Resolvent estimates for the one-dimensional damped wave equation with unbounded damping
Abstract
We study the generator G of the one-dimensional damped wave equation with unbounded damping. We show that the norm of the corresponding resolvent operator, \| (G - λ)-1 \|, is approximately constant as |λ| +∞ on vertical strips of bounded width contained in the closure of the left-hand side complex semi-plane, C- := \λ ∈ C: Re λ 0\. Our proof rests on a precise asymptotic analysis of the norm of the inverse of T(λ), the quadratic operator associated with G.
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