Pingxu Hu scite author profile

Pingxu Hu

3Publications

0Citation Statements Received

90Citation Statements Given

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Beijing Normal University

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New John–Nirenberg–Campanato‐type spaces related to both maximal functions and their commutators

Tao

Yang

2022

Math Methods in App Sciences

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Let p,q-1pt∈-1ptfalse[1,∞false], α∈ℝ, and s be a nonnegative integer. In this article, the authors introduce a new function space trueJN˜false(p,q,sfalse)αfalse(scriptXfalse) of John–Nirenberg–Campanato type, where scriptX denotes ℝn or any cube Q0 of ℝn with finite edge length. The authors give an equivalent characterization of trueJN˜false(p,q,sfalse)αfalse(scriptXfalse) via both the John–Nirenberg–Campanato space and the Riesz–Morrey space. Moreover, for the particular case s=0, this new space can be equivalently characterized by both maximal functions and their commutators. Additionally, the authors give some basic properties, a good‐ λ inequality, and a John–Nirenberg‐type inequality for trueJN˜false(p,q,sfalse)αfalse(scriptXfalse).

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New John--Nirenberg--Campanato-Type Spaces Related to Both Maximal Functions and Their Commutators

Hu¹,

Jin²,

Yang³

2022

Preprint

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Let p, q ∈ [1, ∞], α ∈ R, and s be a non-negative integer. In this article, the authors introduce a new function space JN (p,q,s) α (X) of John-Nirenberg-Campanato type, where X denotes R n or any cube Q 0 of R n with finite edge length. The authors give an equivalent characterization of JN (p,q,s) α (X) via both the John-Nirenberg-Campanato space and the Riesz-Morrey space. Moreover, for the particular case s = 0, this new space can be equivalently characterized by both maximal functions and their commutators. Additionally, the authors give some basic properties, a good-λ inequality, and a John-Nirenberg type inequality for JN (p,q,s) α (X).

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Bourgain–Morrey spaces meet structure of Triebel–Lizorkin spaces

Yang

2023

Math. Z.

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Pingxu Hu

New John–Nirenberg–Campanato‐type spaces related to both maximal functions and their commutators

New John--Nirenberg--Campanato-Type Spaces Related to Both Maximal Functions and Their Commutators

Bourgain–Morrey spaces meet structure of Triebel–Lizorkin spaces

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