AbstractThe eigenvalue problem for the Hamiltonian operator associated with the mathematical model for the deflection of a thin elastic plate is investigated. First, the problem for a rectangular plate with simply supported edges is solved directly. Then, the completeness of the eigenfunctions is proved, thereby demonstrating the feasibility of using separation of variables to solve the problem. Finally, the general solution is obtained by using the proved expansion theorem
Rectangular, thin plates are common structural elements employed in many engineering applications an...
This paper is concerned with the investigation of the nonlinear eigenvalue problem describing the na...
The nonlinear differential eigenvalue problem describing eigenvibrations of a simply supported beam ...
The symplectic method for a thin piezoelectric plate problem is developed. The Hamiltonian canonical...
AbstractThis paper presents a bridging research between a modeling methodology in quantum mechanics/...
AbstractThe symplectic geometry method is introduced for exact bending solutions of moderately thick...
In the classical approach, it has been common to treat free vibration of rectangular Kirchhoff or th...
In this paper, the analytical solutions for an elastic rectangular thin plate with opposite boundary...
Abstract: On the example of the boundary value problem of bending of a thin elastic semi-i...
Abstract A new two-eigenfunctions theory, using the amplitude deflection and the generalized curvatu...
Consider algorithms to solve eigenvalue problems for partial differential equations describing the b...
The present article will give a Fadle eigenfunction analysis of rectangular plates in flexure by mea...
This paper deals with a classic but very difficult type of problems, i.e., pursuing analytic bucklin...
AbstractIn this paper, we investigate the behavior of the vibration modes (eigenvalues) of an isotro...
AbstractIn this paper, based on Lagrange–Germanian theory of elastic thin plates, applying the metho...
Rectangular, thin plates are common structural elements employed in many engineering applications an...
This paper is concerned with the investigation of the nonlinear eigenvalue problem describing the na...
The nonlinear differential eigenvalue problem describing eigenvibrations of a simply supported beam ...
The symplectic method for a thin piezoelectric plate problem is developed. The Hamiltonian canonical...
AbstractThis paper presents a bridging research between a modeling methodology in quantum mechanics/...
AbstractThe symplectic geometry method is introduced for exact bending solutions of moderately thick...
In the classical approach, it has been common to treat free vibration of rectangular Kirchhoff or th...
In this paper, the analytical solutions for an elastic rectangular thin plate with opposite boundary...
Abstract: On the example of the boundary value problem of bending of a thin elastic semi-i...
Abstract A new two-eigenfunctions theory, using the amplitude deflection and the generalized curvatu...
Consider algorithms to solve eigenvalue problems for partial differential equations describing the b...
The present article will give a Fadle eigenfunction analysis of rectangular plates in flexure by mea...
This paper deals with a classic but very difficult type of problems, i.e., pursuing analytic bucklin...
AbstractIn this paper, we investigate the behavior of the vibration modes (eigenvalues) of an isotro...
AbstractIn this paper, based on Lagrange–Germanian theory of elastic thin plates, applying the metho...
Rectangular, thin plates are common structural elements employed in many engineering applications an...
This paper is concerned with the investigation of the nonlinear eigenvalue problem describing the na...
The nonlinear differential eigenvalue problem describing eigenvibrations of a simply supported beam ...