The maximal function on spaces of homogeneous type, or adjacent dyadic cubes do good

Abstract

We prove that the Hardy--Littlewood maximal operator M is bounded on the variable Lebesgue space Lp(·)(X,d,μ), with 1<p- p+<∞, over an unbounded space of homogeneous type (X,d,μ) with a Borel-semiregular measure μ, if and only if the averaging operators TQ are bounded on Lp(·)(X,d,μ) uniformly over all families Q of pairwise disjoint ``cubes'' from a Hytönen--Kairema dyadic system on X. This extends Diening's well-known characterization of the boundedness of M on Lp(·)(Rn) to the setting of spaces of homogeneous type, while also providing a slight refinement of the original result.

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