In this paper, prey-predator model of five Compartments are constructed with treatment is given to infected prey and infected predator. We took predation incidence rates as functional response type II and disease transmission incidence rates follow simple kinetic mass action function. The positivity, boundedness, and existence of the solution of the model are established and checked. Equilibrium points of the models are identified and Local stability analysis of Trivial Equilibrium point, Axial Equilibrium point, and Disease-free Equilibrium points are performed with the Method of Variation Matrix and Routh Hourwith Criterion. It is found that the Trivial equilibrium point 〖E〗_(o) is always unstable, and Axial equilibrium point 〖E〗_(A) is locally asymptotically stable if βk - (t1+d2) < 0, qp1k - d3(s+k) < 0, & qp3k - (t2+d4)(s+k) < 0 conditions hold true. Global Stability analysis of endemic equilibrium point of the model has been proved by Considering appropriate Liapunove function. In this study, the basic reproduction number of infected prey is obtained to be the following general formula R01=[(qp1-d3)2 kβd3s2]⁄[(qp1-d3){(qp1-d3)2ks(t1+d2 )+rsqp2 (kqp1-kd3-d3s)}] and the basic reproduction number of infected predator population is computed and results are written as the general formula of the form as R02=[(qp1-d3 )(qp3 d3 )k+αrsq(kqp1-kd3-d3s)]⁄[(qp1-d3)2 (t2+d4)k]. If the basic reproduction number is greater than one, then the disease will persist in prey-predator system. If the basic reproduction number is one, then the disease is stable, and if basic reproduction number less than one, then the disease is dies out from the prey-predator system. Finally, simulations are done with the help of DEDiscover software to clarify results.
Published in | Science Journal of Applied Mathematics and Statistics (Volume 9, Issue 1) |
DOI | 10.11648/j.sjams.20210901.11 |
Page(s) | 1-14 |
Creative Commons |
This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited. |
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Copyright © The Author(s), 2021. Published by Science Publishing Group |
Eco-Epidemiology, Prey-Predator, Stability, Variation Matrix, Reproduction Number, Simulation
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APA Style
Abayneh Fentie Bezabih, Geremew Kenassa Edessa, Koya Purnachandra Rao. (2021). Eco-Epidemiological Modelling and Analysis of Prey-Predator Population. Science Journal of Applied Mathematics and Statistics, 9(1), 1-14. https://doi.org/10.11648/j.sjams.20210901.11
ACS Style
Abayneh Fentie Bezabih; Geremew Kenassa Edessa; Koya Purnachandra Rao. Eco-Epidemiological Modelling and Analysis of Prey-Predator Population. Sci. J. Appl. Math. Stat. 2021, 9(1), 1-14. doi: 10.11648/j.sjams.20210901.11
AMA Style
Abayneh Fentie Bezabih, Geremew Kenassa Edessa, Koya Purnachandra Rao. Eco-Epidemiological Modelling and Analysis of Prey-Predator Population. Sci J Appl Math Stat. 2021;9(1):1-14. doi: 10.11648/j.sjams.20210901.11
@article{10.11648/j.sjams.20210901.11, author = {Abayneh Fentie Bezabih and Geremew Kenassa Edessa and Koya Purnachandra Rao}, title = {Eco-Epidemiological Modelling and Analysis of Prey-Predator Population}, journal = {Science Journal of Applied Mathematics and Statistics}, volume = {9}, number = {1}, pages = {1-14}, doi = {10.11648/j.sjams.20210901.11}, url = {https://doi.org/10.11648/j.sjams.20210901.11}, eprint = {https://article.sciencepublishinggroup.com/pdf/10.11648.j.sjams.20210901.11}, abstract = {In this paper, prey-predator model of five Compartments are constructed with treatment is given to infected prey and infected predator. We took predation incidence rates as functional response type II and disease transmission incidence rates follow simple kinetic mass action function. The positivity, boundedness, and existence of the solution of the model are established and checked. Equilibrium points of the models are identified and Local stability analysis of Trivial Equilibrium point, Axial Equilibrium point, and Disease-free Equilibrium points are performed with the Method of Variation Matrix and Routh Hourwith Criterion. It is found that the Trivial equilibrium point 〖E〗_(o) is always unstable, and Axial equilibrium point 〖E〗_(A) is locally asymptotically stable if βk - (t1+d2) qp1k - d3(s+k) qp3k - (t2+d4)(s+k) R01=[(qp1-d3)2 kβd3s2]⁄[(qp1-d3){(qp1-d3)2ks(t1+d2 )+rsqp2 (kqp1-kd3-d3s)}] and the basic reproduction number of infected predator population is computed and results are written as the general formula of the form as R02=[(qp1-d3 )(qp3 d3 )k+αrsq(kqp1-kd3-d3s)]⁄[(qp1-d3)2 (t2+d4)k]. If the basic reproduction number is greater than one, then the disease will persist in prey-predator system. If the basic reproduction number is one, then the disease is stable, and if basic reproduction number less than one, then the disease is dies out from the prey-predator system. Finally, simulations are done with the help of DEDiscover software to clarify results.}, year = {2021} }
TY - JOUR T1 - Eco-Epidemiological Modelling and Analysis of Prey-Predator Population AU - Abayneh Fentie Bezabih AU - Geremew Kenassa Edessa AU - Koya Purnachandra Rao Y1 - 2021/02/23 PY - 2021 N1 - https://doi.org/10.11648/j.sjams.20210901.11 DO - 10.11648/j.sjams.20210901.11 T2 - Science Journal of Applied Mathematics and Statistics JF - Science Journal of Applied Mathematics and Statistics JO - Science Journal of Applied Mathematics and Statistics SP - 1 EP - 14 PB - Science Publishing Group SN - 2376-9513 UR - https://doi.org/10.11648/j.sjams.20210901.11 AB - In this paper, prey-predator model of five Compartments are constructed with treatment is given to infected prey and infected predator. We took predation incidence rates as functional response type II and disease transmission incidence rates follow simple kinetic mass action function. The positivity, boundedness, and existence of the solution of the model are established and checked. Equilibrium points of the models are identified and Local stability analysis of Trivial Equilibrium point, Axial Equilibrium point, and Disease-free Equilibrium points are performed with the Method of Variation Matrix and Routh Hourwith Criterion. It is found that the Trivial equilibrium point 〖E〗_(o) is always unstable, and Axial equilibrium point 〖E〗_(A) is locally asymptotically stable if βk - (t1+d2) qp1k - d3(s+k) qp3k - (t2+d4)(s+k) R01=[(qp1-d3)2 kβd3s2]⁄[(qp1-d3){(qp1-d3)2ks(t1+d2 )+rsqp2 (kqp1-kd3-d3s)}] and the basic reproduction number of infected predator population is computed and results are written as the general formula of the form as R02=[(qp1-d3 )(qp3 d3 )k+αrsq(kqp1-kd3-d3s)]⁄[(qp1-d3)2 (t2+d4)k]. If the basic reproduction number is greater than one, then the disease will persist in prey-predator system. If the basic reproduction number is one, then the disease is stable, and if basic reproduction number less than one, then the disease is dies out from the prey-predator system. Finally, simulations are done with the help of DEDiscover software to clarify results. VL - 9 IS - 1 ER -