Application of the DSC-Element method to flexural vibration of skew plates with continuous and discontinuous boundaries

This paper presents an application of the spline element method based on the Mindlin plate theory to analyze the vibration of thick skew plates with varying thickness in the longitudinal direction. To demonstrate the convergence and accuracy of the present method, several examples are solved, and re

AbstractÐThe boundary-domain element method is applied to the free vibration problem of thinwalled plate structures. The static fundamental solutions are used for the derivation of the integral equations for both in-plane and out-of-plane motions. All the integral equations to be implemented are reg

The spectral finite element method and equally the dynamic stiffness method use exponential functions as basis functions. Thus it is possible to find exact solutions to the homogeneous equations of motion for simple rod, beam, plate and shell structures. Normally, this restricts the analysis to elem

this paper, we consider the vibration of a thin rectangular plate supported by identical beams at two opposing sides. This plate-beam system is rigidly supported at the remaining sides. The finite-element method is used to calculate the natural frequencies for the plate-beam system and to solve the