Abstract damped wave equations: The optimal decay rate

Abstract

The exponential decay rate of the semigroup S(t)=etA generated by the abstract damped wave equation u + 2f(A) u +A u=0 is here addressed, where A is a strictly positive operator. The continuous function f, defined on the spectrum of A, is subject to the constraints ∈f f(s)>0 f(s)/s <∞ which are known to be necessary and sufficient for exponential stability to occur. We prove that the operator norm of the semigroup fulfills the estimate \|S(t)\|≤ Ceσ*t being σ*<0 the supremum of the real part of the spectrum of A. This estimate always holds except in the resonant cases, where the negative exponential eσ*t turns out to be penalized by a factor (1+t). The decay rate is the best possible allowed by the theory.