Dichotomy property for maximal operators in non-doubling setting

Abstract

We investigate a dichotomy property for Hardy--Littlewood maximal operators, non-centered M and centered Mc, that was noticed by Bennett, DeVore and Sharpley. We illustrate the full spectrum of possible cases related to the occurrence or not of this property for M and Mc in the context of non-doubling metric measure spaces (X, , μ). In addition, if X = Rd, d ≥ 1, and is the metric induced by an arbitrary norm on Rd, then we give the exact characterization (in terms of μ) of situations in which Mc possesses the dichotomy property provided that μ satisfies some very mild assumptions.