ON q-DEFORMATED HORMANDER MULTIPLIER THEOREM
The main purposes of this work, we introduce the q-deformed Fourier multiplier Ag defined on the space L2q(Rq) through the framework of the q2-Fourier transform, while also extending the functional setting of Lpq(Rq) with 1 ≤ p < ∞. Our approach provides a natural extension of classical Fourier m...
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| Published in | Vestnik KazNU. Serii͡a︡ matematika, mekhanika, informatika Vol. 127; no. 3 |
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| Main Author | |
| Format | Journal Article |
| Language | English |
| Published |
30.09.2025
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| Online Access | Get full text |
| ISSN | 1563-0277 2617-4871 2617-4871 |
| DOI | 10.26577/JMMCS202512738 |
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| Summary: | The main purposes of this work, we introduce the q-deformed Fourier multiplier Ag defined on the space L2q(Rq) through the framework of the q2-Fourier transform, while also extending the functional setting of Lpq(Rq) with 1 ≤ p < ∞. Our approach provides a natural extension of classical Fourier multiplier theory into the q-deformed setting, which is relevant in the context of quantum groups and noncommutative analysis. Furthermore, we establish several key q-analogues of classical harmonic analysis inequalities for the q2-Fourier transform, including the Paley inequality, Hausdorff-Young inequality, Hausdorff-Young-Paley inequality, and Hardy-Littlewood inequality. These results not only generalize their classical counterparts but also open new avenues for analysis on q-deformed spaces. As a significant application, we prove a q-deformed version of the Ho¨rmander multiplier theorem, which provides sufficient conditions for the boundedness of multipliers in the q-deformed setting. This work sets the stage for further developments in the field of q-deformed harmonic analysis. |
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| ISSN: | 1563-0277 2617-4871 2617-4871 |
| DOI: | 10.26577/JMMCS202512738 |