函数空间弱特征的二元方法

arXiv - MATH - Functional Analysis Pub Date : 2024-09-11 DOI:arxiv-2409.07395

Galia Dafni, Shahaboddin Shaabani

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引用次数: 0

摘要

弱型准正则是利用二元立方体上函数的均值振荡或均值定义的，它提供了以前文献中考虑的上半空间上相应准正则的离散类似物和变体。将得到的函数空间与已知的函数空间如 $\dot{W}^{1,p}(\rn)$, $\JNp$, $\Lp$ 和 weak-$\Lp$ 进行比较，给出了这些空间的新的嵌入和特征。我们还提供了一些例子来证明这些结果的清晰性。

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A Dyadic Approach to Weak Characterizations of Function Spaces

Weak-type quasi-norms are defined using the mean oscillation or the mean of a function on dyadic cubes, providing discrete analogues and variants of the corresponding quasi-norms on the upper half-space previously considered in the literature. Comparing the resulting function spaces to known function spaces such as $\dot{W}^{1,p}(\rn)$, $\JNp$, $\Lp$ and weak-$\Lp$ gives new embeddings and characterizations of these spaces. Examples are provided to prove the sharpness of the results.

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arXiv - MATH - Functional Analysis

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