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- Title
Theoretical Investigation of Fractional Estimations in Liouville–Caputo Operators of Mixed Order with Applications.
- Authors
Mohammed, Pshtiwan Othman; Lupas, Alina Alb; Agarwal, Ravi P.; Yousif, Majeed A.; Al-Sarairah, Eman; Abdelwahed, Mohamed
- Abstract
In this study, to approximate nabla sequential differential equations of fractional order, a class of discrete Liouville–Caputo fractional operators is discussed. First, some special functions are re-called that will be useful to make a connection with the proposed discrete nabla operators. These operators exhibit inherent symmetrical properties which play a crucial role in ensuring the consistency and stability of the method. Next, a formula is adopted for the solution of the discrete system via binomial coefficients and analyzing the Riemann–Liouville fractional sum operator. The symmetry in the binomial coefficients contributes to the precise approximation of the solutions. Based on this analysis, the solution of its corresponding continuous case is obtained when the step size p 0 tends to 0. The transition from discrete to continuous domains highlights the symmetrical nature of the fractional operators. Finally, an example is shown to testify the correctness of the presented theoretical results. We discuss the comparison of the solutions of the operators along with the numerical example, emphasizing the role of symmetry in the accuracy and reliability of the numerical method.
- Subjects
FRACTIONAL differential equations; SPECIAL functions; DISCRETE systems; SYMMETRY
- Publication
Axioms (2075-1680), 2024, Vol 13, Issue 8, p570
- ISSN
2075-1680
- Publication type
Article
- DOI
10.3390/axioms13080570