Cyclic Composition Operators on Segal-Bargmann space

Abstract

We study the hypercyclic, supercyclic and cyclic properties of composition operator Cφ on the Segal-Bargmann space H(E), where φ (z)=Az+b, A∈ B(E), b∈ E with \|A\|≤ 1 and A*b∈ (I-A*A)12. In this connection we also give a characterization of the symbols φ which induce the bounded composition operator Cφ on H(E) and show that the properties of φ influence the cyclic behaviour of Cφ.