| Popis: |
We initiate a study of the forward weighted shift operator, denoted by $F_w$, defined on the Banach spaces $\ell^p_{a,b}(\mathtt{A})$ and $c_{0,a,b}(\mathtt{A})$ of analytic functions on a suitable annulus $\mathtt{A}$ in the complex plane. Here, $\ell^p_{a,b}(\mathtt{A})$ and $c_{0,a.b}(\mathtt{A})$, respectively, are the spaces of analytic functions on some annulus $\mathtt{A}$, having normalized Schauder bases of the form $\{(a_n+b_nz)z^n, ~~n\in \mathbb{Z}\}$, which are equivalent to the standard basis in $\ell^p(\mathbb{Z})$ and $c_0(\mathbb{Z})$. We first obtain necessary and sufficient conditions for $F_w$ to be bounded, and then we primarily study when $F_w$ and its adjoint $F_w^*$ are hypercyclic, supercyclic, and chaotic. It is proved that, under certain conditions on $\{a_n\}$ and $\{b_n\}$, the operator $F_w$ similar to a compact perturbation of a classical bilateral weighted shift on $\ell^p(\mathbb{Z})$. Unlike the case of classical weighted shifts, the adjoint operator $F_w^*$ on the dual of $\ell^p_{a,b}(\mathtt{A})$ can have non-trivial periodic vectors, without being even hypercyclic. The zero-one law of orbital limit points fails for $F_w^*$. |
