References
- Uboh FE, Asuquo EN, Eteng MU, et al. Endosulfan-induces renal toxicity independent of the route of exposure in rats. Am J Biochem Mol Biol. 2011;1(4):359–367.
- Holling CS. Some characteristics of simple types of predation and parasitism. Can Entomol. 1959;91(7):385–398.
- Holling CS. The functional response of predators to prey density and its role in mimicry and population regulation. Mem Ent Soc Can. 1965;97(S45):5–60.
- Tang S, Xiao. Y, Chen L, et al. Integrated pest management models and their dynamical behavior. Bull Math Biol. 2005;67(1):115–135.
- Ghosh S, Bhattacharya S, Bhattacharya DK. The role of viral infection in pest control: a mathematical study. Bull Math Biol. 2007;69(8):2649–2691.
- Ghosh S, Bhattacharya DK. Optimization in microbial pest control: an integrated approach. Appl Math Model. 2010;34(5):1382–1395.
- Pei Y, Ji X, Li C. Pest regulation by means of continuous impulsive nonlinear controls. Math Comput Model. 2010;51(5–6):810–822.
- Liang J, Tanga S, Cheke RA. An integrated pest management model with delayed responses to pesticide applications and its threshold dynamics. Nonlinear Anal Real World Appl. 2012;13(5):2352–2374.
- Apreutesei NC. An optimal control problem for a pest predator, and plant system. Nonlinear Anal Real World Appl. 2012;13(3):1391–1400.
- Kar TK, Ghorai A, Jana S. Dynamics of pest and predator model with disease in the pest optimal use of pesticide. J Theor Biol. 2012;310:187–198.
- Jana S, Haldar S, Das D, et al. Modeling and analysis of an ecological system incorporating infection and prey refuge. Biophys Rev Lett. 2018 Dec 21;13(4):195–216.
- Tankam-Chedjou I, Touzeau S, Mailleret L, et al. Modelling and control of a banana soilborne pest in a multi-seasonal framework. Math Biosci 2020;322:108324.
- Le Gal A, Robert C, Accatino F, et al. Modelling the interactions between landscape structure and spatio-temporal dynamics of pest natural enemies: implications for conservation biological control. Ecol Model. 2020;420:108912.
- Tan Y, Chen L. Modelling approach for biological control of insect pest by releasing infected pest. Chaos Solitans Fractals. 2009;39(1):304–315.
- Sun S, Chen L. Mathematical modelling to control a pest population by infected pests. Appl Math Model. 2009;33(6):2864–2873.
- Wang X, Song X. Mathematical models for the control of a pest population by infected pest. Comput Math Appl. 2008;56(1):266–278.
- Kar TK, Mondal PK. A mathematical study on the dynamics of an eco-epidemiological model in the presence of delay. Appl Appl Math. 2012;7(1):300–333.
- Zhang H, Chen L, Nieto JJ. A delayed epidemic model with stage-structure and pulses for pest management strategy. Nonlinear Anal Real World Appl. 2008;9(4):1714–1726.
- Guo H, Chen L. Time-limited pest control of a Lotka-Volterra model with impulsive harvest. Nonlinear Anal Real World Appl. 2009;10(2):840–848.
- Wang X, Tao Y, Song X. Analysis of pest-epidemic model by releasing diseased pest with impulsive transmission. Nonlinear Dyn. 2011;65(1–2):175–185.
- Wang T, Chen L. Nonlinear analysis of a microbial pesticide model with impulsive state feedback control. Nonlinear Dyn. 2011;65(1–2):1–10.
- Perumal R, Munigounder S, Mohd MH, et al. Stability analysis of the fractional-order prey-predator model with infection. Int J Modell Simul. 2020: 1–17
- Das S, Mahato SK, Mahato P. Biological control of infection pervasive via pest: a study of prey–predator model incorporating prey refuge under fuzzy impreciseness. Int J Modell Simul. 2021;1–25 . DOI:10.1080/02286203.2021.1964060.
- Haldar S, Khatua A, Das K, et al. Modeling and analysis of a predator–prey type eco-epidemic system with time delay. Model Earth Syst Environ. 2021;7(3):1753–1768.
- Morozov A, Petrovskii S. Excitable population dynamics, biological control failure, and spatiotemporal pattern formation in a model ecosystem. Bull Math Biol. 2009;71(4):863–887.
- Nandi SK, Mondal PK, Jana S, et al. Prey-predator model with two–stage infection in prey: concerning pest control. J Nonlinear Dyn. Article ID: 948728. 2015;.
- Railsback SF, Johnson MD. Effects of land use on bird populations and pest control services on coffee farms. Proc Natl Acad Sci. 2014;111(16):6109–6114.
- Rodríguez N. On an integro-differential model for pest control in a heterogeneous environment. J Math Biol. 2015;70(5):1177–1206.
- Das A, Samanta GP. Modeling the fear effect on a stochastic prey–predator system with additional food for the predator. J Phys A Math Theor. 2018a;51(46):465601.
- Das A, Samanta GP. Stochastic prey–predator model with additional food for predator. Phys A Stat Mech Appli. 2018b;512:121–141.
- Das A, Samanta GP. A prey–predator model with refuge for prey and additional food for predator in a fluctuating environment. Phys A Stat Mech Appli. 2020a;538:122844.
- Das A, Samanta GP. Modelling the fear effect in a two-species predator–prey system under the influence of toxic substances. Rendiconti del Circolo Matematico di Palermo Series. 2020b;2:1–26.
- Das A, Samanta GP. Modelling the effect of resource subsidy on a two-species predator-prey system under the influence of environmental noises. Int J Dyn Control. 1-18. 2021;9:1800–1817.
- Mondal S, Samanta GP. Provision of additional food as a tool of biological control in a delayed predator–prey interaction with prey refuge. Int J Modell Simul. 2021;1–25 . DOI:10.1080/02286203.2021.1949233.
- Srinivasu PDN, Prasad BSRV. Role of quantity of additional food to the predators as a control in predator-prey system with relevance to the pest management and biological conservation. Bull Math Biol. 2011;73(10):2249–2276.
- Sasmal SK, Mandal DS, Chattopadhyay J. A predator-pest model with Allee effect and pest culling and additional food provision to the predator—application to pest control. J Biol Syst. 2017;25(2):295–326.
- Anguelov R, Dufourd C, Dumont Y. Mathematical model for pest–insect control using mating disruption and trappingl. App Math Model. 2017;52:437–457.
- Al Basir F, Banerjee A, Ray S. Role of farming awareness in crop pest management-A mathematical model. J Theor Biol. 2019;461:59–67.
- Fleming WH, Rishel RW. Deterministic and stochastic optimal control. New York: Springer-Verlag; 1975.
- Zaman G, Kang YH, Jung IH. Stability analysis and optimal vaccination of an SIR epidemic model. BioSystems. 2008;93(3):240–249.
- Lukes DL. Differential equation: classical to controlled. In: Mathematics in Science and Engineering. New York: Academic Press; 1982.
- Pontryagin LS, Boltyanskii VG, Gamkrelidze RV, et al. The mathematical theory of optimal processes. New York: Wiley; 1962.
- Lenhart S, Workman JT. Optimal control applied to biological models, Mathematical and computational biology series. Boca Raton: Chapman & Hall CRC Press; 2007.
- Yang J, Tan Y. Effects of pesticide dose on Holling II predator–prey model with feedback control. J Biol Dyn. 2018;12(1):527–550.
- Yadav S, Kumar V. Study of a prey–predator model with preventing crop pest using natural enemies and control. AIP Conf Proc. 2021;2336(1):020002.