Stabilisation of wave equations on the torus with rough dampings

Abstract

For the damped wave equation on a compact manifold with continuous dampings, the geometric control condition is necessary and sufficient for uniform stabilisation. In this article, on the two dimensional torus, in the special case where a(x) = Σ\j=1N a\j 1\x∈ R\j (R\j are polygons), we give a very simple necessary and sufficient geometric condition for uniform stabilisation. We also propose a natural generalization of the geometric control condition which makes sense for L∞ dampings. We show that this condition is always necessary for uniform stabilisation (for any compact (smooth) manifold and any L∞ damping), and we prove that it is sufficient in our particular case on T2 (and for our particular dampings).