Free vibrations of a rectangular plate-cavity system

The free vibration problem of a system of two rectangular plates connected by a non-homogeneous elastic layer is considered. An integral formulation of the problem by using properties of Green's functions is achieved and by application of a quadrature method to the integral equation, the frequency e

## 1.  Vibrations of piezoelectric plates have been studied for a long time. In fact, in as early as 1952, Mindlin [1] derived the two-dimensional approximate theory of thickness and bending vibrations for piezoelectric plates. Dokmeci [2] made a review on the main works of vibrations o

In this paper, the free transverse vibrations of a system of two rectangular simply supported thin plates connected by a homogeneous Winkler elastic layer are investigated analytically. The small vibrations of the system are described by a set of two partial di!erential equations, based on the Kirch

Estimates of flexural vibration frequencies and modes of homogeneous rectangular plates are initially obtained by the dynamic edge effect method (Bolotin's asymptotic method). After separation of temporal and spatial variables all functions of the dynamic equations are represented by series expansio