A note on the maximal operator on weighted Morrey spaces

Abstract

In this paper we consider weighted Morrey spaces Mλ, Fp(w) adapted to a family of cubes F, with norm \|f\| Mλ, Fp(w):=Q∈ F(1|Q|λ∫Q|f|pw)1/p, and the question we deal with is whether a Muckenhoupt-type condition characterizes the boundedness of the Hardy--Littlewood maximal operator on Mλ, Fp(w). In the case of the global Morrey spaces (when F is the family of all cubes in Rn) this question is still open. In the case of the local Morrey spaces (when F is the family of all cubes centered at the origin) this question was answered positively in a recent work of Duoandikoetxea--Rosenthal DR21. We obtain an extension of DR21 by showing that the answer is positive when F is the family of all cubes centered at a sequence of points in Rn satisfying a certain lacunary-type condition.

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