Periodic damping gives polynomial energy decay
Abstract
Let u solve the damped Klein--Gordon equation ( ∂t2-Σ ∂xj2 +m Id +γ(x) ∂t ) u=0 on Rn with m>0 and γ≥ 0 bounded below on a 2 π Zn-invariant open set by a positive constant. We show that the energy of the solution u decays at a polynomial rate. This is proved via a periodic observability estimate on Rn.
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