COVID-19 MODEL WITH S-I FOR BEDDINGTON DE ANGELIS PREY-PREDATOR SPECIES
This paper presents the three species mathematical models in which the interaction of two preys-one predator where the virus will affected the healthy species under some mutual interference with handling time using Beddington De Angelis FR. The motive of this work is to interaction among healthy (susceptible) prey, infected prey and predator to minimize the spread of disease. Boundedness, Equilibrium points, check the periodic solution and analyse the stability with numerical examples using maple software of Rossler type. Finally the result of this model prey predator of the SI type using numerical simulations.
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