Morrey-Sobolev Spaces on Metric Measure Spaces

Abstract

In this article, the authors introduce the Newton-Morrey-Sobolev space on a metric measure space (X,d,μ). The embedding of the Newton-Morrey-Sobolev space into the H\"older space is obtained if X supports a weak Poincar\'e inequality and the measure μ is doubling and satisfies a lower bounded condition. Moreover, in the Ahlfors Q-regular case, a Rellich-Kondrachov type embedding theorem is also obtained. Using the Hajasz gradient, the authors also introduce the Hajasz-Morrey-Sobolev spaces, and prove that the Newton-Morrey-Sobolev space coincides with the Hajasz-Morrey-Sobolev space when μ is doubling and X supports a weak Poincar\'e inequality. In particular, on the Euclidean space Rn, the authors obtain the coincidence among the Newton-Morrey-Sobolev space, the Hajasz-Morrey-Sobolev space and the classical Morrey-Sobolev space. Finally, when (X,d) is geometrically doubling and μ a non-negative Radon measure, the boundedness of some modified (fractional) maximal operators on modified Morrey spaces is presented; as an application, when μ is doubling and satisfies some measure decay property, the authors further obtain the boundedness of some (fractional) maximal operators on Morrey spaces, Newton-Morrey-Sobolev spaces and Hajasz-Morrey-Sobolev spaces.