Spectral Properties and Stability of One-Parameter Semigroups

The classical theory of continuous almost periodic functions on the real line was extended by Fre chet in 1941 [14,15], to the case of continuous almost periodic functions on half-lines. Since then, the theory of asymptotically almost periodic functions as they were called by Fre chet became the sub

The question regarding the relationship between the spectral decomposition property of operators of a strongly continuous semigroup and that of its generator has been left open for many years. This paper proves that if one of the operators of a strongly continuous semigroup has the spectral decompos

## Abstract We investigate polynomial decay of classical solutions of linear evolution equations. For bounded strongly continuous semigroups on a Banach space this property is closely related to polynomial growth estimates of the resolvent of the generator. For systems of commuting normal operators

We prove several characterizations of strong stability of uniformly bounded evolution families ðUðt; sÞÞ t5s50 of bounded operators on a Banach space X , i.e. we characterize the property lim t!1 jjUðt; sÞxjj ¼ 0 for all s50 and all x 2 X . These results are connected to the asymptotic stability of