Dynamic Relaxation (DR) method is presented for the analysis of geometrically linear laterally loaded, rectangular laminated plates. The analysis uses the Mindlin plate theory which accounts for transverse shear deformations. A computer program has been compiled. The convergence and accuracy of the DR solutions of isotropic, orthotropic, and laminated plates for elastic small deflection response are established by comparison with different exact and approximate solutions. The present Dynamic Relaxation (DR) method shows a good agreement with other analytical and numerical methods used in the verification scheme.It was found that: The convergence and accuracy of the DR solution is dependent on several factors which include boundary condition...
In this paper, various dynamic relaxation methods are investigated for geometric nonlinear analysis ...
In this paper the geometrically nonlinear continuum plate finite element model, hitherto not reporte...
A new discretely stiffened circular plate theory is presented in outline. The governing plate equati...
Dynamic Relaxation (DR) method is presented for the analysis ofgeometrically linear laterally loaded...
Dynamic Relaxation (DR) method is presented for the analysis of geometrically linear laterally loade...
Dynamic Relaxation (DR) method is presented for the analysis ofgeometrically linear laterally loaded...
First order orthotropic shear deformation equations for the nonlinear elastic bending response of re...
First – order orthotropic shear deformation equations for thenonlinearly elastic bending response of...
Dynamic Relaxation (DR) method is presented for the geometrically nonlinear laterally loaded, rectan...
First order orthotropic shear deformation equations for the linear elastic bending response of recta...
Dynamic Relaxation (DR) method is presented for the geometricallynonlinear laterally loaded, rectang...
The convergence and accuracy of the dynamic relaxation solution depends on different factors which i...
The convergence and accuracy of the Dynamic Relaxation (DR) solutions for elasticlarge deflection re...
The convergence and accuracy of the Dynamic Relaxation (DR) solutions for elastic large deflection r...
A finite-difference analysis of the large deflection response of uniformly loaded square, circular a...
In this paper, various dynamic relaxation methods are investigated for geometric nonlinear analysis ...
In this paper the geometrically nonlinear continuum plate finite element model, hitherto not reporte...
A new discretely stiffened circular plate theory is presented in outline. The governing plate equati...
Dynamic Relaxation (DR) method is presented for the analysis ofgeometrically linear laterally loaded...
Dynamic Relaxation (DR) method is presented for the analysis of geometrically linear laterally loade...
Dynamic Relaxation (DR) method is presented for the analysis ofgeometrically linear laterally loaded...
First order orthotropic shear deformation equations for the nonlinear elastic bending response of re...
First – order orthotropic shear deformation equations for thenonlinearly elastic bending response of...
Dynamic Relaxation (DR) method is presented for the geometrically nonlinear laterally loaded, rectan...
First order orthotropic shear deformation equations for the linear elastic bending response of recta...
Dynamic Relaxation (DR) method is presented for the geometricallynonlinear laterally loaded, rectang...
The convergence and accuracy of the dynamic relaxation solution depends on different factors which i...
The convergence and accuracy of the Dynamic Relaxation (DR) solutions for elasticlarge deflection re...
The convergence and accuracy of the Dynamic Relaxation (DR) solutions for elastic large deflection r...
A finite-difference analysis of the large deflection response of uniformly loaded square, circular a...
In this paper, various dynamic relaxation methods are investigated for geometric nonlinear analysis ...
In this paper the geometrically nonlinear continuum plate finite element model, hitherto not reporte...
A new discretely stiffened circular plate theory is presented in outline. The governing plate equati...