The symplectic method for a thin piezoelectric plate problem is developed. The Hamiltonian canonical equation of thin piezoelectric plate is given by using the variational principle. By applying the separation of variables method, we can obtain symplectic orthogonal eigensolutions. As an application, the problem of a thin piezoelectric plate with full edges simply supported under a uniformly distributed load is discussed, and analytical solutions of the deflection and potential of a piezoelectric thin plate are obtained. A numerical example shows that the solutions converge very rapidly. The advantage of this method is that it does not need to assume the predetermined function in advance, so it has better universality. It may also be applie...
Abstract. The aim of this paper is to analyze a piecewise linear finite element method to approximat...
The derivation of plate equations for a plate consisting of twolayers, one anisotropic elastic and o...
This paper presents an exact three-dimensional method of solution for the distribution of mechanical...
AbstractThe eigenvalue problem for the Hamiltonian operator associated with the mathematical model f...
In the classical approach, it has been common to treat free vibration of rectangular Kirchhoff or th...
AbstractThis paper presents a bridging research between a modeling methodology in quantum mechanics/...
In this paper a theory of thin piezoelectric plates is obtained through a rational derivation from t...
AbstractThe symplectic geometry method is introduced for exact bending solutions of moderately thick...
In this paper, the analytical solutions for an elastic rectangular thin plate with opposite boundary...
The subject of this thesis is dynamics of plates with thin piezoelectric layers. Piezoelectric mater...
In this paper, a symplectic model, based on the Hamiltonian system, is developed for analyzing singu...
This paper deals with a classic but very difficult type of problems, i.e., pursuing analytic bucklin...
This paper undertakes model development and numerical simulations of vibration problem of piezoelect...
A Reissner-Mindlin-type modellization of piezoelectric plates is here considered in a suitable varia...
International audienceThe paper presents an efficient two-dimensional approach to piezoelectric plat...
Abstract. The aim of this paper is to analyze a piecewise linear finite element method to approximat...
The derivation of plate equations for a plate consisting of twolayers, one anisotropic elastic and o...
This paper presents an exact three-dimensional method of solution for the distribution of mechanical...
AbstractThe eigenvalue problem for the Hamiltonian operator associated with the mathematical model f...
In the classical approach, it has been common to treat free vibration of rectangular Kirchhoff or th...
AbstractThis paper presents a bridging research between a modeling methodology in quantum mechanics/...
In this paper a theory of thin piezoelectric plates is obtained through a rational derivation from t...
AbstractThe symplectic geometry method is introduced for exact bending solutions of moderately thick...
In this paper, the analytical solutions for an elastic rectangular thin plate with opposite boundary...
The subject of this thesis is dynamics of plates with thin piezoelectric layers. Piezoelectric mater...
In this paper, a symplectic model, based on the Hamiltonian system, is developed for analyzing singu...
This paper deals with a classic but very difficult type of problems, i.e., pursuing analytic bucklin...
This paper undertakes model development and numerical simulations of vibration problem of piezoelect...
A Reissner-Mindlin-type modellization of piezoelectric plates is here considered in a suitable varia...
International audienceThe paper presents an efficient two-dimensional approach to piezoelectric plat...
Abstract. The aim of this paper is to analyze a piecewise linear finite element method to approximat...
The derivation of plate equations for a plate consisting of twolayers, one anisotropic elastic and o...
This paper presents an exact three-dimensional method of solution for the distribution of mechanical...