A stability result concerning the obstacle problem for a plate

In the recent paper [13] we have answered the question of stability for the linear circular plate which is being axially compressed by a force greater than the critical value and contacts a plane obstacle. In this case there are radially symmetric solutions and the contact region is a disk of a smal

## Abstract We consider the dynamical one‐dimensional Mindlin–Timoshenko model for beams. We study the existence of solutions for a contact problem associated with the Mindlin–Timoshenko system. We also analyze how its energy decays exponentially to zero as time goes to infinity. Copyright © 2008 J

We prove a multiplicity result for the Yamabe problem on the manifold (S, g~), where g~is a perturbation of the standard metric g 0 of S n . Solutions are found by variational methods via an abstract perturbation result.

## Abstract Let Ω~1~ and Ω~2~ be bounded, connected open sets in \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$\mathbb {R}^N$\end{document} with continuous boundary, and let __p__ > 2. We show that every positive linear isometry __T__ from __W__^1, __p__^(Ω~1~) to __W

## Abstract We prove __C__^0, α^ regularity for local minimizers __u__ of functionals with __p__(__x__)‐growth of the type in the class \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$K :=\lbrace w \in W^{1,p(\cdot )}(\Omega ;{\mathbb R}): w \ge \psi \rbrace$\end{docum