An example of a minimal action of the free semi-group +2 on the Hilbert space

Abstract

The Invariant Subset Problem on the Hilbert space is to know whether there exists a bounded linear operator T on a separable infinite-dimensional Hilbert space H such that the orbit \Tnx;\ n 0\ of every non-zero vector x∈ H under the action of T is dense in H. We show that there exists a bounded linear operator T on a complex separable infinite-dimensional Hilbert space H and a unitary operator V on H, such that the following property holds true: for every non-zero vector x∈ H, either x or Vx has a dense orbit under the action of T. As a consequence, we obtain in particular that there exists a minimal action of the free semi-group with two generators +2 on a complex separable infinite-dimensional Hilbert space H.