Divergence of weighted square averages in L1

Abstract

We study convergence of ergodic averages along squares with polynomial weights. For a given polynomial P∈ Z[·], consider the set of all θ∈[0,1) such that for every aperiodic system (X,μ, T) there is a function f∈ L1(X,μ) such that the weighted averages along squares 1NΣn=1N e(P(n)θ)Tn2f diverge on a set with positive measure. We show that this set is residual and includes the rational numbers as well as a dense set of Liouville numbers. This on one hand extends the divergence result for squares in L1 of the first author and Mauldin and on the other hand shows that the convergence result for linear weights for squares due to the second author and Krause in Lp, p>1 does not hold for p=1.