Local dyadic fractional Sobolev spaces: paraproducts, commutators, and the algebra property

Abstract

We characterize the boundedness and compactness of dyadic paraproducts on local dyadic fractional Sobolev spaces, Hs. We apply this result to establish the algebra property for Hs when s ∈ (12,1) and to deduce the boundedness and compactness of commutators with the Haar shift on Hs. Our conditions are stated in terms of new dyadic fractional BMOs and CMOs conditions involving the dyadic fractional Sobolev capacity, and our proof uses a new dyadic fractional version of the Carleson embedding theorem.

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