We study a population model for an infectious disease that spreads in the h
ost population through both horizontal and vertical transmission. The total
host population is assumed to have constant density and the incidence term
is of the bilinear mass-action form. We prove that the global dynamics are
completely determined by the basic reproduction number R-0(p,q), where p a
nd q are fractions of infected newborns from the exposed and infectious cla
sses, respectively. If R-0 (p,q)less than or equal to1, the disease-free eq
uilibrium is globally stable and the disease always dies out. If R-0(p,q) >
1, a unique endemic equilibrium exists and is globally stable in the inter
ior of the feasible region, and the disease persists at an endemic equilibr
ium state if it initially exists. The contribution of the vertical transmis
sion to the basic reproduction number is also analyzed.