In this paper, we study analytically a class of nonlinear parabolic reaction- diffusion systems modeling the spread of infectious diseases with cross- diffusion terms. This model is governed by an S-I-R type system. First, we
prove the global existence of weak solution to this class of system by means of an approximation process, the Faedo-Galerkin method, some a priori estimates and compactness arguments. Then, using Gronwall’s lemma, we establish an existence and uniqueness result of weak solution for this class of systems without the cross-diffusion terms.
Keywords and phrases: infectious diseases S-I-R model cross-diffusion system weak solutions Faedo-Galerkin.