On asymptotics for C0-semigroups

Abstract

We stretch the spectral bound equal growth bound condition along with a generalized Lyapunov stability theorem, known to hold for C0-semigroups of normal operators on complex Hilbert spaces, to C0-semigroups of scalar type spectral operators on complex Banach spaces. For such semigroups, we obtain exponential estimates with the best stability constants. We also extend to a Banach space setting a celebrated characterization of uniform exponential stability for C0-semigroups on complex Hilbert spaces and thereby acquire a characterization of uniform exponential stability for scalar type spectral and eventually norm-continuous C0-semigroups.