The stability and equilibrium behavior of predator–prey systems involving cannibalistic interactions is crucial for explaining the long-term sustainability of ecological communities. This study aims to analyze the dynamics of a modified predator–prey model by incorporating cannibalism in predators as a self-regulating mechanism influencing population control. This study is a literature-based research, and the instruments employed are non-physical in nature, including a mathematical model, mathematical analysis tools, and numerical computation frameworks. The research methodology employs literature review and analysis of a model formulated as a system of nonlinear differential equations.  This system describes the population dynamics of two prey species and one predator species exhibiting cannibalistic tendencies. Analytical and numerical approaches are utilized to determine equilibrium points, evaluate local stability, and assess the effects of density-dependent mortality and cannibalistic behavior on ecosystem balance. The results show that the proposed predator–prey model admits one trivial equilibrium, five semi-trivial equilibrium, and one coexistence equilibrium. The coexistence equilibrium is locally asymptotically stable and satisfies the Routh–Hurwitz stability criterion. Simulation numeric the cannibalism parameter and density-dependent mortality rates play a significant role in stabilizing the predator population dynamics. When the mortality coefficient increases, the predator population decreases toward a lower equilibrium point, while the prey population slightly increases due to reduced predation pressure. Eigenvalue analysis reinforces these findings by confirming the system's compliance with the Routh–Hurwitz stability conditions. Ecological implications, these findings suggest that cannibalistic behavior in predators acts as a natural feedback mechanism to regulate population density, enhance ecosystem stability, and support the long-term sustainability of predator–prey interactions. The cannibalistic character of the predator species does not necessarily lead to species extinction, but can instead facilitate a sustainable and balanced coexistence within the ecosystem.

Cannibalisme; Holling type II; Monod-Haldane; Nonlinear differential equations; Predator-prey dynamics.

Aguegboh, N. S., Onyiaji, N., Okeke, C. A., Daniel, N. U., Walter, O., & Diallo, B. (2025). Analysis of a fractional-order prey-predator model with prey refuge and predator harvest using the consumption number: Holling type III functional response. Computational and Mathematical Biophysics, 13(1), 20250023. https://doi.org/10.1515/cmb-2025-0023

Alemu, S. M., Dawed, M. Y., & Mamo, T. T. (2025). Existence of Hydra Effect in a Three‐Species Food Chain Mathematical Model With General Holling Type Response Functions. Natural Resource Modeling, 38(4), e70009. https://doi.org/10.1111/nrm.70009

Alsakaji, H. J., Kundu, S., & Rihan, F. A. (2021). Delay differential model of one-predator two-prey system with Monod-Haldane and holling type II functional responses. Applied Mathematics and Computation, 397(5), 125919. https://doi.org/10.1016/j.amc.2020.125919

Bose, A. P. H., Lau, M. J., Cogliati, K. M., Neff, B., & Balshine, S. (2019). Cannibalism of young is related to low paternity and nest take-overs in an intertidal fish. Animal Behaviour, 153(7), 41–48. https://doi.org/10.1016/j.anbehav.2019.04.018

Bose, A. P. H., McClelland, G. B., & Balshine, S. (2016). Cannibalism, competition, and costly care in the plainfin midshipman fish, Porichthys notatus. Behavioral Ecology, 27(2), 628–636. https://doi.org/10.1093/beheco/arv203

Castillo-Alvino, H. H., & Marvá, M. (2022). Group defense promotes coexistence in interference competition: The Holling type IV competitive response. Mathematics and Computers in Simulation, 198(8), 426–445. https://doi.org/10.1016/j.matcom.2022.02.031

Cavassa, D., Postiglioni, R., Aisenberg, A., & Defeo, O. (2022). Relationship between beach morphodynamics and body traits in a sand-dwelling wolf spider. Acta Oecologica, 114(5), 103808. https://doi.org/10.1016/j.actao.2021.103808

Chathuranga, W. G. D., Karunaratne, S. H. P. P., & Silva, W. A. P. P. D. (2020). Predator–prey interactions and the cannibalism of larvae of Armigeres subalbatus (Diptera: Culicidae). Journal of Asia-Pacific Entomology, 23(1), 124–131. https://doi.org/10.1016/j.aspen.2019.11.010

Chowdhury, P. R., Banerjee, M., & Petrovskii, S. (2022). Canards, relaxation oscillations, and pattern formation in a slow-fast ratio-dependent predator-prey system. Applied Mathematical Modelling, 109(9), 519–535. https://doi.org/10.1016/j.apm.2022.04.022

Dai, W., Lu, L., Qiu, H., Zhong, J., Ling, S., Xu, J., Keller, L., & Yan, Z. (2025). Targeted cannibalism of queens mediated by worker signals in fire ants. Current Biology, 35(24), 5931-5937.e4. https://doi.org/10.1016/j.cub.2025.10.044

Jiang, D., Wen, X., & Zhou, B. (2022). Stationary distribution and extinction of a stochastic two-stage model of social insects with egg cannibalism. Applied Mathematics Letters, 132(10), 108100. https://doi.org/10.1016/j.aml.2022.108100

