Linear dynamics of the adjoint of a unilateral weighted shift operator

Abstract

This paper is a sequel to our work in Das-Mundayadan. Here, we primarily study the dynamics of the adjoint of a weighted forward shift operator Fw on the analytic function space pa,b having a normalized Schauder basis of the form \(an+bnz)zn:~n ≥ 0\. We obtain sufficient conditions for Fw to be continuous, and show, under certain conditions, that the operator Fw is similar to a compact perturbation of a weighted forward shift on p(N0). This also allows us to obtain the essential spectrum of Fw. Further, we study when the adjoint Fw* is hypercyclic, mixing, and chaotic, and provide a class of chaotic operators that are compact perturbations of weighted shifts on p(N0). Finally, it is proved that the adjoint of a shift on the dual of pa,b can have non-trivial periodic vectors, without being even hypercyclic. Also, the zero-one law of orbital limit points fails for Fw*, which means that, under certain conditions, the adjoint Fw* is non-hypercyclic, but it has an orbit possessing non-zero norm limit points.