Solyanik estimates in ergodic theory

Abstract

Let U1, …, Un be a collection of commuting measure preserving transformations on a probability space (, , μ). Associated with these measure preserving transformations is the ergodic strong maximal operator M S given by \[ M S f(ω) := 0 ∈ R ⊂ Rn1\#(R Zn)Σ(j1, …, jn) ∈ R Zn|f(U1j1·s Unjnω)|, \] where the supremum is taken over all open rectangles in Rn containing the origin whose sides are parallel to the coordinate axes. For 0 < α < 1 we define the sharp Tauberian constant of M S with respect to α by \[ C S (α) := E ⊂ \\ μ(E) > 01μ(E)μ(\ω ∈ : M S E (ω) > α\). \] Motivated by previous work of A. A. Solyanik and the authors regarding Solyanik estimates for the geometric strong maximal operator in harmonic analysis, we show that the Solyanik estimate \[ α → 1 C S(α) = 1 \] holds, and that in particular we have \[ C S(α) - 1 n (1 - 1α)1/n\] provided that α is sufficiently close to 1. Solyanik estimates for centered and uncentered ergodic Hardy-Littlewood maximal operators associated with U1, …, Un are shown to hold as well. Further directions for research in the field of ergodic Solyanik estimates are also discussed.