Add to ORKGEquivalence of differential conditions of elastic equilibrium for homogeneous Saint-Venant beams and for composite Kirchhoff plates is established. New exact solutions in the theory of thin plates with no kinematic boundary constraints are inferred. Benchmarks for computational mechanics are provided
International audienceWe compare different models describing the buckling, post-buckling and vibrati...
In this paper, the differential equations of Mindlin plates are derived from basic principles by sim...
KIRCHHOFF’S theory [1] and the first-order shear deformation theory (FSDT) [2] of plates in bending ...
Equivalence of differential conditions of elastic equilibrium for homogeneous Saint-Venant beams and...
Torsion of linearly elastic homogeneous and orthotropic Saint-Venant beams is based on the solution ...
New exact solutions for isotropic Kirchhoff plates, with no kinematic boundary constraints, are infe...
Exact solutions of elastic Kirchhoff plates are available only for spe- cial geometries, loadings an...
Viscoelastic equilibrium problems of KIRCHHOFF plates can be solved in a closed form only under spec...
The relationships of bending solutions between Timoshenko beams and Euler-Bernoulli beams are derive...
The elastostatic problem of a functionally graded KIRCHHOFF plate, with no kinematic constraints on ...
Using the mathematical similarity of the governing equations of the classical beam and plate theorie...
The 2-D approximation functions based on a general exact 3-D plate solution are used to derive locki...
In this article numerical results, obtained by the FEM planе-spatial problem solution, in the case o...
International audienceWe compare different models describing the buckling, post-buckling and vibrati...
In this paper, the differential equations of Mindlin plates are derived from basic principles by sim...
KIRCHHOFF’S theory [1] and the first-order shear deformation theory (FSDT) [2] of plates in bending ...
Equivalence of differential conditions of elastic equilibrium for homogeneous Saint-Venant beams and...
Torsion of linearly elastic homogeneous and orthotropic Saint-Venant beams is based on the solution ...
New exact solutions for isotropic Kirchhoff plates, with no kinematic boundary constraints, are infe...
Exact solutions of elastic Kirchhoff plates are available only for spe- cial geometries, loadings an...
Viscoelastic equilibrium problems of KIRCHHOFF plates can be solved in a closed form only under spec...
The relationships of bending solutions between Timoshenko beams and Euler-Bernoulli beams are derive...
The elastostatic problem of a functionally graded KIRCHHOFF plate, with no kinematic constraints on ...
Using the mathematical similarity of the governing equations of the classical beam and plate theorie...
The 2-D approximation functions based on a general exact 3-D plate solution are used to derive locki...
In this article numerical results, obtained by the FEM planе-spatial problem solution, in the case o...
International audienceWe compare different models describing the buckling, post-buckling and vibrati...
In this paper, the differential equations of Mindlin plates are derived from basic principles by sim...
KIRCHHOFF’S theory [1] and the first-order shear deformation theory (FSDT) [2] of plates in bending ...