On structure theorems and non-saturated examples

Abstract

For any minimal system (X,T) and d≥ 1 there is an associated minimal system (Nd(X), Gd(T)), where Gd(T) is the group generated by T×·s× T and T× T2×·s× Td and Nd(X) is the orbit closure of the diagonal under Gd(T). It is known that the maximal d-step pro-nilfactor of Nd(X) is Nd(Xd), where Xd is the maximal d-step pro-nilfactor of X. In this paper, we further study the structure of Nd(X). We show that the maximal distal factor of Nd(X) is Nd(Xdis) with Xdis being the maximal distal factor of X, and prove that as minimal systems (Nd(X), Gd(T)) has the same structure theorem as (X,T). In addition, a non-saturated metric example (X,T) is constructed, which is not T× T2-saturated and is a Toeplitz minimal system.