English

On structure theorems and non-saturated examples

Dynamical Systems 2022-01-04 v1

Abstract

For any minimal system (X,T)(X,T) and d1d\geq 1 there is an associated minimal system (Nd(X),Gd(T))(N_{d}(X), \mathcal{G}_{d}(T)), where Gd(T)\mathcal{G}_{d}(T) is the group generated by T××TT\times\cdots\times T and T×T2××TdT\times T^2\times\cdots\times T^{d} and Nd(X)N_{d}(X) is the orbit closure of the diagonal under Gd(T)\mathcal{G}_{d}(T). It is known that the maximal dd-step pro-nilfactor of Nd(X)N_d(X) is Nd(Xd)N_d(X_d), where XdX_d is the maximal dd-step pro-nilfactor of XX. In this paper, we further study the structure of Nd(X)N_d(X). We show that the maximal distal factor of Nd(X)N_d(X) is Nd(Xdis)N_d(X_{dis}) with XdisX_{dis} being the maximal distal factor of XX, and prove that as minimal systems (Nd(X),Gd(T))(N_{d}(X), \mathcal{G}_{d}(T)) has the same structure theorem as (X,T)(X,T). In addition, a non-saturated metric example (X,T)(X,T) is constructed, which is not T×T2T\times T^2-saturated and is a Toeplitz minimal system.

Cite

@article{arxiv.2201.00152,
  title  = {On structure theorems and non-saturated examples},
  author = {Qinqi Wu and Hui Xu and Xiangdong Ye},
  journal= {arXiv preprint arXiv:2201.00152},
  year   = {2022}
}
R2 v1 2026-06-24T08:37:28.175Z