Bounded oscillation operators on BMO spaces

Abstract

Bounded Oscillation (BO) operators were recently introduced in the author's paper [13], where it was proved that many operators in harmonic analysis (Calder\'on-Zygmund operators, Carleson type operators, martingale transforms, Littlewood-Paley square functions, maximal operators, etc) are BO operators. BO operators are defined on abstract measure spaces equipped with a basis of abstract balls. The abstract balls in their definition owe four basic properties of classical balls in Rn, which are crucial in the study of singular operators on Rn. Among various properties studied in these papers it was proved that BO operators allow pointwise sparse domination, establishing the A2-conjecture for those operators. In the present paper we study boundedness properties of BO operators on BMO spaces. In particular, we prove that general BO operators boundedly map L∞ into BMO, and under a logarithmic localization condition those map BMO into itself. We obtain these properties as corollaries of new local type bounds, involving oscillations of functions over the balls. We apply the results in the BMO estimations of Calder\'on-Zygmund operators, martingale transforms, Carleson type operators, as well as in the unconditional basis properties of general wavelet type systems in atomic Hardy spaces H1.

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