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On Fourier–Bessel matrix transforms and applications
Author(s) -
Abdalla Mohamed,
Boulaaras Salah,
Akel Mohamed
Publication year - 2021
Publication title -
mathematical methods in the applied sciences
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.719
H-Index - 65
eISSN - 1099-1476
pISSN - 0170-4214
DOI - 10.1002/mma.7489
Subject(s) - bessel function , hankel transform , mathematics , laplace transform , mellin transform , convolution theorem , integral transform , two sided laplace transform , fourier transform , hartley transform , convolution (computer science) , kernel (algebra) , fractional fourier transform , mathematical analysis , inverse laplace transform , matrix (chemical analysis) , pure mathematics , fourier analysis , computer science , artificial intelligence , materials science , composite material , artificial neural network
The Fourier–Bessel transform is an integral transform and is also known as the Hankel transform. This transform is a very important tool in solving many problems in mathematical sciences, physics, and engineering. Very recently, Abdalla (AIMS Mathematics 6: [2021], 6122–6139) introduced certain Hankel integral transforms associated with functions involving generalized Bessel matrix polynomials and various applications. Motivated by this work, we introduce the Fourier–Bessel matrix transform (FBMT) containing Bessel matrix function of the first kind as a kernel. The corresponding inversion formula and several illustrative examples of this transform have been presented. A relation between the Laplace transform and the FBMT has been obtained. Furthermore, a convolution of the FBMT is constructed with some properties. In addition, some applications are proposed in the present research. Finally, we outlined the significant links for the preceding outcomes of some particular cases with our results.

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