The (L1,L1) bilinear Hardy-Littlewood function and Furstenberg averages

Abstract

Let (X,B, μ, T) be an ergodic dynamical system on a non-atomic finite measure space. Consider the maximal function R*:(f, g) ∈ L1× L1 R*(f, g)(x) = n f(Tnx)g(T2nx)n. We show that there exist f and g such that R*(f, g)(x) is not finite almost everywhere. Two consequences are derived. The bilinear Hardy--Littlewood maximal function fails to be a.e. finite for all functions (f, g)∈ L1× L1. The Furstenberg averages do not converge for all pairs of (L1,L1) functions, while by a result of J. Bourgain these averages converge for all pairs of (Lp,Lq) functions with 1p+1q≤ 1.