The study examined the construction of the fundamental solution for the equations of statics {1,2} – approximation for transversely isotropic plates under bending with the action of concentrated force. Equations {1,2} -approximation were obtained by the decomposition method in the thickness coordinate using the Legendre polynomials. These equations take into account all the components of the stress tensor, including the transverse shear and normal stresses. Since the classical theory of Kirchhoff-Love doesn't take account of these stresses, the study on the basis of refined theories of stress-strain state of transversely isotropic plates under the action of concentrated force effects is an important scientific and technical problem.The fund...
Two variants of a refined theory for calculation of the rectangular orthotropic plates stress-strain...
This book explains in detail the generalized Fourier series technique for the approximate solution o...
Analytical solutions in exact closed-forms are obtained for stresses and displacements in an solid d...
The study examined the construction of the fundamental solution for the equations of statics {1,2}&n...
In present research, we examined and analyzed the fundamental solutions of the equations of statics ...
<p>The problem of static for transversely-isotropic plates, which are under the action of a concentr...
The general equations for the elastic analysis of transversely isotropic materials are written in a ...
Mathematical models of deformation of elastic plates are used by applied mathematicians and engineer...
This paper presents the bending stress analysis of anisotropic plate material under transverse loadi...
The refined theory of a transversely isotropic elastic plate is analysed. Based on the transversely ...
A plate theory is developed for the plane anisotropic plate using Kozik's linear exact displacement ...
The problem of a thin elastic plate in the form of Pascal's limacon under concentrated forces at the...
© Published under licence by IOP Publishing Ltd. The stress-strain state of elastic inhomogeneous is...
The paper studies the stress-strain state of flat elastic isotropic thin-walled shell structures in ...
A 5th order shear deformation theory considering transverse shear deformation effect as well as tran...
Two variants of a refined theory for calculation of the rectangular orthotropic plates stress-strain...
This book explains in detail the generalized Fourier series technique for the approximate solution o...
Analytical solutions in exact closed-forms are obtained for stresses and displacements in an solid d...
The study examined the construction of the fundamental solution for the equations of statics {1,2}&n...
In present research, we examined and analyzed the fundamental solutions of the equations of statics ...
<p>The problem of static for transversely-isotropic plates, which are under the action of a concentr...
The general equations for the elastic analysis of transversely isotropic materials are written in a ...
Mathematical models of deformation of elastic plates are used by applied mathematicians and engineer...
This paper presents the bending stress analysis of anisotropic plate material under transverse loadi...
The refined theory of a transversely isotropic elastic plate is analysed. Based on the transversely ...
A plate theory is developed for the plane anisotropic plate using Kozik's linear exact displacement ...
The problem of a thin elastic plate in the form of Pascal's limacon under concentrated forces at the...
© Published under licence by IOP Publishing Ltd. The stress-strain state of elastic inhomogeneous is...
The paper studies the stress-strain state of flat elastic isotropic thin-walled shell structures in ...
A 5th order shear deformation theory considering transverse shear deformation effect as well as tran...
Two variants of a refined theory for calculation of the rectangular orthotropic plates stress-strain...
This book explains in detail the generalized Fourier series technique for the approximate solution o...
Analytical solutions in exact closed-forms are obtained for stresses and displacements in an solid d...