On extension of Calder\'on-Zygmund type singular integrals and their commutators

Abstract

Motivated by the recent works [Huan Yu, Quansen Jiu, and Dongsheng Li, 2021] and [Yanping Chen and Zihua Guo, 2021], we study the following extension of Calder\'on-Zygmund type singular integrals Tβf (x) = p.v. ∫Rn (y)|y|n-β f(x-y) \, dy, for 0 < β < n, and their commutators. We establish estimates of these singular integrals on Lipschitz spaces, Hardy spaces and Muckenhoupt Ap-weighted Lp-spaces. We also establish Lebesgue and Hardy space estimates of their commutators. Our estimates are uniform in small β, and therefore one can pass onto the limits as β 0 to deduce analogous estimates for the classical Calder\'on-Zygmund type singular integrals and their commutators.