Dynamical behavior of a fractional-order epidemic model for investigating two fear effect functions
Ashraf Adnan Thirthar, Hamadjam Abboubakar, Abdesslem Lamrani Alaoui, Kottakkaran Sooppy Nisar
Abstract
Using the Caputo operator, a model for a fractional-order epidemic is developed to investigate the fear effect in a pathogenic environment and vaccination procedure. First, we examine if the proposed model is positive. Next, based on the value of the control reproduction number R c , we compute both the control reproduction and strength numbers and derive the stability criteria of the disease-free equilibrium. In fact, we use the comparison theorem to show that the disease-free equilibrium point is globally asymptotically stable whenever R c < 1 . Next, we prove that the solutions of the fractional model exist and are unique. Finally, several numerical simulations are conducted to verify our theoretical results.