A new metric for statistical properties of long time behaviors

Abstract

Let (X,T) be a topological dynamical system with metric d. We define a new function F(x,y)=n +∞ ∈fσ ∈ Sn 1n Σk=1n d(Tk x,Tσ(k) y) by using permutation group Sn. It's shown F(x,y)=n +∞ ∈fσ ∈ Sn 1n Σk=1n d(Tk x,Tσ(k) y) exists when x,y ∈ X are generic points. Applying this function, we prove (X,T) is uniquely ergodic if and only if F(x,y)=0 for any x,y ∈ X. The characterizations of ergodic measures and physical measures by F(x,y) are given. We introduce the notion of weak mean equicontinuity and prove that (X,T) is weak mean equicontinuous if and only if the time averages f*(x)=n +∞ 1n Σk=1n f(Tk x) exist and are continuous for all f ∈ C(X).