Hypercyclic operators on topological vector spaces
Abstract
Bonet, Frerick, Peris and Wengenroth constructed a hypercyclic operator on the locally convex direct sum of countably many copies of the Banach space 1. We extend this result. In particular, we show that there is a hypercyclic operator on the locally convex direct sum of a sequence \Xn\n∈ of Fr\'echet spaces if and only if each Xn is separable and there are infinitely many n∈ for which Xn is infinite dimensional. Moreover, we characterize inductive limits of sequences of separable Banach spaces which support a hypercyclic operator.
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