Slowly Changing Vectors and the Asymptotic Finite-Dimensionality of an Operator Semigroup

Abstract

Let T:X X be a linear power bounded operator on Banach space. Let X0 is a subspace of vectors tending to zero under iterating of T. We prove that if X0 is not equal to X then there exists λ in Sp(T) such that, for every ε>0, there is x such that |Tx-λ x|<ε but |Tnx|>1-ε for all n. The technique we develop enables us to establish that if X is reflexive and there exists a compactum K in X such that for every norm-one x∈ X \Tnx, K\<α (T)<1 for some n=n1, n2,... then codim(X0)<∞. The results hold also for a one-parameter semigroup.