Optimal Control Studies on Age Structural Modeling of COVID-19 in Presence of Saturated Medical Treatment of Holling Type III

Abstract

In this study initially, we propose an age structured model and calculate the equilibrium points and basic reproduction number. Later we propose an optimal control problem to understand the roles of treatment in controlling the epidemic. From the Stability analysis we see that the infection free equilibrium remains asymptotically stable whenever R0 < 1 and as R0 crosses unity we have the infected equilibrium to be stable. From the sensitivity analysis parameters u11, b1, β1, d1 and μ were found to be sensitive. Findings from the Optimal Control studies suggests that the infection among the adult population(age ≥ 30) is least considering the second control u12 whereas, when both the controls u11 and u12 are considered together the infectives is minimum in case of young populations(age ≤ 30). The cumulative infected population reduced the maximum when the second control was considered followed by considering both the controls together. The control u12 was effective for mild epidemic (R0 ∈(1, 2)) whereas control u11 was found to be highly effective when epidemic was severe (R0 ∈(2, 7)) for the population of age group (≤ 30). Whereas for age group (≥ 30) the control u12 was highly effective for the entire range of basic reproduction number. The effect of saturation level in treatment is also explored numerically.