Mathematical Modelling and Analysis of the Dynamics of Corruption Incorporating Anti – Corruption Agencies

Autor/innen

  • Mohammed Fori Department of Mathematics, College of Education Waka Biu, PMB 1502, Borno State, Nigeria Autor/in
  • Samuel Musa Department of Mathematics, Modibbo Adama University Yola, PMB 2076, Adamawa, Nigeria Autor/in
  • Abdulfatai Atte Momoh Department of Mathematics, Modibbo Adama University Yola, PMB 2076, Adamawa, Nigeria Autor/in
  • Shuaibu Abdullahi Ahijo Department of Mathematics, Modibbo Adama University Yola, PMB 2076, Adamawa, Nigeria Autor/in

DOI:

https://doi.org/10.62054/ijdm/0202.07

Schlagwörter:

Mathematical Model, Corruption, reproduction number, equilibrium point, stability analysis

Abstract

Corruption is a global problem that affects many countries, undermining economic, social, and political development. To better understand the control measures that can reduce corruption transmission, we have formulated and analyzed a mathematical model incorporating anti – corruption agencies. To verify the model's validity, we explored the basic properties of the model in terms of existence, uniqueness, positivity and boundedness, and results showed that the solution exists, is unique, positive and bounded. The basic reproduction number, , was computed using the next-generation matrix method. Furthermore, the model was studied analytically to explore corruption dynamics. The stability analysis of the formulated model showed that the corruption-free equilibrium is locally and globally asymptotically stable if, but the corruption-endemic equilibrium is globally asymptotically stable if . A sensitivity analysis of the model parameters with respect to the threshold quantity measuring the spread of corruption was conducted to identify the most influential parameters driving the spread of corruption. The results revealed that reducing the values of parameters with positive indices will contribute in controlling the spread of corruption. Conversely, the sensitivity results suggest that increasing the values of parameters with negative indices will also help to mitigate the spread of corruption.

Literaturhinweise

References

Abayneh K. F & Zerihun K. B. (2022), Mathematical model and analysis of corruption dynamics with optimal control. Hindawi, journal of applied mathematics, volume 2022, article ID 8073877, 1-16.

Abdulrahman S. (2014), “Stability analysis of the transmission dynamics and control of

corruption,” Pacific Journal of Science and Technology, 15(1), 99 – 113.

Adeyemi O. Binayo, Victor O. Akinsola (2020), “Stability Analysis of the Corruption Free

Equilibrium of the Mathematical Model of Corruption in Nigeria”, Mathematical Journal of interdisciplinary Sciences, Math. J. Interdiscip. Sci. 8(2), March 2020, 61 – 69.

Alhassan A., Momoh A.A, Abdullahi S.A. & Abdullahi M. (2024), Mathematical model on the dynamics of corruption menace with control strategies. Internationals Journal of science for Global Sustainability. 10(1), 142 -152.

Alemneh H. T. (2020). Mathematical Modeling, Analysis, and Optimal Control of Corruption

dynamics. Hindawi, Journal of Applied Mathematics, vol. 2020, Article ID 5109841, 13,

Aloke , S. N. (2023). Analyzing Corruption Dynamics and Control Measures in Nigeria: A Mathematical Model. Asian Journal of Pure and Applied Mathematics, 5(1), 493–511.

Castillo-Chavez, C, Sally, B. P., Van den, D, Denise, K. &Abdul-Aziz, Y. (2002). Mathematical Approaches for Emerging and Reemerging Infectious Diseases", Springer-Verlag, New York.

Diekmann, O., Heesterbeek, J., & Roberts, M. (2009). The construction of next – generation

matrices for compartmental epidemic models. The royal society interface, 7,873 – 885.

Eicher S. 2009. Corruption in International Business: The Challenge of Culture and Legal

Diversity. Gower Publishing, Ltd.: Farnham, UK. 238 (ISBN: 9780754671374).

Felix Y., Festus O., Timothy A (2016), “Understanding the Dynamics of Corruption Using Mathematical Modelling Approach”, International Journal of Innovative Science. Engineering & Technology, 4(8), 2348 – 7968.

Fori M., (2024). Mathematical model of the dynamics of corruption considering loss of immunity of Ex – Convict. Zaria Journal of Educational Studies 24(S) 2024.

Gutema T.W, Wedajo A.G and Koya P.R (2024) A mathematical analysis of the corruption

dynamics model with optimal control strategy. Front. Appl. Math. Stat. 10:1387147.

Hathroubi S. (2013). Epidemic Corruption: a bioeconomic homology, Econstor, available at

http://hdl.handle.net/10419/73558

Lasalle J. and Lefschetz S. (1976). The Stability of the Dynamical Systems. Regional Conference

Series in Applied Mathematics. SIAM, Philadelphia.

Leggesse L., Shiferaw F. (2018) “Modelling Corruption Dynamics and its Analysis, Ethiopian Journal of Sciences and Sustainable Development, 5(2), 13 – 27.

Mokaya N.O., Alemmeh H.T., C.G. Ngari,. Mathematical modelling and analysis of corruption of morals amongst adolescents with control measures in Kenya, Discr. Dyn. Nat. Soc. 2021 (2021), 6662185.

Musa, S. and Fori, M. (2019) Mathematical Model of the Dynamics of Rumour Propagation.

Journal of applied Mathematics and Physics, 7, 1289 – 1303.

https://doi.org/10.4236/Jamp.2019.76088.

Rwat, S.I, Emmanuel S., Danat N.T, & Tsok S.H, (2023). Mathematical Modelling of corruption Dynamics: Examining the Reintegration of Formerly Corrupt Individuals. FUDMA Journal of Sciences (FJS), ISSN online: 2616 – 1370, 7(4),1 – 13.

Squires H., & Tappender P. (2011). Mathematical Modelling and its Application to Social Care,

Methods Review, 7. 10 – 22.

Verma P. and Sengupta S. (2015). Bribe and Punishment: An evolutionary game – theoretic

analysis of bribery. PLOSONE 10(7): doi:10.1371/journal.pone.0133441.

Zerihun K.B and Abayneh K.F. (2022). Modeling and Analysis of Corruption Dynamics Incorporating Media Coverage. Commun. Math. Biol. Neurosis. 2022, 2022:94 https://doi.org/10.28919/cmbn/7651. ISSN: 2052-2541.

Veröffentlicht

2025-06-29

Zitationsvorschlag

Mathematical Modelling and Analysis of the Dynamics of Corruption Incorporating Anti – Corruption Agencies. (2025). International Journal of Development Mathematics (IJDM), 2(2), 123-157. https://doi.org/10.62054/ijdm/0202.07

Am häufigsten gelesenen Artikel dieser/dieses Autor/in

Ähnliche Artikel

1-10 von 172

Sie können auch eine erweiterte Ähnlichkeitssuche starten für diesen Artikel nutzen.