Density properties of orbits for a hypercyclic operator on a Banach space

Abstract

We study density properties of orbits for a hypercyclic operator T on a separable Banach space X, and show that exactly one of the following four cases holds: (1) every vector in X is asymptotic to zero with density one; (2) generic vectors in X are distributionally irregular of type 1; (3) generic vectors in X are distributionally irregular of type 212 and no hypercyclic vector is distributionally irregular of type 1; (4) every hypercyclic vector in X is divergent to infinity with density one. We also present some examples concerned with weighted backward shifts on p to show that all the above four cases can occur. Furthermore, we show that similar results hold for C0-semigroups.