Recurrent subspaces in Banach spaces

Abstract

We study the spaceability of the set of recurrent vectors Rec(T) for an operator T:X X on a Banach space X. In particular: we find sufficient conditions for a quasi-rigid operator to have a recurrent subspace; when X is a complex Banach space we show that having a recurrent subspace is equivalent to the fact that the essential spectrum of the operator intersects the closed unit disc; and we extend the previous result to the real case. As a consequence we obtain that: a weakly-mixing operator on a real or complex separable Banach space has a hypercyclic subspace if and only if it has a recurrent subspace. The results exposed exhibit a symmetry between the hypercyclic and recurrence spaceability theories showing that, at least for the spaceable property, hypercyclicity and recurrence can be treated as equals.

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