A primary flexure problem defined by Kirchhoff theory of plates in bending is considered. Significance of auxiliary function introduced earlier in the in-plane displacements in resolving Poisson-Kirchhoffs boundary conditions paradox is reexamined with reference to reported sixth order shear deformation theories, in particular, Reissner's theory and Hencky's theory. Sixth order modified Kirchhoff's theory is extended here to include shear deformations in the analysis. (C) 2011 Elsevier Ltd. All rights reserved
summary:Starting from the refined theories of the bending of plates proposed by I. Babuška and M. Pr...
New exact solutions for isotropic Kirchhoff plates, with no kinematic boundary constraints, are infe...
The Kirchhoff-Love hypothesis expresses a kinematic constraint that is assumed to be valid for the d...
KIRCHHOFF’S theory [1] and the first-order shear deformation theory (FSDT) [2] of plates in bending ...
The development of accurate and reliable plate bending13; elements based on t h e shear flexible Eli...
This paper joins a host of others, beginning with the seminal papers of Reissner 1,2, that attempt t...
A plate theory is developed for the plane anisotropic plate using Kozik's linear exact displacement ...
This study presents a relationship between the buckling loads of sectorial plates based on the Kirch...
The stress recovery at nodes from simple shear flexible plate elements is often unreliable. In this ...
For a plate subject to stress boundary condition, the deformation determined by the Reissner–Mindlin...
The Kirchhoff plate theory, when used for the analysis of bending of plates that are relatively thic...
International audienceWe propose a model of flexural elastic plates accounting for boundary layer ef...
This study presents exact relationships between the bending solutions of sectorial plates based on t...
This paper presents exact axisymmetric bending solutions of circular and annular plates based on the...
First-order shear deformation theories, one proposed by Reissner and another one by Mindlin, are wid...
summary:Starting from the refined theories of the bending of plates proposed by I. Babuška and M. Pr...
New exact solutions for isotropic Kirchhoff plates, with no kinematic boundary constraints, are infe...
The Kirchhoff-Love hypothesis expresses a kinematic constraint that is assumed to be valid for the d...
KIRCHHOFF’S theory [1] and the first-order shear deformation theory (FSDT) [2] of plates in bending ...
The development of accurate and reliable plate bending13; elements based on t h e shear flexible Eli...
This paper joins a host of others, beginning with the seminal papers of Reissner 1,2, that attempt t...
A plate theory is developed for the plane anisotropic plate using Kozik's linear exact displacement ...
This study presents a relationship between the buckling loads of sectorial plates based on the Kirch...
The stress recovery at nodes from simple shear flexible plate elements is often unreliable. In this ...
For a plate subject to stress boundary condition, the deformation determined by the Reissner–Mindlin...
The Kirchhoff plate theory, when used for the analysis of bending of plates that are relatively thic...
International audienceWe propose a model of flexural elastic plates accounting for boundary layer ef...
This study presents exact relationships between the bending solutions of sectorial plates based on t...
This paper presents exact axisymmetric bending solutions of circular and annular plates based on the...
First-order shear deformation theories, one proposed by Reissner and another one by Mindlin, are wid...
summary:Starting from the refined theories of the bending of plates proposed by I. Babuška and M. Pr...
New exact solutions for isotropic Kirchhoff plates, with no kinematic boundary constraints, are infe...
The Kirchhoff-Love hypothesis expresses a kinematic constraint that is assumed to be valid for the d...