Proof that a Form of Rubio de Francia’s Conjectured Littlewood-Paley Type Inequality for $$A_{1}\left( {\mathbb {R}}\right) $$-Weighted $$L^{2}\left( {\mathbb {R}}\right) $$ is Valid for Every Even $$A_{1}\left( {\mathbb {R}}\right) $$ Weight-Reference-Cited by-同舟云学术

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Proof that a Form of Rubio de Francia’s Conjectured Littlewood-Paley Type Inequality for $$A_{1}\left( {\mathbb {R}}\right) $$-Weighted $$L^{2}\left( {\mathbb {R}}\right) $$ is Valid for Every Even $$A_{1}\left( {\mathbb {R}}\right) $$ Weight

Published:2024-08-24 Issue:10 Volume:34 Page:
ISSN:1050-6926
Container-title:The Journal of Geometric Analysis
language:en
Short-container-title:J Geom Anal

Author:

Berkson Earl

Publisher

Springer Science and Business Media LLC

Link

https://link.springer.com/content/pdf/10.1007/s12220-024-01762-y.pdf

Reference9 articles.

1. Rubio de Francia, J.L.: A Littlewood-Paley inequality for arbitrary intervals. Rev. Mat. Iberoam. 1, 1–14 (1985)

2. Berkson, E.: Re: Positive resolution of Rubio de Francia’s Littlewood-Paley conjecture for arbitrary disjoint intervals in the context of $$A_{1}$$-weighted $$L^{2}$$. J. Geom. Anal. 32(8), 223 (2022)

3. Berkson, E.: Note on a special class of $$A_{1}( {\mathbb{R} }) $$ weights that exemplify Rubio de Francia’s Littlewood-Paley Type Inequality in the setting of $$A_{1}( {\mathbb{R} }) $$-weighted $$L^{2}$$. J. Geom. Anal. 33, 241 (2023)

4. Calderón, A.P.: Spaces between $$L^{1}$$ and $$L^{\infty }$$ and the theorem of Marcinkiewicz. Studia Math. 26, 273–299 (1966)

5. Bennett, C., Sharpley, R.: Interpolation of Operators. Pure and Applied Mathematics, p. 129. Academic Press Inc, Boston, MA (1988)

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