-supercyclicity

Abstract

We characterize the subsets of for which the notion of -supercyclicity coincides with the notion of hypercyclicity, where an operator T on a Banach space X is said to be -supercyclic if there exists x∈ X such that Orb( x, T)=X. In addition we characterize the sets ⊂ for which, for every operator T on X, T is hypercyclic if and only if there exists a vector x∈ X such that the set Orb( x, T) is somewhere dense in X. This extends results by Le\'on-M\"uller and Bourdon-Feldman respectively. We are also interested in the description of those sets ⊂ for which -supercyclicity is equivalent to supercyclicity.