Relative compactness of orbits and geometry of Banach spaces

Abstract

We investigate for a bounded semigroup of linear operators S on a Banach space E and a vector x ∈ E, when relative compactness of S(I-T)x for every T ∈ S implies relative compactness of the orbit Sx. In particular, we derive characterizations of separable Banach spaces not containing c0 and of reflexivity of Banach spaces with a Schauder basis in terms of such compactness results.