CORRECTED SOLVABILITY CONDITIONS FOR NON-LINEAR ASYMMETRIC VIBRATIONS OF A CIRCULAR PLATE

The theoretical analysis of the problem of large amplitude vibration of thin elastic homogeneous plates has been treated by many authors [1][2][3]. Kung and Pao [4] have investigated the non-linear flexural vibrations of a thin clamped circular plate both experimentally and theoretically. Their inve

Geometric non-linearities for large amplitude free and forced vibrations of circular plates are investigated. In-plane displacement and in-plane inertia are included in the formulation. The finite element method is used. An harmonic force matrix for non-linear forced vibration analysis is introduced

In this article, a detailed study of the forced asymmetric non-linear vibrations of circular plates with a free edge is presented. The dynamic analogue of the von K" a arm" a an equations is used to establish the governing equations. The plate displacement at a given point is expanded on the linear

Non-linear free vibration of hinged orthotropic circular plates with a concentric rigid mass at the centre is studied by using the finite element method. Hamilton's principle is applied to derive the basis non-linear partial differential equations and associated boundary conditions for the problem o

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