Topological correspondence of multiple ergodic averages of nilpotent group actions

Abstract

Let (X,) be a topological system, where is a nilpotent group generated by T1,…, Td such that for each T∈ , T≠ e, (X,T) is weakly mixing and minimal. For d,k∈ N, let pi,j(n), 1 i k, 1 j d be polynomials with rational coefficients taking integer values on the integers and pi,j(0)=0. We show that if the expressions gi(n)=T1pi,1(n)·s Tdpi,d(n) depends nontrivially on n for i=1,2,·s,k, and for all i≠ j∈ \1,2,…,k\ the expressions gi(n)gj(n)-1 depend nontrivially on n, then there is a residual set X0 of X such that for all x∈ X0 equation* \(g1(n)x, g2(n)x,…, gk(n)x)∈ Xk:n∈ Z\ equation* is dense in Xk.