Add to ORKGThe derivation of plate equations for a homogenous, fully anisotropic, elastic plate is considered. Power series expansions in the thickness coordinate for the displacements lead to recursion relations among the expansion functions. Using these in the boundary conditions a set of plate equations, which can be truncated to any order in the thickness, are obtained and it is believed that these equations are asymptotically correct. Numerical investigations for guided waves along the plate illustrate the accuracy
Approximate boundary conditions for an infinite elastic layer immersed in a fluid are derived. By us...
Dynamic equations for an anisotropic cylindrical shell are derived using a series expansion techniqu...
The subject of this thesis is to derive and evaluate governing equations and correspondingboundary c...
The derivation of plate equations for a homogenous, fully anisotropic, elastic plate is considered. ...
A hierarchy of dynamic plate equations is derived for a fully anisotropic elastic plate. Using power...
A hierarchy of dynamic plate equations is derived for an orthotropic elastic plate. Using power seri...
The subject of this thesis is dynamics of plates. Both anisotropic elastic plates, piezoelectric pla...
Thin structures are used in a wide range of engineering applications. The subject of this thesis is ...
A hierarchy of dynamic plate equations based on the three dimensional piezoelectric theory is derive...
AbstractThis work considers homogeneous isotropic micropolar plates adopting a power series expansio...
This work considers homogeneous isotropic micropolar plates adopting a power series expansion method...
The derivation of plate equations for a plate consisting of twolayers, one anisotropic elastic and o...
Piezoelectric materials have been used widely in applications for sensing and actuation purposes in ...
A finite element-based asymptotic analysis tool is developed for general anisotropic plates. The for...
Piezoelectric materials have been used widely in applications for sensing and actuation purposes in ...
Approximate boundary conditions for an infinite elastic layer immersed in a fluid are derived. By us...
Dynamic equations for an anisotropic cylindrical shell are derived using a series expansion techniqu...
The subject of this thesis is to derive and evaluate governing equations and correspondingboundary c...
The derivation of plate equations for a homogenous, fully anisotropic, elastic plate is considered. ...
A hierarchy of dynamic plate equations is derived for a fully anisotropic elastic plate. Using power...
A hierarchy of dynamic plate equations is derived for an orthotropic elastic plate. Using power seri...
The subject of this thesis is dynamics of plates. Both anisotropic elastic plates, piezoelectric pla...
Thin structures are used in a wide range of engineering applications. The subject of this thesis is ...
A hierarchy of dynamic plate equations based on the three dimensional piezoelectric theory is derive...
AbstractThis work considers homogeneous isotropic micropolar plates adopting a power series expansio...
This work considers homogeneous isotropic micropolar plates adopting a power series expansion method...
The derivation of plate equations for a plate consisting of twolayers, one anisotropic elastic and o...
Piezoelectric materials have been used widely in applications for sensing and actuation purposes in ...
A finite element-based asymptotic analysis tool is developed for general anisotropic plates. The for...
Piezoelectric materials have been used widely in applications for sensing and actuation purposes in ...
Approximate boundary conditions for an infinite elastic layer immersed in a fluid are derived. By us...
Dynamic equations for an anisotropic cylindrical shell are derived using a series expansion techniqu...
The subject of this thesis is to derive and evaluate governing equations and correspondingboundary c...