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Capacitary maximal inequalities and applications

You-Wei Benson Chen, Keng Hao Ooi, Daniel Spector

2024Journal of Functional Analysis10 citationsDOIOpen Access PDF

Abstract

In this paper we introduce capacitary analogues of the Hardy-Littlewood maximal function,MCf(x):=supr>0⁡1C(B(x,r))∫B(x,r)|f|dC, 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.

Topics & Concepts

MathematicsMaximal functionHausdorff spaceType (biology)Lebesgue integrationFunction spacePure mathematicsStandard probability spaceFunction (biology)Sobolev spaceLp spaceSpace (punctuation)Sobolev inequalityUpper and lower boundsDiscrete mathematicsMathematical analysisCombinatoricsBanach spaceEvolutionary biologyEcologyBiologyPhilosophyLinguisticsAdvanced Harmonic Analysis ResearchNonlinear Partial Differential EquationsMathematical Approximation and Integration