Quaternion Fractional Fourier Transform: Bridging Signal Processing and Probability Theory

Samad, Muhammad Adnan; Xia, Yuanqing; Siddiqui, Saima; Bhat, Muhammad Younus; Urynbassarova, Didar; Urynbassarova, Altyn

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dc.contributor.author	Samad, Muhammad Adnan
dc.contributor.author	Xia, Yuanqing
dc.contributor.author	Siddiqui, Saima
dc.contributor.author	Bhat, Muhammad Younus
dc.contributor.author	Urynbassarova, Didar
dc.contributor.author	Urynbassarova, Altyn
dc.date.accessioned	2026-03-12T05:23:44Z
dc.date.available	2026-03-12T05:23:44Z
dc.date.issued	2025
dc.identifier.citation	Samad, M.A.; Xia, Y.; Siddiqui, S.; Bhat, M.Y.; Urynbassarova, D.; Urynbassarova, A. Quaternion Fractional Fourier Transform: Bridging Signal Processing and Probability Theory. Mathematics 2025, 13, 195. https://doi.org/ 10.3390/math13020195	ru
dc.identifier.issn	2227-7390
dc.identifier.other	doi.org/ 10.3390/math13020195
dc.identifier.uri	http://repository.enu.kz/handle/enu/30185
dc.description.abstract	The one-dimensional quaternion fractional Fourier transform (1DQFRFT) introduces a fractional-order parameter that extends traditional Fourier transform techniques, providing new insights into the analysis of quaternion-valued signals. This paper presents a rigorous theoretical foundation for the 1DQFRFT, examining essential properties such as linearity, the Plancherel theorem, conjugate symmetry, convolution, and a generalized Parseval’s theorem that collectively demonstrate the transform’s analytical power. We further explore the 1DQFRFT’s unique applications to probabilistic methods, particularly for modeling and analyzing stochastic processes within a quaternionic framework. By bridging quaternionic theory with probability, our study opens avenues for advanced applications in signal processing, communications, and applied mathematics, potentially driving significant advancements in these fields.	ru
dc.language.iso	en	ru
dc.publisher	Mathematics	ru
dc.relation.ispartofseries	13, 195;
dc.subject	quaternion fractional Fourier transform	ru
dc.subject	probability theory	ru
dc.subject	quaternion algebra	ru
dc.subject	characteristic function	ru
dc.subject	stochastic processes	ru
dc.subject	statistical analysis	ru
dc.subject	quaternion-valued signals	ru
dc.title	Quaternion Fractional Fourier Transform: Bridging Signal Processing and Probability Theory	ru
dc.type	Article	ru