Khajanchi, S. (2017). Modeling the dynamics of stage-structure predator-prey system with Monod–Haldane type response function. Applied Mathematics and Computation, 302(12), 122–143. https://doi.org/10.1016/j.amc.2017.01.019

Kumar, V., & Pramanick, B. (2022). Impact of nanoparticles on the dynamics of a Crowley–Martin type phytoplankton–zooplankton interaction model. Results in Control and Optimization, 8(9), 100139. https://doi.org/10.1016/j.rico.2022.100139

Li, J., Li, F., Gao, H., Zhang, Y., & Liu, Z. (2022). Characterization of cuticular proteins in CPR family in the wolf spider, Pardosa pseudoannulata, and the response of one subfamily genes to environmental stresses. Insect Biochemistry and Molecular Biology, 150(10), 103859. https://doi.org/10.1016/j.ibmb.2022.103859

Li, J., Zhu, X., Lin, X., & Li, J. (2020). Impact of cannibalism on dynamics of a structured predator–prey system. Applied Mathematical Modelling, 78(2), 1–19. https://doi.org/10.1016/j.apm.2019.09.022

Li, N., & Yan, M. (2022). Bifurcation control of a delayed fractional-order prey-predator model with cannibalism and disease. Physica A: Statistical Mechanics and Its Applications, 600(15), 127600. https://doi.org/10.1016/j.physa.2022.127600

Li, Y., Liu, H., & Yang, R. (2018). A delayed diffusive predator–prey system with predator cannibalism. Computers & Mathematics with Applications, 75(5), 1355–1367. https://doi.org/10.1016/j.camwa.2017.11.006

Luo, D., & Wang, Q. (2021). Global dynamics of a Beddington–DeAngelis amensalism system with weak Allee effect on the first species. Applied Mathematics and Computation, 408(11), 126368. https://doi.org/10.1016/j.amc.2021.126368

Madhusudanan, V., Srinivas, M. N., Nwokoye, C. H., Murthy, B. S. N., & Sridhar, S. (2022). HOPF- bifurcation analysis of delayed computer virus model with holling type iii incidence function and treatment. Scientific African, 15(3), e01125. https://doi.org/10.1016/j.sciaf.2022.e01125

Mayntz, D., & Toft, S. (2006). Nutritional value of cannibalism and the role of starvation and nutrient imbalance for cannibalistic tendencies in a generalist predator. Journal of Animal Ecology, 75(1), 288–297. https://doi.org/10.1111/j.1365-2656.2006.01046.x

Pratama, R. A. (2022). Impact Of Fear Behavior On Prey Population Growth Prey-Predator Interaction. BAREKENG: Jurnal Ilmu Matematika Dan Terapan, 16(2), 371–378. https://doi.org/10.30598/barekengvol16iss2pp371-378

Pratama, R. A., Suryani, D. R., Ruslau, M. F. V., Meirista, E., & Nurhayati, N. (2025). Analysis Dynamics Model Predator-Prey with Holling Type III Response Function and Anti-Predator Behavior. JTAM (Jurnal Teori Dan Aplikasi Matematika), 9(3), 919. https://doi.org/10.31764/jtam.v9i3.31533

Purnomo, A. S., Darti, I., Suryanto, A., & Kusumawinahyu, W. M. (2025). Dynamical Analysis of Discrete-Time Modified Leslie-Gower Predator-Prey with Fear Effect. JTAM (Jurnal Teori Dan Aplikasi Matematika), 9(1), 24. https://doi.org/10.31764/jtam.v9i1.26515

Shao, Y. (2022). Global stability of a delayed predator–prey system with fear and Holling-type II functional response in deterministic and stochastic environments. Mathematics and Computers in Simulation, 200(10), 65–77. https://doi.org/10.1016/j.matcom.2022.04.013

Shishikura, S., & Choh, Y. (2024). Adult females and larvae of the predatory mite Gynaeseius liturivorus avoid cannibalism via kin recognition. Animal Behaviour, 211, 35–41. https://doi.org/10.1016/j.anbehav.2024.02.021

Takegaki, T., Nakatake, Y., Matsumoto, Y., Suga, K., & Amiya, N. (2023). Early Filial Cannibalism in Fish Revisited: Endocrinological Constraint, Costs of Parental Care, and Mating Possibility. The American Naturalist, 201(6), 841–850. https://doi.org/10.1086/724284

Zhang, X., & Yuan, R. (2021). A stochastic chemostat model with mean-reverting Ornstein-Uhlenbeck process and Monod-Haldane response function. Applied Mathematics and Computation, 394(8), 125833. https://doi.org/10.1016/j.amc.2020.125833

Zhao, Z., & Shen, Y. (2025). Dynamic complexity of Holling-Tanner predator–prey system with predator cannibalism. Mathematics and Computers in Simulation, 232, 227–244. https://doi.org/10.1016/j.matcom.2024.12.025

Zhou, X., Zhang, L., Zheng, T., Li, H.-L., & Teng, Z. (2021). Global stability for a delayed HIV reactivation model with latent infection and Beddington–DeAngelis incidence. Applied Mathematics Letters, 117(7), 107047. https://doi.org/10.1016/j.aml.2021.107047