A counterexample on polynomial multiple convergence without commutativity
Abstract
It is shown that for polynomials p1, p2 ∈ Z[t] with deg\ p1, deg\ p2 5 there exist a probability space (X, X,μ), two ergodic measure preserving transformations T,S acting on (X, X,μ) with hμ(X,T)=hμ(X,S)=0, and f, g ∈ L∞(X,μ) such that the limit equation* N∞1NΣn=0N-1 f(Tp1(n)x)g(Sp2(n)x) equation* does not exist in L2(X,μ), which in some sense answers a question by Frantzikinakis and Host.
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