Large Time Existence for Thin Vibrating Plates
Analysis of PDEs
2011-01-06 v2
Abstract
We construct strong solutions for a nonlinear wave equation for a thin vibrating plate described by nonlinear elastodynamics. For sufficiently small thickness we obtain existence of strong solutions for large times under appropriate scaling of the initial values such that the limit system as is either the nonlinear von K\'arm\'an plate equation or the linear fourth order Germain-Lagrange equation. In the case of the linear Germain-Lagrange equation we even obtain a convergence rate of the three-dimensional solution to the solution of the two-dimensional linear plate equation.
Cite
@article{arxiv.0909.2796,
title = {Large Time Existence for Thin Vibrating Plates},
author = {H. Abels and M. G. Mora and S. Müller},
journal= {arXiv preprint arXiv:0909.2796},
year = {2011}
}