Economic Modeling via Memory Effects Using Conformable Fractional Derivatives

المؤلفون

  • Saber T. R. Syouri المؤلف

DOI:

https://doi.org/10.59992/IJFAES.2026.v5n2p18

الكلمات المفتاحية:

Conformable Fractional Derivative، Economic Dynamics، Memory Effects، Path Dependence، Capital Accumulation، Price Adjustment

الملخص

Classical Economic models (CEM) based on integer-order classical calculus commonly assume instantaneous market clearing and memoryless agent behavior. These assumptions frequently fail to account for the widespread reality of economic hysteresis, path dependency, and delayed responses. This study suggests for the incorporation of fractional calculus into economic dynamics as a more effective framework for describing such occurrences. We concentrate on the Conformable Fractional Derivative ( ), a contemporary fractional operator that preserves classical calculus's basic concepts, such as the product, quotient, and chain rules, while adding an adjustable memory parameter. This characteristic makes it ideal for economic modeling. We reformulate foundational economic models, counting capital accumulation and price alteration components, utilizing . An expository arrangement to a fragmentary development show illustrates how a unitary subordinate arrange creates trends characterized by introductory dormancy and quickening development, adjusting more closely with watched financial behavior than its classical partner. The is displayed as an effective, however numerically tractable, device for upgrading the authenticity and prescient control of financial hypothesis.

السيرة الشخصية للمؤلف

  • Saber T. R. Syouri

    Department of Data science, Faculty of Administrative and Information Sciences, Al-Istiqlal University, Palestine

المراجع

1. Khalil, R., Al Horani, M., Yousef, A., & Sababheh, M. (2014). A new definition of fractional derivative. Journal of Computational and Applied Mathematics, 264, 65-70.

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4. Tarasov, V. E. (2019). On history of mathematical economics: Application of fractional calculus. Mathematics, 7(6), 509.

5. Syouri, S., Sulaiman, I. M., & Mamat, M. (2020, March). Conformable Fractional Differintegral Method for Solving Fractional Equations. International Journal of Scientific and Technology Research, 9(3), 292- 295.

6. Syouri, S., Sulaiman, I. M., & Mamat, M. (2020, April). Conformable Fractional Differential Transform Method for Solving Fractional Derivatives. International Journal of Advanced Science and Technology, 29(7), 1734-1743.

7. Hammad, M.A., & Khalil, R. (2014a). Abel's formula and wronskian for conformable fractional differential equations. International journal of differential equations and applications, 13(3), 177-183.

8. Hammad, M. A., & Khalil, R. (2014b). Conformable fractional heat differential equation. Int. J. Pure Appl. Math, 94(2), 215-221.‏

التنزيلات

منشور

2026-02-15

إصدار

القسم

المقالات

كيفية الاقتباس

Economic Modeling via Memory Effects Using Conformable Fractional Derivatives. (2026). المجلة الدولية للعلوم المالية والإدارية والاقتصادية, 5(2). https://doi.org/10.59992/IJFAES.2026.v5n2p18