Optimal Sparse Bounds and Commutator Characterizations Without Doubling

Abstract

We examine dyadic paraproducts and commutators in the non-homogeneous setting, where the underlying Borel measure μ is not assumed to be doubling. We first establish a pointwise sparse domination for dyadic paraproducts and related operators with symbols b ∈ BMO(μ), improving upon an earlier result of Lacey, where the symbol b was assumed to satisfy a stronger Carleson-type condition, that coincides with BMO only in the doubling setting. As an application of this result, we obtain sharpened weighted inequalities for the commutator of a dyadic Hilbert transform H previously studied by Borges, Conde Alonso, Pipher, and the third author. We also characterize the symbols for which the commutator [H,b] is bounded on Lp(μ) for 1<p<∞ and provide some interesting examples to prove that this class of symbols strictly depends on p and is nested between symbols satisfying the p-Carleson packing condition and symbols belonging to martingale BMO (even in the case of absolutely continuous measures).

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