In this paper, nonlinear bending analysis of functionally graded rectangular and sectorial micro/nano plates is investigated using the modified couple stress theory. For this purpose, a higher-order shear deformation theory and von Kármán geometrically nonlinear theory are employed. The equilibrium equations and the boundary conditions for rectangular and annular sector plates are derived from the principle of minimum total potential energy and solved using the Semi-Analytical Polynomial Method (SAPM). One of the advantages of the implemented shear deformation theory is removing the defects of higher order shear deformation theory, and obtaining the response of the first and the third-order shear deformation theories at the same time. After...
This study presents strain gradient elasticity based procedures for static bending, free vibration a...
ABSTRACT: This article presents the large deformation analysis of piezolaminated smart structures. T...
The isogeometric analysis associated with a novel quasi-3D shear deformation theory is proposed to i...
In this paper, the nonlinear bending analysis for annular circular nano plates is conducted based on...
In this paper, bending analysis of rectangular functionally graded nanoplates under a uniform transv...
In this study, a new and efficient computational approach based on isogeometric analysis (IGA) and r...
In this paper, an exact analytical approach is used for bending analysis of functionally graded (FG)...
In the present article, static analysis of thin functionally graded micro-plates, based on Kirchhoff...
In the present study, the buckling analysis of the rectangular nanoplate under biaxial non-uniform c...
Finite element models of microstructure-dependent geometrically nonlinear theories for axisymmetric ...
In this paper, a general third-order shear deformation plate theory (GTSDPT) is employed to investig...
In this paper, various efficient higher-order shear deformation theories are presented for bending a...
The aim of the present study is to investigate the nonlinear motion characteristics of a shear defor...
This paper investigates the micro- and nano-mechanical behavior of orthotropic doubly-curved shells ...
A microstructure-dependent nonlinear third-order beam theory which accounts for through-thickness po...
This study presents strain gradient elasticity based procedures for static bending, free vibration a...
ABSTRACT: This article presents the large deformation analysis of piezolaminated smart structures. T...
The isogeometric analysis associated with a novel quasi-3D shear deformation theory is proposed to i...
In this paper, the nonlinear bending analysis for annular circular nano plates is conducted based on...
In this paper, bending analysis of rectangular functionally graded nanoplates under a uniform transv...
In this study, a new and efficient computational approach based on isogeometric analysis (IGA) and r...
In this paper, an exact analytical approach is used for bending analysis of functionally graded (FG)...
In the present article, static analysis of thin functionally graded micro-plates, based on Kirchhoff...
In the present study, the buckling analysis of the rectangular nanoplate under biaxial non-uniform c...
Finite element models of microstructure-dependent geometrically nonlinear theories for axisymmetric ...
In this paper, a general third-order shear deformation plate theory (GTSDPT) is employed to investig...
In this paper, various efficient higher-order shear deformation theories are presented for bending a...
The aim of the present study is to investigate the nonlinear motion characteristics of a shear defor...
This paper investigates the micro- and nano-mechanical behavior of orthotropic doubly-curved shells ...
A microstructure-dependent nonlinear third-order beam theory which accounts for through-thickness po...
This study presents strain gradient elasticity based procedures for static bending, free vibration a...
ABSTRACT: This article presents the large deformation analysis of piezolaminated smart structures. T...
The isogeometric analysis associated with a novel quasi-3D shear deformation theory is proposed to i...