‎Exact analytical solution of tempered fractional heat-like (diffusion) equations by the modified variational iteration method

Autor:	Mohammad Hossein Akrami, Abbas Poya, Mohammad Ali Zirak
Jazyk:	angličtina
Rok vydání:	2024
Předmět:	tempered fractional derivative ‎mittag-leffler function‎ ‎fractional diffusion equation‎ Mathematics QA1-939
Zdroj:	Journal of Mahani Mathematical Research, Vol 13, Iss 2, Pp 571-593 (2024)
Druh dokumentu:	article
ISSN:	2251-7952 2645-4505
DOI:	10.22103/jmmr.2024.22861.1574
Popis:	‎ This paper introduces a modified version of the Variational Iteration Method, incorporating $\mathbb{P}$-transformation. We propose a novel semi-analytical technique named the modified variational iteration method for addressing fractional differential equations featuring tempered Liouville-Caputo derivatives. The modified variational iteration method emerges as a highly efficient and powerful mathematical tool, offering exact or approximate solutions for a diverse range of real-world problems in engineering and the natural sciences, specifically those expressed through differential equations. To assess its effectiveness and accuracy, we scrutinize the modified variational iteration method by applying it to three problems related to the heat-like multidimensional diffusion equation with a fractional time derivative in a tempered Liouville-Caputo form.
Databáze:	Directory of Open Access Journals
Externí odkaz:	https://doaj.org/article/35dcb78beacf4930993fc6608d956367 Zobrazit plný text záznamu View record in DOAJ