoshenko beam formulation for geometrically nonlinear isogeometric analysis of planar curved beams ⋮ Simultaneous modeling and structural analysis of curvilinearly stiffened plates using an isogeometric approach ⋮ A Fully Nonlinear Beam Model of Bernoulli–Euler Type ⋮ A weak form quadrature element formulation of geometrically exact beams with strain gradient elasticity ⋮ Geometrically exact thin-walled beam including warping formulated on the special Euclidean group \(SE(3)\) ⋮ Geometrically nonlinear multi-patch isogeometric analysis of spatial Euler-Bernoulli beam structures ⋮ Efficient computation of nonlinear isogeometric elements using the adjoint method and algorithmic differentiation ⋮ Linear static isogeometric analysis of an arbitrarily curved spatial Bernoulli-Euler beam ⋮ A quadrilateral \(\operatorname{G}^1\)-conforming finite element for the Kirchhoff plate model ⋮ On the simultaneous use of simple geometrically exact shear-rigid rod and shell finite elements ⋮ On the analytical approach to the linear analysis of an arbitrarily curved spatial Bernoulli-Euler beam ⋮ A geometrically nonlinear Euler-Bernoulli beam model within strain gradient elasticity with isogeometric analysis and lattice structure applications ⋮ A non-linear symmetric \(\mathrm{G}^1\)-conforming Bézier finite element formulation for the analysis of Kirchhoff beam assemblies ⋮ Dynamic multi-patch isogeometric analysis of planar Euler-Bernoulli beams ⋮ Invariant isogeometric formulation for the geometric stiffness matrix of spatial curved Kirchhoff rods ⋮ Isogeometric analysis of free-form Timoshenko curved beams including the nonlinear effects of large deformations ⋮ On the geometrically exact formulations of finite deformable isogeometric beams ⋮ Isogeometric collocation for three-dimensional geometrically exact shear-deformable beams ⋮ Isogeometric configuration design sensitivity analysis of finite deformation curved beam structures using Jaumann strain formulation ⋮ Bloch theorem for isogeometric analysis of periodic problems governed by high-order partial differential equations ⋮ A simple finite element for the geometrically exact analysis of Bernoulli-Euler rods ⋮ An isogeometric collocation method for frictionless contact of Cosserat rods ⋮ Locking-free isogeometric collocation formulation for three-dimensional geometrically exact shear-deformable beams with arbitrary initial curvature ⋮ Embedded structural entities in NURBS-based isogeometric analysis ⋮ Free vibration analysis of spatial Bernoulli-Euler and Rayleigh curved beams using isogeometric approach ⋮ A reconstructed local \(\bar{B}\) formulation for isogeometric Kirchhoff-Love shells ⋮ Rotation-free isogeometric analysis of an arbitrarily curved plane Bernoulli-Euler beam ⋮ Geometrically exact static isogeometric analysis of an arbitrarily curved spatial Bernoulli-Euler beam ⋮ A finite element formulation for a geometrically exact Kirchhoff-Love beam based on constrained translation ⋮ Differential formulation and numerical solution for elastic arches with variable curvature and tapered cross-sections ⋮ A 2D field-consistent beam element for large displacement analysis using a rational Bézier representation with varying weights ⋮ Multiscale modelling and material design of woven textiles using Gaussian processes

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• Invariant Hermitian finite elements for thin Kirchhoff rods. II: The linear three-dimensional case
• A hierarchic family of isogeometric shell finite elements
• Isogeometric Reissner-Mindlin shell analysis with exactly calculated director vectors
• B-spline interpolation of Kirchhoff-Love space rods
• Isogeometric shell analysis: the Reissner-Mindlin shell
• A large deformation, rotation-free, isogeometric shell
• Isogeometric shell analysis with Kirchhoff-Love elements
• Isogeometric analysis: CAD, finite elements, NURBS, exact geometry and mesh refinement
• A comparison of finite elements for nonlinear beams: the absolute nodal coordinate and geometrically exact formulations
• A finite strain beam formulation. The three-dimensional dynamic problem. I
• A three-dimensional finite-strain rod model. II. Computational aspects
• An objective 3D large deformation finite element formulation for geometrically exact curved Kirchhoff rods
• A locking-free finite element formulation and reduced models for geometrically exact Kirchhoff rods
• Analysis in computer aided design: nonlinear isogeometric B-Rep analysis of shell structures
• Locking-free isogeometric collocation methods for spatial Timoshenko rods
• Isogeometric rotation-free bending-stabilized cables: statics, dynamics, bending strips and coupling with shells
• A consistent co-rotational formulation for nonlinear, three-dimensional, beam-elements
• On a non-linear formulation for curved Timoshenko beam elements considering large displacement/rotation increments
• Geometrically nonlinear formulation of 3D finite strain beam element with large rotations
• Large displacement analysis of three-dimensional beam structures
• A large displacement analysis of a beam using a CAD geometric definition
• Lagrangian Aspects of the Kirchhoff Elastic Rod
• Non-linear Modeling and Analysis of Solids and Structures
• Nonlinear problems of elasticity
• On the dynamics of elastic strips