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Hypercyclic subspaces in Fréchet spaces |
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| Authors: | L Bernal-Gonzá lez |
| Institution: | Departamento De Análisis Matemático, Facultad De Matemáticas, Apdo. 1160, Avenida Reina Mercedes, 41080 Sevilla, Spain |
| Abstract: | In this note, we show that every infinite-dimensional separable Fréchet space admitting a continuous norm supports an operator for which there is an infinite-dimensional closed subspace consisting, except for zero, of hypercyclic vectors. The family of such operators is even dense in the space of bounded operators when endowed with the strong operator topology. This completes the earlier work of several authors. |
| Keywords: | Hypercyclic operator hypercyclic sequence hypercyclic subspace backward shift Fr\'echet space |
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