Diskcyclicity of sets of operators and applications

Abstract

In this paper, we extend the notion of diskcyclicity and disk transitivity of a single operator to a subset of B(X). We establish a diskcyclicity criterion and we give the relationship between this criterion and the diskcyclicity. As applications, we study the diskcyclicty of C0-semigroups and C-regularized groups of operators. We show that a diskcyclic C0-semigroup exists on a complex topological vector space X if and only if dim(X)=1 or dim(X)=∞ and we prove that diskcyclicity and disk transitivity of a C0-semigroups and C-regularized groups are equivalent.