A highly efficient and accurate analytical spectral dynamic stiffness (SDS) method for modal analysis of plane elastodynamic problems based on both plane stress and plane strain assumptions is presented in this paper. First, the general solution satisfying the governing differential equation exactly is derived by applying two types of one-dimensional modified Fourier series. Then the SDS matrix for an element is formulated symbolically using the general solution. The SDS matrices are assembled directly in a similar way to that of the finite element method, demonstrating the method's capability to model complex structures. Any arbitrary boundary conditions are represented accurately in the form of the modified Fourier series. The Wittrick-Wi...
The dynamic stiffness method for composite plate elements based on the first order shear deformation...
The application of the dynamic stiffness method (DSM) for free-vibration analysis of beams is survey...
In linear elasticity, most of the theories of structures in dynamics are governed by partial differe...
A spectral dynamic stiffness (SDS) model for plate assemblies stiffened by beams is proposed. The th...
A spectral-dynamic stiffness method (S-DSM) for exact free vibration analysis of general orthotropic...
The dynamic stiffness matrix of a rectangular plate for the most general case is developed by solvin...
When the structure vibrates with high frequency, the finite element method needs to be modeled with ...
The dynamic stiffness formulation for both inplane and bending free vibration based on the first ord...
An exact dynamic stiffness method based on higher order shear deformation theory is developed for th...
An exact dynamic stiffness matrix for a beam is developed by integrating the Rayleigh–Love theory fo...
Closed-form dynamic stiffness (DS) formulations coupled with an efficient eigen-solution technique a...
The paper describes free vibration of Timoshenko beam by using spectral element method. Based on the...
An exact spectral-dynamic stiffness method (S-DSM) for free vibration analysis of composite plates a...
The free vibration of functionally graded Timoshenko beams is investigated by developing the dynamic...
This paper presents an exact spectral dynamic stiffness (SDS) theory for composite plates and plate ...
The dynamic stiffness method for composite plate elements based on the first order shear deformation...
The application of the dynamic stiffness method (DSM) for free-vibration analysis of beams is survey...
In linear elasticity, most of the theories of structures in dynamics are governed by partial differe...
A spectral dynamic stiffness (SDS) model for plate assemblies stiffened by beams is proposed. The th...
A spectral-dynamic stiffness method (S-DSM) for exact free vibration analysis of general orthotropic...
The dynamic stiffness matrix of a rectangular plate for the most general case is developed by solvin...
When the structure vibrates with high frequency, the finite element method needs to be modeled with ...
The dynamic stiffness formulation for both inplane and bending free vibration based on the first ord...
An exact dynamic stiffness method based on higher order shear deformation theory is developed for th...
An exact dynamic stiffness matrix for a beam is developed by integrating the Rayleigh–Love theory fo...
Closed-form dynamic stiffness (DS) formulations coupled with an efficient eigen-solution technique a...
The paper describes free vibration of Timoshenko beam by using spectral element method. Based on the...
An exact spectral-dynamic stiffness method (S-DSM) for free vibration analysis of composite plates a...
The free vibration of functionally graded Timoshenko beams is investigated by developing the dynamic...
This paper presents an exact spectral dynamic stiffness (SDS) theory for composite plates and plate ...
The dynamic stiffness method for composite plate elements based on the first order shear deformation...
The application of the dynamic stiffness method (DSM) for free-vibration analysis of beams is survey...
In linear elasticity, most of the theories of structures in dynamics are governed by partial differe...