Add to ORKGUnderstanding asymptotics of gradient components in relation to the symmetrized gradient is important for the analysis of buckling of slender structures. For circular cylindrical shells we obtain the exact scaling exponent of the Korn constant as a function of shell's thickness. Equally sharp results are obtained for individual components of the gradient in cylindrical coordinates. We also derive an analogue of the Kirchhoff ansatz, whose most prominent feature is its singular dependence on the slenderness parameter, in marked contrast with the classical case of plates and rods
We state and prove a Korn-like inequality for a vector field in a bounded open set of $\mathbb{R}^N$...
The optimal asymptotic behaviour of the Korn-Poincare inequality constant due to anysotropic shrinki...
International audienceKorn’s inequalities on a surface constitute the keystone for establishing the ...
We consider a cylinder Ω ε having fixed length and small cross-section εω with ω⊂R2. Let 1/K ε be th...
Appropriate weighted norms in H 1 are presented such that the Korn type inequality is asymptotically...
Asymptotically optimal Korn inequalities are derived for a composite material that consists of two f...
Asymptotically optimal Korn inequalities are derived for a composite material that consists of two f...
A thin anisotropic elastic plate clamped along its lateral side and also supported at a small area $...
summary:The Korn's inequality involves a positive constant, which depends on the domains, in general...
textabstractA hypothesis for the prediction of the circumferential wavenumber of buckling ofthe thin...
We prove constructive estimates for elastic plates modeledby the Reissner\u2013Mindlin theory and ma...
A thin anisotropic elastic plate clamped along its lateral side and also supported at a small area t...
The stability problem of cylindrical shells is addressed using higher-order continuum theories in a ...
This paper presents an analytical approach to analyze the nonlinear stability of thin closed circula...
AbstractWe propose in this article to consider the limit behavior of the Koiter shell model when one...
We state and prove a Korn-like inequality for a vector field in a bounded open set of $\mathbb{R}^N$...
The optimal asymptotic behaviour of the Korn-Poincare inequality constant due to anysotropic shrinki...
International audienceKorn’s inequalities on a surface constitute the keystone for establishing the ...
We consider a cylinder Ω ε having fixed length and small cross-section εω with ω⊂R2. Let 1/K ε be th...
Appropriate weighted norms in H 1 are presented such that the Korn type inequality is asymptotically...
Asymptotically optimal Korn inequalities are derived for a composite material that consists of two f...
Asymptotically optimal Korn inequalities are derived for a composite material that consists of two f...
A thin anisotropic elastic plate clamped along its lateral side and also supported at a small area $...
summary:The Korn's inequality involves a positive constant, which depends on the domains, in general...
textabstractA hypothesis for the prediction of the circumferential wavenumber of buckling ofthe thin...
We prove constructive estimates for elastic plates modeledby the Reissner\u2013Mindlin theory and ma...
A thin anisotropic elastic plate clamped along its lateral side and also supported at a small area t...
The stability problem of cylindrical shells is addressed using higher-order continuum theories in a ...
This paper presents an analytical approach to analyze the nonlinear stability of thin closed circula...
AbstractWe propose in this article to consider the limit behavior of the Koiter shell model when one...
We state and prove a Korn-like inequality for a vector field in a bounded open set of $\mathbb{R}^N$...
The optimal asymptotic behaviour of the Korn-Poincare inequality constant due to anysotropic shrinki...
International audienceKorn’s inequalities on a surface constitute the keystone for establishing the ...