On Weak Decay Rates and Uniform Stability of Bounded Linear Operators

Abstract

We consider a bounded linear operator T on a complex Banach space X and show that its spectral radius r(T) satisfies r(T) < 1 if all sequences (< x',Tnx>)n ∈ N0 (x ∈ X, x' ∈ X') are, up to a certain rearrangement, contained in a principal ideal of the space c0 of sequences which converge to 0. From this result we obtain generalizations of theorems of G. Weiss and J. van Neerven. We also prove a related result on C0-semigroups.