A Metric Framework for Approximate Transitivity, Mixing, and Hypercyclicity

Abstract

We study metric versions of transitivity, mixing, and hypercyclicity for continuous maps, based on intersections of the form \( fn(U) Bδ(V)≠. \) We introduce δ-topological transitivity, δ-topological mixing, and a uniform-from-below version of δ-mixing, and prove \( UFB-δ-TM \;⇒\; δ-TM \;⇒\; δ-TT. \) In the linear setting of separable F-spaces, we formulate a δ-Hypercyclicity Criterion, prove that it implies δ-hypercyclicity, and show that the classical Hypercyclicity Criterion implies the δ-criterion for every δ>0. We further show that this criterion yields eventual δ-mixing along the underlying sequence. Finally, we discuss weighted backward shifts, derive sufficient conditions for δ-topological mixing, and show that λ B satisfies the δ-Hypercyclicity Criterion for every δ>0.