Kaïs Ammari, Ahmed Bchatnia, Karim El Mufti
Published 2017-05-03Version 1
We deal with the wave equation with assigned moving boundary ($0<x<a(t)$) upon which Dirichlet-Neuman boundary conditions are satisfied, here $a(t)$ is assumed to move slower than the light and periodically. We give a feedback which guarantees the exponential decay of the energy. The proof relies on a reduction theorem of Yoccoz. At the end we give a remark on the moving-pointwise stabilization problem.
Waves along fractal coastlines: From fractal arithmetic to wave equations
Twisted recurrence for dynamical systems with exponential decay of correlations
Holder regularity and exponential decay of correlations for a class of piecewise partially hyperbolic maps
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