Here we discuss the possible ways of derivation of two-dimensional (2D) plate equations starting from the three-dimensional (3D) linear strain-gradient elasticity. Among various approaches we consider the direct approach, the through-the-thickness integration procedure and variational approaches based on minimization of total energy functional and other variational principles. We show that the non-classic boundary conditions of the 3D strain gradient elasticity and the reduction method may generally lead to different plate model, in general. As a result, the mechanics of plates based on strain gradient elasticity is broader than the classic theory
International audienceIt is well known that bending and stretching modes of deformation in linearly-...
In this work, we present an exact 3D plate solution in the conventional form of 2D plate theories wi...
In this paper a general procedure for a rational derivation of plate theories is proposed. The metho...
Here we discuss the possible ways of derivation of two-dimensional (2D) plate equations starting fro...
Gradient elastic flexural Kirchhoff plates under static loading are considered. Their governing equa...
AbstractGradient elastic flexural Kirchhoff plates under static loading are considered. Their govern...
The aim of the paper is to formulate the two-dimensional governing equations in the theory of elasti...
In this paper we derive a strain gradient plate model from the three-dimensional equations of strain...
We consider the derivation and rigorous justification of models for thin linearly elastic plates usi...
In this paper we derive a strain gradient plate model from the three-dimensional equations of strain...
Theories on intrinsic or material length scales find applications in the modeling of size-dependent ...
International audienceNon-linear plate theory for thin prismatic elastic bodies is obtained by estim...
Nonlinear plate bending within Mindlin's strain gradient elasticity theory (SGT) is investigated by ...
International audienceIt is well known that bending and stretching modes of deformation in linearly-...
In this work, we present an exact 3D plate solution in the conventional form of 2D plate theories wi...
In this paper a general procedure for a rational derivation of plate theories is proposed. The metho...
Here we discuss the possible ways of derivation of two-dimensional (2D) plate equations starting fro...
Gradient elastic flexural Kirchhoff plates under static loading are considered. Their governing equa...
AbstractGradient elastic flexural Kirchhoff plates under static loading are considered. Their govern...
The aim of the paper is to formulate the two-dimensional governing equations in the theory of elasti...
In this paper we derive a strain gradient plate model from the three-dimensional equations of strain...
We consider the derivation and rigorous justification of models for thin linearly elastic plates usi...
In this paper we derive a strain gradient plate model from the three-dimensional equations of strain...
Theories on intrinsic or material length scales find applications in the modeling of size-dependent ...
International audienceNon-linear plate theory for thin prismatic elastic bodies is obtained by estim...
Nonlinear plate bending within Mindlin's strain gradient elasticity theory (SGT) is investigated by ...
International audienceIt is well known that bending and stretching modes of deformation in linearly-...
In this work, we present an exact 3D plate solution in the conventional form of 2D plate theories wi...
In this paper a general procedure for a rational derivation of plate theories is proposed. The metho...