Hypercyclicity of composition operators in Stein manifolds

Abstract

We characterise hypercyclic composition operators C:f f on the space of functions holomorphic on , where is a connected Stein manifold and is a holomorphic self-mapping of . In the case when all balls with respect to the Carath\'eodory pseudodistance are relatively compact in , we show that much simpler characterisation is possible (many natural classes of domains in N satisfy this condition). Moreover, we show that in such a class of manifolds, and in simply connected and infinitely connected planar domains, hypercyclicity of C implies its hereditary hypercyclicity.