Mean Li-Yorke chaos along some good sequences

Abstract

If a topological dynamical system (X,T) has positive topological entropy, then it is multivariant mean Li-Yorke chaotic along a sequence \ak\k=1∞ of positive integers which is "good" for pointwise ergodic convergence with a mild condition; more specifically, there exists a Cantor subset K of X such that for every n2 and pairwise distinct points x1,x2,…c,xn in K we have \[N∞1NΣk=1N1≤ i<j≤ n d(Takxi,Takxj)=0\] and \[N∞1NΣk=1N1≤ i<j≤ n d(Takxi,Takxj)>0.\] Examples are given for the classic sequences of primes and generalized polynomials.