Existence and Non-existence of Solutions to the Coboundary Equation for Measure Preserving Systems

Abstract

Let (X,B,μ) be a standard probability space. We give new fundamental results determining solutions to the coboundary equation: eqnarray* f = g - g T eqnarray* where f ∈ Lp and T is ergodic invertible measure preserving on (X, B, μ ). We extend previous results by showing for any measurable f that is non-zero on a set of positive measure, the class of measure preserving T with a measurable solution g is meager (including the case where ∫X f dμ = 0). From this fact, a natural question arises: given f, does there always exist a solution pair T and g? In regards to this question, our main results are: (i) Given measurable f, there exists an ergodic invertible measure preserving transformation T and measurable function g such that f(x) = g(x) - g(Tx) for a.e. x∈ X, if and only if ∫f > 0 f dμ = - ∫f < 0 f dμ (whether finite or ∞). (ii) Given mean-zero f ∈ Lp for p ≥ 1, there exists an ergodic invertible measure preserving T and g ∈ Lp-1 such that f(x) = g(x) - g( Tx ) for a.e. x ∈ X. (iii) In some sense, the previous existence result is the best possible. For p ≥ 1, there exist mean-zero f ∈ Lp such that for any ergodic invertible measure preserving T and any measurable g such that f(x) = g(x) - g(Tx) a.e., then g Lq for q > p - 1. Also, we show this situation is generic for mean-zero f ∈ Lp. Finally, it is shown that we cannot expect finite moments for solutions g, when f ∈ L1. In particular, given any φ : R R such that x ∞ φ (x) = ∞, there exist mean-zero f ∈ L1 such that for any solutions T and g, the transfer function g satisfies: eqnarray* ∫X φ ( | g(x) | ) dμ = ∞. eqnarray*