Abstract
In this paper, by constructing Lyapunov functionals, we consider the global
dynamics of an SIRS epidemic model with a wide class of nonlinear incidence rates
and distributed delays h
0 p(? )f (S(t), I (t - ?))d? under the condition that the total
population converges to 1. By using a technical lemma which is derived from strong
condition of strict monotonicity of functions f (S,I) and f (S,I)/I with respect to
S >= 0 and I > 0, we extend the global stability result for an SIR epidemic model
Anno
2012
Autori IAC
Tipo pubblicazione
Altri Autori
Enatsu, Yoichi; Messina, Eleonora; Nakata, Yukihiko; Muroya, Yoshiaki; Russo, Elvira; Vecchio, Antonia
Editore
Springer
Rivista
Journal of Applied Mathematics and Computing. International Journal
