Stanislav Shkarin
Published 2012-09-05Version 1
We prove that a continuous linear operator $T$ on a topological vector space $X$ with weak topology is mixing if and only if the dual operator $T'$ has no finite dimensional invariant subspaces. This result implies the characterization of hypercyclic operators on the space $\omega$ due to Herzog and Lemmert and implies the result of Bayart and Matheron, who proved that for any hypercyclic operator $T$ on $\omega$, $T\oplus T$ is also hypercyclic.
Journal: Demonstratio Math. 44 (2011), 143-150
Trichotomy for the orbits of a hypercyclic operator on a Banach space
Remarks on common hypercyclic vectors
On a weak topology for Hadamard spaces
![QR code for arXiv:1209.0979 [math.FA]](http://oss.arxitics.com/images/favicon.svg)