Octonion quadratic-phase Fourier transform: inequalities, uncertainty principles, and examples

In this article, we define the octonion quadratic-phase Fourier transform (OQPFT) and derive its inversion formula, including its fundamental properties such as linearity, parity, modulation, and shifting. We also establish its relationship with the quaternion quadratic-phase Fourier transform (QQPF...

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Bibliographic Details
Published in:	Journal of inequalities and applications Vol. 2024; no. 1; pp. 134 - 52
Main Authors:	Kumar, Manish, Bhawna
Format:	Journal Article
Language:	English
Published:	Cham Springer International Publishing 16.10.2024 Springer Nature B.V SpringerOpen
Subjects:	Algebra Analysis Applications of Mathematics Data compression Fourier transform Fourier transforms Inequalities Inequality Integral transforms Investigations Lie groups Mathematics Mathematics and Statistics Octonion quadratic-phase Fourier transform Principles Quaternions Sharp inequalities Signal processing Uncertainty principles Wavelet transforms 26A42 Sharp inequalities Uncertainty principles 42B10 Octonion quadratic-phase Fourier transform Fourier transform 26D15
ISSN:	1029-242X, 1025-5834, 1029-242X
Online Access:	Get full text
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Summary:	In this article, we define the octonion quadratic-phase Fourier transform (OQPFT) and derive its inversion formula, including its fundamental properties such as linearity, parity, modulation, and shifting. We also establish its relationship with the quaternion quadratic-phase Fourier transform (QQPFT). Further, we derive the Parseval formula and the Riemann–Lebesgue lemma using this transform. Furthermore, we formulate two important inequalities (sharp Pitt’s and sharp Hausdorff–Young’s inequalities) and three main uncertainty principles (logarithmic, Donoho–Stark’s, and Heisenberg’s uncertainty principles) for the OQPFT. To complete our investigation, we construct three elementary examples of signal theory with graphical interpretations to illustrate the use of OQPFT and discuss their particular cases.
Bibliography:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14
ISSN:	1029-242X 1025-5834 1029-242X
DOI:	10.1186/s13660-024-03213-2