Global asymptotic properties of a delay SIR epidemic model with finite incubation times

## Abstract We study the stability of a delay susceptible–infective–recovered epidemic model with time delay. The model is formulated under the assumption that all individuals are susceptible, and we analyse the global stability __via__ two methods—by Lyapunov functionals, and—in terms of the varia

In [1], there was a typographical error in the entries of the off-diagonal elements of the matrix A(t), starting on the line before Equation ( 15). The purpose of this current note is to correct this mistake and propose a direction for future work. Choose W 1 , W 2 > 0 such that W 2 = W 1 e -h I \*

In this paper, we consider the permanence of a discrete SIRS epidemic model with time delays. This model is constructed from the discretization by the Euler method. Applying the technique to prove the existence of an eventual lower bound in a continuous epidemic model, a sufficient condition for the

Th$ is a etudy of dypamic behavior of an SEIRS epidemic model with time delays. It is shown that disease-free equilibrium is globally stable if the reproduction number ls'not greater than one. when the reproduction number ls greater than 1, it is prov& th$ thd dll le uniformly persistent in the popu