Localized Morrey-Campanato Spaces on Metric Measure Spaces and Applications to Schr\"odinger Operators

Abstract

Let X be a space of homogeneous type in the sense of Coifman and Weiss and D a collection of balls in . The authors introduce the localized atomic Hardy space Hp, q D( X) with p∈ (0,1] and q∈[1,∞](p,∞], the localized Morrey-Campanato space Eα, p D( X) and the localized Morrey-Campanato-BLO space Eα, p D( X) with ∈ R and p∈(0, ∞) and establish their basic properties including Hp, q D( X)=Hp, ∞ D( X) and several equivalent characterizations for Eα, p D( X) and Eα, p D( X). Especially, the authors prove that when p∈(0,1], the dual space of Hp, ∞ D( X) is E1/p-1, 1 D( X). Let be an admissible function modeled on the known auxiliary function determined by the Schr\"odinger operator. Denote the spaces Eα, p D( X) and Eα, p D( X), respectively, by Eα, p( X) and Eα, p( X), when D is determined by . The authors then obtain the boundedness from Eα, p( X) to Eα, p( X) of the radial and the Poisson semigroup maximal functions and the Littlewood-Paley g-function which are defined via kernels modeled on the semigroup generated by the Schr\"odinger operator.