AbstractIn this short note, general formulations of the Toupin–Mindlin strain gradient theory in orthogonal curvilinear coordinate systems are derived, and are then specified for the cases of cylindrical coordinates and spherical coordinates. Expressions convenient for practical use are presented for the corresponding equilibrium equations, boundary conditions, and the physical components for strains and strain gradients in the two coordinate systems. The results obtained in this paper are general and complete, and can be useful for a wide range of applications, such as asymptotic crack tip field analysis, cylindrical and spherical cavity expansion problems, and the interpretation of micro/nano indentation tests and bending/twisting tests o...
A mechanism-based theory of strain gradient (MSG) plasticity has been proposed in Part I of this pap...
An oblique, Cartesian coordinate system arises from the geometry affiliated with a QR decomposition ...
A new strain gradient theory which is based on energy nonlocal model is proposed in this paper, and ...
In this short note, general formulations of the Toupin–Mindlin strain gradient theory in orthogonal ...
AbstractIn this short note, general formulations of the Toupin–Mindlin strain gradient theory in ort...
In this paper, Mindlin’s second strain gradient theory is formulated and presented in an arbitrary o...
Equilibrium equations and boundary conditions of the strain gradient theory in arbitrary curvilinear...
Stress and strain tensors, the equilibrium equation in terms of the stress tensor and transformation...
The formulations for the modified couple stress theory (MCST) are consistently derived in general or...
A new phenomenological deformation theory with strain gradient effects is proposed. This theory, whi...
Abstract:Based on an analysis of connotation and extension of the concept of the orthogonal curvilin...
Based on an analysis of connotation and extension of the concept of the orthogonal curvilinear coord...
Bending deformations are reviewed in the context of strain gradient linear elasticity, considering t...
A Þnite element implementation is reported of the Fleck—Hutchinson phenomenological strain gradient ...
Analytical solutions to problems in finite elasticity are most often derived using the semi-inverse ...
A mechanism-based theory of strain gradient (MSG) plasticity has been proposed in Part I of this pap...
An oblique, Cartesian coordinate system arises from the geometry affiliated with a QR decomposition ...
A new strain gradient theory which is based on energy nonlocal model is proposed in this paper, and ...
In this short note, general formulations of the Toupin–Mindlin strain gradient theory in orthogonal ...
AbstractIn this short note, general formulations of the Toupin–Mindlin strain gradient theory in ort...
In this paper, Mindlin’s second strain gradient theory is formulated and presented in an arbitrary o...
Equilibrium equations and boundary conditions of the strain gradient theory in arbitrary curvilinear...
Stress and strain tensors, the equilibrium equation in terms of the stress tensor and transformation...
The formulations for the modified couple stress theory (MCST) are consistently derived in general or...
A new phenomenological deformation theory with strain gradient effects is proposed. This theory, whi...
Abstract:Based on an analysis of connotation and extension of the concept of the orthogonal curvilin...
Based on an analysis of connotation and extension of the concept of the orthogonal curvilinear coord...
Bending deformations are reviewed in the context of strain gradient linear elasticity, considering t...
A Þnite element implementation is reported of the Fleck—Hutchinson phenomenological strain gradient ...
Analytical solutions to problems in finite elasticity are most often derived using the semi-inverse ...
A mechanism-based theory of strain gradient (MSG) plasticity has been proposed in Part I of this pap...
An oblique, Cartesian coordinate system arises from the geometry affiliated with a QR decomposition ...
A new strain gradient theory which is based on energy nonlocal model is proposed in this paper, and ...