Homogenization of von Kármán Plates Excited by Piezoelectric Patches

In this paper we extend some results from our earlier work [ 11, where additional The buckling of a thin clamped plate can be described by a function u (xl, x2) information about the model and its operator equation can be found. defined in a bounded domain Q ' 3 2 , being a solution of the equation

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

We deal with the system of quasistationary von Kà armà an equations describing moderately large de ections of thin viscoelastic plates. We concentrate on a di erential-type material, which gives rise to a quasistationary system with a linear pseudoparabolic main part and a non-linear di erential ter

Asymptotic behavior of solutions to a fully nonlinear von Kármán system is considered. The existence of compact attractors in the presence of nonlinear boundary damping is established. It is also shown that in the case of linear boundary dissipation, this attractor is of finite Hausdorff dimension (