Topological mild mixing of all orders along polynomials

Abstract

A minimal system (X,T) is topologically mildly mixing if all non-empty open subsets U,V, \n∈ : U T-nV≠ \ is an IP*-set. In this paper we show that if a minimal system is topologically mildly mixing, then it is mild mixing of all orders along polynomials. That is, suppose that (X,T) is a topologically mildly mixing minimal system, d∈ , p1(n),…, pd(n) are integral polynomials with no pi and no pi-pj constant, 1 i≠ j d, then for all non-empty open subsets U , V1, …, Vd , \n∈ : U T-p1(n) V1 T-p2(n)V2 … T-pd(n) Vd ≠ \ is an IP*-set. We also give the theorem for systems under abelian group actions.