Lipschitz spaces and fractional integral operators associated with nonhomogeneous metric measure spaces
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Publication:1722255
DOI10.1155/2014/174010zbMath1472.42027OpenAlexW2071700798WikidataQ59035742 ScholiaQ59035742MaRDI QIDQ1722255
Publication date: 14 February 2019
Published in: Abstract and Applied Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1155/2014/174010
boundedness of the fractional operator in Lipschitz spacesLipschitz spaces on nonhomogeneous metric measure spaces
Singular and oscillatory integrals (Calderón-Zygmund, etc.) (42B20) Maximal functions, Littlewood-Paley theory (42B25) Function spaces arising in harmonic analysis (42B35)
Related Items
Endpoint estimates for generalized multilinear fractional integrals on the non-homogeneous metric spaces ⋮ Boundedness of commutators of Marcinkiewicz integrals on nonhomogeneous metric measure spaces ⋮ Lipschitz estimates for commutator of fractional integral operators on non-homogeneous metric measure spaces ⋮ Generalized homogeneous Littlewood-Paley \(g\)-function on some function spaces ⋮ Unnamed Item ⋮ Bilinear Calderón-Zygmund operators on Sobolev, BMO and Lipschitz spaces ⋮ Multi-Morrey spaces for non-doubling measures ⋮ Bilinear \(\theta\)-type generalized fractional integral operator and its commutator on some non-homogeneous spaces
Cites Work
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- The Hardy space H1 on non-homogeneous metric spaces
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- The space $H^1$ for nondoubling measures in terms of a grand maximal operator
- Boundedness properties of fractional integral operators associated to non-doubling measures
- BMO, \(H^1\), and Calderón-Zygmund operators for non doubling measures
- Littlewood-Paley theory and the \(T(1)\) theorem with non-doubling measures
