Multiply minimal points for the product of iterates

Abstract

The multiple Birkhoff recurrence theorem states that for any d∈ N, every system (X,T) has a multiply recurrent point x, i.e. (x,x,…, x) is recurrent under τd=:T× T2× … × Td. It is natural to ask if there always is a multiply minimal point, i.e. a point x such that (x,x,…,x) is τd-minimal. A negative answer is presented in this paper via studying the horocycle flows. However, it is shown that for any minimal system (X,T) and any non-empty open set U, there is x∈ U such that \n∈ Z: Tnx∈ U, …, Tdnx∈ U\ is piecewise syndetic; and that for a PI minimal system, any M-subsystem of (Xd, τd) is minimal.