On the complexity of upper frequently hypercyclic vectors

Abstract

Given a continuous linear operator T:X X, where X is a topological vector space, let UFHC(T) be the set of upper frequently hypercyclic vectors, that is, the set of vectors x ∈ X such that \n ∈ ω: Tnx ∈ U\ has positive upper asymptotic density for all nonempty open sets U⊂eq X. It is known that UFHC(T) is a Gδσδ-set which is either empty or contains a dense Gδ-set. Using a purely topological proof, we improve it by showing that UFHC(T) is always a Gδσ-set. Bonilla and Grosse-Erdmann asked in [Rev. Mat. Complut. 31 (2018), 673--711] whether UFHC(T) is always a Gδ-set. We answer such question in the negative, by showing that there exists a continuous linear operator T for which UFHC(T) is not a Fσδ-set (hence not Gδ). In addition, we study the [non-]equivalence between (the ideal versions of) upper frequently hypercyclicity in the product topology and upper frequently hypercyclicity in the norm topology.