Résumé:
The aime of this work is to study the problem of global asymptotic stability for
equilibria of a spatially diffusive HIV/AIDS epidemic model with homogeneous
Neumann boundary condition. By discretizing the model with respect to the space
variable, we first then by incorporating the theory of stable matrix of VolterraLyapunov into the classical method of the Lyapunov functional ODEs model, and
then broaden the construction method into the PDEs model in which either
susceptible or infective populations are diffusive. In both cases, we obtain the
standard threshold dynamical behaviors, that is, if 01, then the disease-free
equilibrium is globally asymptotically stable and if 01, then the (strictly positive)
endemic equilibrium is globally asymptotically stable