Uncentered Fractional Maximal functions and mean oscillation spaces associated with dyadic Hausdorff content

Abstract

We study the action of uncentered fractional maximal functions on mean oscillation spaces associated with the dyadic Hausdorff content H∞β with 0<β≤ n. For 0 < α < n, we refine existing results concerning the action of the Euclidean uncentered fractional maximal function Mα on the functions of bounded mean oscillations (BMO) and vanishing mean oscillations (VMO). In addition, for 0 < β1 ≤ β2 ≤ n, we establish the boundedness of the β2-dimensional uncentered maximal function Mβ2 on the space BMOβ1(Rn), where BMOβ1(Rn) denotes the mean oscillation space adapted to the dyadic Hausdorff content H∞β1 on Rn.