$$H^{p(\cdot )}_{\omega }(\mathbb {R}^{n})$$ 的分子重构定理

Pub Date : 2024-05-30 DOI:10.1007/s10998-024-00575-4

Pablo Rocha

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引用次数: 0

摘要

本文给出了 $H_{\omega }^{p(\cdot )}(\mathbb {R}^{n})$ 的分子重构定理。作为这一结果以及在 Ho (Tohoku Math J 69 (3), 383-413, 2017) 中发展的原子分解的应用，我们证明经典奇异积分可以扩展到 $H_{\omega }^{p(\cdot )}(\mathbb {R}^{n})\ 上的有界算子。）我们还证明，对于某些指数（q(\cdot )）和某些权重（\omega }），里兹势（I_{\alpha })，随着（0< \alpha <；n$, can be extended to a bounded operator from $H^{p(\cdot )}_{\omega }(\mathbb {R}^{n})$ into $H^{q(\cdot )}_{\omega }(\mathbb {R}^{n})$, for$\frac{1}{p(\cdot )}：= \frac{1}{q(\cdot )} + \frac{α }{n}$.

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A molecular reconstruction theorem for $$H^{p(\cdot )}_{\omega }(\mathbb {R}^{n})$$

In this article we give a molecular reconstruction theorem for $H_{\omega }^{p(\cdot )}(\mathbb {R}^{n})$. As an application of this result and the atomic decomposition developed in Ho (Tohoku Math J 69 (3), 383–413, 2017) we show that classical singular integrals can be extended to bounded operators on $H_{\omega }^{p(\cdot )}(\mathbb {R}^{n})$. We also prove, for certain exponents $q(\cdot )$ and certain weights $\omega $, that the Riesz potential $I_{\alpha }$, with $0< \alpha < n$, can be extended to a bounded operator from $H^{p(\cdot )}_{\omega }(\mathbb {R}^{n})$ into $H^{q(\cdot )}_{\omega }(\mathbb {R}^{n})$, for $\frac{1}{p(\cdot )}:= \frac{1}{q(\cdot )} + \frac{\alpha }{n}$.

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