Common hypercyclic vectors for high dimensional families of operators

Abstract

Let (T\λ)\λ∈ be a family of operators acting on a F-space X, where the parameter space is a subset of Rd. We give sufficient conditions on the family to yield the existence of a vector x∈ X such that, for any λ∈, the set \T\λn x;\ n≥ 1\ is dense in X. We obtain results valid for any value of d≥ 1 whereas the previously known results where restricted to d=1. Our methods also shed new light on the one-dimensional case.