Capacitary Muckenhoupt Weight, BMO and BLO Spaces with Hausdorff Content, Factorization Theorems and Applications

Abstract

Let δ∈(0,n], p∈[1,∞), H∞δ denote the Hausdorff content on Rn, and Ap,δ be the capacitary Muckenhoupt weight class. We are interested in understanding the relationship between the capacitary Muckenhoupt weight class Ap,δ and BMO( Rn, H∞δ) or BLO( Rn, H∞δ) spaces for all dimension δ∈(0,n], and further to comprehend the structure of these two spaces. Our main result shows that Ap,δ for p∈(1,∞) is equivalent to the BMO spaces, while A1,δ is equivalent to the BLO spaces, and consequently yields the factorization theorems for these BMO and BLO spaces via capacitary Hardy--Littlewood maximal operators, which essentially extend main results of Coifman and Rochberg in 1980 beyond measure theory. As applications, by establishing some capacitary weighted John--Nirenberg inequalities, we obtain the equivalence between capacitary weighted BMO or BLO spaces and BMO( Rn, H∞δ) or BLO( Rn, H∞δ) respectively. These results reveal deep connections between Ap,δ and BMO or BLO spaces with Hausdorff content, beyond the classical measure-theoretic settings. We develop some approaches in the proofs and using a new observation, that is, the additivity of measures and linearity of integrals are superfluous for the corresponding classical theory.

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