Failure of the L1 pointwise and maximal ergodic theorems for the free group

Abstract

Let F2 denote the free group on two generators a,b. For any measure-preserving system (X, X, μ, (Tg)g ∈ F2) on a finite measure space X = (X, X,μ), any f ∈ L1(X), and any n ≥ 1, define the averaging operators An f(x) := 14 × 3n-1 Σg ∈ F2: |g| = n f( Tg-1 x ), where |g| denotes the word length of g. We give an example of a measure-preserving system X and an f ∈ L1(X) such that the sequence An f(x) is unbounded in n for almost every x, thus showing that the pointwise and maximal ergodic theorems do not hold in L1 for actions of F2. This is despite the results of Nevo-Stein and Bufetov, who establish pointwise and maximal ergodic theorems in Lp for p>1 and for L L respectively, as well as an estimate of Naor and the author establishing a weak-type (1,1) maximal inequality for the action on 1(F2). Our construction is a variant of a counterexample of Ornstein concerning iterates of a Markov operator.