Positive entropy implies chaos along any infinite sequence

Abstract

Let G be an infinite countable discrete amenable group. For any G-action on a compact metric space (X,), it turns out that if the action has positive topological entropy, then for any sequence \si\i=1+∞ with pairwise distinct elements in G there exists a Cantor subset K of X which is Li-Yorke chaotic along this sequence, that is, for any two distinct points x,y∈ K, one has \[i+∞(si x,siy)>0,\ and\ i+∞(six,siy)=0.\]