Matrix-weighted Besov-type and Triebel–Lizorkin-type spaces III: characterizations of molecules and wavelets, trace theorems, and boundedness of pseudo-differential operators and Calderón–Zygmund operators

IF 1 3区数学 Q1 MATHEMATICS Mathematische Zeitschrift Pub Date : 2024-09-15 DOI:10.1007/s00209-024-03584-8

Fan Bu, Tuomas Hytönen, Dachun Yang, Wen Yuan

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Abstract

This is the last one of three successive articles by the authors on matrix-weighted Besov-type and Triebel–Lizorkin-type spaces \(\dot{B}^{s,\tau }_{p,q}(W)\) and \(\dot{F}^{s,\tau }_{p,q}(W)\). In this article, the authors establish the molecular and the wavelet characterizations of these spaces. Furthermore, as applications, the authors obtain the optimal boundedness of trace operators, pseudo-differential operators, and Calderón–Zygmund operators on these spaces. Due to the sharp boundedness of almost diagonal operators on their related sequence spaces obtained in the second article of this series, all results presented in this article improve their counterparts on matrix-weighted Besov and Triebel–Lizorkin spaces \(\dot{B}^{s}_{p,q}(W)\) and \(\dot{F}^{s}_{p,q}(W)\). In particular, even when reverting to the boundedness of Calderón–Zygmund operators on unweighted Triebel–Lizorkin spaces \(\dot{F}^{s}_{p,q}\), these results are still better.

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矩阵加权贝索夫型和特里贝尔-利佐尔金型空间 III：分子和小波的特性、迹定理以及伪微分算子和卡尔德龙-齐格蒙算子的有界性

这是作者连续发表的三篇关于矩阵加权贝索夫型和特里贝尔-利佐金型空间（\dot{B}^{s,\tau }_{p,q}(W)\）和（\dot{F}^{s,\tau }_{p,q}(W)\）的文章中的最后一篇。在本文中，作者建立了这些空间的分子特征和小波特征。此外，作为应用，作者还得到了这些空间上的迹算子、伪微分算子和卡尔德龙-齐格蒙算子的最优有界性。由于在本系列的第二篇文章中得到了几乎对角线算子在其相关序列空间上的尖锐有界性，本文提出的所有结果都改进了它们在矩阵加权贝索夫和特里贝尔-利佐金空间\(\dot{B}^{s}_{p,q}(W)\)和\(\dot{F}^{s}_{p,q}(W)\)上的对应结果。特别是，即使回到无权特里贝尔-利佐金空间 \(\dot{F}^{s}_{p,q}\)上的卡尔德龙-齐格蒙算子的有界性，这些结果仍然更好。

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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