Solyanik estimates and local H\"older continuity of halo functions of geometric maximal operators

Abstract

Let B be a homothecy invariant basis consisting of convex sets in Rn, and define the associated geometric maximal operator MB by MB f(x) :=x ∈ R ∈ B1|R|∫R |f| and the halo function φB(α) on (1,∞) by φ B(α) :=E ⊂ Rn :\, 0 < |E| < ∞1|E||\x∈ Rn : MB E (x) >1/α\|. It is shown that if φB(α) satisfies the Solyanik estimate φ B(α) - 1 ≤ C (1 - 1α)p for α∈(1,∞) sufficiently close to 1 then φB lies in the H\"older class Cp(1,∞). As a consequence we obtain that the halo functions associated with the Hardy-Littlewood maximal operator and the strong maximal operator on Rn lie in the H\"older class C1/n(1,∞).