Extension of hypercyclic and frequently hypercyclic subspaces

Abstract

We focus on the existence of large linear structures within the sets of hypercyclic and frequently hypercyclic vectors. For operators T satisfying Kitai's Criterion or the Frequent Hypercyclicity Criterion, we analyze the fundamental linear space \f(T)x | f ∈ H(C)\, studied by Herrero, Bourdon, Bès, Wengenroth, and many others. We show that the set \f(T)x | f ∈ H(C)\ can be extended within HC(T) \0\ or FHC(T) \0\ if x ∈ HC(T) or x ∈ FHC(T), respectively. The extension is such that the quotient of the new space with \ f(T)x f ∈ H(C) \ has dimension c (the cardinality of the continuum). Second, we prove that generically a finite-dimensional subspace contained in HC(T) \0\ can be enlarged to a subspace of dimension c. Third, we establish sufficient conditions for extending arbitrary linear subspaces both from HC(T) \0\ and FHC(T) \0\ to larger subspaces of dimension c.