Abstract
Asymptomatic carriers play an important role in modelling infectious diseases. Asymptomatic infected people have no symptoms but can infect other people and spread the disease among other people. The laboratory confirmed that asymptomatic hepatitis B may infect individuals and may generate other infected cases. Due to this significant role of asymptomatic carriers, we are considering a new mathematical model for hepatitis B virus with asymptomatic carriers to study its dynamic analysis. First, we briefly discussed the formulation of the model, and then used the Caputo derivative to generalize the model. Using the definition of fractional stability analysis, we study the results of the model, and show that the model is locally asymptotically stable for disease-free cases when R0<1. We also give the result so that the model is globally asymptotically stable when R0<1. The endemic equilibrium of the model is obtained when R0>1, which demonstrates the existence of a unique endemic equilibrium. Additionally, we use a new numerical scheme that is introduced for fractional differential equations to get numerical results. We use a number of fractional order values and present the graphical results of the model.