Using Conformable Fractional Laplace Transform to Solve Fractional System
Keywords:
Conformable Fractional Derivative, Conformable Fractional Laplace Transform, System of Fractional Differential Equations
Abstract
In this study, we introduce the conformable fractional derivative, one of the most recent concepts in fractional calculus. We then employ the conformable fractional Laplace transform (CFLT) to solve a nonhomogeneous conformable fractional differential equation with variable coefficients, as well as a system of fractional differential equations, as an application.
Published
2026-03-24
How to Cite
Tamara Salameh, Gharib M. Gharib, Maha Alsaoudi, & Labeeb, M. A. (2026). Using Conformable Fractional Laplace Transform to Solve Fractional System. Statistics, Optimization & Information Computing. https://doi.org/10.19139/soic-2310-5070-3610
Issue
Section
Research Articles
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