Analysis of thin shells using anisotropic polyconvex energy densities
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Publication:839282
DOI10.1016/j.cma.2007.10.005zbMath1169.74475OpenAlexW2023598501MaRDI QIDQ839282
Friedrich Gruttmann, Daniel Balzani, Jörg Schröder
Publication date: 1 September 2009
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cma.2007.10.005
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A nonlinear plate finite element formulation for shape memory alloy applications ⋮ A computational framework for polyconvex large strain elasticity for geometrically exact beam theory ⋮ A simple triangular finite element for nonlinear thin shells: statics, dynamics and anisotropy ⋮ Implementation of incremental variational formulations based on the numerical calculation of derivatives using hyper dual numbers ⋮ A 3D Cosserat point element (CPE) for nonlinear orthotropic solids: Generalization for an initially distorted mesh and an arbitrary orientation of material orthotropy ⋮ Finite element analysis of compressible transversely isotropic hyperelastic shells ⋮ Approximation of anisotropic elasticity tensors at the reference state with polyconvex energies ⋮ Shear correction factors for layered plates and shells ⋮ A computational framework for incompressible electromechanics based on convex multi-variable strain energies for geometrically exact shell theory ⋮ A novel mixed finite element for finite anisotropic elasticity: the SKA-element simplified kinematics for anisotropy
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