On the convergence of the Chien's perturbation method for von Karman plate equations

The asymptotic behavior of the solutions of three-dimensional nonlinear elastodynamics in a thin plate is studied, as the thickness h of the plate tends to zero. We discuss the long time existence and convergence to solutions of the time-dependent von Kármán and linear plate equation under appropria

## Abstract Numerical methods for nonlinear plate dynamics play an important role across many disciplines. In this article, the focus is on numerical stability for numerical methods for the von Karman system, through the use of energy‐conserving methods. It is shown that one may take advantage of s

Non-linear phenomena in the vibration of a square plate subject to lateral forcing are studied. Starting from the dynamic analogue of the von Ka´rma´n partial differential equations that govern the motion of the plate, a system of second order non-linear ordinary differential equations are derived.

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We consider a dynamical von Ka´rma´n system in the presence of thermal effects. Our model includes the possibility of a rotational inertia term in the system. We show that the total energy of the solution of such system decays exponentially as tP# R. The decay rates we obtain are uniform on bounded