Polynomial orbits in totally minimal systems

Abstract

Inspired by the recent work of Glasner, Huang, Shao, Weiss and Ye, we prove that the maximal ∞-step pro-nilfactor X∞ of a minimal system (X,T) is the topological characteristic factor along polynomials in a certain sense. Namely, we show that by an almost one to one modification of π:X X∞, the induced open extension π*:X* X∞* has the following property: for any d∈ N, any open subsets V0,V1,…,Vd of X* with i=0d π*(Vi)≠ and any distinct non-constant integer polynomials pi with pi(0)=0 for i=1,…,d, there exists some n∈ Z such that V0 T-p1(n)V1 … T-pd(n)Vd ≠ . where an integer polynomial is the polynomial with rational coefficients taking integer values on the integers. As an application, the following result is obtained: for a totally minimal system (X,T) and integer polynomials p1,…,pd, if every non-trivial integer combination of p1,…,pd is not constant, then there is a dense Gδ subset of X such that the set \[ \(Tp1(n)x,…, Tpd(n)x):n∈ Z\ \] is dense in Xd for every x∈ .