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A novel generalized type of the Caputo fractional derivative: integral transforms, illustrative examples, and solution of fractional-order generalized differential equations | ||
| Computational Methods for Differential Equations | ||
| مقالات آماده انتشار، پذیرفته شده، انتشار آنلاین از تاریخ 08 خرداد 1405 اصل مقاله (1.54 M) | ||
| نوع مقاله: Research Paper | ||
| شناسه دیجیتال (DOI): 10.22034/cmde.2026.61736.2682 | ||
| نویسندگان | ||
| Enes Ata* 1؛ İ. Onur Kıymaz2 | ||
| 1Department of Mathematics, Bingol University, Bingol, Turkey. | ||
| 2Department of Mathematics, Kirsehir Ahi Evran University, Kirsehir, Turkey. | ||
| چکیده | ||
| In this article, we introduce a novel generalized Caputo fractional derivative, using a special type of function known as the Wright function in the definition of the classical Caputo fractional derivative. We also apply the Fourier, Laplace, and Mellin integral transform methods, which are very useful popular mathematical tools in various scientific fields, to the new generalized fractional derivative. Moreover, as illustrative examples, we calculate the new generalized fractional derivative of constant, power, exponential, sine, and cosine functions. Furthermore, we obtain the solutions of the generalized motion, harmonic vibration, and Bessel differential equations defined by the new generalized fractional derivative using the Fourier, Laplace, and Mellin integral transform methods. Finally, we obtain approximate behavior graphs for both the classical Caputo fractional derivative and the generalized Caputo fractional derivative using some specific data and present these graphs comparatively. | ||
| کلیدواژهها | ||
| Caputo fractional derivative؛ Fourier integral transform؛ Laplace integral transform؛ Mellin integral transform؛ Wright function | ||
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آمار تعداد مشاهده مقاله: 7 تعداد دریافت فایل اصل مقاله: 2 |
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