Recurrence and vectors escaping to infinity for Lipschitz operators

Abstract: We investigate dynamical properties of linear operators that are obtained as the linearization of Lipschitz self-maps defined on a pointed metric space. These operators are known as Lipschitz operators. More concretely, for a Lipschitz operator $\widehat{f}$, we study the set of recurrent vectors and the set of vectors $\mu$ such that the sequence $(|\widehat{f}^n(\mu)|)_n$ goes to infinity. As a consequence of our results we get that there is no wild Lipschitz operator. Furthermore, several examples are presented illustrating our ideas. We highlight the cases when the underlying metric space is a connected subset of $\mathbb{R}$ or a subset of $\mathbb{Z}^d$. We end this paper studying some topological properties of the set of Lipschitz operators.