Capacitary Maximal Inequalities and Applications

Abstract

In this paper we introduce capacitary analogues of the Hardy-Littlewood maximal function, align* MC(f)(x):= r>0 1C(B(x,r)) ∫B(x,r) |f|\;dC, align* for C= the Hausdorff content or a Riesz capacity. For these maximal functions, we prove a strong-type (p,p) bound for 1<p ≤+∞ on the capacitary integration spaces Lp(C) and a weak-type (1,1) bound on the capacitary integration space L1(C). We show how these estimates clarify and improve the existing literature concerning maximal function estimates on capacitary integration spaces. As a consequence, we deduce correspondingly stronger differentiation theorems of Lebesgue-type, which in turn, by classical capacitary inequalities, yield more precise estimates concerning Lebesgue points for functions in Sobolev spaces.