Fractional Type Marcinkiewicz Integral Operator Associated with Θ-Type Generalized Fractional Kernel and Its Commutator on Non-homogeneous Spaces

Pub Date : 2022-01-01 DOI:10.1515/agms-2022-0137

G. Lu, S. Tao, Miaomiao Wang

引用次数: 1

Abstract

Abstract Let (𝒳, d, μ) be a non-homogeneous metric measure space satisfying the upper doubling and geometrically doubling conditions in the sense of Hytönen. Under assumption that θ and dominating function λ satisfy certain conditions, the authors prove that fractional type Marcinkiewicz integral operator M˜ \tilde M α,lρ,q associated with θ-type generalized fractional kernel is bounded from the generalized Morrey space ℒr,ϕp/r,κ (μ) into space ℒp,ϕ,κ (μ), and bounded from the Lebesgue space Lr(μ) into space Lp(μ). Furthermore, the boundedness of commutator M˜ \tilde M α,l,ρq,b generated by b∈RBMO˜(μ) b \in \widetilde {RBMO}\left( \mu \right) and the M˜ \tilde M α,l,ρq,b on space ℒp(μ) and on space ℒp,ϕ,κ (μ) is also obtained.

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与Θ-Type广义分数核相关的分数型Marcinkiewicz积分算子及其在非齐次空间上的交换子

设(f, d， μ)是满足Hytönen意义上的上加倍和几何加倍条件的非齐次度量度量空间。在θ和主导函数λ满足一定条件的假设下，证明了与θ型广义分数型核相关的分数型Marcinkiewicz积分算子M ～ \tilde M α，lρ，q从广义Morrey空间∑，ϕ /r，κ (μ)有界到∑，φ，κ (μ)空间，并从Lebesgue空间Lr(μ)有界到∑(μ)空间。此外，还得到了由b∈RBMO≈(μ) b \in\widetilde RBMO \left ({}\mu\right)生成的换向子M ～ \tilde M α，l，ρq,b和M ～ \tilde M α，l，ρq,b在空间＿＿p (μ)和空间＿＿p， φ，κ (μ)上的有界性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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