Far East Journal of Dynamical Systems

The Far East Journal of Dynamical Systems publishes original research papers and survey articles in all aspects of dynamical systems, including chaos, fractals, and ergodic theory. It encourages application-oriented research in physics, life sciences, and social sciences.

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EXACT SOLUTION OF SOME FRACTIONAL SYSTEMS OF PARTIAL DIFFERENTIAL EQUATIONS VIA THE SBA AND VIM METHODS

Authors

  • Charvelin BILOUMBOU NKOUKA
  • Rabi Bachire BEKAKO ALI
  • Joseph BONAZEBI YINDOULA
  • Alphonse MASSAMBA

Keywords:

Some Blaise Abbo (SBA) method, variational iteration method (VIM), Lagrange multiplier

DOI:

https://doi.org/10.17654/0972111826002

Abstract

In this paper, the SBA method and VIM are used to obtain an exact solution of fractional systems of partial differential equations. To test the effectiveness of these methods, three numerical examples were solved. The obtained results indicate the identical exact solution for each example test. Thus the accuracy of these methods is in a good agreement with the exact solution. However, a comparison between these methods shows that the SBA method provides more accurate results.

Received: May 20, 2025
Revised: June 9, 2025
Accepted: June 19, 2025

References

[1] Aleksandra Ziemiska-Stolarska and Jerzy Skrzypski, Review of mathematical models of water quality, Ecol. Chem. Eng. S. 19(2) (2012), 197-211.

[2] H. W. Streeter and E. B. Phelps, A study of the pollution and natural purification of the Ohio River, Public health office of United States, Public Health Bulletin, Vol. 146, Washington, DC: US Government Press, 1925.

[3] J. R. James, D. K. Frederik and J. H. Taylor, Use of expert-systems programming techniques for the design of lead-lag compensators, IEE Proceedings D (Control Theory and Applications) 134(3) (1987), 137-144.

https://doi-org/10.49/ip-d-1987-0023.

[4] Ebeezer Bongah, Paul Agbekpornu and Canan Unlud, Mathematical modeling of transmission of water pollution, Journal of Prime Research in Mathematics 17(2) (2021), 20-38.

[5] F. B. Agusto and O. M. Bamigbola, Numerical treatment of the mathematical models for water pollution, Journal of Mathematics and Statistics 3(4) (2007), 172-180.

[6] Jonathan King, Reza Ahmadian and Roger A. Falconer, Hydro-epidemiological modelling of bacterial transport and decay in nearshore coastal waters, Water Research 196 (2021), 117049. https://doi.org/10.1016/j.watres.2021.117049.

[7] H. Sing, D. K. Mishra, R. N. Das and S. Kumar, A brief review-mathematical modeling on water pollution and its effects on aquatic species, Resembling Bagnati River, International Journal of Applied Environmental Sciences 17(1) (2022), 67-72. https://doi.org/10.37622/IJAES/17.1.2022.67-72.

[8] Chelsea J. Weiskerger and Mantha S. Phanikumar, Numerical modeling of microbial fate and transport in natural waters: Review and Implications for normal and extreme Storn Events, Water 12 (2020), 1876-1898.

DOI: 10.3390/w12071876.

[9] N. Pochai, S. Tangmanee, L. J. Crane and J. J. H. Miller, A Mathematical Model of Water Pollution Control using the Finite Element Method, In PAMM: Proceeding in Applied Mathematics and Mechanics, Berlin: Wiley-VCH Verlag 6(1) (2006), 755-756.

[10] A. Ebrahinzadeh, E. Hashemizadeh and R. Mirabbasi, A numerical solution of the mathematical models for water pollution by shifted Jacobi polynomials, TWMS J. App. and Eng. Math. 15(2) (2025), 298-308.

[11] Tsegaye Simon and Purnachandra Rao Koya, Modeling and numerical simulation of river pollution using diffusion-reaction equation, American Journal of Applied Mathematics 3(6) (2015), 335-340. Doi: 10:11648/j.ajan:20150306:24.

[12] Putsadee Poruphol, Porpattama Hammachukiattikul, Rajarathinan Vadivel Salaudeen Ab-dulwaheed Adebago and Saratha Sathasivan, Compartmental equations hybrid model for modelling water pollution transmission, Journal of Advanced Research in Fluid Mechanics and Thermal Sciences 115(1) (2024), 30-50.

[13] Steven Kent, Doddi Yadianto, Gao Cheng, Finna Fitriana and Wang Qian, Water quality modelling with industrial and domestic point source pollution: a study case of Cikakembang River, Majalaya District, Journal of the Civil Engineering Forum 10(2) (2024), 151-162. Doi: 10.22146/joof:11807.

[14] Y. N. Anjam, M. ur Yavuz, Mu Rahman and A. Batod, Analysis of a fractional pollution model in a system of three interconnecting lakes, AIMS Biophysics 10(2) (2023), 220-240. DOI: 10.3934/bio-phy.2023014.

[15] Soner Aydinlink, A novel approach for fractional model of water pollution management, Journal of Industrial and Management Optimization 20(12) (2024), 3617-3627.

[16] Keit B. Oldhan and Jerome Spanier, The Fractional Calculus, Theory and Applications of Differentiation and Integration Tonarbitrary Order, Dover Publications, 2006.

[17] K. Abbaoui and Y. Cherruault, Convergence of Adomian method applied to differential equations, Math. Comput. Modeling 28(5) (1994), 103-109.

[18] K. Abbaoui, Les fondements de la méthode décompositionnelle d’Adomian et application à la résolution de problèmes issus de la biologie et de la medicine, Thèse de doctorat de l, Université Paris VI, 1995.

[19] K. Abbaoui and Y. Cherruault, The decomposition method applied to non-linear equation, Math. Comput. Modeling 20(9) (1994), 60-73.

[20] Blaise SOME, SBA method for solving mathematical models in the environment, European University Editions, July 2018.

[21] Joseph Bonazebi Yindoula, Gabriel Bissanga, Pare Youssouf, Francis Bassono and Blaise SOME, Application of the Adomian Decomposition Method (ADM) and the SOME BLAISE ABBO (SBA) method to solving the diffusion-reaction equations, Advances in Theoretical and Applied Mathematics 9(2) (2014), 97-104.

[22] Stevy Mikamona Mayembo, Joseph Bonazebi-Yindoula, Youssouf Pare and Gabriel Bissanga, Application of the SBA method to solve the nonlinear biological population models, European Journal of Pure and Applied Mathematics 12(3) (2019), 1096-1105.

[23] J. H. He, Variational iteration method a kind of nonlinear analytical technique: some examples, Int. J. Nonlinear Mech. 34 (1999), 699-708.

[24] A. M. Wazwaz, A comparison between the variational iteration method and Adomian decomposition method, J. Comput. Appl. Math. 207(1) (2007), 129-136.

[25] A. M. Wazwaz, The variational iteration method for solving linear and nonlinear systems of PDEs, Comput. Math. Appl. 54 (2007), 895-902.

[26] A. M. Wazwaz, The variational iteration method: A reliable analytic tool for solving linear and nonlinear wave equations, Comput. Math. Appl. 54 (2007), 926-932.

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Published

2025-12-11

Issue

Vol. 39 No. 1 (2026)

Section

Articles

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How to Cite

EXACT SOLUTION OF SOME FRACTIONAL SYSTEMS OF PARTIAL DIFFERENTIAL EQUATIONS VIA THE SBA AND VIM METHODS. (2025). Far East Journal of Dynamical Systems, 39(1), 23-59. https://doi.org/10.17654/0972111826002

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