Povstenko, Yuriy (2021) Some Applications of the Wright Function in Continuum Physics: A Survey. Mathematics, 9 (2). p. 198. ISSN 2227-7390
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Official URL: https://doi.org/10.3390/math9020198
Abstract
The Wright function is a generalization of the exponential function and the Bessel functions. Integral relations between the Mittag–Leffler functions and the Wright function are presented. The applications of the Wright function and the Mainardi function to description of diffusion, heat conduction, thermal and diffusive stresses, and nonlocal elasticity in the framework of fractional calculus are discussed.
| Item Type: | Article |
|---|---|
| Uncontrolled Keywords: | fractional calculus; Caputo derivative; Mittag–Leffler functions; Wright function; Mainardi function; Laplace transform; Fourier transform; nonperfect thermal contact; nonlocal elasticity; fractional nonlocal elasticity |
| Subjects: | STM Repository > Mathematical Science |
| Depositing User: | Managing Editor |
| Date Deposited: | 06 Jul 2023 03:28 |
| Last Modified: | 22 Oct 2024 04:25 |
| URI: | http://classical.goforpromo.com/id/eprint/1595 |
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