An epidemic model with optimal control strategies was investigated for Hepatitus-A Viral disease that can be transmitted through infected
individuals. In this study, we used a deterministic compartmental model for assessing the effect of different control strategies to control the spread
of Hepatitus-A viral disease in the community. Stability theory of differential equations is used to study the qualitative behavior of the system. The
basic reproduction number that represents the epidemic indicator is obtained by using the condition of endemicity. Both the local stability and
global stability conditions for disease free equilibrium is established. Uniqueness of endemic equilibrium point and its global stability conditions are
proved. Numerical simulation of the model showed that applying all the control strategies can eliminate the disease from the community. However,
using all intervention strategies is impractical in most circumstances; therefore, using prevention strategies can be recommended in the present
mathematical modeling context.