Self-similar folding patterns and energy scaling in compressed elastic sheets
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Publication:817317
DOI10.1016/j.cma.2004.07.044zbMath1082.74030OpenAlexW2041175253WikidataQ59202279 ScholiaQ59202279MaRDI QIDQ817317
Sergio Conti, Stefan Müller, Antonio De Simone
Publication date: 8 March 2006
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.2004.07.044
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Cites Work
- The Föppl-von Kármán plate theory as a low energy \(\Gamma\)-limit of nonlinear elasticity
- Continuously distributed wrinkles in fabrics
- A justification of the von Kármán equations
- Domain branching in uniaxial ferromagnets: A scaling law for the minimum energy
- The morphology and folding patterns of buckling-driven thin-film blisters
- An introduction to \(\Gamma\)-convergence
- A finite element analysis of configurational stability and finite growth of buckling driven delamination
- Structure of entropy solutions to the eikonal equation
- On the justification of the nonlinear inextensional plate model
- Justification of the nonlinear Kirchhoff-Love theory of plates as the application of a new singular inverse method
- Singular perturbation and the energy of folds
- Mode-dependent toughness and the delamination of compressed thin films
- Rigorous derivation of nonlinear plate theory and geometric rigidity
- Energy minimization and flux domain structure in the intermediate state of a type-I superconductor
- Energy scaling of compressed elastic films -- three-dimensional elasticity and reduced theories
- Numerical analysis of buckling-driven delamination.
- The membrane shell model in nonlinear elasticity: A variational asymptotic derivation
- The nonlinear membrane model as variational limit of nonlinear three-dimensional elasticity
- Line energies for gradient vector fields in the plane
- The geometry of the phase diffusion equation
- Une justification partielle du modèle de plaque en flexion par -convergence
- Fully C1‐conforming subdivision elements for finite deformation thin‐shell analysis
- A compactness result in the gradient theory of phase transitions
- Energy estimates for the von Kármán model of thin-film blistering
- Shell structures-a sensitive interrelation between physics and numerics
- The Relaxed Energy Density for Isotropic Elastic Membranes
- On lower semicontinuity of a defect energy obtained by a singular limit of the Ginzburg–Landau type energy for gradient fields
- Surface energy and microstructure in coherent phase transitions
- Crumpled paper
- Plaques très comprimées
- Folding energetics in thin-film diaphragms
- A reduced theory for thin-film micromagnetics
- A theorem on geometric rigidity and the derivation of nonlinear plate theory from three-dimensional elasticity
- In-plane displacements in thin-film blistering
- Rigourous bounds for the Föppl-von Kármán theory of isotropically compressed plates
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