Existence theorems in linear chaos

Chaotic linear dynamics deals primarily with various topological ergodic properties of semigroups of continuous linear operators acting on a topological vector space. We treat questions of characterizing which of the spaces from a given class support a semigroup of prescribed shape satisfying a given topological ergodic property. In particular, we characterize countable inductive limits of separable Banach spaces that admit a hypercyclic operator, show that there is a non-mixing hypercyclic operator on a separable infinite dimensional complex Fr\'echet space $X$ if and only if $X$ is non-isomorphic to the space $\omega$ of all sequences with coordinatewise convergence topology. It is also shown for any $k\in\N$, any separable infinite dimensional Fr\'echet space $X$ non-isomorphic to $\omega$ admits a mixing uniformly continuous group $\{T_t\}_{t\in C^n}$ of continuous linear operators and that there is no supercyclic strongly continuous operator semigroup $\{T_t\}_{t\geq 0}$ on $\omega$. We specify a wide class of Fr\'echet spaces $X$, including all infinite dimensional Banach spaces with separable dual, such that there is a hypercyclic operator $T$ on $X$ for which the dual operator $T'$ is also hypercyclic. An extension of the Salas theorem on hypercyclicity of a perturbation of the identity by adding a backward weighted shift is presented and its various applications are outlined.