Stanislav Shkarin
Published 2010-08-19Version 1
Bonet, Frerick, Peris and Wengenroth constructed a hypercyclic operator on the locally convex direct sum of countably many copies of the Banach space $\ell_1$. We extend this result. In particular, we show that there is a hypercyclic operator on the locally convex direct sum of a sequence $\{X_n\}_{n\in\N}$ of Fr\'echet spaces if and only if each $X_n$ is separable and there are infinitely many $n\in\N$ for which $X_n$ is infinite dimensional. Moreover, we characterize inductive limits of sequences of separable Banach spaces which support a hypercyclic operator.
Comments: The paper is submitted to Journal of LMS
Continuity of bilinear maps on direct sums of topological vector spaces
Automatic boundedness of some operators between ordered and topological vector spaces
Complemented subspaces of locally convex direct sums of Banach spaces
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