Existence of bounded uniformly continuous mild solutions on R of evolution equations and their asymptotic behaviour

Abstract

We prove that u'= A u + φ has on R a mild solution uφ∈ BUC (R,X) (that is bounded and uniformly continuous), where A is the generator of a C0-semigroup on the Banach space X with resolvent satisfying ||R(it,A)||= O(|t|-θ), |t| ∞ , with some θ > 1/2, φ∈ L∞ (R,X) and i\,sp (φ) σ (A)=. As a consequence it is shown that if F is the space of almost periodic, almost automorphic, bounded Levitan almost periodic or certain classes of recurrent functions and φ as above is such that Mh φ:=(1/h)∫0h φ (·+s)\, ds ∈ F for each h >0, then uφ∈ F BUC (R,X). These results seem new and strengthen several recent theorems.