Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by Crossref.
Lewicka, Marta
2011.
A note on convergence of low energy critical points of nonlinear elasticity functionals, for thin shells of arbitrary geometry.
ESAIM: Control, Optimisation and Calculus of Variations,
Vol. 17,
Issue. 2,
p.
493.
Gaudiello, Antonio
and
Zappale, Elvira
2011.
A Model of Joined Beams as Limit of a 2D Plate.
Journal of Elasticity,
Vol. 103,
Issue. 2,
p.
205.
Mora, Maria Giovanna
and
Scardia, Lucia
2012.
Convergence of equilibria of thin elastic plates under physical growth conditions for the energy density.
Journal of Differential Equations,
Vol. 252,
Issue. 1,
p.
35.
Velčić, Igor
2012.
Nonlinear Weakly Curved Rod by Γ-Convergence.
Journal of Elasticity,
Vol. 108,
Issue. 2,
p.
125.
Bîrsan, M.
Altenbach, H.
Sadowski, T.
Eremeyev, V.A.
and
Pietras, D.
2012.
Deformation analysis of functionally graded beams by the direct approach.
Composites Part B: Engineering,
Vol. 43,
Issue. 3,
p.
1315.
El Kass, D.
and
Monneau, R.
2014.
Atomic to Continuum Passage for Nanotubes: A Discrete Saint-Venant Principle and Error Estimates.
Archive for Rational Mechanics and Analysis,
Vol. 213,
Issue. 1,
p.
25.
Marohnić, Maroje
and
Velčić, Igor
2016.
Non-periodic homogenization of bending–torsion theory for inextensible rods from 3D elasticity.
Annali di Matematica Pura ed Applicata (1923 -),
Vol. 195,
Issue. 4,
p.
1055.
Cicalese, Marco
Ruf, Matthias
and
Solombrino, Francesco
2017.
On global and local minimizers of prestrained thin elastic rods.
Calculus of Variations and Partial Differential Equations,
Vol. 56,
Issue. 4,
Bukal, Mario
Pawelczyk, Matthäus
and
Velčić, Igor
2017.
Derivation of homogenized Euler–Lagrange equations for von Kármán rods.
Journal of Differential Equations,
Vol. 262,
Issue. 11,
p.
5565.
Müller, Stefan
2017.
Vector-Valued Partial Differential Equations and Applications.
Vol. 2179,
Issue. ,
p.
125.
Schmidt, Bernd
2017.
A Griffith–Euler–Bernoulli theory for thin brittle beams derived from nonlinear models in variational fracture mechanics.
Mathematical Models and Methods in Applied Sciences,
Vol. 27,
Issue. 09,
p.
1685.
Hornung, Peter
Pawelczyk, Matthäus
and
Velčić, Igor
2018.
Stochastic homogenization of the bending plate model.
Journal of Mathematical Analysis and Applications,
Vol. 458,
Issue. 2,
p.
1236.
Kohn, Robert V.
and
O’Brien, Ethan
2018.
On the Bending and Twisting of Rods with Misfit.
Journal of Elasticity,
Vol. 130,
Issue. 1,
p.
115.
Pawelczyk, Matthäus
2020.
Convergence of equilibria for bending-torsion models of rods with inhomogeneities.
Proceedings of the Royal Society of Edinburgh: Section A Mathematics,
Vol. 150,
Issue. 1,
p.
233.
Engl, Dominik
and
Kreisbeck, Carolin
2021.
Theories for incompressible rods: A rigorous derivation via Γ-convergence.
Asymptotic Analysis,
Vol. 124,
Issue. 1-2,
p.
1.
Chen, Xiaoyi
Dai, Hui-Hui
and
Pruchnicki, Erick
2021.
On a consistent rod theory for a linearized anisotropic elastic material: I. Asymptotic reduction method.
Mathematics and Mechanics of Solids,
Vol. 26,
Issue. 2,
p.
217.
Qin, Yizhao
and
Yao, Peng-Fei
2021.
The Time-Dependent Von Kármán Shell Equation as a Limit of Three-Dimensional Nonlinear Elasticity.
Journal of Systems Science and Complexity,
Vol. 34,
Issue. 2,
p.
465.
Hernández-Llanos, Pedro
2022.
Asymptotic analysis of a junction of hyperelastic rods.
Asymptotic Analysis,
Vol. 126,
Issue. 3-4,
p.
303.
Schmidt, Bernd
and
Zeman, Jiří
2023.
A Bending-Torsion Theory for Thin and Ultrathin Rods as a \(\boldsymbol{\Gamma}\)-Limit of Atomistic Models.
Multiscale Modeling & Simulation,
Vol. 21,
Issue. 4,
p.
1717.