Finite difference schemes and partial differential equations
Finite difference schemes and partial differential equations
Spectral element method for acoustic wave simulation in heterogeneous media
Finite Elements in Analysis and Design - Special issue: selection of papers presented at ICOSAHOM'92
On some properties of 2D spectral finite elements in problems of wave propagation
Finite Elements in Analysis and Design
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In this paper, a Mindlin pseudospectral plate element is constructed to perform static, dynamic, and wave propagation analyses of plate-like structures. Chebyshev polynomials are used as basis functions and Chebyshev-Gauss-Lobatto points are used as grid points. Two integration schemes, i.e., Gauss-Legendre quadrature (GLEQ) and Chebyshev points quadrature (CPQ), are employed independently to form the elemental stiffness matrix of the present element. A lumped elemental mass matrix is generated by only using CPQ due to the discrete orthogonality of Chebyshev polynomials and overlapping of the quadrature points with the grid points. This results in a remarkable reduction of numerical operations in solving the equation of motion for being able to use explicit time integration schemes. Numerical calculations are carried out to investigate the influence of the above two numerical integration schemes in the elemental stiffness formation on the accuracy of static and dynamic response analyses. By comparing with the results of ABAQUS, this study shows that CPQ performs slightly better than GLEQ in various plates with different thicknesses, especially in thick plates. Finally, a one dimensional (1D) and a 2D wave propagation problems are used to demonstrate the efficiency of the present Mindlin pseudospectral plate element.